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Linear Systems and Signals, Second Edition B. P. Lathi Oxford University Press 2005 Published by Oxford University Press, Inc. 198 Madison Avenue, New York, New York 10016 http://www.oup.com © 2005 Oxford University Press, Inc. Oxford is a registered trademark of Oxford University Press All rights reserved. No part of this publication may be reproduced, stored in a retrieval system, or transmitted, in any form or by any means, electronic, mechanical, photocopying, recording, or otherwise, without the prior permission of Oxford University Press. Library of Congress Cataloging-in-Publication Data Lathi, B. P. (Bhagwandas Pannalal) Linear systems and signals/B. P. Lathi.—2nd ed. p. cm. 0-19-515833-4 1. Signal processing—Mathematics. 2. System analysis. 3. Linear time invariant systems. 4. Digital filters (Mathematics) I. Title. TK5102.5L298 2004 621.382′2—dc22 2003064978 987654321

Preface This book, Linear Systems and Signals, presents a comprehensive treatment of signals and linear systems at an introductory level. Like all my other books, it emphasizes physical appreciation of concepts through heuristic reasoning, and the use of metaphors, analogies, and creative explanations. Such an approach is much different from a purely deductive technique that uses mere mathematical manipulation of symbols. There is a temptation to treat engineering subjects as a branch of applied mathematics. Such an approach is a perfect match to the public image of engineering as a dry and dull discipline. It ignores the physical meaning behind various derivations and deprives a student of intuitive grasp and the enjoyable experience of logical uncovering of the subject matter. Here I have used mathematics not so much to prove axiomatic theory as to support and enhance physical and intuitive understanding. Wherever possible, theoretical results are interpreted heuristically and are enhanced by carefully chosen examples and analogies. This second edition, which closely follows the organization of the first edition, has been refined by incorporating suggestions and changes provided by various reviewers. The added topics include Bode plots, use of digital filters in an impulse-invariance method of designing analog systems, convergence of infinite series, bandpass systems, group and phase delay, and Fourier applications to communication systems. A significant and sizable addition in the area of MATLAB® (a registered trademark of The Math Works, Inc.) has been provided by Dr. Roger Green of North Dakota State University. Dr. Green discusses his contribution at the conclusion of this preface.

ORGANIZATION The book may be conceived as divided into five parts: 1. Introduction (Background and Chapter 1). 2. Time-domain analysis of linear time-invariant (LTI) systems (Chapters 2 and 3). 3. Frequency-domain (transform) analysis of LTI systems (Chapters 4 and 5). 4. Signal analysis (Chapters 6, 7, 8, and 9).

5. State-space analysis of LTI systems (Chapter 10). The organization of the book permits much flexibility in teaching the continuous-time and discrete-time concepts. The natural sequence of chapters is meant to integrate continuous-time and discrete-time analysis. It is also possible to use a sequential approach in which all the continuous-time analysis is covered first (Chapters 1, 2, 4, 6, 7, and 8), followed by discrete-time analysis (Chapters 3, 5, and 9).

SUGGESTIONS FOR USING THIS BOOK The book can be readily tailored for a variety of courses spanning 30 to 45 lecture hours. Most of the material in the first eight chapters can be covered at a brisk pace in about 45 hours. The book can also be used for a 30-lecture-hour course by covering only analog material (Chapters 1, 2, 4, 6, 7, and possibly selected topics in Chapter 8). Alternately, one can also select Chapters 1 to 5 for courses purely devoted to systems analysis or transform techniques. To treat continuous- and discrete-time systems by using an integrated (or parallel) approach, the appropriate sequence of Chapters is 1, 2, 3, 4, 5, 6, 7, and 8. For a sequential approach, where the continuous-time analysis is followed by discrete-time analysis, the proper chapter sequence is 1, 2, 4, 6, 7, 8, 3, 5, and possibly 9 (depending on the time availability). Logically, the Fourier transform should precede the Laplace transform. I have used such an approach in the companion volume, Signal Processing and Linear Systems (Oxford, 1998). However, a sizable number of instructors feel that it is easier for students to learn Fourier after Laplace. Such an approach has an appeal because of the gradual progression of difficulty, in the sense that the relatively more difficult concepts of Fourier are treated after the simpler area of Laplace. This book is written to accommodate that viewpoint. For those who wish to see Fourier before Laplace, there is Signal Processing and Linear Systems.

NOTABLE FEATURES The notable features of this book include the following: 1. Intuitive and heuristic understanding of the concepts and physical meaning of mathematical results are emphasized throughout. Such an approach not only leads to deeper appreciation and easier comprehension of the concepts, but also makes learning enjoyable for students. 2. Many students are handicapped by an inadequate background in basic material such as complex numbers, sinusoids, quick sketching of functions, Cramer's rule, partial fraction expansion, and matrix algebra. I have added a chapter that addresses these basic and pervasive topics in electrical engineering. Response by students has been unanimously enthusiastic. 3. There are more than 200 worked examples in addition to exercises (usually with answers) for students to test their understanding. There is also a large number of selected problems of varying difficulty at the end of each chapter. 4. For instructors who like to get students involved with computers, several examples are worked out by means of MATLAB, which is becoming a standard software package in electrical engineering curricula. There is also a MATLAB session at the end of each chapter. The problem set contains several computer problems. Working computer examples or problems, though not essential for the use of this book, is highly recommended. 5. The discrete-time and continuous-time systems may be treated in sequence, or they may be integrated by using a parallel approach. 6. The summary at the end of each chapter proves helpful to students in summing up essential developments in the chapter. 7. There are several historical notes to enhance student's interest in the subject. This information introduces students to the historical background that influenced the development of electrical engineering.

ACKNOWLEDGMENTS Several individuals have helped me in the preparation of this book. I am grateful for the helpful suggestions of the several reviewers. I am most grateful to Prof. Yannis Tsividis of Columbia University, who provided his comprehensively thorough and insightful feedback for the book. I also appreciate another comprehensive review by Prof. Roger Green. I thank Profs. Joe Anderson of Tennessee Technological University, Kai S. Yeung of the University of Texas at Arlington, and Alexander Poularikis of the University of Alabama at Huntsville for very thoughtful reviews. Thanks for helpful suggestions are also due to Profs. Babajide Familoni of the University of Memphis, Leslie Collins of Duke University, R. Rajgopalan of the University of

Arizona, and William Edward Pierson from the U.S. Air Force Research Laboratory. Only those who write a book understand that writing a book such as this is an obsessively time-consuming activity, which causes much hardship for the family members, where the wife suffers the most. So what can I say except to thank my wife, Rajani, for enormous but invisible sacrifices. B. P. Lathi

MATLAB MATLAB is a sophisticated language that serves as a powerful tool to better understand a myriad of topics, including control theory, filter design, and, of course, linear systems and signals. MATLAB's flexible programming structure promotes rapid development and analysis. Outstanding visualization capabilities provide unique insight into system behavior and signal character. By exploring concepts with MATLAB, you will substantially increase your comfort with and understanding of course topics. As with any language, learning MATLAB is incremental and requires practice. This book provides two levels of exposure to MATLAB. First, short computer examples are interspersed throughout the text to reinforce concepts and perform various computations. These examples utilize standard MATLAB functions as well as functions from the control system, signal processing, and symbolic math toolboxes. MATLAB has many more toolboxes available, but these three are commonly available in many engineering departments. A second and deeper level of exposure to MATLAB is achieved by concluding each chapter with a separate MATLAB session. Taken together, these eleven sessions provide a self-contained introduction to the MATLAB environment that allows even novice users to quickly gain MATLAB proficiency and competence. These sessions provide detailed instruction on how to use MATLAB to solve problems in linear systems and signals. Except for the very last chapter, special care has been taken to avoid the use of toolbox functions in the MATLAB sessions. Rather, readers are shown the process of developing their own code. In this way, those readers without toolbox access are not at a disadvantage. All computer code is available online (http://www.mathworks.com/support/books). Code for the computer examples in a given chapter, say Chapter xx, is named CExx.m. Program yy from MATLAB Session xx is named MSxxPyy.m. Additionally, complete code for each individual MATLAB session is named MSxx.m. Roger Green

Chapter B: Background The topics discussed in this chapter are not entirely new to students taking this course. You have already studied many of these topics in earlier courses or are expected to know them from your previous training. Even so, this background material deserves a review because it is so pervasive in the area of signals and systems. Investing a little time in such a review will pay big dividends later. Furthermore, this material is useful not only for this course but also for several courses that follow. It will also be helpful later, as reference material in your professional career.

B.1 COMPLEX NUMBERS Complex numbers are an extension of ordinary numbers and are an integral part of the modern number system. Complex numbers, particularly imaginary numbers, sometimes seem mysterious and unreal. This feeling of unreality derives from their unfamiliarity and novelty rather than their supposed nonexistence! Mathematicians blundered in calling these numbers "imaginary," for the term immediately prejudices perception. Had these numbers been called by some other name, they would have become demystified long ago, just as irrational numbers or negative numbers were. Many futile attempts have been made to ascribe some physical meaning to imaginary numbers. However, this effort is needless. In mathematics we assign symbols and operations any meaning we wish as long as internal consistency is maintained. The history of mathematics is full of entities that were unfamiliar and held in abhorrence until familiarity made them acceptable. This fact will become clear from the following historical note.

B.1-1 A Historical Note Among early people the number system consisted only of natural numbers (positive integers) needed to express the number of children, cattle, and quivers of arrows. These people had no need for fractions. Whoever heard of two and one-half children or three and one-fourth cows! However, with the advent of agriculture, people needed to measure continuously varying quantities, such as the length of a field and the weight of a quantity of butter. The number system, therefore, was extended to include fractions. The ancient Egyptians and Babylonians knew how to handle fractions, but Pythagoras discovered that some numbers (like the diagonal of a unit square) could not be expressed as a whole number or a fraction. Pythagoras, a number mystic, who regarded numbers as the essence and principle of all things in the universe, was so appalled at his discovery that he swore his followers to secrecy and imposed a death penalty for divulging this secret. [1] These numbers, however, were included in the number system by the time of Descartes, and they are now known as irrational numbers.

Until recently, negative numbers were not a part of the number system. The concept of negative numbers must have appeared absurd to early man. However, the medieval Hindus had a clear understanding of the significance of positive and negative numbers. [2] , [3] They were also the first to

recognize the existence of absolute negative quantities. [4] The works of Bhaskar (1114-1185) on arithmetic (Līlāvatī) and algebra (Bījaganit) not only

use the decimal system but also give rules for dealing with negative quantities. Bhaskar recognized that positive numbers have two square roots. [5] Much later, in Europe, the men who developed the banking system that arose in Florence and Venice during the late Renaissance (fifteenth century) are credited with introducing a crude form of negative numbers. The seemingly absurd subtraction of 7 from 5 seemed reasonable when bankers began to allow their clients to draw seven gold ducats while their deposit stood at five. All that was necessary for this purpose was to write the difference, 2, on the debit side of a ledger.[6]

Thus the number system was once again broadened (generalized) to include negative numbers. The acceptance of negative numbers made it

possible to solve equations such as x + 5 = 0, which had no solution before. Yet for equations such as x 2 + 1 = 0, leading to x 2 = −1, the solution could not be found in the real number system. It was therefore necessary to define a completely new kind of number with its square equal to −1. During the time of Descartes and Newton, imaginary (or complex) numbers came to be accepted as part of the number system, but they were still regarded as algebraic fiction. The Swiss mathematician Leonhard Euler introduced the notation i (for imaginary) around 1777 to represent √−1. Electrical engineers use the notation j instead of i to avoid confusion with the notation i often used for electrical current. Thus and This notation allows us to determine the square root of any negative number. For example, When imaginary numbers are included in the number system, the resulting numbers are called complex numbers. ORIGINS OF COMPLEX NUMBERS

Ironically (and contrary to popular belief), it was not the solution of a quadratic equation, such as x 2 + 1 = 0, but a cubic equation with real roots that made imaginary numbers plausible and acceptable to early mathematicians. They could dismiss √−1 as pure nonsense when it appeared as a solution to x 2 + 1 = 0 because this equation has no real solution. But in 1545, Gerolamo Cardano of Milan published Ars Magna (The Great Art), the most important algebraic work of the Renaissance. In this book he gave a method of solving a general cubic equation in which a root of a negative number appeared in an intermediate step. According to his method, the solution to a third-order equation[†] is given by

Gerolamo Cardano For example, to find a solution of x 3 + 6x − 20 = 0, we substitute a = 6, b = −20 in the foregoing equation to obtain

We can readily verify that 2 is indeed a solution of x 3 + 6x − 20 = 0. But when Cardano tried to solve the equation x 3 − 15x − 4 = 0 by this formula, his solution was

What was Cardano to make of this equation in the year 1545? In those days negative numbers were themselves suspect, and a square root of a negative number was doubly preposterous! Today we know that Therefore, Cardano's formula gives We can readily verify that x = 4 is indeed a solution of x 3 − 15x − 4 = 0. Cardano tried to explain halfheartedly the presence of but ultimately dismissed the whole enterprize as being "as subtle as it is useless." A generation later, however, Raphael Bombelli (1526-1573), after examining Cardano's results, proposed acceptance of imaginary numbers as a necessary vehicle that would transport the mathematician from the real cubic equation to its real solution. In other words, although we begin and end with real numbers, we seem compelled to move into an unfamiliar

world of imaginaries to complete our journey. To mathematicians of the day, this proposal seemed incredibly strange.7 Yet they could not dismiss the idea of imaginary numbers so easily because this concept yielded the real solution of an equation. It took two more centuries for the full importance of complex numbers to become evident in the works of Euler, Gauss, and Cauchy. Still, Bombelli deserves credit for recognizing that such numbers have a role to play in algebra.7

In 1799 the German mathematician Karl Friedrich Gauss, at the ripe age of 22, proved the fundamental theorem of algebra, namely that every algebraic equation in one unknown has a root in the form of a complex number. He showed that every equation of the nth order has exactly n solutions (roots), no more and no less. Gauss was also one of the first to give a coherent account of complex numbers and to interpret them as points in a complex plane. It is he who introduced the term "complex numbers" and paved the way for their general and systematic use. The number system was once again broadened or generalized to include imaginary numbers. Ordinary (or real) numbers became a special case of generalized (or complex) numbers. The utility of complex numbers can be understood readily by an analogy with two neighboring countries X and Y, as illustrated in Fig. B.1. If we want to travel from City a to City b (both in Country X), the shortest route is through Country Y, although the journey begins and ends in Country X. We may, if we desire, perform this journey by an alternate route that lies exclusively in X, but this alternate route is longer. In mathematics we have a similar situation with real numbers (Country X) and complex numbers (Country Y). All real-world problems must start with real numbers, and all the final results must also be in real numbers. But the derivation of results is considerably simplified by using complex numbers as an intermediary. It is also possible to solve any real-world problem by an alternate method, using real numbers exclusively, but such procedures would increase the work needlessly.

Figure B.1: Use of complex numbers can reduce the work.

B.1-2 Algebra of Complex Numbers A complex number (a, b) or a + jb can be represented graphically by a point whose Cartesian coordinates are (a, b) in a complex plane (Fig. B.2). Let us denote this complex number by z so that

The numbers a and b (the abscissa and the ordinate) of z are the real part and the imaginary part, respectively, of z. They are also expressed as

Note that in this plane all real numbers lie on the horizontal axis, and all imaginary numbers lie on the vertical axis. Complex numbers may also be expressed in terms of polar coordinates. If (r, θ) are the polar coordinates of a point z = a + jb (see Fig. B.2), then

and

Figure B.2: Representation of a number in the complex plane. The Euler formula states that To prove the Euler formula, we use a Maclaurin series to expand e jθ, cos θ, and sin θ:

Hence, it follows that[†]

Using Eq. (B.3) in (B.2) yields

Thus, a complex number can be expressed in Cartesian form a + jb or polar form re jθ with

and

Observe that r is the distance of the point z from the origin. For this reason, r is also called the magnitude (or absolute value) of z and is denoted by |z|. Similarly, θ is called the angle of z and is denoted by ∠z. Therefore and

Also

CONJUGATE OF A COMPLEX NUMBER We define z*, the conjugate of z = a + jb, as

The graphical representation of a number z and its conjugate z* is depicted in Fig. B.2. Observe that z* is a mirror image of z about the horizontal axis. To find the conjugate of any number, we need only replace j by −j in that number (which is the same as changing the sign of its angle). The sum of a complex number and its conjugate is a real number equal to twice the real part of the number:

The product of a complex number z and its conjugate is a real number |z| 2 , the square of the magnitude of the number:

UNDERSTANDING SOME USEFUL IDENTITIES

In a complex plane, re jθ represents a point at a distance r from the origin and at an angle θ with the horizontal axis, as shown in Fig. B.3a. For example, the number − 1 is at a unit distance from the origin and has an angle π or − π (in fact, any odd multiple of ± π), as seen from Fig. B.3b. Therefore,

Figure B.3: Understanding some useful identities in terms of re jθ. In fact,

The number 1, on the other hand, is also at a unit distance from the origin, but has an angle 2π (in fact, ±2nπ for any integer value of n). Therefore,

The number j is at unit distance from the origin and its angle is π/2 (see Fig. B.3b). Therefore, Similarly, Thus

In fact,

This discussion shows the usefulness of the graphic picture of re j. This picture is also helpful in several other applications. For example, to determine the limit of e (α+ jw)t as t → ∞, we note that

Now the magnitude of e jwt is unity regardless of the value of ω or t because e jwt = re jθ with r = 1. Therefore, e αt determines the behavior of e (α+ jω)t as t → ∞ and

In future discussions you will find it very useful to remember re jθ as a number at a distance r from the origin and at an angle θ with the horizontal axis of the complex plane. A WARNING ABOUT USING ELECTRONIC CALCULATORS IN COMPUTING ANGLES

From the Cartesian form a + jb we can readily compute the polar form re jθ [see Eq. (B.6)]. Electronic calculators provide ready conversion of rectangular into polar and vice versa. However, if a calculator computes an angle of a complex number by using an inverse trigonometric function θ = tan −1 (b/a), proper attention must be paid to the quadrant in which the number is located. For instance, θ corresponding to the number −2 − j3 is

tan −1 (−3/−2). This result is not the same as tan −1 (3/2). The former is −123.7°, whereas the latter is 56.3°. An electronic calculator cannot make

this distinction and can give a correct answer only for angles in the first and fourth quadrants. It will read tan −1 (−3/−2) as tan −1 (3/2), which is clearly wrong. When you are computing inverse trigonometric functions, if the angle appears in the second or third quadrant, the answer of the calculator is off by 180°. The correct answer is obtained by adding or subtracting 180° to the value found with the calculator (either adding or subtracting yields the correct answer). For this reason it is advisable to draw the point in the complex plane and determine the quadrant in which the point lies. This issue will be clarified by the following examples. EXAMPLE B.1 Express the following numbers in polar form: a. 2 + j3 b. −2 + j3 c. −2 − j3 d. 1 − j3 a. In this case the number is in the first quadrant, and a calculator will give the correct value of 56.3°. Therefore (see Fig. B.4a), we can

write

b.

Figure B.4: From Cartesian to polar form. In this case the angle is in the second quadrant (see Fig. B.4b), and therefore the answer given by the calculator, tan −1 (1/−2) = −26.6°, is off by 180°. The correct answer is (−26.6 ± 180)° = 153.4° or −206.6°. Both values are correct because they represent the same angle. It is a common practice to choose an angle whose numerical value is less than 180°. Such a value is called the principal value of the angle, which in this case is 153.4°. Therefore,

c. In this case the angle appears in the third quadrant (see Fig. B.4c), and therefore the answer obtained by the calculator (tan −1 (−3/−2) = 56.3°) is off by 180°. The correct answer is (56.3° 180)° = 236.3° or −123.7°. We choose the principal value −123.7° so that (see Fig. B.4c).

d. In this case the angle appears in the fourth quadrant (see Fig. B.4d), and therefore the answer given by the calculator, tan −1 (−3/1) = −71.6°, is correct (see Fig. B.4d):

COMPUTER EXAMPLE CB.1 Using the MATLAB function cart2pol, convert the following numbers from Cartesian form to polar form: a. z = 2 + j3 b. z = −2 + j1 >> [z_rad, z_mag] = cart2pol(2, 3); >> z_deg = z_rad* (180/pi); >> disp(['(a) z_mag = ',num2str(z_mag),'; z_rad = ',num2str(z_rad), ... >> '; z_deg = ',num2str(z_deg)]); (a) z mag = 3.6056; z rad = 0.98279; z deg = 56.3099 b. Therefore, z = 2 + j3 = 3.6056e j0.98279 + 3.6056e j56.3099° >> [z_rad, z_mag] = cart2pol(-2, 1); >> z_deg = z_rad* (180/pi); >> disp(['(b) z_mag = ',num2str(z_mag),'; z_rad = ',num2str(z_rad), ... >> '; z_deg = ',num2str(z_deg)]); (b) z mag = 2.2361; z rad = 2.6779; z deg = 153.4349 Therefore, z = −2 + j1 = 2.2361e j2.6779 = 2.2361e j153.4349° .

EXAMPLE B.2 Represent the following numbers in the complex plane and express them in Cartesian form: a. 2e jπ/3 b. 4e −j3π/4 c. 2e jπ/2 d. 3e −j3π e. 2e j4π f. 2e −j4π a. 2e jπ/3 = 2(cos π/3 + j sin π/3) = 1 + j √3 (See Fig. B.5b)

Figure B.5: From polar to Cartesian form. b. 4e −j3π/4 = 4(cos 3π/4 − j sin π/4) = −2√2 − j2 √2 (See Fig. B.5b) c. 2e jπ/2 = 2(cos π/2 + j sin π/2) = 2(0 + j 1) = j2 (See Fig. B.5c) d. 3e −j3π = 2(cos 3π − j sin 3π) = 3(−1 + j0) = −3 (See Fig. B.5d) e. 2e j4π = 2(cos 4π + j sin 4π) = 2(1 − j0) = 2 (See Fig. B.5e) f. 2e −j4π = 2(cos 4π − j sin 4π) = 2(1 − j0) = 2 (See Fig. B.5f) COMPUTER EXAMPLE CB.2 Using the MATLAB function pol2cart, convert the number z = 4e −j(3π/4) from polar form to Cartesian form. >> [z_real, z_imag] = pol2cart(-3*pi/4,4); >> disp (['z_real = ',num2str(z_real),'; z_imag = ',num2str(z_imag)]); z real = -2.8284; z imag = -2.8284 Therefore, z = 4e −j(3π/4) = −2.8284 − j2.8284. ARITHMETICAL OPERATIONS, POWERS, AND ROOTS OF COMPLEX NUMBERS To perform addition and subtraction, complex numbers should be expressed in Cartesian form. Thus, if

and then If z 1 and z 2 are given in polar form, we would need to convert them into Cartesian form for the purpose of adding (or subtracting). Multiplication and division, however, can be carried out in either Cartesian or polar form, although the latter proves to be much more convenient. This is because if z 1 and z 2 are expressed in polar form as then

and

Moreover,

and

This shows that the operations of multiplication, division, powers, and roots can be carried out with remarkable ease when the numbers are in polar form. Strictly speaking, there are n values for z 1/n (the nth root of z). To find all the n roots, we reexamine Eq. (B.15d).

The value of z 1/n given in Eq. (B.15d) is the principal value of z 1/n , obtained by taking the nth root of the principal value of z, which corresponds to the case k = 0 in Eq. (B.15e). EXAMPLE B.3 Determine z 1 z 2 and z 1 /z 2 for the numbers

We shall solve this problem in both polar and Cartesian forms. MULTIPLICATION: CARTESIAN FORM MULITPLICATION: POLAR FORM DIVISION: CARTESIAN FORM

To eliminate the complex number in the denominator, we multiply both the numerator and the denominator of the right-hand side by 2 − j3, the denominator's conjugate. This yields

DIVISION: POLAR FORM

It is clear from this example that multiplication and division are easier to accomplish in polar form than in Cartesian form. EXAMPLE B.4 For z 1 = 2e jπ/4 and z 2 = 8e jπ/3 , find the following: a. 2z 1 − z 2

b. 1/z 1 c. z 1 /z 2 2 d. a. Since subtraction cannot be performed directly in polar form, we convert z 1 and z 2 to Cartesian form:

Therefore,

b.

c. d. There are three cube roots of 8e j(π/3) = 8e jj(π/3+2k), k = 0, 1, 2. The principal value (value corresponding to k = 0) is 2e jπ/9. COMPUTER EXAMPLE CB.3 Determine z 1 z 2 and z 1 /z 2 if z 1 = 3 + j4 and z 2 = 2 + j3 >> z_1 = 3+j*4; z_2 = 2+j*3; >> z_1z_2 = z_1*z_2; >> z_1divz_2 = z_1/z_2; >> disp(['z_1*z_2 = ',num2str(z_1 z_2),'; z_1/z_2 = ',num2str(z_1divz_2)]); z 1*z 2 = -6+17i; z 1/z 2 = 1.3846-0.076923i Therefore, z 1 z 2 = (3 + j4)(2 + j3) = −6 + j17 and z 1 /z 2 = (3 + j4)/(2 + j3) = 1.3486 − j0.076923. EXAMPLE B.5 Consider X(ω), a complex function of a real variable ω:

a. Express X(ω) in Cartesian form, and find its real and imaginary parts. b. Express X(ω) in polar form, and find its magnitude |X(ω)| and angle ∠X(ω). a. To obtain the real and imaginary parts of X (ω), we must eliminate imaginary terms in the denominator of X (ω). This is readily done by multiplying both the numerator and the denominator of X(ω) by 3 − j4ω, the conjugate of the denominator 3 + j4ω so that

This is the Cartesian form of X(ω). Clearly the real and imaginary parts Xr(ω) and Xi (ω) are given by

b. This is the polar representation of X(ω). Observe that

LOGARITHMS OF COMPLEX NUMBERS We have

if then

The value of In z for k = 0 is called the principal value of In z and is denoted by Ln z.

In all these expressions, the case of k = 0 is the principal value of that expression. [1] Calinger, R., ed. Classics of Mathematics. Moore Publishing, Oak Park, IL, 1982. [2] Hogben, Lancelot. Mathematics in the Making. Doubleday, New York, 1960. [3] Cajori, Florian. A History of Mathematics, 4th ed. Chelsea, New York, 1985. [4] Encyclopaedia Britannica. Micropaedia IV, 15th ed., vol. 11, p. 1043. Chicago, 1982. [5] Singh, Jagjit. Great Ideas of Modern Mathematics. Dover, New York, 1959. [6] Dunham, William. Journey Through Genius. Wiley, New York, 1990. [†] This equation is known as the depressed cubic equation. A general cubic equation

can always be reduced to a depressed cubic form by substituting y = x − (p/3). Therefore any general cubic equation can be solved if we know the solution to the depressed cubic. The depressed cubic was independently solved, first by Scipione del Ferro (1465-1526) and then by Niccolo Fontana (1499-1557). The latter is better known in the history of mathematics as Tartaglia ("Stammerer"). Cardano learned the secret of the depressed cubic solution from Tartaglia. He then showed that by using the substitution y = x − (p/3), a general cubic is reduced to a depressed cubic. [†] It can be shown that when we impose the following three desirable properties on an exponential e z where z = x + jy, we come to conclusion that e jy = cos y + j sin y (Euler equation). These properties are

1. e z is a single-valued and analytic function of z. 2. de z /dz = e z 3. e z reduces to e x if y = 0.

B.2 SINUSOIDS Consider the sinusoid

We know that Therefore, cos φ repeats itself for every change of 2π in the angle φ. For the sinusoid in Eq. (B.18), the angle 2πf 0 t + θ changes by 2π when t changes by 1/f 0 . Clearly, this sinusoid repeats every 1/f 0 seconds. As a result, there are f0 repetitions per second. This is the frequency of the sinusoid, and the repetition interval T0 given by

is the period. For the sinusoid in Eq. (B.18), C is the amplitude, f0 is the frequency (in hertz), and θ is the phase. Let us consider two special cases of this sinusoid when θ = 0 and θ = −π/2 as follows: a. x(t) = C cos 2πf 0 t (θ = 0) b. x(t) = C cos (2πf 0 t − π/2) = C sin 2πf0 t (θ = −π/2) The angle or phase can be expressed in units of degrees or radians. Although the radian is the proper unit, in this book we shall often use the degree unit because students generally have a better feel for the relative magnitudes of angles expressed in degrees rather than in radians. For example, we relate better to the angle 24° than to 0.419 radian. Remember, however, when in doubt, use the radian unit and, above all, be consistent. In other words, in a given problem or an expression do not mix the two units. It is convenient to use the variable ω0 (radian frequency) to express 2π/f0 :

With this notation, the sinusoid in Eq. (B.18) can be expressed as in which the period T0 is given by [see Eqs. (B.19) and (B.20)]

and

In future discussions, we shall often refer to ω0 as the frequency of the signal cos (ω0 t + θ), but it should be clearly understood that the frequency of this sinusoid is f0 H z (f0 = ω0 /2π), and ω0 is actually the radian frequency. The signals C cos ω0 t and C sin ω0 t are illustrated in Fig. B.6a and B.6b, respectively. A general sinusoid C cos (ω0 t + θ) can be readily sketched by shifting the signal C cos ω0 t in Fig. B.6a by the appropriate amount. Consider, for example,

Figure B.6: Sketching a sinusoid. This signal can be obtained by shifting (delaying) the signal C cos ω0 t (Fig. B.6a) to the right by a phase (angle) of 60°. We know that a sinusoid undergoes a 360° change of phase (or angle) in one cycle. A quarter-cycle segment corresponds to a 90° change of angle. We therefore shift (delay) the signal in Fig. B.6a by two-thirds of a quarter-cycle segment to obtain C cos (ω0 t − 60°), as shown in Fig. B.6c. Observe that if we delay C cos ω0 t in Fig. B.6a by a quarter-cycle (angle of 90° or π/2 radians), we obtain the signal C sin ω0 t, depicted in Fig. B.6b. This verifies the well-known trigonometric identity

Alternatively, if we advance C sin ω0 t by a quarter-cycle, we obtain C cos ω0 t. Therefore,

This observation means sin ω0 t lags cos ω0 t by 90°(π/2 radians), or cos ω0 t leads sin ω0 t by 90°.

B.2-1 Addition of Sinusoids Two sinusoids having the same frequency but different phases add to form a single sinusoid of the same frequency. This fact is readily seen from the well-known trigonometric identity

in which Therefore,

Equations (B.23b) and (B.23c) show that C and θ are the magnitude and angle, respectively, of a complex number a − jb. In other words, a − jb =

Cejθ. Hence, to find C and θ, we convert a − jb to polar form and the magnitude and the angle of the resulting polar number are C and θ, respectively. To summarize,

in which C and θ are given by Eqs. (B.23b) and (B.23c), respectively. These happen to be the magnitude and angle, respectively, of a − jb. The process of adding two sinusoids with the same frequency can be clarified by using phasors to represent sinusoids. We represent the sinusoid C cos (ω0 t + θ) by a phasor of length C at an angle θ with the horizontal axis. Clearly, the sinusoid a cos ω0 t is represented by a horizontal phasor of length a (θ = 0), while b sin ω0 t = b cos (ω0 t − π/2) is represented by a vertical phasor of length b at an angle − π/2 with the horizontal (Fig. B.7). Adding these two phasors results in a phasor of length C at an angle θ, as depicted in Fig. B.7. From this figure, we verify the values of C and θ found in Eqs. (B.23b) and (B.23c), respectively.

Figure B.7: Phasor addition of sinusoids. Proper care should be exercised in computing θ, as explained on page 8 ("A Warning About Using Electronic Calculators in Computing Angles"). EXAMPLE B.6 In the following cases, express x(t) as a single sinusoid: a. x(t) = cos ω0 t − √3 sin ω0 t b. x(t) = −3 cos ω0 t + 4 sin ω0 t

a. In this case, a = 1, b = −√3, and from Eqs. (B.23)

Therefore, We can verify this result by drawing phasors corresponding to the two sinusoids. The sinusoid cos ω0 t is represented by a phasor of unit length at a zero angle with the horizontal. The phasor sin ω0 t is represented by a unit phasor at an angle of −90° with the horizontal, Therefore, −√3 sin ω0 t is represented by a phasor of length √2 at 90° with the horizontal, as depicted in Fig. B.8a. The two phasors added yield a phasor of length 2 at 60° with the horizontal (also shown in Fig. B.8a).

Figure B.8: Phasor addition of sinusoids. Alternately, we note that a − jb = 1 + j√3 = 2e jπ/3 . Hence, C = 2 and θ = π/3. Observe that a phase shift of ±π amounts to multiplication by −1. Therefore, x(t) can also be expressed alternatively as

In practice, the principal value, that, is, −120°, is preferred. b. In this case, a = −3, b = 4, and from Eqs. (B.23) we have

Observe that Therefore, This result is readily verified in the phasor diagram in Fig. B.8b. Alternately, a − jb = −3 −j4 = 5e −j126.9°. Hence, C = 5 and θ = −126.9°. COMPUTER EXAMPLE CB.4 Express f(t) = −3 cos (ω0 t) + 4 sin (ω0 t) as a single sinusoid. Notice that a cos (ω0 t) + b sin (ω0 t) = C cos [ω0 t + tan −1 (−b/a)]. Hence, the amplitude C and the angle θ of the resulting sinusoid are the magnitude and angle of a complex number a − jb. >> a= -3; b = 4; >> [theta,C] = cart2pol(a,-b); >> theta_deg = (180/pi)*theta; >> disp(['C = ',num2str(C),'; theta = ',num2str(theta),... >> '; theta_deg = ',nu,2str(theta_deg)]); C = 5; theta = -2.2143; theta deg = -126.8699 Therefore, f(t) = −3 cos (ω0 t) + 4 sin (ω0 t) = 5 cos (ω0 t − 2.2143) = 5 cos (ω0 t − 126.8699°). We can also perform the reverse operation, expressing in terms of cos ω0 t and sin ω0 t by means of the trigonometric identity

For example,

B.2-2 Sinusoids in Terms of Exponentials: Euler's Formula Sinusoids can be expressed in terms of exponentials by using Euler's formula [see Eq. (B.3)]

Inversion of these equations yields

B.3 SKETCHING SIGNALS In this section we discuss the sketching of a few useful signals, starting with exponentials.

B.3-1 Monotonic Exponentials The signal e −at decays monotonically, and the signal e at grows monotonically with t (assuming a > 0) as depicted in Fig. B.9. For the sake of

simplicity, we shall consider an exponential e −at starting at t = 0, as shown in Fig. B.10a.

Figure B.9: Monotonic exponentials.

Figure B.10: (a) Sketching e −at . (b) Sketching e −2t . The signal e −at has a unit value at t = 0. At t = 1/a, the value drops to 1/e (about 37% of its initial value), as illustrated in Fig. B.10a. This time interval over which the exponential reduces by a factor e (i.e., drops to about 37% of its value) is known as the time constant of the exponential.

Therefore, the time constant of e −at is 1/a. Observe that the exponential is reduced to 37% of its initial value over any time interval of duration 1/a. This can be shown by considering any set of instants t1 and t2 separated by one time constant so that

Now the ratio of e −at2 to e −at1 is given by

We can use this fact to sketch an exponential quickly. For example, consider The time constant in this case is 0.5. The value of x(t) at t = 0 is 1. At t = 0.5 (one time constant) it is 1/e (about 0.37). The value of x(t) continues

to drop further by the factor 1/e (37%) over the next half-second interval (one time constant). Thus x(t) at t = 1 is (1/e) 2 . Continuing in this manner,

we see that x(t) = (1/e) 3 at t = 1.5, and so on. A knowledge of the values of x(t) at t = 0, 0.5, 1, and 1.5 allows us to sketch the desired signal as shown in Fig. B.10b.[†]

For a monotonically growing exponential e at , the waveform increases by a factor e over each interval of 1/a seconds.

B.3-2 The Exponentially Varying Sinusoid We now discuss sketching an exponentially varying sinusoid

Let us consider a specific example:

We shall sketch 4e −2t and cos (6t − 60°) separately and then multiply them: i. Sketching 4e −2t . This monotonically decaying exponential has a time constant of 0.5 second and an initial value of 4 at t = 0.

Therefore, its values at t = 0.5, 1, 1.5, and 2 are 4/e, 4/e 2 , 4/e 3 , and 4/e 4 , or about 1.47, 0.54, 0.2, and 0.07, respectively. Using these

values as a guide, we sketch 4e −2t , as illustrated in Fig. B.11a.

ii. Sketching cos (6t − 60°). The procedure for sketching cos (6t − 60°) is discussed in Section B.2 (Fig. B.6c). Here the period of the sinusoid is T0 = 2π/6 ≈ 1, and there is a phase delay of 60°, or two-thirds of a quarter-cycle, which is equivalent to a delay of about (60/360)(1) ≈ 1/6 second (see Fig. B.11b).

Figure B.11: Sketching an exponentially varying sinusoid. iii. Sketching 4e −2t cos (6t − 60°). We now multiply the waveforms in steps i and ii. This multiplication amounts to forcing the sinusoid 4 cos (6t − 60°) to decrease exponentially with a time constant of 0.5. The initial amplitude (at t = 0) is 4, decreasing to 4/e (= 1.47) at t = 0.5, to 1.47/e (= 0.54) at t = 1, and so on. This is depicted in Fig. B.11c. Note that when cos (6t − 60°) has a value of unity (peak amplitude),

Therefore, 4e −2t cos (6t − 60°) touches 4e −2t at the instants at which the sinusoid cos (6t − 60°) is at its positive peaks. Clearly 4e −2t is an

envelope for positive amplitudes of4e −2t cos (6t − 60°). Similar argument shows that 4e −2t cos (6t − 60°) touches −4e −2t at its negative peaks.

Therefore, −4e −2t is an envelope for negative amplitudes of 4e −2t cos (6t − 60°). Thus, to sketch 4e −2t cos (6t − 60°), we first draw the envelopes

4e −2t and −4e −2t (the mirror image of 4e −2t about the horizontal axis), and then sketch the sinusoid cos (6t − 60°), with these envelopes acting as constraints on the sinusoid's amplitude (see Fig. B.11c). In general, Ke−at cos (ω0 t + θ) can be sketched in this manner, with Ke−at and −Ke−at constraining the amplitude of cos (ω0 t + θ). [†] If we wish to refine the sketch further, we could consider intervals of half the time constant over which the signal decays by a factor 1/√e. Thus, at t = 0.25, x(t) = 1/√e, and at t = 0.75, x(t) = 1/e√e, and so on.

B.4 CRAMER'S RULE Cramer's rule offers a very convenient way to solve simultaneous linear equations. Consider a set of n linear simultaneous equations in n unknowns x 1 , x 2 ,..., x n :

These equations can be expressed in matrix form as

We denote the matrix on the left-hand side formed by the elements a ij as A. The determinant of A is denoted by |A|. If the determinant |A| is not zero, the set of equations (B.29) has a unique solution given by Cramer's formula

where |D k | is obtained by replacing the kth column of |A| by the column on the right-hand side of Eq. (B.30) (with elements y 1 , y 2 ,..., y n ). We shall demonstrate the use of this rule with an example. EXAMPLE B.7 Use Cramer's rule to solve the following simultaneous linear equations in three unknowns:

In matrix form these equations can be expressed as

Here,

Since |A| = 4 ≠ 0, a unique solution exists for x 1 , x 2 , and x 3 . This solution is provided by Cramer's rule [Eq. (B.31)] as follows:

B.5 PARTIAL FRACTION EXPANSION In the analysis of linear time-invariant systems, we encounter functions that are ratios of two polynomials in a certain variable, say x. Such functions are known as rational functions. A rational function F(x) can be expressed as

The function F(x) is improper if m ≧ n and proper if m < n. An improper function can always be separated into the sum of a polynomial in x and a proper function. Consider, for example, the function

Because this is an improper function, we divide the numerator by the denominator until the remainder has a lower degree than the denominator.

Therefore, F(x) can be expressed as

A proper function can be further expanded into partial fractions. The remaining discussion in this section is concerned with various ways of doing this.

B.5-1 Method of Clearing Fractions A rational function can be written as a sum of appropriate partial fractions with unknown coefficients, which are determined by clearing fractions and equating the coefficients of similar powers on the two sides. This procedure is demonstrated by the following example. EXAMPLE B.8 Expand the following rational function F(x) into partial fractions:

This function can be expressed as a sum of partial fractions with denominators (x + 1), (x + 2), (x + 3), and (x + 3) 2 , as follows:

To determine the unknowns k 1 , k 2 , k 3 , and k 4 we clear fractions by multiplying both sides by (x + 1)(x + 2)(x + 3) 2 to obtain

Equating coefficients of similar powers on both sides yields

Solution of these four simultaneous equations yields Therefore,

Although this method is straightforward and applicable to all situations, it is not necessarily the most efficient. We now discuss other methods that can reduce numerical work considerably.

B.5-2 The Heaviside "Cover-Up" Method

Distinct Factors Of Q(x) We shall first consider the partial fraction expansion of F(x) = P(x)/Q(x), in which all the factors of Q(x) are distinct (not repeated). Consider the proper function

We can show that F(x) in Eq. (B.35a) can be expressed as the sum of partial fractions

To determine the coefficient k 1 , we multiply both sides of Eq. (B.35b) by x − λ1 and then let x = λ1 . This yields

On the right-hand side, all the terms except k 1 vanish. Therefore,

Similarly, we can show that

This procedure also goes under the name method of residues. EXAMPLE B.9 Expand the following rational function F(x) into partial fractions:

To determine k 1 , we let x = −1 in (x + 1) F(x). Note that (x + 1)F(x) is obtained from F(x) by omitting the term (x + 1) from its denominator. Therefore, to compute k 1 corresponding to the factor (x + 1), we cover up the term (x + 1) in the denominator of F(x) and then substitute x = −1 in the remaining expression. [Mentally conceal the term (x + 1) in F(x) with a finger and then let x = −1 in the remaining expression.] The steps in covering up the function

are as follows. Step 1. Cover up (conceal) the factor (x + 1) from F(x):

Step 2. Substitute x = −1 in the remaining expression to obtain k 1 :

Similarly, to compute k 2 , we cover up the factor (x − 2) in F(x) and let x = 2 in the remaining function, as follows:

and

Therefore,

Complex Factors Of Q(x) The procedure just given works regardless of whether the factors of Q(x) are real or complex. Consider, for example,

where

Similarly,

Therefore,

The coefficients k 2 and k 3 corresponding to the complex conjugate factors are also conjugates of each other. This is generally true when the coefficients of a rational function are real. In such a case, we need to compute only one of the coefficients. Quadratic Factors Often we are required to combine the two terms arising from complex conjugate factors into one quadratic factor. For example, F(x) in Eq. (B.38) can be expressed as

The coefficient k 1 is found by the Heaviside method to be 2. Therefore,

The values of c 1 and c 2 are determined by clearing fractions and equating the coefficients of similar powers of x on both sides of the resulting equation. Clearing fractions on both sides of Eq. (B.40) yields

Equating terms of similar powers yields c 1 = 2, c 2 = −8, and

SHORTCUTS The values of c 1 and c 2 in Eq. (B.40) can also be determined by using shortcuts. After computing k 1 = 2 by the Heaviside method as before, we let x = 0 on both sides of Eq. (B.40) to eliminate c 1 . This gives us

Therefore, To determine c 1 , we multiply both sides of Eq. (B.40) by x and then let x → ∞. Remember that when x → ∞, only the terms of the highest power are significant. Therefore, and In the procedure discussed here, we let x = 0 to determine c 2 and then multiply both sides by x and let x → ∞ to determine c 1 . However, nothing is sacred about these values (x = 0 or x = ∞). We use them because they reduce the number of computations involved. We could just as well use

other convenient values for x, such as x = 1. Consider the case

We find k = 1 by the Heaviside method in the usual manner. As a result,

To determine c 1 and c 2 , if we try letting x = 0 in Eq. (B.43), we obtain ∞ on both sides. So let us choose x = 1. This yields

or We can now choose some other value for x, such as x = 2, to obtain one more relationship to use in determining c 1 and c 2 . In this case, however, a simple method is to multiply both sides of Eq. (B.43) by x and then let x → ∞. This yields so that Therefore,

B.5-3 Repeated Factors of Q(x) If a function F(x) has a repeated factor in its denominator, it has the form

Its partial fraction expansion is given by

The coefficients k 1 , k 2 ,..., k j corresponding to the unrepeated factors in this equation are determined by the Heaviside method, as before [Eq. (B.37)]. To find the coefficients a 0 , a 1 , a 2 ,..., a r−1 , we multiply both sides of Eq. (B.45) by (x − λ) r. This gives us

If we let x = λ on both sides of Eq. (B.46), we obtain

Therefore, a 0 is obtained by concealing the factor (x − λ) r in F(x) and letting x = λ in the remaining expression (the Heaviside "cover-up" method). If we take the derivative (with respect to x) of both sides of Eq. (B.46), the right-hand side is a 1 + terms containing a factor (x − λ) in their numerators. Letting x = λ on both sides of this equation, we obtain

Thus, a 1 is obtained by concealing the factor (x − λ) r in F(x), taking the derivative of the remaining expression, and then letting x = λ. Continuing in this manner, we find

Observe that (x − λ) r F(x) is obtained from F(x) by omitting the factor (x − λ) r from its denominator. Therefore, the coefficient a j is obtained by concealing the factor (x − λ) r in F(x), taking the jth derivative of the remaining expression, and then letting x = λ (while dividing by j!).

EXAMPLE B.10 Expand F(x) into partial fractions if

The partial fractions are

The coefficient k is obtained by concealing the factor (x + 2) in F(x) and then substituting x = −2 in the remaining expression:

To find a 0 , we conceal the factor (x + 1) 3 in F(x) and let x = −1 in the remaining expression:

To find a 1 , we conceal the factor (x + 1) 3 in F(x), take the derivative of the remaining expression, and then let x = −1:

Similarly,

Therefore,

B.5-4 Mixture of the Heaviside "Cover-Up" and Clearing Fractions For multiple roots, especially of higher order, the Heaviside expansion method, which requires repeated differentiation, can become cumbersome. For a function that contains several repeated and unrepeated roots, a hybrid of the two procedures proves to be the best. The simpler coefficients are determined by the Heaviside method, and the remaining coefficients are found by clearing fractions or shortcuts, thus incorporating the best of the two methods. We demonstrate this procedure by solving Example B.10 once again by this method. In Example B.10, coefficients k and a 0 are relatively simple to determine by the Heaviside expansion method. These values were found to be k 1 = 1 and a 0 = 2. Therefore,

We now multiply both sides of this equation by (x + 1) 3 (x + 2) to clear the fractions. This yields

Equating coefficients of the third and second powers of x on both sides, we obtain

We may stop here if we wish because the two desired coefficients, a 1 and a 2 , are now determined. However, equating the coefficients of the two

remaining powers of x yields a convenient check on the answer. Equating the coefficients of the x 1 and x 0 terms, we obtain

These equations are satisfied by the values a 1 = 1 and a 2 = 3, found earlier, providing an additional check for our answers. Therefore,

which agrees with the earlier result. A MIXTURE OF THE HEAVISIDE "Cover-Up" AND SHORTCUTS

In Example B.10, after determining the coefficients a 0 = 2 and k = 1 by the Heaviside method as before, we have

There are only two unknown coefficients, a 1 and a 2 . If we multiply both sides of this equation by x and then let x → ∞, we can eliminate a 1 . This yields Therefore,

There is now only one unknown a 1 , which can be readily found by setting x equal to any convenient value, say x = 0. This yields

which agrees with our earlier answer. There are other possible shortcuts. For example, we can compute a 0 (coefficient of the highest power of the repeated root), subtract this term from both sides, and then repeat the procedure.

B.5-5 Improper F (x) with m = n A general method of handling an improper function is indicated in the beginning of this section. However, for a special case of the numerator and denominator polynomials of F(x) being of the same degree (m = n), the procedure is the same as that for a proper function. We can show that for

the coefficients k 1 , k 2 ,..., k n are computed as if F(x) were proper. Thus, For quadratic or repeated factors, the appropriate procedures discussed in Sections B.5-2 or B.5-3 should be used as if F(x) were proper. In other words, when m = n, the only difference between the proper and improper case is the appearance of an extra constant b n in the latter. Otherwise the procedure remains the same. The proof is left as an exercise for the reader. EXAMPLE B.11 Expand F(x) into partial fractions if

Here m = n = 2 with b n = b 2 = 3. Therefore,

in which

and

Therefore,

B.5-6 Modified Partial Fractions In finding the inverse z-transforms (Chapter 5), we require partial fractions of the form kx/(x − λi ) r rather than k/(x − λi ) r. This can be achieved by expanding F(x)/x into partial fractions. Consider, for example,

Dividing both sides by x yields

Expansion of the right-hand side into partial fractions as usual yields

Using the procedure discussed earlier, we find a 1 = 1, a 2 = 1, a 3 = −2, and a 4 = 1. Therefore,

Now multiplying both sides by x yields

This expresses F(x) as the sum of partial fractions having the form kx/(x − λi ) r.

B.6 VECTORS AND MATRICES An entity specified by n numbers in a certain order (ordered n-tuple) is an n-dimensional vector. Thus, an ordered n-tuple (x 1 , x 2 ,..., x n ) represents an n-dimensional vector x. A vector may be represented as a row (row vector): or as a column (column vector):

Simultaneous linear equations can be viewed as the transformation of one vector into another. Consider, for example, the n simultaneous linear equations

If we define two column vectors x and y as

then Eqs. (B.48) may be viewed as the relationship or the function that transforms vector x into vector y. Such a transformation is called the linear transformation of vectors. To perform a linear transformation, we need to define the array of coefficients a ij appearing in Eqs. (B.48). This array is called a matrix and is denoted by A for convenience:

A matrix with m rows and n columns is called a matrix of the order (m, n) or an (m × n) matrix. For the special case of m = n, the matrix is called a square matrix of order n. It should be stressed at this point that a matrix is not a number such as a determinant, but an array of numbers arranged in a particular order. It is convenient to abbreviate the representation of matrix A in Eq. (B.50) with the form (a ij) m x n, implying a matrix of order m x n with a ij as its ijth element. In practice, when the order m x n is understood or need not be specified, the notation can be abbreviated to (a ij). Note that the first index i of a ij indicates the row and the second index j indicates the column of the element a ij in matrix A. The simultaneous equations (B.48) may now be expressed in a symbolic form as

or

Equation (B.51) is the symbolic representation of Eq. (B.48). Yet we have not defined the operation of the multiplication of a matrix by a vector. The quantity Ax is not meaningful until such an operation has been defined.

B.6-1 Some Definitions and Properties A square matrix whose elements are zero everywhere except on the main diagonal is a diagonal matrix. An example of a diagonal matrix is

A diagonal matrix with unity for all its diagonal elements is called an identity matrix or a unit matrix, denoted by I. This is a square matrix:

The order of the unit matrix is sometimes indicated by a subscript. Thus, In represents the n − n unit matrix (or identity matrix). However, we shall omit the subscript. The order of the unit matrix will be understood from the context. A matrix having all its elements zero is a zero matrix. A square matrix A is a symmetric matrix if a ij = a ij (symmetry about the main diagonal). Two matrices of the same order are said to be equal if they are equal element by element. Thus, if then A = B only if a ij = b ij for all i and j. If the rows and columns of an m × n matrix A are interchanged so that the elements in the ith row now become the elements of the ith column (for i = 1, 2,..., m), the resulting matrix is called the transpose of A and is denoted by A T. It is evident that A T is an n x m matrix. For example, if

Thus, if then

Note that

B.6-2 Matrix Algebra We shall now define matrix operations, such as addition, subtraction, multiplication, and division of matrices. The definitions should be formulated so that they are useful in the manipulation of matrices. ADDITION OF MATRICES For two matrices A and B, both of the same order (m × n),

we define the sum A + B as

or Note that two matrices can be added only if they are of the same order. MULTIPLICATION OF A MATRIX BY A SCALAR We multiply a matrix A by a scalar c as follows:

We also observe that the scalar c and the matrix A commute, that is, MATRIX MULTIPLICATION We define the product in which c ij, the element of C in the ith row and jth column, is found by adding the products of the elements of A in the ith row with the corresponding elements of B in the jth column. Thus,

This result is expressed as follows:

Note carefully that if this procedure is to work, the number of columns of A must be equal to the number of rows of B. In other words, AB, the product of matrices A and B, is defined only if the number of columns of A is equal to the number of rows of B. If this condition is not satisfied, the product AB is not defined and is meaningless. When the number of columns of A is equal to the number of rows of B, matrix A is said to be conformable to matrix B for the product AB. Observe that if A is an m × n matrix and B is an n × p matrix, A and B are conformable for the product, and C is an m × p matrix. We demonstrate the use of the rule in Eq. (B.56) with the following examples.

In both cases, the two matrices are conformable. However, if we interchange the order of the matrices as follows,

the matrices are no longer conformable for the product. It is evident that in general,

Indeed, AB may exist and BA may not exist, or vice versa, as in our examples. We shall see later that for some special matrices, AB = BA. When

this is true, matrices A and B are said to commute. We reemphasize that in general, matrices do not commute. In the matrix product AB, matrix A is said to be postmultiplied by B or matrix B is said to be premultiplied by A. We may also verify the following relationships:

We can verify that any matrix A premultiplied or postmultiplied by the identity matrix I remains unchanged:

Of course, we must make sure that the order of I is such that the matrices are conformable for the corresponding product. We give here, without proof, another important property of matrices:

where |A| and |B| represent determinants of matrices A and B. MULTIPLICATION OF A MATRIX BY A VECTOR Consider the matrix Eq. (B.52), which represents Eq. (B.48). The right-hand side of Eq. (B.52) is a product of the m × n matrix A and a vector x. If, for the time being, we treat the vector x as if it were an n × 1 matrix, then the product Ax, according to the matrix multiplication rule, yields the righthand side of Eq. (B.48). Thus, we may multiply a matrix by a vector by treating the vector as if it were an n × 1 matrix. Note that the constraint of conformability still applies. Thus, in this case, xA is not defined and is meaningless. MATRIX INVERSION To define the inverse of a matrix, let us consider the set of equations represented by Eq. (B.52):

We can solve this set of equations for x 1 ,x 2 ,...,x n in terms of y 1 , y 2 ,..., y n , by using Cramer's rule [see Eq. (B.31)]. This yields

in which |A| is the determinant of the matrix A and |D ij| is the cofactor of element a ij in the matrix A. The cofactor of element a ij is given by (−1) i+j times the determinant of the (n − 1) × (n − 1) matrix that is obtained when the ith row and the jth column in matrix A are deleted. We can express Eq. (B.62a) in matrix form as

We now define A −1 , the inverse of a square matrix A, with the property

Then, premultiplying both sides of Eq. (B.63) by A −1 , we obtain or

A comparison of Eq. (B.65) with Eq. (B.62b) shows that

One of the conditions necessary for a unique solution of Eq. (B.62a) is that the number of equations must equal the number of unknowns. This

implies that the matrix A must be a square matrix. In addition, we observe from the solution as given in Eq. (B.62b) that if the solution is to exist, |A|

≠ 0.[†] Therefore, the inverse exists only for a square matrix and only under the condition that the determinant of the matrix be nonzero. A matrix whose determinant is nonzero is a nonsingular matrix. Thus, an inverse exists only for a nonsingular, square matrix. By definition, we have

Postmultiplying this equation by A −1 and then premultiplying by A, we can show that

Clearly, the matrices A and A −1 commute. The operation of matrix division can be accomplished through matrix inversion. EXAMPLE B.12 Let us find A −1 if

Here

and |A| = −4. Therefore,

B.6-3 Derivatives and Integrals of a Matrix Elements of a matrix need not be constants; they may be functions of a variable. For example, if

then the matrix elements are functions of t. Here, it is helpful to denote A by A(t). Also, it would be helpful to define the derivative and integral of A(t). The derivative of a matrix A(t) (with respect to t) is defined as a matrix whose ijth element is the derivative (with respect to t) of the ijth element of the matrix A. Thus, if then

or

Thus, the derivative of the matrix in Eq. (B.68) is given by

Similarly, we define the integral of A(t) (with respect to t) as a matrix whose ijth element is the integral (with respect to t) of the ijth element of the matrix A:

Thus, for the matrix A in Eq. (B.68), we have

We can readily prove the following identities:

The proofs of identities (B.71a) and (B.71b) are trivial. We can prove Eq. (B.71c) as follows. Let A be an m x n matrix and B an n x p matrix. Then, if from Eq. (B.56), we have

and

or Equation (B.72) along with the multiplication rule clearly indicate that d ik is the ikth element of matrix Equation (B.71c) then follows.

and e ik is the ikth element of matrix

If we let B = A −1 in Eq. (B.71c), we obtain

But since

we have

B.6-4 The Characteristic Equation of a Matrix: The Cayley-Hamilton Theorem For an (n − n) square matrix A, any vector x (x ≠ 0) that satisfies the equation

is an eigenvector (or characteristic vector), and λ is the corresponding eigenvalue (or characteristic value) of A. Equation (B.74) can be expressed as

The solution for this set of homogeneous equations exists if and only if

or

Equation (B.76a) [or (B.76b)] is known as the characteristic equation of the matrix A and can be expressed as

Q(λ) is called the characteristic polynomial of the matrix A. The n zeros of the characteristic polynomial are the eigenvalues of A and, corresponding to each eigenvalue, there is an eigenvector that satisfies Eq. (B.74). The Cayley-Hamilton theorem states that every n × n matrix A satisfies its own characteristic equation. In other words, Eq. (B.77) is valid if λ. is replaced by A:

FUNCTIONS OF A MATRIX We now demonstrate the use of the Cayley-Hamilton theorem to evaluate functions of a square matrix A. Consider a function f(λ) in the form of an infinite power series:

Since λ, being an eigenvalue (characteristic root) of A, satisfies the characteristic equation [Eq. (B.77)], we can write

If we multiply both sides by λ, the left-hand side is λn+1 , and the right-hand side contains the terms λn , λn-1 , ..., λ. Using Eq. (B.80), we substitute

λn , in terms of λn−1 , ? n-2 ,..., λ so that the highest power on the right-hand side is reduced to n − 1. Continuing in this way, we see that λn+k can

be expressed in terms of λn-1 , ? n-2 ,...,λ for any k. Hence, the infinite series on the right-hand side of Eq. (B.79) can always be expressed in terms of λn−1 , λn−2 ,λ,λ and a constant as

If we assume that there are n distinct eigenvalues ? 1 , ? 2 ,..., λn , then Eq. (B.81) holds for these n values of λ. The substitution of these values in Eq. (B.81) yields n simultaneous equations

and

Since A also satisfies Eq. (B.80), we may advance a similar argument to show that if f(A) is a function of a square matrix A expressed as an infinite power series in A, then

and, as argued earlier, the right-hand side can be expressed using terms of power less than or equal to n − 1,

in which the coefficients βi s are found from Eq. (B.82b). If some of the eigenvalues are repeated (multiple roots), the results are somewhat modified. We shall demonstrate the utility of this result with the following two examples.

B.6-5 Computation of an Exponential and a Power of a Matrix Let us compute e At defined by

From Eq. (B.83b), we can express

in which the βi s are given by Eq. (B.82b), with f(λi ) = eλit . EXAMPLE B.13 Let us consider

The characteristic equation is

Hence, the eigenvalues are λ1 = −1, λ2 = −2, and in which

and

COMPUTATION OF A k As Eq. (B.83b) indicates, we can express A k as in which the βi s are given by Eq. (B.82b) with f(λi ) = λk i . For a completed example of the computation of A k by this method, see Example 10.12. [†] These two conditions imply that the number of equations is equal to the number of unknowns and that all the equations are independent.

B.7 MISCELLANEOUS B.7-1 L'Hôpital's Rule If lim f(x)/g(x) results in the indeterministic form 0/0 or ∞/∞, then

B.7-2 The Taylor and Maclaurin Series

B.7-3 Power Series

B.7-4 Sums

B.7-5 Complex Numbers

B.7-6 Trigonometric Identities

B.7-7 Indefinite Integrals

B.7-8 Common Derivative Formulas

B.7-9 Some Useful Constants

B.7-10 Solution of Quadratic and Cubic Equations Any quadratic equation can be reduced to the form The solution of this equation is provided by

A general cubic equation may be reduced to the depressed cubic form by substituting

This yields Now let

The solution of the depressed cubic is

and

REFERENCES 1. Asimov, Isaac. Asimov on Numbers. Bell Publishing, New York, 1982. 2. Calinger, R., ed. Classics of Mathematics. Moore Publishing, Oak Park, IL, 1982. 3. Hogben, Lancelot. Mathematics in the Making. Doubleday, New York, 1960. 4. Cajori, Florian. A History of Mathematics, 4th ed. Chelsea, New York, 1985. 5. Encyclopaedia Britannica. Micropaedia IV, 15th ed., vol. 11, p. 1043. Chicago, 1982. 6. Singh, Jagjit. Great Ideas of Modern Mathematics. Dover, New York, 1959. 7. Dunham, William. Journey Through Genius. Wiley, New York, 1990.

MATLAB SESSION B: ELEMENTARY OPERATIONS MB.1 MATLAB OVERVIEW Although MATLAB(r) (a registered trademark of The Math Works, Inc.) is easy to use, it can be intimidating to new users. Over the years, MATLAB has evolved into a sophisticated computational package with thousands of functions and thousands of pages of documentation. This section provides a brief introduction to the software environment. When MATLAB is first launched, its command window appears. When MATLAB is ready to accept an instruction or input, a command prompt (>>) is displayed in the command window. Nearly all MATLAB activity is initiated at the command prompt. Entering instructions at the command prompt generally results in the creation of an object or objects. Many classes of objects are possible, including

functions and strings, but usually objects are just data. Objects are placed in what is called the MATLAB workspace. If not visible, the workspace can be viewed in a separate window by typing workspace at the command prompt. The workspace provides important information about each object, including the object's name, size, and class. Another way to view the workspace is the whos command. When whos is typed at the command prompt, a summary of the workspace is printed in the command window. The who command is a short version of whos that reports only the names of workspace objects. Several functions exist to remove unnecessary data and help free system resources. To remove specific variables from the workspace, the clear command is typed, followed by the names of the variables to be removed. Just typing clear removes all objects from the workspace. Additionally, the clc command clears the command window, and the clf command clears the current figure window. Often, important data and objects created in one session need to be saved for future use. The save command, followed by the desired filename, saves the entire workspace to a file, which has the .mat extension. It is also possible to selectively save objects by typing save followed by the filename and then the names of the objects to be saved. The load command followed by the filename is used to load the data and objects contained in a MATLAB data file (.mat file). Although MATLAB does not automatically save workspace data from one session to the next, lines entered at the command prompt are recorded in the command history. Previous command lines can be viewed, copied, and executed directly from the command history window. From the command window, pressing the up or down arrow key scrolls through previous commands and redisplays them at the command prompt. Typing the first few characters and then pressing the arrow keys scrolls through the previous commands that start with the same characters. The arrow keys allow command sequences to be repeated without retyping. Perhaps the most important and useful command for new users is help. To learn more about a function, simply type help followed by the function name. Helpful text is then displayed in the command window. The obvious shortcoming of help is that the function name must first be known. This is especially limiting for MATLAB beginners. Fortunately, help screens often conclude by referencing related or similar functions. These references are an excellent way to learn new MATLAB commands. Typing help help, for example, displays detailed information on the help command itself and also provides reference to relevant functions such as the lookfor command. The lookfor command helps locate MATLAB functions based on a keyword search. Simply type lookfor followed by a single keyword, and MATLAB searches for functions that contain that keyword. MATLAB also has comprehensive HTML-based help. The HTML help is accessed by using MATLAB's integrated help browser, which also functions as a standard web browser. The HTML help facility includes a function and topic index as well as full text-searching capabilities. Since HTML documents can contain graphics and special characters, HTML help can provide more information than the command-line help. With a little practice, MATLAB makes it very easy to find information. When MATLAB graphics are created, the print command can save figures in a common file format such as postscript, encapsulated postscript, JPEG, or TIFF. The format of displayed data, such as the number of digits displayed, is selected by using the format command. MATLAB help provides the necessary details for both these functions. When a MATLAB session is complete, the exit command terminates MATLAB.

MB.2 Calculator Operations MATLAB can function as a simple calculator, working as easily with complex numbers as with real numbers. Scalar addition, subtraction, multiplication, division, and exponentiation are accomplished using the traditional operator symbols +, −, ×, ÷, and ⁁. Since MATLAB predefines i = j = √−1, a complex constant is readily created using cartesian coordinates. For example, >> z = -3-j*4 z = -3.0000 - 4.0000i assigns the complex constant −3 − j4 to the variable z. The real and imaginary components of z are extracted by using the real and imag operators. In MATLAB, the input to a function is placed parenthetically following the function name. >> z_real = real(z); z_imag = imag(z); When a line is terminated with a semicolon, the statement is evaluated but the results are not displayed to the screen. This feature is useful when one is computing intermediate results, and it allows multiple instructions on a single line. Although not displayed, the results z_real = −3 and z_imag = −4 are calculated and available for additional operations such as computing |z|. There are many ways to compute the modulus, or magnitude, of a complex quantity. Trigonometry confirms that z = −3 − j4, which corresponds to a 3-4-5 triangle, has modulus required square root. >> z_mag = sqrt(z_real^2 + z_imag^2) z_mag = 5

. The MATLAB sqrt command provides one way to compute the

In MATLAB, most commands, include sqrt, accept inputs in a variety of forms including constants, variables, functions, expressions, and combinations thereof. The same result is also obtained by computing >> z_mag = sqrt(z*conj(z)) z_mag = 5

. In this case, complex conjugation is performed by using the conj command.

More simply, MATLAB computes absolute values directly by using the abs command.

>> z_mag = abs(z) z_mag = 5 In addition to magnitude, polar notation requires phase information. The angle command provides the angle of a complex number. >> z_rad = angle(z) z_πad = -2.2143 MATLAB expects and returns angles in a radian measure. Angles expressed in degrees require an appropriate conversion factor. >> z_deg = angle(z)*180/pi z_πad = 126.8699 Notice, MATLAB predefines the variable pi = π. It is also possible to obtain the angle of z using a two-argument arc-tangent function, atan2. >> z_deg = atan(z_imag,z_real) z_rad = -2.2143 Unlike a single-argument arctangent function, the two-argument arctangent function ensures that the angle reflects the proper quadrant. MATLAB supports a full complement of trigonometric functions: standard trigonometric functions cos, sin, tan; reciprocal trigonometric functions sec, csc, cot; inverse trigonometric functions acos, asin, atan, asec, acsc, acot; and hyperbolic variations cosh, sinh, tanh, sech, csch, coth, acosh, asinh, atanh, asech, acsch, and acoth. Of course, MATLAB comfortably supports complex arguments for any trigonometric function. As with the angle command, MATLAB trigonometric functions utilize units of radians. The concept of trigonometric functions with complex-valued arguments is rather intriguing. The results can contradict what is often taught in introductory mathematics courses. For example, a common claim is that |cos(x)| ≤ 1. While this is true for real x, it is not necessarily true for complex x. This is readily verified by example using MATLAB and the cos function. >> cos(j) ans = 1.5431 Problem B.19 investigates these ideas further. Similarly, the claim that it is impossible to take the logarithm of a negative number is false. For example, the principal value of ln(−1) is jπ, a fact easily verified by means of Euler's equation. In MATLAB, base-10 and base-e logarithms are computed by using the log10 and log commands, respectively. >> log(-1) ans = 0 + 3.1416i

MB.3 Vector Operations The power of MATLAB becomes apparent when vector arguments replace scalar arguments. Rather than computing one value at a time, a single expression computes many values. Typically, vectors are classified as row vectors or column vectors. For now, we consider the creation of row vectors with evenly spaced, real elements. To create such a vector, the notation a: b: c is used, where a is the initial value, b designates the step size, and c is the termination value. For example, 0: 2: 11 creates the length-6 vector of even-valued integers ranging from 0 to 10. >> k = 0:2:11 k = 0 2 4 6 8 10 In this case, the termination value does not appear as an element of the vector. Negative and noninteger step sizes are also permissible. >> k = 11:-10/3:00 k = 11.0000 7.6667 4.3333 1.0000 If a step size is not specified, a value of one is assumed. >> k = 0:11 k = 0 1 2 3 4 5 6 7 8 9 10 11 Vector notation provides the basis for solving a wide variety of problems. For example, consider finding the three cube roots of minus one, w 3 = −1 = e j(π + 2πk) for integer k. Taking the cube root of each side yields w =

e j(π/3+2πk/3) To find the three unique solutions, use any three consecutive integer values of k and MATLAB's exp function. >> k = 0:2; >> w = exp(j*(pi/3 + 2*pi*k/3)) w = 0.5000 + 0.8660i -1.0000 + 0.0000i 0.5000 - 0.8660i The solutions, particularly w = − 1, are easy to verify. Finding the 100 unique roots of w 100 = −1 is just as simple. >> k = 0:99; >> w = exp(j*(pi/100 + 2*pi*k/100));

A semicolon concludes the final instruction to suppress the inconvenient display of all 100 solutions. To view a particular solution, the user must

specify an index. In MATLAB, ascending positive integer indices specify particular vector elements. For example, the fifth element of w is extracted using an index of 5. >> w(5) ans = 0.9603 + 0.2790i Notice that this solution corresponds to k = 4. The independent variable of a function, in this case k, rarely serves as the index. Since k is also a vector, it can likewise be indexed. In this way, we can verify that the fifth value of k is indeed 4. >> k(5) ans = 4 It is also possible to use a vector index to access multiple values. For example, index vector 98:100 identifies the last three solutions corresponding to k = [97,98,99]. >> w(98:100) ans = 0.9877 - 0.1564i 0.9956 - 0.0941i 0.9995 - 0.0314i Vector representations provide the foundation to rapidly create and explore various signals. Consider the simple 10 Hz sinusoid described by f(t) = sin(2π 10t + π/6). Two cycles of this sinusoid are included in the interval 0 ≤ t < 0.2. A vector t is used to uniformly represent 500 points over this interval. >> t = 0:0.2/500:0.2-0.2/500; Next, the function f(t) is evaluated at these points. >> f = sin(2*pi*10*t+pi/6); The value of f(t) at t = 0 is the first element of the vector and is thus obtained by using an index of one. >> f(1) ans = 0.5000 Unfortunately, MATLAB's indexing syntax conflicts with standard equation notation.[†] That is, the MATLAB indexing command f(1) is not the same as the standard notation f(1) = f(t)| t = 1 . Care must be taken to avoid confusion; remember that the index parameter rarely reflects the independent variable of a function.

MB.4 Simple Plotting MATLAB's plot command provides a convenient way to visualize data, such as graphing f(t) against the independent variable t. >> plot(t, f); Axis labels are added using the xlabel and ylabel commands, where the desired string must be enclosed by single quotation marks. The result is shown in Fig. MB.1. >> xlabel('t'); ylabel('f(t)')

Figure MB.1: f(t) = sin (2π 10t + π/6). The title command is used to add a title above the current axis. By default, MATLAB connects data points with solid lines. Plotting discrete points, such as the 100 unique roots of w 100 = −1, is accommodated by supplying the plot command with an additional string argument. For example, the string 'o' tells MATLAB to mark each data point with a circle rather than connecting points with lines. A full description of the supported plot options is available from MATLAB's help facilities. >> plot(real(w),imag(w),'o');

>> xlabel('Re(w); ylabel('Im(w)'); >> axis equal The axis equal command ensures that the scale used for the horizontal axis is equal to the scale used for the vertical axis. Without axis

equal, the plot would appear elliptical rather than circular. Figure MB.2 illustrates that the 100 unique roots of w 100 = −1 lie equally spaced on the unit circle, a fact not easily discerned from the raw numerical data.

Figure MB.2: Unique roots of w 100 = −1. MATLAB also includes many specialized plotting functions. For example, MATLAB commands semilogx, semilogy, and loglog operate like the plot command but use base-10 logarithmic scales for the horizontal axis, vertical axis, and the horizontal and vertical axes, respectively. Monochrome and color images can be displayed by using the image command, and contour plots are easily created with the contour command. Furthermore, a variety of three-dimensional plotting routines are available, such as plot3, contour3, mesh, and surf. Information about these instructions, including examples and related functions, is available from MATLAB help.

MB.5 Element-by-Element Operations Suppose a new function h(t) is desired that forces an exponential envelope on the sinusoid f(t), h(t) = f(t)g(t) where g(t) = e −10t . First, row vector g(t) is created. >> g = exp(-10*t); Given MATLAB's vector representation of g(t) and f(t), computing h(t) requires some form of vector multiplication. There are three standard ways to multiply vectors: inner product, outer product, and element-by-element product. As a matrix-oriented language, MATLAB defines the standard multiplication operator * according to the rules of matrix algebra: the multiplicand must be conformable to the multiplier. A 1 × N row vector times an N × 1 column vector results in the scalar-valued inner product. An N × 1 column vector times a 1 × M row vector results in the outer product, which is an N × M matrix. Matrix algebra prohibits multiplication of two row vectors or multiplication of two column vectors. Thus, the * operator is not used to perform element-by-element multiplication.[†]

Element-by-element operations require vectors to have the same dimensions. An error occurs if element-by-element operations are attempted between row and column vectors. In such cases, one vector must first be transposed to ensure both vector operands have the same dimensions. In MATLAB, most element-by-element operations are preceded by a period. For example, element-by-element multiplication, division, and exponentiation are accomplished using. *,. /, and .ˇ, respectively. Vector addition and subtraction are intrinsically element-by-element operations and require no period. Intuitively, we know h(t) should be the same size as both g(t) and f(t). Thus, h(t) is computed using element-by-element multiplication. >> h = f.*g; The plot command accommodates multiple curves and also allows modification of line properties. This facilitates side-by-side comparison of different functions, such as h(t) and f(t). Line characteristics are specified by using options that follow each vector pair and are enclosed in single quotes. >> plot(t, f,'-k',t,h,':k'); >> xlabel('t'); ylabel('Amplitude'); >> legend('f(t)','h(t)'); Here, '-k' instructs MATLAB to plot f(t) using a solid black line, while ':k' instructs MATLAB to use a dotted black line to plot h(t). A legend and axis labels complete the plot, as shown in Fig. MB.3. It is also possible, although more cumbersome, to use pull-down menus to modify line properties and to add labels and legends directly in the figure window.

Figure MB.3: Graphical comparison of f(t) and h(t).

MB.6 Matrix Operations Many applications require more than row vectors with evenly spaced elements; row vectors, column vectors, and matrices with arbitrary elements are typically needed. MATLAB provides several functions to generate common, useful matrices. Given integers m, n, and vector x, the function eye(m) creates the m × m identity matrix; the function ones(m,n) creates the m × n matrix of all ones; the function zeros (m,n) creates the m × n matrix of all zeros; and the function diag(x) uses vector x to create a diagonal matrix. The creation of general matrices and vectors, however, requires each individual element to be specified. Vectors and matrices can be input spreadsheet style by using MATLAB's array editor. This graphical approach is rather cumbersome and is not often used. A more direct method is preferable. Consider a simple row vector r, The MATLAB notation a: b: c cannot create this row vector. Rather, square brackets are used to create r. >> r = [1 0 0] r = 1 0 0 Square brackets enclose elements of the vector, and spaces or commas are used to separate row elements. Next, consider the 3 × 2 matrix A,

Matrix A can be viewed as a three-high stack of two-element row vectors. With a semicolon to separate rows, square brackets are used to create the matrix. >> A = [2 3; 4 5; 0 6] A = 2 3 4 5 0 6 Each row vector needs to have the same length to create a sensible matrix. In addition to enclosing string arguments, a single quote performs the complex conjugate transpose operation. In this way, row vectors become column vectors and vice versa. For example, a column vector c is easily created by transposing row vector r. >> c = r' c = 1 0 0 Since vector r is real, the complex-conjugate transpose is just the transpose. Had r been complex, the simple transpose could have been accomplished by either r. 'or (conj (r))'. More formally, square brackets are referred to as a concatenation operator. A concatenation combines or connects smaller pieces into a larger whole. Concatenations can involve simple numbers, such as the six-element concatenation used to create the 3 × 2 matrix A. It is also possible to concatenate larger objects, such as vectors and matrices. For example, vector c and matrix A can be concatenated to form a 3 × 3 matrix B. >> B = [c A] B = 1 2 3 0 4 5 0 0 6 Errors will occur if the component dimensions do not sensibly match; a 2 × 2 matrix would not be concatenated with a 3 × 3 matrix, for example. Elements of a matrix are indexed much like vectors, except two indices are typically used to specify row and column. [†] Element (1, 2) of matrix B, for example, is 2.

>> B(1, 2) ans = 2 Indices can likewise be vectors. For example, vector indices allow us to extract the elements common to the first two rows and last two columns of matrix B. >> B(1:2,2:3) ans = 2 3 4 5 One indexing technique is particularly useful and deserves special attention. A colon can be used to specify all elements along a specified dimension. For example, B(2,:) selects all column elements along the second row of B. >> B(2,:) ans = 0 4 5 Now that we understand basic vector and matrix creation, we turn our attention to using these tools on real problems. Consider solving a set of three linear simultaneous equations in three unknowns.

This system of equations is represented in matrix form according to Ax = y, where

Although Cramer's rule can be used to solve Ax = y, it is more convenient to solve by multiplying both sides by the matrix inverse of A. That is, x = A −1 Ax = A −1 y. Solving for x by hand or by calculator would be tedious at best, so MATLAB is used. We first create A and y. >> A = [1 -2 3;-sqrt(3) 1 -sqrt(5);3 -sqrt(7) 1]; >> y = [1;pi;exp(1)]; The vector solution is found by using MATLAB's inv function. >> x = inv(A)*y x = -1.9999 -3.8998 -1.5999 It is also possible to use MATLAB's left divide operator x = A\y to find the same solution. The left divide is generally more computationally efficient than matrix inverses. As with matrix multiplication, left division requires that the two arguments be conformable. Of course, Cramer's rule can be used to compute individual solutions, such as x 1 , by using vector indexing, concatenation, and MATLAB's det command to compute determinants. >> x1 = det([y,A(:,2:3)])/det(A) x1 = -1.9999 Another nice application of matrices is the simultaneous creation of a family of curves. Consider h α (t) = e −αt sin(2π10t + π/6) over 0 ≤ t ≤ 0.2. Figure MB.3 shows h α (t) for α = 0 and α = 10. Let's investigate the family of curves h α (t) for a = [0, 1,..., 10]. An inefficient way to solve this problem is create h α (t) for each α of interest. This requires 11 individual cases. Instead, a matrix approach allows all 11 curves to be computed simultaneously. First, a vector is created that contains the desired values of α. >> alpha = (0:10); By using a sampling interval of one millisecond, Δt = 0.001, a time vector is also created. >> t = (0:0.001:0.2)'; The result is a length-201 column vector. By replicating the time vector for each of the 11 curves required, a time matrix T is created. This replication

can be accomplished by using an outer product between t and a 1 × 11 vector of ones.[†] >> T = t*ones(1,11);

The result is a 201 × 11 matrix that has identical columns. Right multiplying T by a diagonal matrix created from α, columns of T can be individually scaled and the final result is computed. >> H = exp(-T*diag(alpha)).*sin(2*pi*10*T+pi/6); Here, H is a 201 × 11 matrix, where each column corresponds to a different value of α. That is, H = [h0 , h1 ,..., h10 ], where hα are column vectors. As shown in Fig. MB.4, the 11 desired curves are simultaneously displayed by using MATLAB's plot command, which allows matrix arguments.

>> plot(t,H); xlabel('t'); ylabel('h(t)');

Figure MB.4: h α (t) for α = [0,1,..., 10]. This example illustrates an important technique called vectorization, which increases execution efficiency for interpretive languages such as

MATLAB.[‡] Algorithm vectorization uses matrix and vector operations to avoid manual repetition and loop structures. It takes practice and effort to become proficient at vectorization, but the worthwhile result is efficient, compact code.

MB.7 Partial Fraction Expansions There are a wide variety of techniques and shortcuts to compute the partial fraction expansion of rational function F(x) = B(x)/A(x), but few are more simple than the MATLAB residue command. The basic form of this command is >> [R,P,K] = residue(B,A) The two input vectors B and A specify the polynomial coefficients of the numerator and denominator, respectively. These vectors are ordered in descending powers of the independent variable. Three vectors are output. The vector R contains the coefficients of each partial fraction, and vector P contains the corresponding roots of each partial fraction. For a root repeated r times, the r partial fractions are ordered in ascending powers. When the rational function is not proper, the vector K contains the direct terms, which are ordered in descending powers of the independent variable. To demonstrate the power of the residue command, consider finding the partial fraction expansion of

By hand, the partial fraction expansion of F(x) is difficult to compute. MATLAB, however, makes short work of the expansion. >> [R,P,K] = residue( [1 0 0 0 0 pi], [1 -sqrt(8) 0 sqrt(32) -4]) R = 7.8888 5.9713 3.1107 0.1112 P = 1.4142 1.4142 1.4142 -1.4142 K = 1.0000 2.8284 Written in standard form, the partial fraction expansion of F(x) is

The signal processing toolbox function residuez is similar to the residue command and offers more convenient expansion of certain rational functions, such as those commonly encountered in the study of discrete-time systems. Additional information about the residue and residuez commands are available from MATLAB's help facilities. [†] Advanced structures such as MATLAB inline objects are an exception. [†] While grossly inefficient, element-by-element multiplication can be accomplished by extracting the main diagonal from the outer product of two N-

length vectors.

[†] Matrix elements can also be accessed by means of a single index, which enumerates along columns. Formally, the element from row m and column n of an M × N matrix may be obtained with a single index (n − 1)M + m. For example, element (1, 2) of matrix B is accessed by using the index (2 − 1)3 + 1 = 4. That is, B (4) yields 2. [†] The repmat command provides a more flexible method to replicate or tile objects. Equivalently, T = repmat(t,1,11). [‡] The benefits of vectorization are less pronounced in recent versions of MATLAB.

PROBLEMS b.1

b.2

Given a complex number w = x + jy, the complex conjugate of w is defined in rectangular coordinates as w* = x − jy. Use this fact to derive complex conjugation in polar form. Express the following numbers in polar form: a. 1 + j b. −4 + j3 c. (1 + j)(−4 + j3) d. e jπ/4 + 2e −jπ/4 e. e j + 1

b.3

f. (1 + j)/(04 + j3) Express the following numbers in Cartesian form: a. 3e jπ/4 b. 1/e j c. (1 + j)(−4 + j3) d. e jπ/4 + 2e −jπ/4 e. e j + 1

b.4

f. 1/2 j For complex constant w, prove: a. Re(w) = (w + w*)/2

b.5

b. Im(w) = (w − w*)/2j Given w = x − jy, determine: a. Re(e w)

b.6

b. Im(e w) For arbitrary complex constants w 1 and w 2 , prove or disprove the following: a. Re(jw 1 ) = −Im(w 1 ) b. Im(jw 1 ) = Re(w 1 ) c. Re(w 1 ) + Re(w 2 ) = Re(w 1 + w 2 ) d. Im(w 1 ) + Im(w 2 ) = Im(w 1 + w 2 ) e. Re(w 1 )Re(w 2 ) = Re(w 1 , w 2 )

b.7

f. Im(w 1 )/Im(w 2 ) = Im(w 1 /w 2 ) Given w 1 = 3 + j4 and w 2 = 2e jπ/4 . a. Express w 1 in standard polar form. b. Express w 2 in standard rectangular form. c. Determine |w 1 | 2 and |w 2 | 2 . d. Express w 1 + w 2 in standard rectangular form. e. Express w 1 − w 2 in standard polar form. f. Express w 1 w 2 in standard rectangular form.

b.8

g. Express w 1 /w 2 in standard polar form. Repeat Prob. B.7 using w = (3 + j4) 2 and w = 2.5 je −j40π .

b.9

b.10

1

2

Repeat Prob. B.7 using w 1 = j + e π/4 and w 2 = cos (j). Use Euler's identity to solve or prove the following: a. Find real, positive constants c and φ for all real t such that 2.5 cos (3t) − 1.5 sin (3t + π/3) = c cos(3t + φ) b. Prove that cos (θ ± φ) = cos (θ) cos (φ) ∓ sin (θ) sin (φ). c. Given real constants a, b, and α, complex constant w, and the fact that

evaluate the integral

b.11

In addition to the traditional sine and cosine functions, there are the hyperbolic sine and cosine functions, which are defined by sinh (w) = (e w − e −w)/2 and cosh (w) = (e w + e −w)/2. In general, the argument is a complex constant w = x + jy. a. Show that cosh (w) = cosh (x) cos (y) + j sinh (x) sin (y).

b.12

b. Determine a similar expression for sinh (w) in rectangular form that only uses functions of real arguments, such as sin (x), cosh (y), and so on. Using the complex plane: a. Evaluate and locate the distinct solutions to (w) 4 = −1. b. Evaluate and locate the distinct solutions to (w − (1 + j2))5 = (32/√2) (1 + j). c. Sketch the solution to |w − 2j| = 3.

b.13

b.14

d. Graph w(t) = (1 + t)e jt for (−10 ≤ t ≤ 10). The distinct solutions to (w − w 1 ) n = w 2 lie on a circle in the complex plane, as shown in Fig. PB.13. One solution is located on the real axis at √3 + 1 = 2.732, and one solution is located on the imaginary axis at √3 − 10.732. Determine w 1 , w 2 , and n.

Figure PB.13: Distinct solutions to (w − w 1 ) n = w 2 . Find the distinct solutions to (j − w) 1.5 = 2 + j2. Use MATLAB to graph the solution set in the complex plane.

b.15

If j = √−1, what is √j?

b.16

Find all the values of ln(−e), expressing your answer in Cartesian form.

b.17

Determine all values of log 10 (−1), expressing your answer in Cartesian form. Notice that the logarithm has base 10, not e.

b.18

Express the following in standard rectangular coordinates: a. ln(1/(1+j))

b. cos(1 + j)

b.19

b.20

b.21

c. (1 − j) j By constraining w to be purely imaginary, show that the equation cos (w) = 2 can be represented as a standard quadratic equation. Solve this equation for w. Determine an expression for an exponentially decaying sinusoid that oscillates three times per second and whose amplitude envelope decreases by 50% every 2 seconds. Use MATLAB to plot the signal over −2 ≤ t ≤ 2. By hand, sketch the following against independent variable t: a. x 1 (t) = Re(2e (−1 +j2π)t) b. x 2 (t) = Im(3 − e (1 − j2π)t)

c. x 3 (t) = 3 − Im(e (1 − j2π)t)

b.22

Use MATLAB to produce the plots requested in Prob. B.21.

b.23

Use MATLAB to plot x(t) = cos (t) sin (20t) over a suitable range of t.

b.24

Use MATLAB to plot x(t) = Σ10 k=1 cos (2πkt) over a suitable range of t. The MATLAB command sum may prove useful.

b.25

b.26

When a bell is struck with a mallet, it produces a ringing sound. Write an equation that approximates the sound produced by a small, light bell. Carefully identify your assumptions. How does your equation change if the bell is large and heavy? You can assess the quality of your models by using the MATLAB sound command to listen to your "bell." Certain integrals, although expressed in relatively simple form, are quite difficult to solve. For example, ∫ e -x2 dx cannot be evaluated in terms of elementary functions; most calculators that perform integration cannot handle this indefinite integral. Fortunately, you are smarter than most calculators. a. Express e −x2 using a Taylor series expansion. b. Using your series expansion for e −x2 , determine ∫ e −x2 dx.

b.27

b.28

b.29

c. Using a suitably truncated series, evaluate the definite integral ∫ 1 0 e −x2 dx. Repeat Prob. B.26 for ∫ e −x3 dx. Repeat Prob. B.26 for ∫ cos x 2 dx. For each function, determine a suitable series expansion. a. f 1 (x) = (2 −x 2 ) −1

b.30

b. f 2 (x) = (0.5)x You are working on a digital quadrature amplitude modulation (QAM) communication receiver. The QAM receiver requires a pair of quadrature signals: cos Ωn and sin Ωn. These can be simultaneously generated by following a simple procedure: (1) choose a point w on the unit circle, (2) multiply w by itself and store the result, (3) multiply w by the last result and store, and (4) repeat step 3. a. Show that this method can generate the desired pair of quadrature sinusoids. b. Determine a suitable value of w so that good-quality, periodic, 2π × 100,000 rad/s signals can be generated. How much time is available for the processing unit to compute each sample? c. Simulate this procedure by using MATLAB and report your results.

b.31

d. Identify as many assumptions and limitations to this technique as possible. For example, can your system operate correctly for an indefinite period of time? Consider the following system of equations.

Use Cramer's rule to determine: a. x 1

b. x 2 c. x 3

b.32

Matrix determinants can be computed by using MATLAB's det command. A system of equations in terms of unknowns x 1 and x 2 and arbitrary constants a, b, c, d, e, and f is given by

a. Represent this system of equations in matrix form. b. Identify specific constants a, b, c, d, e, and f such that x 1 = 3 and x 2 = −2. Are the constants you selected unique? c. Identify nonzero constants a, b, c, d, e, and f such that no solutions x 1 and x 2 exist.

b.33

b.34

b.35

d. Identify nonzero constants a, b, c, d, e, and f such that an infinite number of solutions x 1 and x 2 exist. Solve the following system of equations:

Solve the following system of equations:

Compute by hand the partial fraction expansions of the following rational functions: a. H 1 (s) = (s 2 + 5s + 6)/(s 3 + s 2 + s + 1), which has denominator poles at s = ± j and s = −1 b. H 2 (s) = 1/H 1 (s) = (s 3 + s 2 + s + 1)/(s 2 + 5s + 6) c. H 2 (s) = 1/((s + 1) 2 (s 2 + 1))

b.36

d. H 4 (s) = (s 2 + 5s + 6)/(3s 2 + 2s + 1) Using MATLAB's residue command, a. Verify the results of Prob. B.35a. b. Verify the results of Prob. B.35b. c. Verify the results of Prob. B.35c.

b.37

b.38

b.39

d. Verify the results of Prob. B.35d. Determine the constants a 0 , a 1 , and a 2 of the partial fraction expansion F(s) = s/(s + 1) 3 = a 0 /(s + 1) 3 + a 1 /(s + 1) 2 + a 2 /(s + 1). Let N = [n 7 , n 6 , n 5 ,...,n 2 , n 1 ] represent the seven digits of your phone number. Construct a rational function according to

Use MATLAB's residue command to compute the partial fraction expansion of H N(s). When plotted in the complex plane for −π ≤ ω ≤ π, the function f (ω) = cos(ω) + j0.1 sin(2ω) results in a so-called Lissajous figure that resembles a two-bladed propeller. a. In MATLAB, create two row vectors fr and fi corresponding to the real and imaginary portions of f (ω), respectively, over a suitable number N samples of ω. Plot the real portion against the imaginary portion and verify the figure resembles a propeller.

b. Let complex constant w = x + jy be represented in vector form

Consider the 2 × 2 rotational matrix R:

Show that Rw rotates vector w by θ radians. c. Create a rotational matrix R corresponding to 10° and multiply it by the 2 × N matrix f = [f r; f i];. Plot the result to verify that the "propeller" has indeed rotated counterclockwise. d. Given the matrix R determined in part c, what is the effect of performing RRf? How about RRRf? Generalize the result. e. Investigate the behavior of multiplying f (ω) by the function e jθ .

Chapter 1: Signals and Systems OVERVIEW In this chapter we shall discuss certain basic aspects of signals. We shall also introduce important basic concepts and qualitative explanations of the hows and whys of systems theory, thus building a solid foundation for understanding the quantitative analysis in the remainder of the book. SIGNALS A signal is a set of data or information. Examples include a telephone or a television signal, monthly sales of a corporation, or daily closing prices of a stock market (e.g., the Dow Jones averages). In all these examples, the signals are functions of the independent variable time. This is not always the case, however. When an electrical charge is distributed over a body, for instance, the signal is the charge density, a function of space rather than time. In this book we deal almost exclusively with signals that are functions of time. The discussion, however, applies equally well to other independent variables. SYSTEMS Signals may be processed further by systems, which may modify them or extract additional information from them. For example, an antiaircraft gun operator may want to know the future location of a hostile moving target that is being tracked by his radar. Knowing the radar signal, he knows the past location and velocity of the target. By properly processing the radar signal (the input), he can approximately estimate the future location of the target. Thus, a system is an entity that processes a set of signals (inputs) to yield another set of signals (outputs). A system may be made up of physical components, as in electrical, mechanical, or hydraulic systems (hardware realization), or it may be an algorithm that computes an output from an input signal (software realization).

1.1 SIZE OF A SIGNAL The size of any entity is a number that indicates the largeness or strength of that entity. Generally speaking, the signal amplitude varies with time. How can a signal that exists over a certain time interval with varying amplitude be measured by one number that will indicate the signal size or signal strength? Such a measure must consider not only the signal amplitude, but also its duration. For instance, if we are to devise a single number V as a measure of the size of a human being, we must consider not only his or her width (girth), but also the height. If we make a simplifying assumption that the shape of a person is a cylinder of variable radius r (which varies with the height h) then one possible measure of the size of a person of height H is the person's volume V, given by

1.1-1 Signal Energy Arguing in this manner, we may consider the area under a signal x(t) as a possible measure of its size, because it takes account not only of the amplitude but also of the duration. However, this will be a defective measure because even for a large signal x(t), its positive and negative areas could cancel each other, indicating a signal of small size. This difficulty can be corrected by defining the signal size as the area under x 2 (t), which is always positive. We call this measure the signal energy Ex , defined (for a real signal) as

This definition can be generalized to a complex valued signal x(t) as

There are also other possible measures of signal size, such as the area under |x(t)|. The energy measure, however, is not only more tractable mathematically but is also more meaningful (as shown later) in the sense that it is indicative of the energy that can be extracted from the signal.

1.1-2 Signal Power The signal energy must be finite for it to be a meaningful measure of the signal size. A necessary condition for the energy to be finite is that the signal amplitude → 0 as |t| → ∞ (Fig. 1.1a). Otherwise the integral in Eq. (1.2a) will not converge.

Figure 1.1: Examples of signals: (a) a signal with finite energy and (b) a signal with finite power. When the amplitude of x(t) does not → 0 as |t| → ∞ (Fig. 1.1b), the signal energy is infinite. A more meaningful measure of the signal size in such a case would be the time average of the energy, if it exists. This measure is called the power of the signal. For a signal x(t), we define its power Px as

We can generalize this definition for a complex signal x(t) as

Observe that the signal power Px is the time average (mean) of the signal amplitude squared, that is, the mean-squared value of x(t). Indeed, the square root of Px is the familiar rms (root-mean-square) value of x(t). Generally, the mean of an entity averaged over a large time interval approaching infinity exists if the entity either is periodic or has a statistical regularity. If such a condition is not satisfied, the average may not exist. For instance, a ramp signal x(t) = t increases indefinitely as |t| → ∞, and neither the energy nor the power exists for this signal. However, the unit step function, which is not periodic nor has statistical regularity, does have a finite power. When x(t) is periodic, |x(t)|2 is also periodic. Hence, the power of x(t) can be computed from Eq. (1.3b) by averaging |x(t)|2 over one period. Comments. The signal energy as defined in Eqs. (1.2) does not indicate the actual energy (in the conventional sense) of the signal because the signal energy depends not only on the signal, but also on the load. It can, however, be interpreted as the energy dissipated in a normalized load of a 1-ohm resistor if a voltage x(t) were to be applied across the 1-ohm resistor (or if a current x(t) were to be passed through the 1 -ohm resistor). The measure of "energy" is, therefore indicative of the energy capability of the signal, not the actual energy. For this reason the concepts of conservation of energy should not be applied to this "signal energy." Parallel observation applies to "signal power" defined in Eqs. (1.3). These measures are but convenient indicators of the signal size, which prove useful in many applications. For instance, if we approximate a signal x(t) by another signal g(t), the error in the approximation is e(t) = x(t) − g(t). The energy (or power) of e(t) is a convenient indicator of the goodness of the approximation. It provides us with a quantitative measure of determining the closeness of the approximation. In communication systems, during transmission over a channel, message signals are corrupted by unwanted signals (noise). The quality of the received signal is judged by the relative sizes of the desired signal and the unwanted signal (noise). In this case the ratio of the message signal and noise signal powers (signal to noise power ratio) is a good indication of the received signal quality. Units of Energy and Power. Equations (1.2) are not correct dimensionally. This is because here we are using the term energy not in its conventional sense, but to indicate the signal size. The same observation applies to Eqs. (1.3) for power. The units of energy and power, as defined here, depend on the nature of the signal x(t). If x(t) is a voltage signal, its energy Ex has units of volts squared-

seconds (V2 s), and its power Px has units of volts squared. If x(t) is a current signal, these units will be amperes squared-seconds (A2 s) and amperes squared, respectively. EXAMPLE 1.1 Determine the suitable measures of the signals in Fig. 1.2.

Figure 1.2 In Fig. 1.2a, the signal amplitude → 0 as |t| → ∞. Therefore the suitable measure for this signal is its energy Ex given by

In Fig. 1.2b, the signal amplitude does not → 0 as |t| → ∞. However, it is periodic, and therefore its power exists. We can use Eq. (1.3a) to determine its power. We can simplify the procedure for periodic signals by observing that a periodic signal repeats regularly each period (2 seconds in this case). Therefore, averaging x 2 (t) over an infinitely large interval is identical to averaging this quantity over one period (2 seconds in this case). Thus

Recall that the signal power is the square of its rms value. Therefore, the rms value of this signal is 1/√3. EXAMPLE 1.2 Determine the power and the rms value of a. x(t) = C cos (ω0 t + θ) b. x(t) = C 1 cos (ω1 t + θ1 ) + C 2 cos (ω2 t + θ2 ) ω1 ≠ ω2 c. x(t) = Dejω0 t a. This is a periodic signal with period T0 = 2π/ω0 . The suitable measure of this signal is its power. Because it is a periodic signal, we may compute its power by averaging its energy over one period T0 = 2π/ω0 . However, for the sake of demonstration, we shall solve this problem by averaging over an infinitely large time interval using Eq. (1.3a).

The first term on the right-hand side is equal to C 2 /2. The second term, however, is zero because the integral appearing in this term represents the area under a sinusoid over a very large time interval T with T → ∞. This area is at most equal to the area of half the cycle because of cancellations of the positive and negative areas of a sinusoid. The second term is this area multiplied by C 2 /2T with T → ∞. Clearly this term is zero, and

This shows that a sinusoid of amplitude C has a power C 2 /2 regardless of the value of its frequency ω0 (ω0 ≠ 0) and phase θ. The rms value is C/√2. If the signal frequency is zero (dc or a constant signal of amplitude C), the reader can

show that the power is C 2 .

b. In Chapter 6, we shall show that a sum of two sinusoids may or may not be periodic, depending on whether the ratio ω1 /ω2 is a rational number. Therefore, the period of this signal is not known. Hence, its power will be determined by averaging its energy over T seconds with T → ∞. Thus,

The first and second integrals on the right-hand side are the powers of the two sinusoids, which are C 2 1 /2 and C 2 2 /2 as found in part (a). The third term, the product of two sinusoids, can be expressed as a sum of two sinusoids cos [(ω1 +

ω2 ) t + (θ1 + θ2 )] and cos [(ω1 − ω2 ) t + (θ1 − θ2 )], respectively. Now, arguing as in part (a), we see that the third term

is zero. Hence, we have [†]

and the rms value is

.

We can readily extend this result to a sum of any number of sinusoids with distinct frequencies. Thus, if

assuming that none of the two sinusoids have identical frequencies and ωn ≠ 0, then

If x(t) also has a dc term, as

then

c. In this case the signal is complex, and we use Eq. (1.3b) to compute the power.

Recall that |e jω0 t | = 1 so that |Dejω0 t | 2 = |D| 2 , and

The rms value is |D|. Comment. In part (b) of Example 1.2, we have shown that the power of the sum of two sinusoids is equal to the sum of the powers of the sinusoids. It may appear that the power of x 1 (t) + x 2 (t) is Px1 + Px2. Unfortunately, this conclusion is not true in general. It is true only under a certain condition (orthogonality), discussed later (Section 6.5-3). EXERCISE E1.1 Show that the energies of the signals in Fig. 1.3a, 1.3b, 1.3c, and 1.3d are 4, 1, 4/3, and 4/3, respectively. Observe that doubling a signal quadruples the energy, and time-shifting a signal has no effect on the energy. Show also that the power of the signal in Fig. 1.3e is 0.4323. What is the rms value of signal in Fig. 1.3e?

Figure 1.3 EXERCISE E1.2 Redo Example 1.2a to find the power of a sinusoid C cos (ω0 t + θ) by averaging the signal energy over one period T0 = 2π/ω0 (rather than averaging over the infinitely large interval). Show also that the power of a dc signal x(t) = C 0 is C 2 0 , and its rms value is C 0. EXERCISE E1.3 Show that if ω1 = ω2 , the power of x(t) = C 1 cos (ω1 t + θ1 ) + C 2 cos (ω2 t + θ2 ) is [C 2 1 + C 2 2 + 2C 1 C 2 cos (θ1 − θ2 )]/2, which is not equal to (C 2 1 + C 2 2 )/2. [†] This is true only if ω ≠ ω . If ω = ω , the integrand of the third term contains a constant cos (θ − θ ), and the third term → 1 2 1 2 1 2

2C 1 C 2 cos (θ1 − θ2 ) as T → ∞.

1.2 SOME USEFUL SIGNAL OPERATIONS We discuss here three useful signal operations: shifting, scaling, and inversion. Since the independent variable in our signal description is time, these operations are discussed as time shifting, time scaling, and time reversal (inversion). However, this discussion is valid for functions having independent variables other than time (e.g., frequency or distance).

1.2-1 Time Shifting Consider a signal x(t) (Fig. 1.4a) and the same signal delayed by T seconds (Fig. 1.4b), which we shall denote by φ(t). Whatever happens in x(t) (Fig. 1.4a) at some instant t also happens in φ(t) (Fig. 1.4b) T seconds later at the instant t + T. Therefore

and

Figure 1.4: Time-shifting a signal. Therefore, to time-shift a signal by T, we replace t with t − T. Thus x(t − T) represents x(t) time-shifted by T seconds. If T is positive, the shift is to the right (delay), as in Fig. 1.4b. If T is negative, the shift is to the left (advance), as in Fig. 1.4c. Clearly, x(t − 2) is x(t) delayed (right-shifted) by 2 seconds, and x(t + 2) is x(t) advanced (left-shifted) by 2 seconds. EXAMPLE 1.3 An exponential function x(t) = e −2t shown in Fig. 1.5a is delayed by 1 second. Sketch and mathematically describe the delayed function. Repeat the problem with x(t) advanced by 1 second.

Figure 1.5: (a) Signal x(t). (b) Signal x(t) delayed by 1 second. (c) Signal x(t) advanced by 1 second. The function x(t) can be described mathematically as

Let x d (t) represent the function x(t) delayed (right-shifted) by 1 second as illustrated in Fig. 1.5b. This function is x(t − 1); its mathematical description can be obtained from x(t) by replacing t with t − 1 in Eq. (1.7). Thus

Let x a (t) represent the function x(t) advanced (left-shifted) by 1 second as depicted in Fig. 1.5c. This function is x(t + 1); its mathematical description can be obtained from x(t) by replacing t with t + 1 in Eq. (1.7). Thus

EXERCISE E1.4 Write a mathematical description of the signal x 3 (t) in Fig. 1.3c. This signal is delayed by 2 seconds. Sketch the delayed signal. Show that this delayed signal x d (t) can be described mathematically as x d (t) = 2(t − 2) for 2 ≤ t ≤ 3, and equal to 0 otherwise. Now repeat the procedure with the signal advanced (left-shifted) by 1 second. Show that this advanced signal x a (t) can be described as x a (t) = 2(t + 1) for − 1 ≤ t ≤ 0, and equal to 0 otherwise.

1.2-2 Time Scaling The compression or expansion of a signal in time is known as time scaling. Consider the signal x(t) of Fig. 1.6a. The signal φ(t) in Fig. 1.6b is x(t) compressed in time by a factor of 2. Therefore, whatever happens in x(t) at some instant t also happens to φ(t) at the instant t/2, so that

and

Figure 1.6: Time scaling a signal. Observe that because x(t) = 0 at t = T1 and T2 , we must have φ(t) = 0 at t = T1 /2 and T2 /2, as shown in Fig. 1.6b. If x(t) were recorded on a tape and played back at twice the normal recording speed, we would obtain x(2t). In general, if x(t) is compressed in time by a factor a (a > 1), the resulting signal φ(t) is given by

Using a similar argument, we can show that x(t) expanded (slowed down) in time by a factor a (a > 1) is given by

Figure 1.6c shows x(t/2), which is x(t) expanded in time by a factor of 2. Observe that in a time-scaling operation, the origin t = 0 is the anchor point, which remains unchanged under the scaling operation because at t = 0, x(t) = x(at) = x(0).

In summary, to time-scale a signal by a factor a, we replace t with at. If a > 1, the scaling results in compression, and if a < 1, the scaling results in expansion. EXAMPLE 1.4 Figure 1.7a shows a signal x(t). Sketch and describe mathematically this signal time-compressed by factor 3. Repeat the problem for the same signal time-expanded by factor 2.

Figure 1.7: (a) Signal x(t),(b) signal x(3t), and (c) signal x(t/2). The signal x(t) can be described as

Figure 1.7b shows x c (t), which is x(t) time-compressed by factor 3; consequently, it can be described mathematically as x(3t), which is obtained by replacing t with 3t in the right-hand side of Eq. (1.14). Thus

Observe that the instants t = −1.5 and 3 in x(t) correspond to the instants t = −0.5, and 1 in the compressed signal x(3t). Figure 1.7c shows x e (t), which is x(t) time-expanded by factor 2; consequently, it can be described mathematically as x(t/2), which is obtained by replacing t with t/2 in x(t). Thus

Observe that the instants t = −1.5 and 3 in x(t) correspond to the instants t = −3 and 6 in the expanded signal x(t/2).

EXERCISE E1.5 Show that the time compression by a factor n (n > 1) of a sinusoid results in a sinusoid of the same amplitude and phase, but with the frequency increased n-fold. Similarly, the time expansion by a factor n (n > 1) of a sinusoid results in a sinusoid of the same amplitude and phase, but with the frequency reduced by a factor n. Verify your conclusion by sketching a sinusoid sin 2t and the same sinusoid compressed by a factor 3 and expanded by a factor 2.

1.2-3 Time Reversal Consider the signal x(t) in Fig. 1.8a. We can view x(t) as a rigid wire frame hinged at the vertical axis. To time-reverse x(t), we rotate this frame 180° about the vertical axis. This time reversal [the reflection of x(t) about the vertical axis] gives us the signal φ(t) (Fig. 1.8b). Observe that whatever happens in Fig. 1.8a at some instant t also happens in Fig. 1.8b at the instant −t, and vice versa. Therefore

Figure 1.8: Time reversal of a signal. Thus, to time-reverse a signal we replace t with −t, and the time reversal of signal x(t) results in a signal x(−t). We must remember that the reversal is performed about the vertical axis, which acts as an anchor or a hinge. Recall also that the reversal of x(t) about the horizontal axis results in −x(t). EXAMPLE 1.5 For the signal x(t) illustrated in Fig. 1.9a, sketch x(−t), which is time-reversed x(t).

Figure 1.9: Example of time reversal. The instants −1 and −5 in x(t) are mapped into instants 1 and 5 in x(−t). Because x(t) = e t/2 , we have x(-t) = e 1/2 . The signal x(−t)

is depicted in Fig. 1.9b. We can describe x(t) and x(−t) as

and its time reversed version x(−t) is obtained by replacing t with −t in x(t) as

1.2-4 Combined Operations Certain complex operations require simultaneous use of more than one of the operations just described. The most general operation involving all the three operations is x(at − b), which is realized in two possible sequences of operation: 1. Time-shift x(t) by b to obtain x(t − b). Now time-scale the shifted signal x(t − b) by a (i.e., replace t with at) to obtain x(at − b). 2. Time-scale x(t) by a to obtain x(at). Now time-shift x(at) by b/a (i.e., replace t with t − (b/a)) to obtain x[a(t − b/a)] = x(at − b). In either case, if a is negative, time scaling involves time reversal. For example, the signal x(2t − 6) can be obtained in two ways. We can delay x(t) by 6 to obtain x(t − 6), and then time-compress this signal by factor 2 (replace t with 2t) to obtain x(2t − 6). Alternately, we can first time-compress x(t) by factor 2 to obtain x(2t), then delay this signal by 3 (replace t with t − 3) to obtain x(2t − 6).

1.3 CLASSIFICATION OF SIGNALS There are several classes of signals. Here we shall consider only the following classes, which are suitable for the scope of this book: 1. Continuous-time and discrete-time signals 2. Analog and digital signals 3. Periodic and aperiodic signals 4. Energy and power signals 5. Deterministic and probabilistic signals

1.3-1 Continuous-Time and Discrete-Time Signals A signal that is specified for a continuum of values of time t (Fig. 1.10a) is a continuous-time signal, and a signal that is specified only at discrete values of t (Fig. 1.10b) is a discrete-time signal. Telephone and video camera outputs are continuous-time signals, whereas the quarterly gross national product (GNP), monthly sales of a corporation, and stock market daily averages are discrete-time signals.

Figure 1.10: (a) Continuous-time and (b) discrete-time signals.

1.3-2 Analog and Digital Signals The concept of continuous time is often confused with that of analog. The two are not the same. The same is true of the concepts of discrete time and digital. A signal whose amplitude can take on any value in a continuous range is an analog signal. This means that an analog signal amplitude can take on an infinite number of values. A digital signal, on the other hand, is one whose amplitude can take on only a finite number of values. Signals associated with a digital computer are digital because they take on only two values (binary signals). A digital signal whose amplitudes can take on M values is an M-ary signal of which binary (M = 2) is a special case. The terms continuous time and discrete time qualify the nature of a signal along the time (horizontal) axis. The terms analog and digital, on the other hand, qualify the nature of the signal amplitude (vertical axis). Figure 1.11 shows examples of signals of various types. It is clear that analog is not necessarily continuous-time and digital need not be discrete-time. Figure 1.11c shows an example of an analog discrete-time signal. An analog signal can be converted into a digital signal [analog-to-digital (A/D) conversion] through quantization (rounding off), as explained in Section 8.3.

Figure 1.11: Examples of signals: (a) analog, continuous time, (b) digital, continuous time, (c) analog, discrete time, and (d) digital, discrete time.

1.3-3 Periodic and Aperiodic Signals A signal x(t) is said to be periodic if for some positive constant T0

The smallest value of T0 that satisfies the periodicity condition of Eq. (1.17) is the fundamental period of x(t). The signals in Figs. 1.2b and 1.3e are periodic signals with periods 2 and 1, respectively. A signal is aperiodic if it is not periodic. Signals in Figs. 1.2a, 1.3a, 1.3b, 1.3c, and 1.3d are all aperiodic. By definition, a periodic signal x(t) remains unchanged when time-shifted by one period. For this reason a periodic signal must start at t = − ∞: if it started at some finite instant, say t = 0, the time-shifted signal x(t + T0 ) would start at t = −T0 and x(t + T0 ) would not be the same as x(t). Therefore a periodic signal, by definition, must start at t = − ∞ and continue forever, as illustrated in Fig. 1.12.

Figure 1.12: A periodic signal of period T0. Another important property of a periodic signal x(t) is that x(t) can be generated by periodic extension of any segment of x(t) of duration T0 (the period). As a result we can generate x(t) from any segment of x(t) having a duration of one period by placing this segment and the reproduction thereof end to end ad infinitum on either side. Figure 1.13 shows a periodic signal x(t) of period T0 = 6. The shaded portion of Fig. 1.13a shows a segment of x(t) starting at t = −1 and having a duration of one period (6 seconds). This segment, when repeated forever in either direction, results in the periodic signal x(t). Figure 1.13b shows another shaded segment of x(t) of duration T0 starting at t = 0. Again we see that this segment, when repeated forever on either side, results in x(t). The reader can verify that this construction is possible with any segment of x(t) starting at any instant as long as the segment duration is one period.

Figure 1.13: Generation of a periodic signal by periodic extension of its segment of one-period duration. An additional useful property of a periodic signal x(t) of period T0 is that the area under x(t) over any interval of duration T0 is the same; that is, for any real numbers a and b

This result follows from the fact that a periodic signal takes the same values at the intervals of T0 . Hence, the values over any segment of duration T0 are repeated in any other interval of the same duration. For convenience, the area under x(t) over any interval of duration T0 will be denoted by

It is helpful to label signals that start at t = − ∞ and continue forever as everlasting signals. Thus, an everlasting signal exists over the entire interval − ∞ < t < ∞. The signals in Figs. 1.1b and 1.2b are examples of everlasting signals. Clearly, a periodic signal, by definition, is an everlasting signal. A signal that does not start before t = 0 is a causal signal. In other words, x(t) is a causal signal if

Signals in Fig. 1.3a-1.3c are causal signals. A signal that starts before t = 0 is a noncausal signal. All the signals in Fig. 1.1 and 1.2 are noncausal. Observe that an everlasting signal is always noncausal but a noncausal signal is not necessarily everlasting. The everlasting signal in Fig. 1.2b is noncausal; however, the noncausal signal in Fig. 1.2a is not everlasting. A signal that is zero for all t ≥ 0 is called an anticausal signal. Comment. A true everlasting signal cannot be generated in practice for obvious reasons. Why should we bother to postulate such a signal? In later chapters we shall see that certain signals (e.g., an impulse and an everlasting sinusoid) that cannot be generated in practice do serve a very useful purpose in the study of signals and systems.

1.3-4 Energy and Power Signals A signal with finite energy is an energy signal, and a signal with finite and nonzero power is a power signal. Signals in Fig. 1.2a and 1.2b are examples of energy and power signals, respectively. Observe that power is the time average of energy. Since the averaging is over an infinitely large interval, a signal with finite energy has zero power, and a signal with finite power has infinite energy. Therefore, a signal cannot both be an energy signal and a power signal. If it is one, it cannot be the other. On the other hand, there are signals that are neither energy nor power signals. The ramp signal is one such case. Comments. All practical signals have finite energies and are therefore energy signals. A power signal must necessarily have infinite duration; otherwise its power, which is its energy averaged over an infinitely large interval, will not approach a (nonzero) limit. Clearly, it is impossible to generate a true power signal in practice because such a signal has infinite duration and infinite energy. Also, because of periodic repetition, periodic signals for which the area under |x(t)|2 over one period is finite are power signals; however, not all power signals are periodic. EXERCISE E1.6 Show that an everlasting exponential e −at is neither an energy nor a power signal for any real value of a. However, if a is imaginary, it is a power signal with power Px = 1 regardless of the value of a.

1.3-5 Deterministic and Random Signals A signal whose physical description is known completely, either in a mathematical form or a graphical form, is a deterministic signal. A

signal whose values cannot be predicted precisely but are known only in terms of probabilistic description, such as mean value or mean-squared value, is a random signal. In this book we shall exclusively deal with deterministic signals. Random signals are beyond the scope of this study.

1.4 SOME USEFUL SIGNAL MODELS In the area of signals and systems, the step, the impulse, and the exponential functions play very important role. Not only do they serve as a basis for representing other signals, but their use can simplify many aspects of the signals and systems.

1.4-1 Unit Step Function u(t) In much of our discussion, the signals begin at t = 0 (causal signals). Such signals can be conveniently described in terms of unit step function u(t) shown in Fig. 1.14a. This function is defined by

Figure 1.14: (a) Unit step function u(t). (b) Exponential e −at u(t). If we want a signal to start at t = 0 (so that it has a value of zero for t < 0), we need only multiply the signal by u(t). For instance, the

signal e −at represents an everlasting exponential that starts at t = − ∞. The causal form of this exponential (Fig. 1.14b) can be described as e −at u(t).

The unit step function also proves very useful in specifying a function with different mathematical descriptions over different intervals. Examples of such functions appear in Fig. 1.7. These functions have different mathematical descriptions over different segments of time as seen from Eqs. (1.14), (1.15a), and (1.15b). Such a description often proves clumsy and inconvenient in mathematical treatment. We can use the unit step function to describe such functions by a single expression that is valid for all t. Consider, for example, the rectangular pulse depicted in Fig. 1.15a. We can express such a pulse in terms of familiar step functions by observing that the pulse x(t) can be expressed as the sum of the two delayed unit step functions as shown in Fig. 1.15b. The unit step function u(t) delayed by T seconds is u(t − T). From Fig. 1.15b, it is clear that

Figure 1.15: Representation of a rectangular pulse by step functions. EXAMPLE 1.6 Describe the signal in Fig. 1.16a.

Figure 1.16: Representation of a signal defined interval by interval. The signal illustrated in Fig. 1.16a can be conveniently handled by breaking it up into the two components x 1 (t) and x 2 (t), depicted in Fig. 1.16b and 1.16c, respectively. Here, x 1 (t) can be obtained by multiplying the ramp t by the gate pulse u(t) − u(t − 2), as shown in Fig. 1.16b. Therefore The signal x 2 (t) can be obtained by multiplying another ramp by the gate pulse illustrated in Fig. 1.16c. This ramp has a slope −2; hence it can be described by −2t + c. Now, because the ramp has a zero value at t = 3, the constant c = 6, and the ramp can be described by −2(t − 3). Also, the gate pulse in Fig. 1.16c is u(t − 2) − u(t − 3). Therefore and

EXAMPLE 1.7 Describe the signal in Fig. 1.7a by a single expression valid for all t. Over the interval from −1.5 to 0, the signal can be described by a constant 2, and over the interval from 0 to 3, it can be described by 2e −t/2 . Therefore

Compare this expression with the expression for the same function found in Eq. (1.14). EXERCISE E1.7 Show that the signals depicted in Fig. 1.17a and 1.17b can be described as u(−t) and e −at u(−t), respectively.

Figure 1.17

EXERCISE E1.8 Show that the signal shown in Fig. 1.18 can be described as

Figure 1.18

1.4-2 The Unit Impulse Function δ(t) The unit impulse function δ(t) is one of the most important functions in the study of signals and systems. This function was first defined by P. A. M. Dirac as

We can visualize an impulse as a tall, narrow, rectangular pulse of unit area, as illustrated in Fig. 1.19b. The width of this rectangular pulse is a very small value ε → 0. Consequently, its height is a very large value 1/ε → ∞. The unit impulse therefore can be regarded as a rectangular pulse with a width that has become infinitesimally small, a height that has become infinitely large, and an overall area that has been maintained at unity. Thus δ(t) = 0 everywhere except at t = 0, where it is undefined. For this reason a unit impulse is represented by the spearlike symbol in Fig. 1.19a.

Figure 1.19: A unit impulse and its approximation. Other pulses, such as the exponential, triangular, or Gaussian types, may also be used in impulse approximation. The important feature of the unit impulse function is not its shape but the fact that its effective duration (pulse width) approaches zero while its area remains at unity. For example, the exponential pulse αe −αt u(t) in Fig. 1.20a becomes taller and narrower as α increases. In the limit as α → ∞, the pulse height → ∞, and its width or duration → 0. Yet, the area under the pulse is unity regardless of the value of α because

The pulses in Fig. 1.20b and 1.20c behave in a similar fashion. Clearly, the exact impulse function cannot be generated in practice; it can only be approached.

Figure 1.20: Other possible approximations to a unit impulse. From Eq. (1.21), it follows that the function kδ(t) = 0 for all t ≠ 0, and its area is k. Thus, kδ(t) is an impulse function whose area is k

(in contrast to the unit impulse function, whose area is 1). MULTIPLICATION OF A FUNCTION BY AN IMPULSE Let us now consider what happens when we multiply the unit impulse δ(t) by a function φ(t) that is known to be continuous at t = 0. Since the impulse has nonzero value only at t = 0, and the value of φ(t) at t = 0 is φ(0), we obtain

Thus, multiplication of a continuous-time function φ(t) with an unit impulse located at t = 0 results in an impulse, which is located at t = 0 and has strength φ(0) (the value of φ(t) at the location of the impulse). Use of exactly the same argument leads to the generalization of this result, stating that provided φ(t) is continuous at t = T, φ(t) multiplied by an impulse δ(t − T) (impulse located at t = T) results in an impulse located at t = T and having strength φ(T) [the value of φ(t) at the location of the impulse].

SAMPLING PROPERTY OF THE UNIT IMPULSE FUNCTION From Eq. (1.23a) it follows that

provided φ(t) is continuous at t = 0. This result means that the area under the product of a function with an impulse δ(t) is equal to the value of that function at the instant at which the unit impulse is located. This property is very important and useful and is known as the sampling or sifting property of the unit impulse. From Eq. (1.23b) it follows that

Equation (1.24b) is just another form of sampling or sifting property. In the case of Eq. (1.24b), the impulse δ(t − T) is located at t = T. Therefore, the area under φ(t)δ(t − T) is φ(T), the value of φ(t) at the instant at which the impulse is located (at t = T). In these derivations we have assumed that the function is continuous at the instant where the impulse is located. UNIT IMPULSE AS A GENERALIZED FUNCTION The definition of the unit impulse function given in Eq. (1.21) is not mathematically rigorous, which leads to serious difficulties. First, the

impulse function does not define a unique function: for example, it can be shown that δ(t) + δ(t) also satisfies Eq. (1.21).[1] Moreover, δ(t) is not even a true function in the ordinary sense. An ordinary function is specified by its values for all time t. The impulse function is zero everywhere except at t = 0, and at this, the only interesting part of its range, it is undefined. These difficulties are resolved by defining the impulse as a generalized function rather than an ordinary function. A generalized function is defined by its effect on other functions instead of by its value at every instant of time. In this approach the impulse function is defined by the sampling property [Eqs. (1.24)]. We say nothing about what the impulse function is or what it looks like. Instead, the impulse function is defined in terms of its effect on a test function φ(t). We define a unit impulse as a function for which the area under its product with a function φ(t) is equal to the value of the function φ(t) at the instant at which the impulse is located. It is assumed that φ(t) is continuous at the location of the impulse. Therefore, either Eq. (1.24a) or (1.24b) can serve as a definition of the impulse function in this approach. Recall that the sampling property [Eqs. (1.24)] is the consequence of the classical (Dirac) definition of impulse in Eq. (1.21). In contrast, the sampling property [Eqs. (1.24)] defines the impulse function in the generalized function approach. We now present an interesting application of the generalized function definition of an impulse. Because the unit step function u(t) is discontinuous at t = 0, its derivative du/dt does not exist at t = 0 in the ordinary sense. We now show that this derivative does exist in the generalized sense, and it is, in fact, δ(t). As a proof, let us evaluate the integral of (du/dt)φ(t), using integration by parts:

This result shows that du/dt satisfies the sampling property of δ(t). Therefore it is an impulse δ(t) in the generalized sense-that is,

Consequently

These results can also be obtained graphically from Fig. 1.19b. We observe that the area from − ∞ to t under the limiting form of δ(t) in Fig. 1.19b is zero if t < −ε/2 and unity if t ≥ ε/2 with ε → 0. Consequently

This result shows that the unit step function can be obtained by integrating the unit impulse function. Similarly the unit ramp function x(t) = tu(t) can be obtained by integrating the unit step function. We may continue with unit parabolic function t2 /2 obtained by integrating the unit ramp, and so on. On the other side, we have derivatives of impulse function, which can be defined as generalized functions (see Prob. 1.4-9). All these functions, derived from the unit impulse function (successive derivatives and integrals) are called singularity functions.[†]

EXERCISE E1.9 Show that a. (t 3 + 3)δ(t) = 3δ(t) b. c. e −2t δ(t) = δ(t)

d. EXERCISE E1.10 Show that a. ∫ ∞−∞ δ(t)e -jωt dt = 1

b. c. ∫ ∞−∞ δ e −2(x−t)δ(2−t dt =e −2(x− 2)

1.4-3 The Exponential Function est Another important function in the area of signals and systems is the exponential signal e st , where s is complex in general, given by Therefore

Since s* = σ − jω (the conjugate of s), then

and

Comparison of this equation with Euler's formula shows that e st is a generalization of the function e jωt , where the frequency variable jω

is generalized to a complex variable s = σ + jω. For this reason we designate the variable s as the complex frequency. From Eqs.

(1.30) it follows that the function e st encompasses a large class of functions. The following functions are either special cases of or can

be expressed in terms of e st :

1. A constant k = ke0t (s = 0) 2. A monotonic exponential e σt (ω = 0, s = σ) 3. A sinusoid cos ωt (σ = 0, s = ±jω) 4. An exponentially varying sinusoid e σt cos ωt (s = σ ± jω) These functions are illustrated in Fig. 1.21.

Figure 1.21: Sinusoids of complex frequency σ + jω. The complex frequency s can be conveniently represented on a complex frequency plane (s plane) as depicted in Fig. 1.22. The horizontal axis is the real axis (σ axis), and the vertical axis is the imaginary axis (jω axis). The absolute value of the imaginary part of s is |ω| (the radian frequency), which indicates the frequency of oscillation of e st ; the real part σ (the neper frequency) gives

information about the rate of increase or decrease of the amplitude of e st . For signals whose complex frequencies lie on the real axis (σ axis, where ω = 0), the frequency of oscillation is zero. Consequently these signals are monotonically increasing or decreasing

exponentials (Fig. 1.21a). For signals whose frequencies lie on the imaginary axis (jω axis where σ = 0), e σt = 1. Therefore, these signals are conventional sinusoids with constant amplitude (Fig. 1.21b). The case s = 0 (σ = ω = 0) corresponds to a constant (dc)

signal because e 0t = 1. For the signals illustrated in Fig. 1.21c and 1.21d, both σ and ω are nonzero; the frequency s is complex and does not lie on either axis. The signal in Fig. 1.21c decays exponentially. Therefore, σ is negative, and s lies to the left of the imaginary axis. In contrast, the signal in Fig. 1.21d grows exponentially. Therefore, σ is positive, and s lies to the right of the imaginary axis. Thus the s plane (Fig. 1.21) can be separated into two parts: the left half-plane (LHP) corresponding to exponentially decaying signals and the right half-plane (RHP) corresponding to exponentially growing signals. The imaginary axis separates the two regions and corresponds to signals of constant amplitude.

Figure 1.22: Complex frequency plane. An exponentially growing sinusoid e 2t cos 5t, for example, can be expressed as a linear combination of exponentials e (2+j5)t and

e (2−j5)t with complex frequencies 2 + j5 and 2 − j5, respectively, which lie in the RHP. An exponentially decaying sinusoid e −2t cos 5t can be expressed as a linear combination of exponentials e (−2+j5)t and e (−2−j5)t with complex frequencies −2 + j5 and-2 − j5,

respectively, which lie in the LHP. A constant amplitude sinusoid cos 5t can be expressed as a linear combination of exponentials e j5t

and e −j5t with complex frequencies ±j5, which lie on the imaginary axis. Observe that the monotonic exponentials e ±2t are also generalized sinusoids with complex frequencies ±2. [1] Papoulis, A. The Fourier Integral and Its Applications. McGraw-Hill, New York, 1962.

[†] Singularity functions were defined by late Prof. S. J. Mason as follows. A singularity is a point at which a function does not possess a

derivative. Each of the singularity functions (or if not the function itself, then the function differentiated a finite number of times) has a singular point at the origin and is zero elsewhere.[2]

[†] Mason, S. J. Electronic Circuits, Signals, and Systems. Wiley, New York, 1960.

1.5 EVEN AND ODD FUNCTIONS A real function x e (t) is said to be an even function of t if [†]

and a real function x 0 (t) is said to be an odd function of t if

An even function has the same value at the instants t and-t for all values of t. Clearly, x e (t) is symmetrical about the vertical axis, as shown in Fig. 1.23a. On the other hand, the value of an odd function at the instant t is the negative of its value at the instant -t. Therefore, x 0 (t) is antisymmetrical about the vertical axis, as depicted in Fig. 1.23b.

Figure 1.23: Functions of t: (a) even and (b) odd.

1.5-1 Some Properties of Even and Odd Functions Even and odd functions have the following properties:

The proofs are trivial and follow directly from the definition of odd and even functions [Eqs. (1.31) and (1.32)]. AREA Because x e (t) is symmetrical about the vertical axis, it follows from Fig. 1.23a that

It is also clear from Fig. 1.23b that

These results are valid under the assumption that there is no impulse (or its derivatives) at the origin. The proof of these statements is obvious from the plots of the even and the odd function. Formal proofs, left as an exercise for the reader, can be accomplished by using the definitions in Eqs. (1.31) and (1.32). Because of their properties, study of odd and even functions proves useful in many applications, as will become evident in later chapters.

1.5-2 Even and Odd Components of a Signal Every signal x(t) can be expressed as a sum of even and odd components because

From the definitions in Eqs. (1.31) and (1.32), we can clearly see that the first component on the right-hand side is an even function, while the second component is odd. This is apparent from the fact that replacing t by -t in the first component yields the same function. The same maneuver in the second component yields the negative of that component. Consider the function Expressing this function as a sum of the even and odd components x e (t) and x 0 (t), we obtain where [from Eq. (1.34)]

and

The function e −at u(t) and its even and odd components are illustrated in Fig. 1.24.

Figure 1.24: Finding even and odd components of a signal. EXAMPLE 1.8 Find the even and odd components of e jt . From Eq. (1.34) where and

[†] A complex signal x(t) is said to be conjugate symmetrical if x(t) = x*(−t). A real conjugate symmetrical signal is an even signal. A signal is conjugate antisymmetrical if x(t) = −x*(−t). A real conjugate antisymmetrical signal is an odd signal.

1.6 SYSTEMS As mentioned in Section 1.1, systems are used to process signals to allow modification or extraction of additional information from the signals. A system may consist of physical components (hardware realization) or of an algorithm that computes the output signal from the input signal (software realization).

Roughly speaking, a physical system consists of interconnected components, which are characterized by their terminal (input-output) relationships. In addition, a system is governed by laws of interconnection. For example, in electrical systems, the terminal relationships are the familiar voltage-current relationships for the resistors, capacitors, inductors, transformers, transistors, and so on, as well as the laws of interconnection (i.e., Kirchhoff's laws). Using these laws, we derive mathematical equations relating the outputs to the inputs. These equations then represent a mathematical model of the system. A system can be conveniently illustrated by a "black box" with one set of accessible terminals where the input variables x 1 (t), x 2 (t),..., x j (t) are applied and another set of accessible terminals where the output variables y 1 (t), y 2 (t),..., y k (t) are observed (Fig. 1.25).

Figure 1.25: Representation of a system. The study of systems consists of three major areas: mathematical modeling, analysis, and design. Although we shall be dealing with mathematical modeling, our main concern is with analysis and design. The major portion of this book is devoted to the analysis problem-how to determine the system outputs for the given inputs and a given mathematical model of the system (or rules governing the system). To a lesser extent, we will also consider the problem of design or synthesis-how to construct a system that will produce a desired set of outputs for the given inputs. DATA NEEDED TO COMPUTE SYSTEM RESPONSE To understand what data we need to compute a system response, consider a simple RC circuit with a current source x(t) as its input (Fig. 1.26). The output voltage y(t) is given by

Figure 1.26: Example of a simple electrical system. The limits of the integral on the right-hand side are from − ∞ to t because this integral represents the capacitor charge due to the current x(t) flowing in the capacitor, and this charge is the result of the current flowing in the capacitor from − ∞. Now, Eq. (1.36a) can be expressed as

The middle term on the right-hand side is v C(0), the capacitor voltage at t = 0. Therefore

This equation can be readily generalized as

From Eq. (1.36a), the output voltage y(t) at an instant t can be computed if we know the input current flowing in the capacitor throughout its entire past (− ∞ to t). Alternatively, if we know the input current x(t) from some moment t0 onward, then, using Eq.

(1.36d), we can still calculate y(t) for t ≥ t0 from a knowledge of the input current, provided we know v C(t0 ), the initial capacitor voltage (voltage at t0 ). Thus v C(t0 ) contains all the relevant information about the circuit's entire past (− ∞ to t0 ) that we need to compute y(t) for t ≥ t0 . Therefore, the response of a system at t ≥ t0 can be determined from its input(s) during the interval t0 to t and from certain initial conditions at t = t0 . In the preceding example, we needed only one initial condition. However, in more complex systems, several initial conditions may be

necessary. We know, for example, that in passive RLC networks, the initial values of all inductor currents and all capacitor voltages [†] are needed to determine the outputs at any instant t ≥ 0 if the inputs are given over the interval [0, t]. [†] Strictly speaking, this means independent inductor currents and capacitor voltages.

1.7 CLASSIFICATION OF SYSTEMS Systems may be classified broadly in the following categories: 1. Linear and nonlinear systems 2. Constant-parameter and time-varying-parameter systems 3. Instantaneous (memoryless) and dynamic (with memory) systems 4. Causal and noncausal systems 5. Continuous-time and discrete-time systems 6. Analog and digital systems 7. Invertible and noninvertible systems 8. Stable and unstable systems Other classifications, such as deterministic and probabilistic systems, are beyond the scope of this text and are not considered.

1.7-1 Linear and Nonlinear Systems THE CONCEPT OF LINEARITY A system whose output is proportional to its input is an example of a linear system. But linearity implies more than this; it also implies the additivity property: that is, if several inputs are acting on a system, then the total effect on the system due to all these inputs can be determined by considering one input at a time while assuming all the other inputs to be zero. The total effect is then the sum of all the component effects. This property may be expressed as follows: for a linear system, if an input x 1 acting alone has an effect y 1 , and if another input x 2 , also acting alone, has an effect y 2 , then, with both inputs acting on the system, the total effect will be y 1 + y 2 . Thus, if

then for all x 1 and x 2

In addition, a linear system must satisfy the homogeneity or scaling property, which states that for arbitrary real or imaginary number k, if an input is increased k-fold, the effect also increases k-fold. Thus, if then for all real or imaginary k

Thus, linearity implies two properties: homogeneity (scaling) and additivity. [†] Both these properties can be combined into one property (superposition), which is expressed as follows: If then for all values of constants k 1 and k 2 ,

This is true for all x 1 and x 2 . It may appear that additivity implies homogeneity. Unfortunately, homogeneity does not always follow from additivity. Exercise E1.11

demonstrates such a case. EXERCISE E1.11 Show that a system with the input x(t) and the output y(t) related by y(t) = Re{x(t)} satisfies the additivity property but violates the homogeneity property. Hence, such a system is not linear. [Hint: Show that Eq. (1.39) is not satisfied when k is complex.] RESPONSE OF A LINEAR SYSTEM For the sake of simplicity, we discuss only single-input, single-output (SISO) systems. But the discussion can be readily extended to multiple-input, multiple-output (MIMO) systems. A system's output for t ≥ 0 is the result of two independent causes: the initial conditions of the system (or the system state) at t = 0 and the input x(t) for t ≥ 0. If a system is to be linear, the output must be the sum of the two components resulting from these two causes: first, the zero-input response component that results only from the initial conditions at t = 0 with the input x(t) = 0 for t ≥ 0, and then the zero-state response component that results only from the input x(t) for t ≥ 0 when the initial conditions (at t = 0) are assumed to be zero. When all the appropriate initial conditions are zero, the system is said to be in zero state. The system output is zero when the input is zero only if the system is in zero state. In summary, a linear system response can be expressed as the sum of the zero-input and the zero-state component:

This property of linear systems, which permits the separation of an output into components resulting from the initial conditions and from the input, is called the decomposition property. For the RC circuit of Fig. 1.26, the response y(t) was found to be [see Eq. (1.36c)]

From Eq. (1.42), it is clear that if the input x(t) = 0 for t ≥ 0, the output y(t) = v C(0). Hence v C(0) is the zero-input component of the response y(t). Similarly, if the system state (the voltage v C in this case) is zero at t = 0, the output is given by the second component on the right-hand side of Eq. (1.42). Clearly this is the zero-state component of the response y(t). In addition to the decomposition property, linearity implies that both the zero-input and zero-state components must obey the principle of superposition with respect to each of their respective causes. For example, if we increase the initial condition k-fold, the zero-input component must also increase k-fold. Similarly, if we increase the input k-fold, the zero-state component must also increase k-fold. These facts can be readily verified from Eq. (1.42) for the RC circuit in Fig. 1.26. For instance, if we double the initial condition v C(0), the zero-input component doubles; if we double the input x(t), the zero-state component doubles. EXAMPLE 1.9 Show that the system described by the equation

is linear. [†] Let the system response to the inputs x 1 (t) and x 2 (t) be y 1 (t) and y 2 (t), respectively. Then

and

Multiplying the first equation by k 1 , the second with k 2 , and adding them yields

But this equation is the system equation [Eq. (1.43)] with and

Therefore, when the input is k 1 x 1 (t) + k 2 x 2 (t), the system response is k 1 y 1 (t) + k 2 y 2 (t). Consequently, the system is linear. Using this argument, we can readily generalize the result to show that a system described by a differential equation of the form

is a linear system. The coefficients a i and b i in this equation can be constants or functions of time. Although here we proved only zerostate linearity, it can be shown that such systems are also zero-input linear and have the decomposition property. EXERCISE E1.12 Show that the system described by the following equation is linear:

EXERCISE E1.13 Show that the system described by the following equation is nonlinear:

MORE COMMENTS ON LINEAR SYSTEMS Almost all systems observed in practice become nonlinear when large enough signals are applied to them. However, it is possible to approximate most of the nonlinear systems by linear systems for small-signal analysis. The analysis of nonlinear systems is generally difficult. Nonlinearities can arise in so many ways that describing them with a common mathematical form is impossible. Not only is each system a category in itself, but even for a given system, changes in initial conditions or input amplitudes may change the nature of the problem. On the other hand, the superposition property of linear systems is a powerful unifying principle that allows for a general solution. The superposition property (linearity) greatly simplifies the analysis of linear systems. Because of the decomposition property, we can evaluate separately the two components of the output. The zero-input component can be computed by assuming the input to be zero, and the zero-state component can be computed by assuming zero initial conditions. Moreover, if we express an input x(t) as a sum of simpler functions, then, by virtue of linearity, the response y(t) is given by

where y k (t) is the zero-state response to an input x k (t). This apparently trivial observation has profound implications. As we shall see repeatedly in later chapters, it proves extremely useful and opens new avenues for analyzing linear systems. For example, consider an arbitrary input x(t) such as the one shown in Fig. 1.27a. We can approximate x(t) with a sum of rectangular pulses of width Δt and of varying heights. The approximation improves as Δt → 0, when the rectangular pulses become impulses

spaced Δt seconds apart (with Δt → 0). [†] Thus, an arbitrary input can be replaced by a weighted sum of impulses spaced Δt (Δt → 0) seconds apart. Therefore, if we know the system response to a unit impulse, we can immediately determine the system response to an arbitrary input x(t) by adding the system response to each impulse component of x(t). A similar situation is depicted in Fig. 1.27b, where x(t) is approximated by a sum of step functions of varying magnitude and spaced Δt seconds apart. The approximation improves as Δt becomes smaller. Therefore, if we know the system response to a unit step input, we can compute the system response to any arbitrary input x(t) with relative ease. Time-domain analysis of linear systems (discussed in Chapter 2) uses this approach.

Figure 1.27: Signal representation in terms of impulse and step components. Chapters 4 through 7 employ the same approach but instead use sinusoids or exponentials as the basic signal components. We show that any arbitrary input signal can be expressed as a weighted sum of sinusoids (or exponentials) having various frequencies. Thus a knowledge of the system response to a sinusoid enables us to determine the system response to an arbitrary input x(t).

1.7-2 Time-Invariant and Time-Varying Systems Systems whose parameters do not change with time are time-invariant (also constant-parameter) systems. For such a system, if the

input is delayed by T seconds, the output is the same as before but delayed by T (assuming initial conditions are also delayed by T). This property is expressed graphically in Fig. 1.28. We can also illustrate this property, as shown in Fig. 1.29. We can delay the output y(t) of a system S by applying the output y(t) to a T second delay (Fig. 1.29a). If the system is time invariant, then the delayed output y(t − T) can also be obtained by first delaying the input x(t) before applying it to the system, as shown in Fig. 1.29b. In other words, the system S and the time delay commute if the system S is time invariant. This would not be true for time-varying systems. Consider, for instance, a time-varying system specified by y(t) = e −t x(t). The output for such a system in Fig. 1.29a is e −(t−T)x(t − T). In contrast, the output for the system in Fig. 1.29b is e −t x(t − T).

Figure 1.28: Time-invariance property.

Figure 1.29: Illustration of time-invariance property. It is possible to verify that the system in Fig. 1.26 is a time-invariant system. Networks composed of RLC elements and other commonly used active elements such as transistors are time-invariant systems. A system with an input-output relationship described by a linear differential equation of the form given in Example 1.9 [Eq. (1.44)] is a linear time-invariant (LTI) system when the coefficients a i and b i of such equation are constants. If these coefficients are functions of time, then the system is a linear time-varying system. The system described in Exercise E1.12 is linear time varying. Another familiar example of a time-varying system is the carbon microphone, in which the resistance R is a function of the mechanical pressure generated by sound waves on the carbon granules of the microphone. The output current from the microphone is thus modulated by the sound waves, as desired. EXERCISE E1.14 Show that a system described by the following equation is time-varying-parameter system: [Hint: Show that the system fails to satisfy the time-invariance property.]

1.7-3 Instantaneous and Dynamic Systems As observed earlier, a system's output at any instant t generally depends on the entire past input. However, in a special class of systems, the output at any instant t depends only on its input at that instant. In resistive networks, for example, any output of the network at some instant t depends only on the input at the instant t. In these systems, past history is irrelevant in determining the response. Such systems are said to be instantaneous or memoryless systems. More precisely, a system is said to be instantaneous (or memoryless) if its output at any instant t depends, at most, on the strength of its input(s) at the same instant t, and not on any past or future values of the input(s). Otherwise, the system is said to be dynamic (or a system with memory). A system whose response at t is completely determined by the input signals over the past T seconds [interval from (t − T) to t] is a finite-memory system with a memory of T seconds. Networks containing inductive and capacitive elements generally have infinite memory because the response of such

networks at any instant t is determined by their inputs over the entire past (− ∞, t). This is true for the RC circuit of Fig. 1.26. In this book we will generally examine dynamic systems. Instantaneous systems are a special case of dynamic systems.

1.7-4 Causal and Noncausal Systems A causal (also known as a physical or nonanticipative) system is one for which the output at any instant to depends only on the value of the input x(t) for t ≤ to . In other words, the value of the output at the present instant depends only on the past and present values of the input x(t), not on its future values. To put it simply, in a causal system the output cannot start before the input is applied. If the response starts before the input, it means that the system knows the input in the future and acts on this knowledge before the input is applied. A system that violates the condition of causality is called a noncausal (or anticipative) system. Any practical system that operates in real time [†] must necessarily be causal. We do not yet know how to build a system that can respond to future inputs (inputs not yet applied). A noncausal system is a prophetic system that knows the future input and acts on it in the present. Thus, if we apply an input starting at t = O to a noncausal system, the output would begin even before t = O. For example, consider the system specified by

For the input x(t) illustrated in Fig. 1.30a, the output y(t), as computed from Eq. (1.46) (shown in Fig. 1.30b), starts even before the input is applied. Equation (1.46) shows that y(t), the output at t, is given by the sum of the input values 2 seconds before and 2 seconds after t (at t − 2 and t + 2, respectively). But if we are operating the system in real time at t, we do not know what the value of the input will be 2 seconds later. Thus it is impossible to implement this system in real time. For this reason, noncausal systems are unrealizable in real time.

Figure 1.30: A noncausal system and its realization by a delayed causal system. WHY STUDY NONCAUSAL SYSTEMS? The foregoing discussion may suggest that noncausal systems have no practical purpose. This is not the case; they are valuable in the study of systems for several reasons. First, noncausal systems are realizable when the independent variable is other than "time" (e.g., space). Consider, for example, an electric charge of density q(x] placed along the x axis for x ≥ O. This charge density produces an electric field E(x) that is present at every point on the x axis from x = − ∞ to ∞. In this case the input [i.e., the charge density q(x)] starts at x = O, but its output [the electric field E(x)] begins before x = O. Clearly, this space-charge system is noncausal. This discussion shows that only temporal systems (systems with time as independent variable) must be causal to be realizable. The terms "before" and "after" have a special connection to causality only when the independent variable is time. This connection is lost for variables other than time. Nontemporal systems, such as those occurring in optics, can be noncausal and still realizable. Moreover, even for temporal systems, such as those used for signal processing, the study of noncausal systems is important. In such systems we may have all input data prerecorded. (This often happens with speech, geophysical, and meteorological signals, and with space probes.) In such cases, the input's future values are available to us. For example, suppose we had a set of input signal records available for the system described by Eq. (1.46). We can then compute y(t) since, for any t, we need only refer to the records to find the input's value 2 seconds before and 2 seconds after t. Thus, noncausal systems can be realized, although not in real time. We may therefore be able to realize a noncausal system, provided we are willing to accept a time delay in the output. Consider a system whose output Ŷ(t) is the same as y(t) in Eq. (1.46) delayed by 2 seconds (Fig 1.30c), so that

Here the value of the output Ŷ at any instant t is the sum of the values of the input x at t and at the instant 4 seconds earlier [at (t − 4)]. In this case, the output at any instant t does not depend on future values of the input, and the system is causal. The output of this

system, which is Ŷ(t), is identical to that in Eq. (1.46) or Fig. 1.30b except for a delay of 2 seconds. Thus, a noncausal system may be realized or satisfactorily approximated in real time by using a causal system with a delay.

Noncausal systems are realizable with time delay! A third reason for studying noncausal systems is that they provide an upper bound on the performance of causal systems. For example, if we wish to design a filter for separating a signal from noise, then the optimum filter is invariably a noncausal system. Although unrealizable, this noncausal system's performance acts as the upper limit on what can be achieved and gives us a standard for evaluating the performance of causal filters. At first glance, noncausal systems may seem to be inscrutable. Actually, there is nothing mysterious about these systems and their approximate realization through physical systems with delay. If we want to know what will happen one year from now, we have two choices: go to a prophet (an unrealizable person) who can give the answers instantly, or go to a wise man and allow him a delay of one year to give us the answer! If the wise man is truly wise, he may even be able, by studying trends, to shrewdly guess the future very closely with a delay of less than a year. Such is the case with noncausal systems-nothing more and nothing less. EXERCISE E1.15 Show that a system described by the following equation is noncausal:

Show that this system can be realized physically if we accept a delay of 5 seconds in the output.

1.7-5 Continuous-Time and Discrete-Time Systems Signals defined or specified over a continuous range of time are continuous-time signals, denoted by symbols x(t), y(t), and so on. Systems whose inputs and outputs are continuous-time signals are continuous-time systems. On the other hand, signals defined only at discrete instants of time to , t 1 , t,... are discrete-time signals, denoted by the symbols x(tn ), y(tn ), and so on, where n is some integer. Systems whose inputs and outputs are discrete-time signals are discrete-time systems. A digital computer is a familiar example of this type of system. In practice, discrete-time signals can arise from sampling continuous-time signals. For example, when the sampling is uniform, the discrete instants to , t 1 , t 2 ,... are uniformly spaced so that In such case, the discrete-time signals represented by the samples of continuous-time signals x(t), y(t), and so on can be expressed as x(nT), y(nT), and so on; for convenience, we further simplify this notation to x[n], y[nT],..., where it is understood that x[n] = x(nT) and that n is some integer. A typical discrete-time signal is shown in Fig. 1.31. A discrete-time signal may also be viewed as a sequence of numbers..., x[− 1], x[0], x[1], x[2],.... Thus a discrete-time system may be seen as processing a sequence of numbers x[n] and yielding as an output another sequence of numbers y[n].

Figure 1.31: A discrete-time signals. Discrete-time signals arise naturally in situations that are inherently discrete time, such as population studies, amortization problems, national income models, and radar tracking. They may also arise as a result of sampling continuous-time signals in sampled data systems, digital filtering, and the like. Digital filtering is a particularly interesting application in which continuous-time signals are processed by using discrete-time systems as shown in Fig. 1.32. A continuous-time signal x(t) is first sampled to convert it into a discrete-time signal x[n], which then is processed by the discrete-time system to yield a discrete-time output y[n]. A continuous-time signal y(t) is finally constructed from y[n]. In this manner we can process a continuous-time signal with an appropriate discrete-time

system such as a digital computer. Because discrete-time systems have several significant advantages over continuous-time systems.

Figure 1.32: Processing contiuous-time signals by discrete-time system.

1.7-6 Analog and Digital Systems Analog and digital signals are discussed in Section 1.3-2. A system whose input and output signals are analog is an analog system; a system whose input and output signals are digital is a digital system. A digital computer is an example of a digital (binary) system. Observe that a digital computer is digital as well as a discrete-time system.

1.7-7 Invertible and Noninvertible Systems A system S performs certain operation(s) on input signal(s). If we can obtain the input x(t) back from the corresponding output y(t) by some operation, the system S is said to be invertible. When several different inputs result in the same output (as in a rectifier), it is impossible to obtain the input from the output, and the system is noninvertible. Therefore, for an invertible system, it is essential that every input have a unique output so that there is a one-to-one mapping between an input and the corresponding output. The system that achieves the inverse operation [of obtaining x(t) from y(t)] is the inverse system for S. For instance, if S is an ideal integrator, then its inverse system is an ideal differentiator. Consider a system S connected in tandem with its inverse Si , as shown in Fig. 1.33. The input x(t) to this tandem system results in signal y(t) at the output of S, and the signal y(t), which now acts as an input to Si , yields back the signal x(t) at the output of Si , Thus, Si , undoes the operation of S on x(t), yielding back x(t). A system whose output is equal to the input (for all possible inputs) is an identity system. Cascading a system with its inverse system, as shown in Fig. 1.33, results in an identity system.

Figure 1.33: A cascade of a system with its inverse results in an identity system. In contrast, a rectifier, specified by an equation y(t) = |x(t)|, is noninvertibe because the rectification operation cannot be undone. Inverse systems are very important in signal processing. In many applications, the signals are distorted during the processing, and it is necessary to undo the distortion. For instance, in transmission of data over a communication channel, the signals are distorted owing to nonideal frequency response and finite bandwidth of a channel. It is necessary to restore the signal as closely as possible to its original shape. Such equalization is also used in audio systems and photographic systems.

1.7-8 Stable and Unstable Systems Systems can also be classified as stable or unstable systems. Stability can be internal or external. If every bounded input applied at the input terminal results in a bounded output, the system is said to be stable externally. The external stability can be ascertained by measurements at the external terminals (input and output) of the system. This type of stability is also known as the stability in the BIBO (bounded-input/bounded-output) sense. The concept of internal stability is postponed to Chapter 2 because it requires some understanding of internal system behavior, introduced in that chapter. EXERCISE E1.16 Show that a system described by the equation y(t) = x 2 (t) is noninvertible but BIBO stable. [†] A linear system must also satisfy the additional condition of smoothness, where small changes in the system's inputs must result in small changes in its outputs. [3] [†] Kailath, T. Linear Systems. Prentice-Hall, Englewood Cliffs, NJ, 1980. [†] Equations such as (1.43) and (1.44) are considered to represent linear systems in the classical definition of linearity. Some authors consider such equations to represent incrementally linear systems. According to this definition, linear system has only a zero-state component. The zero-input component is absent. Hence, incrementally linear system response can be represented as a response of a

linear system (linear in this new definition) plus a zero-input component. We prefer the classical definition to this new definition. It is just a matter of definition and makes no difference in the final results. [†] Here, the discussion of a rectangular pulse approaching an impulse at Δt → 0 is somewhat imprecise. It is explained in Section 2.4

with more rigor.

[†] In real-time operations, the response to an input is essentially simultaneous (contemporaneous) with the input itself.

1.8 SYSTEM MODEL: INPUT-OUTPUT DESCRIPTION A system description in terms of the measurements at the input and output terminals is called the input-output description. As mentioned earlier, systems theory encompasses a variety of systems, such as electrical, mechanical, hydraulic, acoustic, electromechanical, and chemical, as well as social, political, economic, and biological. The first step in analyzing any system is the construction of a system model, which is a mathematical expression or a rule that satisfactorily approximates the dynamical behavior of the system. In this chapter we shall consider only continuous-time systems. (Modeling of discrete-time systems is discussed in Chapter 3.)

1.8-1 Electrical Systems To construct a system model, we must study the relationships between different variables in the system. In electrical systems, for example, we must determine a satisfactory model for the voltage-current relationship of each element, such as Ohm's law for a resistor. In addition, we must determine the various constraints on voltages and currents when several electrical elements are interconnected. These are the laws of interconnection-the well-known Kirchhoff laws for voltage and current (KVL and KCL). From all these equations, we eliminate unwanted variables to obtain equation(s) relating the desired output variable(s) to the input(s). The following examples demonstrate the procedure of deriving input-output relationships for some LTI electrical systems. EXAMPLE 1.10 For the series RLC circuit of Fig. 1.34, find the input-output equation relating the input voltage x(t) to the output current (loop current) y(t).

Figure 1.34 Application of Kirchhoff's voltage law around the loop yields

By using the voltage-current laws of each element (inductor, resistor, and capacitor), we can express this equation as

Differentiating both sides of this equation, we obtain

This differential equation is the input-output relationship between the output y(t) and the input x(t). It proves convenient to use a compact notation D for the differential operator d/dt. Thus

and so on. With this notation, Eq. (1.49) can be expressed as

The differential operator is the inverse of the integral operator, so we can use the operator 1/D to represent integration. [†]

Consequently, the loop equation (1.48) can be expressed as

Multiplying both sides by D, that is, differentiating Eq. (1.54), we obtain

which is identical to Eq. (1.52). Recall that Eq. (1.55) is not an algebraic equation, and D 2 + 3D + 2 is not an algebraic term that multiplies y(t); it is an operator that operates on y(t). It means that we must perform the following operations on y(t): take the second derivative of y(t) and add to it 3 times the first derivative of y(t) and 2 times y(t). Clearly, a polynomial in D multiplied by y(t) represents a certain differential operation on y(t). EXAMPLE 1.11 Find the equation relating the input to output for the series RC circuit of Fig. 1.35 if the input is the voltage x(t) and output is a. the loop current i(t) b. the capacitor voltage y(t)

Figure 1.35 a. The loop equation for the circuit is

or

With operational notation, this equation can be expressed as

b. Multiplying both sides of Eqs. (1.58) by D (i.e., differentiating the equation), we obtain

or

Moreover,

Substitution of this result in Eq. (1.59a) yields

or

EXERCISE E1.17 For the RLC circuit in Fig. 1.34, find the input-output relationship if the output is the inductor voltage v L (t). Answers (D 2 + 3D + 2)v (t) = D 2 x(t) L EXERCISE E1.18 For the RLC circuit in Fig. 1.34, find the input-output relationship if the output is the capacitor voltage v c (t). Answers (D 2 + 3D + 2)v (t) = 2x(t) c

1.8-2 Mechanical Systems Planar motion can be resolved into translational (rectilinear) motion and rotational (torsional) motion. Translational motion will be considered first. We shall restrict ourselves to motions in one dimension. Translational Systems The basic elements used in modeling translational systems are ideal masses, linear springs, and dashpots providing viscous damping. The laws of various mechanical elements are now discussed. For a mass M (Fig. 1.36a), a force x(t) causes a motion y(t) and acceleration ÿ(t). From Newton's law of motion,

Figure 1.36: Some elements in translational mechanical systems. The force x(t) required to stretch (or compress) a linear spring (Fig. 1.36b) by an amount y(t) is given by

where K is the stiffness of the spring. For a linear dashpot (Fig. 1.36c), which operates by virtue of viscous friction, the force moving the dashpot is proportional to the relative velocity y(t) of one surface with respect to the other. Thus

where B is the damping coefficient of the dashpot or the viscous friction. EXAMPLE 1.12 Find the input-output relationship for the translational mechanical system shown in Fig. 1.37a or its equivalent in Fig. 1.37b. The input is the force x(t), and the output is the mass position y(t). In mechanical systems it is helpful to draw a free-body diagram of each junction, which is a point at which two or more elements are connected. In Fig. 1.37, the point representing the mass is a junction. The displacement of the mass is denoted by y(t). The spring is also stretched by the amount y(t), and therefore it exerts a force-Ky(t) on the mass. The dashpot exerts a force-By(t) on the mass as shown in the free-body diagram (Fig. 1.37c). By Newton's second law, the net force must be Mÿ(t). Therefore or

Figure 1.37 Rotational Systems In rotational systems, the motion of a body may be defined as its motion about a certain axis. The variables used to describe rotational motion are torque (in place of force), angular position (in place of linear position), angular velocity (in place of linear velocity), and angular acceleration (in place of linear acceleration). The system elements are rotational mass or moment of inertia (in place of mass) and torsional springs and torsional dashpots (in place of linear springs and dashpots). The terminal equations for these elements are analogous to the corresponding equations for translational elements. If J is the moment of inertia (or rotational mass) of a rotating body about a certain axis, then the external torque required for this motion is equal to J (rotational mass) times the angular acceleration. If θ is the angular position of the body, is its angular acceleration, and

Similarly, if K is the stiffness of a torsional spring (per unit angular twist), and θ is the angular displacement of one terminal of the spring with respect to the other, then

Finally, the torque due to viscous damping of a torsional dashpot with damping coefficient B is

EXAMPLE 1.13 The attitude of an aircraft can be controlled by three sets of surfaces (shown shaded in Fig. 1.38): elevators, rudder, and ailerons. By manipulating these surfaces, one can set the aircraft on a desired flight path. The roll angle φ can be controlled by deflecting in the opposite direction the two aileron surfaces as shown in Fig. 1.38. Assuming only rolling motion, find the equation relating the roll angle

φ to the input (deflection) θ.

Figure 1.38: Attitude control of an airplane. The aileron surfaces generate a torque about the roll axis proportional to the aileron deflection angle θ. Let this torque be cθ, where c . The torque available for rolling motion is then is the constant of proportionality. Air friction dissipates the torque . If J is the moment of inertia of the plane about the x axis (roll axis), then

and

or

This is the desired equation relating the output (roll angle φ) to the input (aileron angle θ). The roll velocity ω is be

. If the desired output is the roll velocity ω rather than the roll angle φ, then the input-output equation would

or

EXERCISE E1.19

Torque (t) is applied to the rotational mechanical system shown in Fig. 1.39a. The torsional spring stiffness is K; the rotational mass (the cylinder's moment of inertia about the shaft) is J; the viscous damping coefficient between the cylinder and the ground is B. Find the equation relating the output angle θ to the input torque . [Hint: A free-body diagram is shown in Fig. 1.39b.]

Figure 1.39: Rotational system. Answers or

1.8-3 Electromechanical Systems A wide variety of electromechanical systems convert electrical signals into mechanical motion (mechanical energy) and vice versa. Here we consider a rather simple example of an armaturecontrolled dc motor driven by a current source x(t), as shown in Fig. 1.40a. The torque (t) generated in the motor is proportional to the armature current x(t). Therefore

Figure 1.40: Armature-controlled dc motor. where K T is a constant of the motor. This torque drives a mechanical load whose free-body diagram is shown in Fig. 1.40b. The viscous damping (with coefficient B) dissipates a torque motor), then the net torque

must be equal to

. If J is the moment of inertia of the load (including the rotor of the :

Thus

which in conventional form can be expressed as

[†] Use of operator 1/D for integration generates some subtle mathematical difficulties because the operators D and 1/D do not

commute. For instance, we know that D(1/D) = 1 because

However, (1/D)D is not necessarily unity. Use of Cramer's rule in solving simultaneous integro-differential equations will always result in cancellation of operators 1/D and D. This procedure may yield erroneous results when the factor D occurs in the numerator as well as in the denominator. This happens, for instance, in circuits with all-inductor loops or all-capacitor cut sets. To eliminate this problem, avoid the integral operation in system equations so that the resulting equations are differential rather than integro-differential. In electrical circuits, this can be done by using charge (instead of current) variables in loops containing capacitors and choosing current variables for loops without capacitors. In the literature this problem of commutativity of D and 1/D is largely ignored. As mentioned earlier, such procedure gives erroneous results only in special systems, such as the circuits with all-inductor loops or all-capacitor cut sets. Fortunately such systems constitute a very small fraction of the systems we deal with. For further discussion of this topic and a correct method of handling problems involving integrals, see Ref. 4.

1.9 INTERNAL AND EXTERNAL DESCRIPTION OF A SYSTEM The input-output relationship of a system is an external description of that system. We have found an external description (not the internal description) of systems in all the examples discussed so far. This may puzzle the reader because in each of these cases, we derived the input-output relationship by analyzing the internal structure of that system. Why is this not an internal description? What makes a description internal? Although it is true that we did find the input-output description by internal analysis of the system, we did so strictly for convenience. We could have obtained the input-output description by making observations at the external (input and output) terminals, for example, by measuring the output for certain inputs such as an impulse or a sinusoid. A description that be obtained from measurements at the external terminals (even when the rest of the system is sealed inside an inaccessible black box) is an external description. Clearly, the input-output description is an external description. What, then, is an internal description? Internal

description is capable of providing the complete information about all possible signals in the system. An external description may not give such complete information. An external description can always be found from an internal description, but the converse is not necessarily true. We shall now give an example to clarify the distinction between an external and an internal description. Let the circuit in Fig. 1.41a with the input x(t) and the output y(t) be enclosed inside a "black box" with only the input and the output terminals accessible. To determine its external description, let us apply a known voltage x(t) at the input terminals and measure the resulting output voltage y(t).

Figure 1.41: A system that cannot be described by external measurements. Let us also assume that there is some initial charge Q o present on the capacitor. The output voltage will generally depend on both, the input x(t) and the initial charge Q o . To compute the output resulting because of the charge Q o , assume the input x(t) = O (short across the input). In this case, the currents in the two 2 Ω resistors in the upper and the lower branches at the output terminals are equal and opposite because of the balanced nature of the circuit. Clearly, the capacitor charge results in zero voltage at the outpu. [†]

Now, to compute the output y(t) resulting from the input voltage x(t), we assume zero initial capacitor charge (short across the capacitor terminals). The current i(t) (Fig. 1.41a), in this case, divides equally between the two parallel branches because the circuit is balanced. Thus, the voltage across the capacitor continues to remain zero. Therefore, for the purpose of computing the current i(t), the capacitor may be removed or replaced by a short. The resulting circuit is equivalent to that shown in Fig. 1.41b, which shows that the input x(t) sees a load of 5 Ω, and Also, because y(t) = 2i(t),

This is the total response. Clearly, for the external description, the capacitor does not exist. No external measurement or external observation can detect the presence of the capacitor. Furthermore, if the circuit is enclosed inside a "black box" so that only the external terminals are accessible, it is impossible to determine the currents (or voltages) inside the circuit from external measurements or observations. An internal description, however, can provide every possible signal inside the system. In Example 1.15, we shall find the internal description of this system and show that it is capable of determining every possible signal in the system. For most systems, the external and internal descriptions are equivalent, but there are a few exceptions, as in the present case, where the external description gives an inadequate picture of the systems. This happens when the system is uncontrollable and/or unobservable. Figure 1.42 shows structural representations of simple uncontrollable and unobservable systems. In Fig. 1.42a, we note that part of the system (subsystem S2 ) inside the box cannot be controlled by the input x(t). In Fig. 1.42b, some of the system outputs (those in subsystem S2 ) cannot be observed from the output terminals. If we try to describe either of these systems by applying an external input x(t) and then measuring the output y(t), the measurement will not characterize the complete system but only the part of the system (here S1 ) that is both controllable and observable (linked to both the input and output). Such systems are undesirable in practice and should be avoided in any system design. The system in Fig. 1.41a can be shown to be neither controllable nor observable. It can be represented structurally as a combination of the systems in Fig. 1.42a and 1.42b.

Figure 1.42: Structures of uncontrollable and unobservable systems. [†] The output voltage y(t) resulting because of the capacitor charge [assuming x(t) = O] is the zero-input response, which, as argued

above, is zero. The output component due to the input x(t) (assuming zero initial capacitor charge) is the zero-state response. Complete analysis of this problem is given later in Example 1.15.

1.10 INTERNAL DESCRIPTION: THE STATE-SPACE DESCRIPTION We shall now introduce the state-space description of a linear system, which is an internal description of a system. In this approach, we identify certain key variables, called the state variables, of the system. These variables have the property that every possible signal in the system can be expressed as a linear combination of these state variables. For example, we can show that every possible signal in a passive RLC circuit can be expressed as a linear combination of independent capacitor voltages and inductor currents, which, therefore, are state variables for the circuit. To illustrate this point, consider the network in Fig. 1.43. We identify two state variables; the capacitor voltage q 1 and the inductor current q 2 . If the values of q 1 , q 2 , and the input x(t) are known at some instant t, we can demonstrate that every possible signal (current or voltage) in the circuit can be determined at t. For example, if q 1 = 10, q 2 = 1, and the input x = 20 at some instant, the remaining voltages and currents at that instant will be

Thus all signals in this circuit are determined. Clearly, state variables consist of the key variables in a system; a knowledge of the state variables allows one to determine every possible output of the system. Note that the state-variable description is an internal description of a system because it is capable of describing all possible signals in the system.

Figure 1.43: Choosing suitable initial conditions in a network. EXAMPLE 1.14 This example illustrates how state equations may be natural and easier to determine than other descriptions, such as loop or node equations. Consider again the network in Fig. 1.43 with q 1 and q 2 as the state variables and write the state equations. This can be done by simple inspection of Fig. 1.43. Since

Also

or

, the voltage across the inductor, is given by

is the current through the capacitor,

Thus the state equations are

This is a set of two simultaneous first-order differential equations. This set of equations is known as the state equations. Once these equations have been solved for q 1 and q 2 , everything else in the circuit can be determined by using Eqs. (1.79). The set of output equations (1.79) is called the output equations. Thus, in this approach, we have two sets of equations, the state equations and the output equations. Once we have solved the state equations, all possible outputs can be obtained from the output equations. In the input-output description, an Nth-order system is described by an Nth-order equation. In the state-variable approach, the same system is described by N simultaneous first-order state equations.[†]

EXAMPLE 1.15 In this example, we investigate the nature of state equations and the issue of controllability and observability for the circuit in Fig. 1.41a. This circuit has only one capacitor and no inductors. Hence, there is only one state variable, the capacitor voltage q(t). Since C = 1 F, the capacitor current is q. There are two sources in this circuit: the input x(t) and the capacitor voltage q(t). The response due to x(t), assuming q(t) = 0, is the zero-state response, which can be found from Fig. 1.44a, where we have shorted the capacitor [q(t) = 0]. The response due to q(t) assuming x(t) = 0, is the zero-input response, which can be found from Fig. 1.44b, where we have shorted x(t) to ensure x(t) = 0. It is now trivial to find both the components. Figure 1.44a shows zero-state currents in every branch. It is clear that the input x(t) sees an effective resistance of 5 Ω, and, hence, the current through x(t) is x/5 A, which divides in the two parallel branches resulting in the current x/10 through each branch.

Figure 1.44: Analysis of a system that is neither controllable nor observable. Examining the circuit in Fig. 1.44b for the zero-input response, we note that the capacitor voltage is q and the current is q. We also observe that the capacitor sees two loops in parallel, each with resistance 4 Ω and current q/2. Interestingly, the 3 Ω branch is effectively shorted because the circuit is balanced, and thus the voltage across the terminals cd is zero. The total current in any branch is the sum of the currents in that branch in Fig. 1.44a and 1.44b (principle of superposition).

To find the state equation, we note that the current in branch ca is (x/10) + q/2 and the current in branch cb is (x/10) − q/2. Hence, the equation around the loop acba is

or

This is the desired state equation. Substitution of q = −0.5q in Eqs. (1.81) shows that every possible current and voltage in the circuit can be expressed in terms of the state variable q and the input x, as desired. Hence, the set of Eqs. (1.81) is the output equation for this circuit. Once we have solved the state equation (1.82) for q, we can determine every possible output in the circuit. The output y(t) is given by

A little examination of the state and the output equations indicates the nature of this system. The state equation (1.82) shows that the state q(t) is independent of the input x(t), and hence, the system state q cannot be controlled by the input. Moreover, Eq. (1.83) shows that the output y(t) does not depend on the state q(t). Thus, the system state cannot be observed from the output terminals. Hence, the system is neither controllable nor observable. Such is not the case of other systems examined earlier. Consider, for example, the circuit in Fig. 1.43. The state equation (1.80) shows that the states are influenced by the input directly or indirectly. Hence, the system is controllable. Moreover, as the output Eqs. (1.79) show, every possible output is expressed in terms of the state variables and the input. Hence, the states are also observable. State-space techniques are useful not just because of their ability to provide internal system description, but for several other reasons, including the following. 1. State equations of a system provide a mathematical model of great generality that can describe not just linear systems, but also nonlinear systems; not just time-invariant systems, but also time-varying parameter systems; not just SISO (single-input/single-output) systems, but also multiple-input/multiple-output (MIMO) systems. Indeed, state equations are ideally suited for the analysis, synthesis, and optimization of MIMO systems. 2. Compact matrix notation and the powerful techniques of linear algebra greatly facilitates complex manipulations. Without such features, many important results of the modern system theory would have been difficult to obtain. State equations can yield a great deal of information about a system even when they are not solved explicitly. 3. State equations lend themselves readily to digital computer simulation of complex systems of high order, with or without nonlinearities, and with multiple inputs and outputs. 4. For second-order systems (N = 2), a graphical method called phase-plane analysis can be used on state equations, whether they are linear or nonlinear. The real benefits of the state-space approach, however, are realized for highly complex systems of large order. Much of the book is devoted to introduction of the basic concepts of linear systems analysis, which must necessarily begin with simpler systems without using the state-space approach. Chapter 10 deals with the state-space analysis of linear, time invariant, continuous-time, and discretetime systems. EXERCISE E1.20

Write the state equations for the series RLC circuit shown in Fig. 1.45, using the inductor current q 1 (t) and the capacitor voltage q 2 (t) as state variables. Express every voltage and current in this circuit as a linear combination of q 1 , q 2 , and x.

Figure 1.45 Answers

[†] This assumes the system to be controllable and observable. If it is not, the input-output description equation will be of an order lower than the corresponding number of state equations.

1.11 SUMMARY A signal is a set of data or information. A system processes input signals to modify them or extract additional information from them to produce output signals (response). A system may be made up of physical components (hardware realization), or it may be an algorithm that computes an output signal from an input signal (software realization). A convenient measure of the size of a signal is its energy, if it is finite. If the signal energy is infinite, the appropriate measure is its power, if it exists. The signal power is the time average of its energy (averaged over the entire time interval from − ∞ to ∞). For periodic signals the time averaging need be performed only over one period in view of the periodic repetition of the signal. Signal power is also equal to the mean squared value of the signal (averaged over the entire time interval from t = − ∞ to ∞). Signals can be classified in several ways. 1. A continuous-time signal is specified for a continuum of values of the independent variable (such as time t). A discretetime signal is specified only at a finite or a countable set of time instants. 2. An analog signal is a signal whose amplitude can take on any value over a continuum. On the other hand, a signal whose amplitudes can take on only a finite number of values is a digital signal. The terms discrete-time and continuous-time qualify the nature of a signal along the time axis (horizontal axis). The terms analog and digital, on the other hand, qualify the nature of the signal amplitude (vertical axis). 3. A periodic signal x(t) is defined by the fact that x(t) = x(t + T0 ) for some T0 . The smallest value of T0 for which this relationship is satisfied is called the fundamental period. A periodic signal remains unchanged when shifted by an integer multiple of its period. A periodic signal x (t) can be generated by a periodic extension of any contiguous segment of x(t) of duration T0 . Finally, a periodic signal, by definition, must exist over the entire time interval − ∞ < t < ∞. A signal is aperiodic if it is not periodic. An everlasting signal starts at t = − ∞ and continues forever to t = ∞. Hence, periodic signals are everlasting signals. A causal signal is a signal that is zero for t < 0. 4. A signal with finite energy is an energy signal. Similarly a signal with a finite and nonzero power (mean square value) is a power signal. A signal can be either an energy signal or a power signal, but not both. However, there are signals that are neither energy nor power signals. 5. A signal whose physical description is known completely in a mathematical or graphical form is a deterministic signal. A

random signal is known only in terms of its probabilistic description such as mean value or mean-square value, rather than by its mathematical or graphical form. A signal x(t) delayed by T seconds (right-shifted) can be expressed as x(t − T); on the other hand, x(t) advanced by T (left-shifted) is x(t + T). A signal x(t) time-compressed by a factor a (a > 1) is expressed as x(at); on the other hand, the same signal time-expanded by factor a (a > 1) is x(t/a). The signal x(t) when time reversed can be expressed as x(− t). The unit step function u(t) is very useful in representing causal signals and signals with different mathematical descriptions over different intervals. In the classical (Dirac) definition, the unit impulse function δ(t) is characterized by unit area and is concentrated at a single instant t = 0. The impulse function has a sampling (or sifting) property, which states that the area under the product of a function with a unit impulse is equal to the value of that function at the instant at which the impulse is located (assuming the function to be continuous at the impulse location). In the modern approach, the impulse function is viewed as a generalized function and is defined by the sampling property. The exponential function e ST , where s is complex, encompasses a large class of signals that includes a constant, a monotonic exponential, a sinusoid, and an exponentially varying sinusoid. A real signal that is symmetrical about the vertical axis (t = 0) is an even function of time, and a real signal that is antisymmetrical about the vertical axis is an odd function of time. The product of an even function and an odd function is an odd function. However, the product of an even function and an even function or an odd function and an odd function is an even function. The area under an odd function from t = −a to a is always zero regardless of the value of a. On the other hand, the area under an even function from t = −a to a is two times the area under the same function from t = 0 to a (or from t = −a to 0). Every signal can be expressed as a sum of odd and even function of time. A system processes input signals to produce output signals (response). The input is the cause, and the output is its effect. In general, the output is affected by two causes: the internal conditions of the system (such as the initial conditions) and the external input. Systems can be classified in several ways. 1. Linear systems are characterized by the linearity property, which implies superposition; if several causes (such as various inputs and initial conditions) are acting on a linear system, the total output (response) is the sum of the responses from each cause, assuming that all the remaining causes are absent. A system is nonlinear if superposition does not hold. 2. In time-invariant systems, system parameters do not change with time. The parameters of time-varying-parameter systems change with time. 3. For memoryless (or instantaneous) systems, the system response at any instant t depends only on the value of the input at t. For systems with memory (also known as dynamic systems), the system response at any instant t depends not only on the present value of the input, but also on the past values of the input (values before t). 4. In contrast, if a system response at t also depends on the future values of the input (values of input beyond t), the system is noncausal. In causal systems, the response does not depend on the future values of the input. Because of the dependence of the response on the future values of input, the effect (response) of noncausal systems occurs before the cause. When the independent variable is time (temporal systems), the noncausal systems are prophetic systems, and therefore, unrealizable, although close approximation is possible with some time delay in the response. Noncausal systems with independent variables other than time (e.g., space) are realizable. 5. Systems whose inputs and outputs are continuous-time signals are continuous-time systems; systems whose inputs and outputs are discrete-time signals are discrete-time systems. If a continuous-time signal is sampled, the resulting signal is a discrete-time signal. We can process a continuous-time signal by processing the samples of the signal with a discrete-time system. 6. Systems whose inputs and outputs are analog signals are analog systems; those whose inputs and outputs are digital signals are digital systems. 7. If we can obtain the input x(t) back from the output y(t) of a system S by some operation, the system S is said to be invertible. Otherwise the system is noninvertible. 8. A system is stable if bounded input produces bounded output. This defines the external stability because it can be ascertained from measurements at the external terminals of the system. The external stability is also known as the stability in the BIBO (bounded-input/bounded-output) sense. The internal stability, discussed later in Chapter 2, is measured in terms of the internal behavior of the system. The system model derived from a knowledge of the internal structure of the system is its internal description. In contrast, an external description is a representation of a system as seen from its input and output terminals; it can be obtained by applying a known input and measuring the resulting output. In the majority of practical systems, an external description of a system so obtained is equivalent to

its internal description. At times, however, the external description fails to describe the system adequately. Such is the case with the socalled uncontrollable or unobservable systems. A system may also be described in terms of certain set of key variables called state variables. In this description, an Nth-order system can be characterized by a set of N simultaneous first-order differential equations in N state variables. State equations of a system represent an internal description of that system.

REFERENCES 1. Papoulis, A. The Fourier Integral and Its Applications. McGraw-Hill, New York, 1962. 2. Mason, S. J. Electronic Circuits, Signals, and Systems. Wiley, New York, 1960. 3. Kailath, T. Linear Systems. Prentice-Hall, Englewood Cliffs, NJ, 1980. 4. Lathi, B. P. Signals and Systems. Berkeley-Cambridge Press, Carmichael, CA, 1987.

MATLAB SESSION 1: WORKING WITH FUNCTIONS Working with functions is fundamental to signals and systems applications. MATLAB provides several methods of defining and evaluating functions. An understanding and proficient use of these methods is therefore necessary and beneficial.

M1.1 Inline Functions Many simple functions are most conveniently represented by using MATLAB inline objects. An inline object provides a symbolic representation of a function defined in terms of MATLAB operators and functions. For example, consider defining the exponentially damped sinusoid f(t) = e −t cos(2πt).

>> f = inline('exp(-t).*cos(2*pi*t)','t') f = Inline function: f(t) = exp(-t).*cos(2*pi*t) The second argument to the inline command identifies the function's input argument as t. Input arguments, such as t, are local to the inline object and are not related to any workspace variables with the same names. Once defined, f(t) can be evaluated simply by passing the input values of interest. For example, >> t = 0; >> f(t) ans = 1 evaluates f(t) at t = 0, confirming the expected result of unity. The same result is obtained by passing t = 0 directly. >> f(0) ans = 1 Vector inputs allow the evaluation of multiple values simultaneously. Consider the task of plotting f(t) over the interval (−2 ≤ t ≤ 2). Gross function behavior is clear: f(t) should oscillate four times with a decaying envelope. Since accurate hand sketches are cumbersome, MATLAB-generated plots are an attractive alternative. As the following example illustrates, care must be taken to ensure reliable results. Suppose vector t is chosen to include only the integers contained in (−2 ≤ t ≤ 2), namely [−2, −1, 0, 1, 2]. >> t = (-2:2); This vector input is evaluated to form a vector output. >> f(t) ans = 7.3891 2.7183 1.0000 0.3679 0.1353 The plot command graphs the result, which is shown in Fig. M1.1. >> plot(t,f(t)); >> xlabel('t'); ylable('f(t)'); grid;

Figure M1.1: f(t) = e −t cos (2πt) for t = (-2:2). Grid lines, added by using the grid command, aid feature identification. Unfortunately, the plot does not illustrate the expected oscillatory behavior. More points are required to adequately represent f(t). The question, then, is how many points is enough? [†] If too few points are chosen, information is lost. If too many points are chosen, memory and time are wasted. A balance is needed. For oscillatory functions, plotting 20 to 200 points per oscillation is normally adequate. For the present case, t is chosen to give 100 points per oscillation. >> t = (-2:0.01:2); Again, the function is evaluated and plotted. >> plot (t,f(t)); >> xlabel('t'); ylabel('f(t)'); grid; The result, shown in Fig. M1.2, is an accurate depiction of f(t).

Figure M1.2: f(t) = e −t cos(2πt) for t = (-2:0.01:2).

M1.2 Relational Operators and the Unit Step Function The unit step function u(t) arises naturally in many practical situations. For example, a unit step can model the act of turning on a system. With the help of relational operators, inline objects can represent the unit step function. In MATLAB, a relational operator compares two items. If the comparison is true, a logical true (1) is returned. If the comparison is false, a logical false (0) is returned. Sometimes called indicator functions, relational operators indicates whether a condition is true. Six relational operators are available: , =, ==, and ~=.

The unit step function is readily defined using the >= relational operator. >> u = inline('(t>=0)','t') u = Inline function: u(t) = (t>=0) Any function with a jump discontinuity, such as the unit step, is difficult to plot. Consider plotting u(t) by using t = (−2:2). >> t = (-2:2); >> plot (t,u(t)); >> xlable('t'); ylabel('u(t)'); Two significant problems are apparent in the resulting plot, shown in Fig. M1.3. First, MATLAB automatically scales plot axes to tightly bound the data. In this case, this normally desirable feature obscures most of the plot. Second, MATLAB connects plot data with lines, making a true jump discontinuity difficult to achieve. The coarse resolution of vector t emphasizes the effect by showing an erroneous sloping line between t = − 1 and t − 0.

Figure M1.3: u(t) for t = (−2:2). The first problem is corrected by vertically enlarging the bounding box with the axis command. The second problem is reduced, but not eliminated, by adding points to vector t. >> t = (-2:0.01:2); >> plot (t,u(t)); >> xlable('t'); ylabel('u(t)'); >> axis ([-2 2 -0.1 1.1]); The four-element vector argument of axis specifies x-axis minimum, x-axis maximum, y-axis minimum, and y-axis maximum, respectively. The improved results are shown in Fig. M1.4.

Figure M1.4: u(t) for t = (−2:0.01:2) with axis modification. Relational operators can be combined using logical AND, logical OR, and logical negation: &, |, and ~, respectively. For example, (t>0)&(t> >> >> >>

p = inline('(t>=0) & (t> g = inline('exp(-t).*cos(2*pi*t).*(t>=0)','t') g = Inline function: g(t) = exp(-t).*cos(2*pi*t).*(t>=0) A combined shifting and scaling operation is represented by g(at + b), where a and b are arbitrary real constants. As an example, consider plotting g(2t + 1) over (−2 ≤ t ≤ 2). With a = 2, the function is compressed by a factor of 2, resulting in twice the oscillations per unit t. Adding the condition b > 0, the waveform shifts to the left. Given inline function g, an accurate plot is nearly trivial to obtain. >> t = (-2:0.01:2); >> plot(t,g(2*t+1)); xlabel('t'); ylabel('g(2t+1)')'; grid; Figure M1.6 confirms the expected waveform compression and left shift. As a final check, realize that function g(·) turns on when the input argument is zero. Therefore, g(2t + 1) should turn on when 2t + 1 = 0 or at t = −0.5, a fact again confirmed by Fig. M1.6.

Figure M1.6: g(2t + 1) over (−2 ≤ t ≤ 2). Next, consider plotting g(−t + 1) over (−2 ≤ t ≤ 2). Since a < 0, the waveform will be reflected. Adding the condition b > 0, the final waveform shifts to the right >> plot(t,g(-t+1)); xlabel('t'); ylabel('g(-t+1)')'; grid; Figure M1.7 confirms both the reflection and the right shift.

Figure M1.7: g(−t + 1) over (−2 ≤ t ≤ 2). Up to this point, Figs. M1.6 and M1.7 could be reasonably sketched by hand. Consider plotting the more complicated function h(t) = g(2t + 1) + g(−t + 1) over (−2 ≤ t ≤ 2) (Fig. M1.8). In this case, an accurate hand sketch is quite difficult. With MATLAB, the work is much less burdensome. >> plot(t,g(2*t+1) +g(-t+1)); xlabel('t'); ylabel('h(t)')'; grid;

Figure M1.8: h(t) = g(2t + 1) + g(−t + 1) over (−2 ≤ t ≤ 2).

M1.4 Numerical Integration and Estimating Signal Energy Interesting signals often have nontrivial mathematical representations. Computing signal energy, which involves integrating the square of these expressions, can be a daunting task. Fortunately, many difficult integrals can be accurately estimated by means of numerical integration techniques. Even if the integration appears simple, numerical integration provides a good way to verify analytical results. To start, consider the simple signal x(t) = e −t (u(t) − u(t − 1)). The energy of x(t) is expressed as Ex = ∫ ∞−∞ |x(t)| 2 dt = ∫ 1 0 e −2t dt. Integrating yields Ex = 0.5(1 − e −2 ) ≈ 0.4323. The energy integral can also be evaluated numerically. Figure 1.27 helps illustrate the simple method of rectangular approximation: evaluate the integrand at points uniformly separated by Δt, multiply each by Δt to compute rectangle areas, and then sum over all rectangles. First, we create function x(t). >> x = inline('exp(-t).*((t>=0)&(t=0)&(t>1))','t'); Estimating Ex immediately follows. >> E_x = quad(x_squared,0,1) E_x = 0.4323 In this case, the relative error is -0.0026%. The same techniques can be used to estimate the energy of more complex signals. Consider g(t), defined previously. Energy is

expressed as Eg = ∫ ∞0 e −2t cos 2 (2πt) dt. A closed-form solution exists, but it takes some effort. MATLAB provides an answer more quickly. >> g_squared = inline('exp(-2*t).*(cos(2*pi*t).*^2).*(t>=0)','t');

Although the upper limit of integration is infinity, the exponentially decaying envelope ensures g(t) is effectively zero well before t = 100. Thus, an upper limit of t = 100 is used along with Δt = 0.001. >> t = (0:0.001:100); >> E_g = sum(g_squared(t)*0.001) E g = 0.2567 A slightly better approximation is obtained with the quad function. >> E_g = quad(g_squared, 0,100) E_g = 0.2562 As an exercise, confirm that the energy of signal h(t), defined previously, is Eh = 0.3768. [†] Sampling theory, presented later, formally addresses important aspects of this question. [†] The function f(t) = e −t cos(2πt) can never be realized in practice; it has infinite duration and, as t → −∞, infinite magnitude. [†] A comprehensive treatment of numerical integration is outside the scope of this text. Details of this particular method are not

important for the current discussion; it is sufficient to say that it is better than the rectangular approximation.

PROBLEMS 1.1.1

1.1.2

1.1.3

Find the energies of the signals illustrated in Fig. P1.1-1. Comment on the effect on energy of sign change, time shifting, or doubling of the signal. What is the effect on the energy if the signal is multiplied by k?

Figure P1.1-1 Repeat Prob. 1.1-1 for the signals in Fig. P1.1-2.

Figure P1.1-2 a. Find the energies of the pair of signals x(t) and y(t) depicted in Fig. P1.1-3a and P1.1-3b. Sketch and find the energies of signals x(t) + y(t) and x(t) − y(t).

Figure P1.1-3 Can you make any observation from these results?

1.1.4

b. Repeat part (a) for the signal pair illustrated in Fig. P1.1-3c. Is your observation in part (a) still valid? Find the power of the periodic signal x(t) shown in Fig. P1.1-4. Find also the powers and the rms values of: a. −x(t) b. 2x(t) c. cx(t).

Figure P1.1-4

1.1.5

Comment. Determine the power and the rms value for each of the following signals: a. 5 + 10 cos(100t + π/3) b. 10 cos(100t + π/3) + 16sin(150t + π/5) c. (10 + 2sin 3t)cos 10t d. 10 cos5t cos 10t e. 10 sin 5t cos 10t

1.1.6

f. e j αt cos ω0 t Figure P1.1-6 shows a periodic 50% duty cycle dc-offset sawtooth wave x(t) with peak amplitude A. Determine the energy and power of x(t).

1.1.7

Figure P1.1-6: 50% duty cycle dc-offset sawtooth wave x(t). a. There are many useful properties related to signal energy. Prove each of the following statements. In each case, let energy signal x 1 (t) have energy E|x 2 (t)], let energy signal x 2 (t) have energy E[x 2 (t)], and let T be a nonzero, finite, real-valued constant. i. Prove E[Tx1 (t)] = T2 E[x1 (t)]. That is, amplitude scaling a signal by constant T scales the signal energy by T2 .

ii. Prove E[x1 (t)] = E[x1 (t − T)]. That is, shifting a signal does not affect its energy. iii. If (x 1 (t) ≠ 0) ⇒ x 2 (t) = 0) and (x 2 (t) ≠ 0) ⇒ (x 1 (t) = 0), then prove E[x1 (t) + x 2 (t)] = E[x1 (t)] + E[x2 (t)]. That is, the energy of the sum of two nonoverlapping signals is the sum of the two individual energies. iv. Prove E[x1 (Tt)] = (1/|T|)E[x1 (t)]. That is, time-scaling a signal by T reciprocally scales the signal energy by 1/|7|. b. Consider the signal x(t) shown in Fig. P1.1-7. Outside the interval shown, x(t) is zero. Determine the signal energy E[x(t)].

1.1.8

Figure P1.1-7: Energy signal x(t). a. Show that the power of a signal

assuming all frequencies to be distinct, that is, ωi ≠ ωk for all i ≠ k.

1.1.9

b. Using the result in part (a) determine the power of each of the signals in Prob. 1.1-5. A binary signal x(t) = 0 for t < 0. For positive time, x(t) toggles between one and zero as follows: one for 1 second, zero for 1 second, one for 1 second, zero for 2 seconds, one for 1 second, zero for 3 seconds, and so forth. That is, the "on" time is always one second but the "off" time successively increases by one second between each toggle. A portion of x(t) is shown in Fig. P1.1-9. Determine the energy and power of x(t).

Figure P1.1-9: Binary signal x(t). 1.2.1

For the signal x(t) depicted in Fig. P1.2-1, sketch the signals

a. x(− t) b. x(t + 6) c. x(3t) d. x(t/2)

1.2.2

Figure P1.2-1 For the signal x(t) illustrated in Fig. P1.2-2, sketch a. x(t−4) b. x(t/1.5) c. x(−t) d. x(2t − 4) e. x(2 − t)

1.2.3

1.2.4

1.2.5

Figure P1.2-2 In Fig. P1.2-3, express signals x 1 (t), x 3 (t) x 3 (t), x 4 (t), and x 5 (t) in terms of signal x(t) and its time-shifted, time-scaled, or time-reversed versions.

Figure P1.2-3 For an energy signal x(t) with energy Ex , show that the energy of any one of the signals −x(t), x(− t), and x(t − T) is Ex .

Show also that the energy of x(at) as well as x(at − b) is Ex /a, but the energy of ax(t) is a 2 Ex . This shows that time inversion and time shifting do not affect signal energy. On the other hand, time compression of a signal (a > 1) reduces the energy, and time expansion of a signal (a < 1) increases the energy. What is the effect on signal energy if the signal is multiplied by a constant a? Define 2x(−3t+1) = t(u(−t−1)−u(−t+1)), where u(t) is the unit step function. a. Plot 2x(−3t + 1) over a suitable range of t.

1.2.6

b. Plot x(t) over a suitable range of t. Consider the signal x(t) = 2 −tu(t) where u(t) is the unit step function.

a. Accurately sketch x(t) over (−1 ≤ t ≤ 1). b. Accurately sketch y(t) = 0.5x(1 − 2t) over (−1 ≤ t ≤ 1). 1.3.1

Determine whether each of the following statements is true or false. If the statement is false, demonstrate this by proof or example. a. Every continuous-time signal is analog signal. b. Every discrete-time signal is digital signal. c. If a signal is not an energy signal, then it must be a power signal and vice versa. d. An energy signal must be of finite duration. e. A power signal cannot be causal.

1.3.2

f. A periodic signal cannot be anticausal. Determine whether each of the following statements is true or false. If the statement is false, demonstrate by proof or example why the statement is false. a. Every bounded periodic signal is a power signal. b. Every bounded power signal is a periodic signal. c. If an energy signal x(t) has energy E, then the energy of x(at) is E/a. Assume a is real and positive.

1.3.3

d. If a power signal x(t) has power P, then the power of x(at) is P/a. Assume a is real and positive. Given x 1 (t) = cos(t), x 2 (t) = sin(πt), and x 3 (t) = x 1 (t) + x 2 (t). a. Determine the fundamental periods T1 and T2 of signals x 1 (t) and x 2 (t). b. Show that x 3 (t) is not periodic, which requires T3 = k 1 T1 = k 2 T2 for some integers k 1 and k 2 .

c. Determine the powers Px1 , Px2 , and Px3 of signals x 1 (t), x 2 (t), and x 3 (t).

1.3.4

For any constant ω, is the function f(t) = sin (ωt) a periodic function of the independent variable t? Justify your answer.

1.3.5

The signal shown in Fig. P1.3-5 is defined as

Figure P1.3-5: Energy signal x(t). The energy of x(t) is E ≈ 1.0417. a. What is the energy of y 1 (t) = (⅓)x(2t)?

b. A periodic signal y 2 (t) is defined as

What is the power of y 2 (t)?

1.3.6

c. What is the power of y 3 (t) = (⅓)y 2 (2t)? Let y 1 (t) = y 2 (t) = t2 over 0 ≤ t ≤ 1. Notice, this statement does not require y 1 (t) = y 2 (t) for all t. a. Define y 1 (t) as an even, periodic signal with period T1 = 2. Sketch y 1 (t) and determine its power. b. Design an odd, periodic signal y 2 (t) with period T2 = 3 and power equal to unity. Fully describe y 2 (t) and sketch the signal over at least one full period. [Hint: There are an infinite number of possible solutions to this problem-you need to find only one of them!] c. We can create a complex-valued function y 3 (t) = y 1 (t) + jy 2 (t). Determine whether this signal is periodic. If yes, determine the period T3 . If no, justify why the signal is not periodic. d. Determine the power of y 3 (t) defined in part (c). The power of a complex-valued function z(t) is

1.4.1

Sketch the following signal: a. u(t − 5) − u(t − 7) b. u(t − 5) − u(t − 7) c. t2 [u(t − 1) − u(t − 2)]

1.4.2

1.4.3

d. (t − 4)[u(t − 2) − u(t − 4)] Express each of the signals in Fig. P1.4-2 by a single expression valid for all t.

Figure P1.4-2 Simplify the following expressions:

a.

b. c. [e −t cos(3t − 60°)]δ(t)

d.

e.

f.

1.4.4

[Hint: Use Eq. (1.23). For part (f) use L'Hôpital's rule.] Evaluate the following integrals: a. ∫ ∞−∞ δ(τ)x(t−τ)dτ b. ∫ ∞−∞ x(τ)δ(t−τ)dτ c. ∫ ∞−∞ δ(t)e −jωt dt d. ∫ ∞−∞ δ(2t−3)πtdt e. ∫ ∞−∞ δ (t + 3)ee −1 dt f. ∫ ∞−∞ (t 3 +4) δ (1−t) dt g. ∫ ∞−∞ x (2−t)δ (3−t)dt

h.

1.4.5

1.4.6

a. Find and sketch dx/dt for the signal x(t) shown in Fig. P1.2-2. b. Find and sketch d 2 x/dt2 for the signal x(t) depicted in Fig. P1.4-2a. Find and sketch ∫ t −∞ x(t) dt for the signal x(t) illustrated in Fig. P1.4-6.

Figure P1.4-6

1.4.7

Using the generalized function definition of impulse [Eq. (1.24a)], show that δ(t) is an even function of t.

1.4.8

Using the generalized function definition of impulse [Eq. (1.24a)], show that

1.4.9

1.4.10

Show that

where φ(t) and are continuous at t = 0, and φ(t) → 0 as t → ±∞. This integral defines function. [Hint: Use integration by parts.]

A sinusoid e σt cos ωt can be expressed as a sum of exponentials e st and e st [Eq. (1.30c)] with complex frequencies s = σ + jω and s = σ − jω. Locate in the complex plane the frequencies of the following sinusoids: a. cos 3t b. e −3t cos 3t c. e 2t cos 3t d. e −2t e. e 2t f. 5

1.5.1

as a generalized

Find and sketch the odd and the even components of the following: a. u(t) b. tu(t) c. sin ω0 t d. cos ω0 t e. cos (ω0 t + θ) f. sin ω0 tu(t) g. cos ω0 tu(t)

1.5.2

a. Determine even and odd components of the signal x(t) = e −2t u(t). b. Show that the energy of x(t) is the sum of energies of its odd and even components found in part (a).

1.5.3

c. Generalize the result in part (b) for any finite energy signal. a. If x e (t) and x 0 (t) are even and the odd components of a real signal x(t), then show that

b. Show that

1.5.4

1.5.5

1.5.6

An aperiodic signal is defined as x(t) = sin (πt)u(t), where u(t) is the continuous-time step function. Is the odd portion of this signal, x 0 (t), periodic? Justify your answer. An aperiodic signal is defined as x(t) = cos (πt)u(t), where u(t) is the continuous-time step function. Is the even portion of this signal, x e (t), periodic? Justify your answer. Consider the signal x(t) shown in Fig. P1.5-6. a. Determine and carefully sketch v(t) = 3x(-(1/2)(t + 1). b. Determine the energy and power of v(t). c. Determine and carefully sketch the ever portion of v(t), v e (t). d. Let a = 2 and b = 3, sketch v(at + b), v(at) + b, av(t + b), and av(t) + b. e. Let a = −3 and b = −2, sketch v(at + b), v(at) + b, av(t + b), and av(t) + b.

1.5.7

Figure P1.5-6: Input x(t). Consider the signal y(t) = ( )x(−2t − 3) shown in Figure P1.5-7. a. Does y(t) have an odd portion, y 0 (t)? If so, determine and carefully sketch y 0 (t). Otherwise, explain why no odd portion exists. b. Determine and carefully sketch the original signal x(t).

1.5.8

Figure P1.5-7: y(t) =

x(−2t − 3).

Consider the signal -(1/2)x(−3t + 2) show in Fig. P1.5-8. a. Determine and carefully sketch the original signal x(t). b. Determine and carefully sketch the even portion of the original signal x(t).

c. Determine and carefully sketch the odd portion of the original signal x(t).

1.5.9

1.5.10

1.5.11

Figure P1.5-8: -1/2x(−3t + 2). The conjugate symmetric (or Hermitian) portion of a signal is defined as w cs(t) = (w(t) + w*(−t))/2. Show that the real portion of w cs(t) is even and that the imaginary portion of w cs(t) is odd. The conjugate antisymmetric (or skew-Hermitian) portion of a signal is defined as w cs(t) = (w(t) + w*(−t))/2. Show that the real portion of w ca(t) is even and that the imaginary portion of w cs(t) is even. Figure P1.5-11 plots a complex signal w(t) in the complex plane over the time range (0 ≤ t ≤ 1). The time t = 0 corresponds with the origin, while the time t = 1 corresponds with the point (2,1). a. In the complex plane, plot w(t) over (−1 ≤ t ≤ 1) if: i. w(t) is an even signal. ii. w(t) is an odd signal. iii. w(t) is a conjugate symmetric signal. [Hint: See Prob. 1.5-9.] iv. w(t) is a conjugate antisymmetric signal. [Hint: See Prob. 1.5-10.] b. In the complex plane, plot as much of w(3t) as possible.

1.5.12

Figure P1.5-11: w(t) for (0 ≤ t ≤ 1). Define complex signal x(t) = t 2 (1 + j) over interval (1 ≤ t ≤ 2). The remaining portion is defined such that x(t) is a minimum-energy, skew-Hermitian signal. a. Fully describe x(t) for all t. b. Sketch y(t) = Re{x(t)} versus the independent variable t. c. Sketch z(t) = Re{jx(−2t + 1)} versus the independent variable t. d. Determine the energy and power of x(t).

1.6.1

1.6.2

Write the input-output relationship for an ideal integrator. Determine the zero-input and zero-state components of the response. A force x(t) acts on a ball of mass M (Fig. P1.6-2). Show that the velocity v(t) of the ball at any instant t > 0 can be determined if we know the force x(t) over the interval from 0 to t and the ball's initial velocity v(0).

Figure P1.6-2 1.7.1

For the systems described by the following equations, with the input x(t) and output y(t), determine which of the systems are linear and which are nonlinear. a.

b. c. 3 y(t) +2 = x(t) d.

e.

f.

g.

1.7.2

h. y(t) = ∫ t −∞ x (τ) d τ For the systems described by the following equations, with the input x(t) and output y(t), explain with reasons which of the systems are time-invariant parameter systems and which are time-varying-parameter systems. a. y(t) = x(t − 2) b. y(t) = x(−t) c. y(t) = x(at) d. y(t) = tx(t−2) e. y(t) = ∞ 5 −5 x(τ)dτ

f.

1.7.3

For a certain LTI system with the input x(t), the output y(t) and the two initial conditions q 1 (0) and q 2 (0), following observations were made: Open table as spreadsheet x(t)

q1 (0)

q2 (0)

y(t)

0

1

−1

e −t u(t)

0

2

1

e −t (3t + 2)u(t)

u(t)

−1

−1

2u(t)

Determine y(t) when both the initial conditions are zero and the input x(t) is as shown in Fig. P1.7-3. [Hint: There are three causes: the input and each of the two initial conditions. Because of the linearity property, if a cause is increased by a factor k, the response to that cause also increases by the same factor k. Moreover, if causes are added, the corresponding responses add.]

1.7.4

1.7.5

1.7.6

1.7.7

Figure P1.7-3 A system is specified by its input-output relationship as

Show that the system satisfies the homogeneity property but not the additivity property. Show that the circuit in Fig. P1.7-5 is zero-state linear but not zero-input linear. Assume all diodes to have identical (matched) characteristics. The output is the current y(t).

Figure P1.7-5 The inductor L and the capacitor C in Fig. P1.7-6 are nonlinear, which makes the circuit nonlinear. The remaining three elements are linear. Show that the output y(t) of this nonlinear circuit satisfies the linearity conditions with respect to the input x(t) and the initial conditions (all the initial inductor currents and capacitor voltages).

Figure P1.7-6 For the systems described by the following equations, with the input x(t) and output y(t), determine which are causal and which are noncausal. a. y(t) = x(t − 2) b. y(t) = x(− t) c. y(t) = x(at) a > 1

1.7.8

d. y(t) = x(at) a < 1 For the systems described by the following equations, with the input x(t) and output y(t), determine which are invertible and which are noninvertible. For the invertible systems, find the input-output relationship of the inverse system.

a. y(t) = ∫ t −∞ x (τ) d τ b. y(t) = x n (t) x(t) real and n integer c. d. y(t) = x (3t−6) e. y(t) = cos [x(t)]

1.7.9

f. y(t)= e x(t) x(t) real Consider a system that multiplies a given input by a ramp function, r(t) = tu(t). That is, y(t) = x(t)r(t). a. Is the system linear? Justify your answer. b. Is the system memoryless? Justify your answer. c. Is the system causal? Justify your answer.

1.7.10

d. Is the system time invariant? Justify your answer. A continuous-time system is given by

Recall that δ(t) designates the Dirac delta function. a. Explain what this system does. b. Is the system BIBO stable? Justify your answer. c. Is the system linear? Justify your answer. d. Is the system memoryless? Justify your answer. e. Is the system causal? Justify your answer.

1.7.11

f. Is the system time invariant? Justify your answer. A system is given by

a. Is the system BIBO stable? [Hint: Let system input x(t) be a square wave.] b. Is the system linear? Justify your answer. c. Is the system memoryless? Justify your answer. d. Is the system causal? Justify your answer.

1.7.12

e. Is the system time invariant? Justify your answer. A system is given by

a. Is the system BIBO stable? Justify your answer. b. Is the system linear? Justify your answer. c. Is the system memoryless? Justify your answer. d. Is the system causal? Justify your answer.

1.7.13

e. Is the system time invariant? Justify your answer. Figure P1.7-13 displays an input x 1 (t) to a linear time-invariant (LTI) system H, the corresponding output y 1 (t), and a

second input x 2 (t). a. Bill suggests that x 2 (t) = 2x 1 (3t) − x 1 (t − 1). Is Bill correct? If yes, prove it. If not, correct his error. b. Hoping to impress Bill, Sue wants to know the output y 2 (t) in response to the input x 2 (t). Provide her with an expression for y 2 (t) in terms of y 1 (t). Use MATLAB to plot y 2 (t).

Figure P1.7-13: 1.8.1

1.8.2

1.8.3

1.8.4

and x 2 (t).

For the circuit depicted in Fig. P1.8-1, find the differential equations relating outputs y 1 (t) and y 2 (t) to the input x(t).

Figure P1.8-1 Repeat Prob. 1.8-1 for the circuit in Fig. P1.8-2.

Figure P1.8-2 A simplified (one-dimensional) model of an automobile suspension system is shown in Fig. P1.8-3. In this case, the input is not a force but a displacement x(t) (the road contour). Find the differential equation relating the output y(t) (auto body displacement) to the input x(t) (the road contour).

Figure P1.8-3 A field-controlled dc motor is shown in Fig. P1.8-4. Its armature current ia is maintained constant. The torque generated by this motor is proportional to the field current ij (torque = Kf if ). Find the differential equation relating the output position θ to the input voltage x(t). The motor and load together have a moment of inertia J.

1.8.5

1.8.6

Figure P1.8-4 Water flows into a tank at a rate of q i units/s and flows out through the outflow valve at a rate of q 0 units/s (Fig. P1.8-5). Determine the equation relating the outflow q 0 to the input q i . The outflow rate is proportional to the head h. Thus q 0 = Rh, where R is the valve resistance. Determine also the differential equation relating the head h to the input q i . [Hint: The net inflow of water in time Δt is (q i − q 0 )Δt. This inflow is also AΔh where A is the cross section of the tank.]

Figure P1.8-5 Consider the circuit shown in Fig. P1.8-6, with input voltage x(t) and output currents y 1 (t), y 2 (t), and y 3 (t). a. What is the order of this system? Explain your answer. b. Determine the matrix representation for this system. c. Use Cramer's rule to determine the output current y 3 (t) for the input voltage x(t) = (2 − | cos(t)|)u(t − 1).

Figure P1.8-6: Resistor circuit. 1.10.1

1.10.2

Write state equations for the parallel RLC circuit in Fig. P1.8-2. Use the capacitor voltage q 1 and the inductor current q 2 as your state variables. Show that every possible current or voltage in the circuit can be expressed in terms of q 1 , q 2 and the input x(t) Write state equations for the third-order circuit shown in Fig. P1.10-2, using the inductor currents q 1 , q 2 and the capacitor voltage q 3 as state variables. Show that every possible voltage or current in this circuit can be expressed as a linear combination of q 1 , q 2 , q 3 , and the input x(t). Also, at some instant t it was found that q 1 = 5, q 2 = 1, q 3 = 2, and x = 10. Determine the voltage across and the current through every element in this circuit.

Figure P1.10-2

Chapter 2: Time-Domain Analysis of Continuous-Time Systems In this book we consider two methods of analysis of linear time-invariant (LTI) systems: the time-domain method and the frequency-domain method. In this chapter we discuss the time-domain analysis of linear, time-invariant, continuous-time (LTIC) systems.

2.1 INTRODUCTION For the purpose of analysis, we shall consider linear differential systems. This is the class of LTIC systems introduced in Chapter 1, for which the input x(t) and the output y(t) are related by linear differential equations of the form

where all the coefficients a i and b i are constants. Using operational notation D to represent d/dt, we can express this equation as

or

where the polynomials Q(D) and P(D) are

Theoretically the powers M and N in the foregoing equations can take on any value. However, practical considerations make M > N undesirable for two reasons. In Section 4.3-2, we shall show that an LTIC system specified by Eq. (2.1) acts as an (M − N)th-order differentiator. A differentiator represents an unstable system because a bounded input like the step input results in an unbounded output, δ (t). Second, the noise is enhanced by a differentiator. Noise is a wideband signal containing components of all frequencies from 0 to a very high frequency approaching

∞ [†] . Hence, noise contains a significant amount of rapidly varying components. We know that the derivative of any rapidly varying signal is high. Therefore, any system specified by Eq. (2.1) in which M > N will magnify the high-frequency components of noise through differentiation. It is entirely possible for noise to be magnified so much that it swamps the desired system output even if the noise signal at the system's input is tolerably small. Hence, practical systems generally use M ≤ N. For the rest of this text we assume implicitly that M ≤ N. For the sake of generality, we shall assume M = N in Eq. (2.1). In Chapter 1, we demonstrated that a system described by Eq. (2.1) is linear. Therefore, its response can be expressed as the sum of two

components: the zero-input component and the zero-state component (decomposition property).[‡] Therefore,

The zero-input component is the system response when the input x(t) = 0, and thus it is the result of internal system conditions (such as energy storages, initial conditions) alone. It is independent of the external input x(t). In contrast, the zero-state component is the system response to the external input x(t) when the system is in zero state, meaning the absence of all internal energy storages: that is, all initial conditions are zero. [†] Noise is any undesirable signal, natural or man-made, that interferes with the desired signals in the system. Some of the sources of noise are the electromagnetic radiation from stars, the random motion of electrons in system components, interference from nearby radio and television stations, transients produced by automobile ignition systems, and fluorescent lighting. [‡] We can verify readily that the system described by Eq. (2.1) has the decomposition property. If y (t) is the zero-input response, then, by definition, 0

If y(t) is the zero-state response, then y(t) is the solution of subject to zero initial conditions (zero-state). Adding these two equations, we have Clearly, y 0 (t)+y(t) is the general solution of Eq. (2.1).

2.2 SYSTEM RESPONSE TO INTERNAL CONDITIONS: THE ZERO-INPUT RESPONSE The zero-input response y 0 (t) is the solution of Eq. (2.1) when the input x(t) = 0 so that

or

A solution to this equation can be obtained systematically. [1] However, we will take a shortcut by using heuristic reasoning. Equation (2.4b) shows that a linear combination of y 0 (t) and its N successive derivatives is zero, not at some values of t, but for all t. Such a result is possible if and only if y 0 (t) and all its N successive derivatives are of the same form. Otherwise their sum can never add to zero for all values of t. We know that only an exponential function e λt has this property. So let us assume that

is a solution to Eq. (2.4b). Then

Substituting these results in Eq. (2.4b), we obtain For a nontrivial solution of this equation,

This result means that ceλt is indeed a solution of Eq. (2.4), provided λ satisfies Eq. (2.5a). Note that the polynomial in Eq. (2.5a) is identical to the polynomial Q(D) in Eq. (2.4), with λ replacing D. Therefore, Eq. (2.5a) can be expressed as

When Q (λ) is expressed in factorized form, Eq. (2.5b) can be represented as

Clearly, λ has N solutions: λ1 , λ2 ,..., λN, assuming that all λi , are distinct. Consequently, Eq. (2.4) has N possible solutions: c 1 e λ 1 t , c 2 e ? 2 t ,..., c Ne λ N t , with c 1 , c 2 ,..., c N as arbitrary constants. We can readily show that a general solution is given by the sum of these N solutions,[†]

so that

where c 1 , c 2 ,..., c N are arbitrary constants determined by N constraints (the auxiliary conditions) on the solution. Observe that the polynomial Q(λ), which is characteristic of the system, has nothing to do with the input. For this reason the polynomial Q(λ) is called the characteristic polynomial of the system. The equation

is called the characteristic equation of the system. Equation (2.5c) clearly indicates that ? 1 , ? 2 ,...,λN are the roots of the characteristic equation; consequently, they are called the characteristic roots of the system. The terms characteristic values, eigenvalues, and natural frequencies are also

used for characteristic roots. [†] The exponentials e λ it (i = 1, 2,..., n) in the zero-input response are the characteristic modes (also known as natural modes or simply as modes) of the system. There is a characteristic mode for each characteristic root of the system, and the zero-input response is a linear combination of the characteristic modes of the system. An LTIC system's characteristic modes comprise its single most important attribute. Characteristic modes not only determine the zero-input response but also play an important role in determining the zero-state response. In other words, the entire behavior of a system is dictated primarily by its characteristic modes. In the rest of this chapter we shall see the pervasive presence of characteristic modes in every aspect of system behavior. REPEATED ROOTS The solution of Eq. (2.4) as given in Eq. (2.6) assumes that the N characteristic roots ? 1 , ? 2 ,..., λN are distinct. If there are repeated roots (same root occurring more than once), the form of the solution is modified slightly. By direct substitution we can show that the solution of the equation is given by In this case the root λ repeats twice. Observe that the characteristic modes in this case are e λt and teλt . Continuing this pattern, we can show that for the differential equation

the characteristic modes are e λt , teλt , t 2 e ?t ,..., tr−1 e λt , and that the solution is

Consequently, for a system with the characteristic polynomial the characteristic modes are e λ 1 t , te? 1 t ,..., tr−1 e λ 1 t , e λ r+1 t ,..., e λ N t and the solution is COMPLEX ROOTS The procedure for handling complex roots is the same as that for real roots. For complex roots the usual procedure leads to complex characteristic modes and the complex form of solution. However, it is possible to avoid the complex form altogether by selecting a real form of solution, as described next. For a real system, complex roots must occur in pairs of conjugates if the coefficients of the characteristic polynomial Q(λ) are to be real. Therefore, if α + jβ is a characteristic root, α − jβ must also be a characteristic root. The zero-input response corresponding to this pair of complex conjugate roots is

For a real system, the response y 0 (t) must also be real. This is possible only if c 1 and c 2 are conjugates. Let

This yields

Therefore, the zero-input response corresponding to complex conjugate roots α ± jβ can be expressed in a complex form (2.10a) or a real form (2.10b). EXAMPLE 2.1 a. Find y 0 (t), the zero-input component of the response for an LTIC system described by the following differential equation: when the initial conditions are (D 2 + 3D + 2)y 0 (t) = 0.

. Note that y 0 (t), being the zero-input component (x(t) = 0), is the solution of

The characteristic polynomial of the system is λ2 + 3λ + 2. The characteristic equation of the system is therefore λ2 + 3λ + 2 = (λ + 1)

(λ + 2) = 0. The characteristic roots of the system are λ1 = −1 and λ2 = −2, and the characteristic modes of the system are e −t and e −2t . Consequently, the zero-input response is

To determine the arbitrary constants c 1 and c 2 , we differentiate Eq. (2.11a) to obtain

Setting t = 0 in Eqs. (2.11a) and (2.11b), and substituting the initial conditions y 0 (0) = 0 and

we obtain

Solving these two simultaneous equations in two unknowns for c 1 and c 2 yields Therefore This is the zero-input component of y(t). Because y 0 (t) is present at t = 0 − , we are justified in assuming that it exists for t ≥ 0.[†] b. A Similar procedure may be followed for repeated roots. For instance, for a system specified by let us determine y 0 (t), the zero-input component of the response if the initial conditions are y 0 (0) = 3 and

.

The characteristic polynomial is λ2 + 6λ + 9 = (λ + 3) 2 , and its characteristic roots are λ1 = −3, λ2 = −3 (repeated roots). Consequently, the characteristic modes of the system are e −3t and te3t . The zero-input response, being a linear combination of the characteristic modes, is given by We can find the arbitrary constants c 1 and c 2 from the initial conditions y 0 (0) = 3 and The reader can show that c 1 = 3 and c 2 = 2. Hence,

following the procedure in part (a).

c. For the case of complex roots, let us find the zero-input response of an LTIC system described by the equation with initial conditions y 0 (0) = 2 and

.

The characteristic polynomial is λ2 + 4λ + 40 = (λ + 2 − j6)(λ + 2 + j6). The characteristic roots are −2 ± j6.[†] The solution can be

written either in the complex form [Eq. (2.10a)] or in the real form [Eq. (2.10b)]. The complex form is y 0 (t) = c 1 e λ 1 t + c 2 e λ 2 t , where λ1 = −2 + j6 and λ2 = −2 − j6. Since α = −2 and β = 6, the real form solution is [see Eq. (2.10b)]

where c and θ are arbitrary constants to be determined from the initial conditions y 0 (0) = 2 and (2.12a) yields

Setting t = 0 in Eqs. (2.12a) and (2.12b), and then substituting initial conditions, we obtain

Solution of these two simultaneous equations in two unknowns c cos θ and c sin θ yields

Squaring and then adding the two sides of Eqs. (2.13) yields Next, dividing Eq. (2.13b) by Eq. (2.13a), that is, dividing c sin θ, by c cos θ, yields

and

Therefore

For the plot of y 0 (t), refer again to Fig. B.11c. COMPUTER EXAMPLE C2.1 Find the roots λ1 and λ2 of the polynomial λ2 + 4λ + k for three values of k : a. k = 3 b. k = 4 c. k = 40 >> r = roots ([1 4 3]); >> disp (['Case (k=3): roots = [',num2str(r.'),']']); Case (k=3): roots = [-3 -1] For k = 3, the polynomial roots are therefore λ1 = −3 and λ2 = −1. >> r = roots ([1 4 4]); >> disp (['Case (k=4): roots = [',num2str(r.'),']']); Case (k=4): roots = [-2 -2] For k = 4, the polynomial roots are therefore λ1 = λ2 = −2.

Differentiation of Eq.

>> r = roots ([1 4 40]); >> disp (['Case (k=40): roots = [',num2str(r.',' %0.5g'),']']); Case (k=40): roots = [-2+6i -2-6i] For k = 40, the polynomial roots are therefore λ1 = −2 + j6 and λ2 = −2 − j6. COMPUTER EXAMPLE C2.2 Consider an LTIC system specified by the differential equation Using initial conditions y 0 (0) = 3 and

, determine the zero-input component of the response for three values of k :

a. k = 3 b. k = 4 c. k = 40 >> y_0 = dsolve('D2y + 4*Dy + 3*y = 0','y(0) = 3','Dy(0) = -7','t'); >> disp(['(a) k = 3; y_0 = ',char(y_0)]) (a) k = 3; y 0 = 2*exp(-3*t) + exp(-t) For k = 3, the zero-input response is therfore y 0 (t) = 2e −3t + e −1 . >> y_0 = dsolve('D2y + 4*Dy + 4*y = 0','y(0) = 3','Dy(0) = -7','t'); >> disp(['(b) k = 4; y_0 = ',char(y_0)]) (b) k = 4; y 0 = 3*exp(-2*t) -exp(-2*t)*t For k = 4, the zero-input response is therfore y 0 (t) = 3e −2t − te−2t . >> y_0 = dsolve('D2y + 4*Dy + 40*y = 0','y(0) = 3','Dy(0) = -7','t'); >> disp(['(c) k = 40; y_0 = ',char(y_0)]) (c) k = 40; y 0 = -1/6*exp(-2*t) *sin(6*t) + 3*exp(-2*t)*cos(6*t) For k = 40, the zero-input response is therfore

EXERCISE E2.1

Find the zero-input response of an LTIC system described by (D + 5) y (t) = x(t) if the initial condition is y(0) = 5.

Answers y (t) = 5e −5t t ≥ 0 0 EXERCISE E2.2 Solve (D 2 + 2D)y 0 (t) = 0 if y 0 (0) = 1 and Answers y (t) = 3 −2e −2t t ≥ 0 0 PRACTICAL INITIAL CONDITIONS AND THE MEANING OF 0 − AND 0 + In Example 2.1 the initial conditions y 0 (0) and were supplied. In practical problems, we must derive such conditions from the physical situation. For instance, in an RLC circuit, we may be given the conditions (initial capacitor voltages, initial inductor currents, etc.). From this information, we need to derive y 0 (0)

, for the desired variable as demonstrated in the next example.

In much of our discussion, the input is assumed to start at t = 0, unless otherwise mentioned. Hence, t = 0 is the reference point. The conditions immediately before t = 0 (just before the input is applied) are the conditions at t = 0 -, and those immediately after t = 0 (just after the input is applied)

are the conditions at t = 0 + (compare this with the historical time frame B.C. and A.D.). In practice, we are likely to know the initial conditions at t =

0 − rather than at t = 0 + . The two sets of conditions are generally different, although in some cases they may be identical.

The total response y(t) consists of two components: the zero-input component y 0 (t) [response due to the initial conditions alone with x(t) = 0] and the zero-state component resulting from the input alone with all initial conditions zero. At t = 0 − , the total response y(t) consists solely of the zero-

input component y 0 (t) because the input has not started yet. Hence the initial conditions on y(t) are identical to those of y 0 (t). Thus, y(0 − ) = y 0 (0 − ), , and so on. Moreover, y 0 (t) is the response due to initial conditions alone and does not depend on the input x(t). Hence, application of the input at t = 0 does not affect y 0 (t). This means the initial conditions on y 0 (t) at t = 0 − and 0 + are identical; that is y 0 (0 -),

are identical to y 0 (0 + ), , respectively. It is clear that for y 0 (t), there is no distinction between the initial conditions at t = 0 − , 0 and 0 + . They are all the same. But this is not the case with the total response y(t), which consists of both the zero-input and the zero-state components. Thus, in general, y(0 − ) ≠ y(0 + )

, and so on.

EXAMPLE 2.2 A voltage x(t) = 10e −3t u(t) is applied at the input of the RLC circuit illustrated in Fig. 2.1a. Find the loop current y(t) for t ≥ 0 if the initial inductor current is zero; that is, y(0 − ) = 0 and the initial capacitor voltage is 5 volts; that is, υc (0 − ) = 5.

Figure 2.1 The differential (loop) equation relating y(t) to x(t) was derived in Eq. (1.55) as The zero-state component of y(t) resulting from the input x(t), assuming that all initial conditions are zero, that is, y(0 − ) = υc (0 − ) = 0, will be obtained later in Example 2.6. In this example we shall find the zero-input component y 0 (t). For this purpose, we need two initial conditions y 0 (0) and . − − These conditions can be derived from the given initial conditions, y(0 ) = 0 and υc (0 ) = 5, as follows. Recall that y 0 (t) is the loop current when the input terminals are shorted so that the input x(t) = 0 (zero-input) as depicted in Fig. 2.1b. , the values of the loop current and its derivative at t = 0, from the initial values of the inductor current and the We now compute y 0 (0) and capacitor voltage. Remember that the inductor current cannot change instantaneously in the absence of an impulsive voltage. Similarly, the capacitor voltage cannot change instantaneously in the absence of an impulsive current. Therefore, when the input terminals are shorted at t = 0, the inductor current is still zero and the capacitor voltage is still 5 volts. Thus, To determine , we use the loop equation for the circuit in Fig. 2.1b. Because the voltage across the inductor is L(dy0 /dt) or can be written as follows: Setting t = 0, we obtain But y 0 (0) = 0 and v c (0) = 5. Consequently, Therefore, the desired initial conditions are

, this equation

Thus, the problem reduces to finding y 0 (t), the zero-input component of y(t) of the system specified by the equation (D 2 + 3D + 2)y(t) = Dx(t), when the initial conditions are y 0 (0) = 0 and . We have already solved this problem in Example 2.1a, where we found

This is the zero-input component of the loop current y(t). It will be interesting to find the initial conditions at t = 0 − and 0 + for the total response y(t). Let us compare y(0 − ) and

with y(0 + ) and

The two pairs can be compared by writing the loop equation for the circuit in Fig. 2.1a at t = 0 − and t = 0 + . The only difference between the two situations is that at t = 0 − , the input x(t) = 0, whereas at t = 0 + , the input x(t) = 10 [because x(t) = 10e −3t ]. Hence, the two loop equations are

.

The loop current y(0 + ) = y0 − ) = 0 because it cannot change instantaneously in the absence of impulsive voltage. The same is true of the capacitor voltage. Hence, υc (0 + ) = υc (0 − ) = 5. Substituting these values in the foregoing equations, we obtain

and

Thus

EXERCISE E2.3 In the circuit in Fig. 2.1a, the inductance L = 0 and the initial capacitor voltage v c (0) = 30 volts. Show that the zero-input component of the loop current is given by y 0 (t) = −10e −2t/3 for t ≥ 0. INDEPENDENCE OF ZERO-INPUT AND ZERO-STATE RESPONSE In Example 2.2 we computed the zero-input component without using the input x(t). The zero-state component can be computed from the knowledge of the input x(t) alone; the initial conditions are assumed to be zero (system in zero state). The two components of the system response (the zero-input and zero-state components) are independent of each other. The two worlds of zero-input response and zero-state response coexist side by side, neither one knowing or caring what the other is doing. For each component, the other is totally irrelevant. ROLE OF AUXILIARY CONDITIONS IN SOLUTION OF DIFFERENTIAL EQUATIONS Solution of a differential equation requires additional pieces of information (the auxiliary conditions). Why? We now show heuristically why a differential equation does not, in general, have a unique solution unless some additional constraints (or conditions) on the solution are known. Differentiation operation is not invertible unless one piece of information about y(t) is given. To get back y(t) from dy/dt, we must know one piece of information, such as y(0). Thus, differentiation is an irreversible (noninvertible) operation during which certain information is lost. To invert this operation, one piece of information about y(t) must be provided to restore the original y(t). Using a similar argument, we can show that, given d 2 y/dt2 , we can determine y(t) uniquely only if two additional pieces of information (constraints) about y(t) are given. In general, to determine y(t) uniquely from its Nth derivative, we need N additional pieces of information (constraints) about y(t). These constraints are also called auxiliary conditions. When these conditions are given at t = 0, they are called initial conditions.

2.2-1 Some Insights into the Zero-Input Behavior of a System By definition, the zero-input response is the system response to its internal conditions, assuming that its input is zero. Understanding this phenomenon provides interesting insight into system behavior. If a system is disturbed momentarily from its rest position and if the disturbance is then removed, the system will not come back to rest instantaneously. In general, it will come back to rest over a period of time and only through a

special type of motion that is characteristic of the system.[†] For example, if we press on an automobile fender momentarily and then release it at t =

0, there is no external force on the automobile for t > 0.[‡] The auto body will eventually come back to its rest (equilibrium) position, but not through any arbitrary motion. It must do so by using only a form of response that is sustainable by the system on its own without any external source, since the input is zero. Only characteristic modes satisfy this condition. The system uses a proper combination of characteristic modes to come back to the rest position while satisfying appropriate boundary (or initial) conditions. If the shock absorbers of the automobile are in good condition (high damping coefficient), the characteristic modes will be monotonically decaying exponentials, and the auto body will come to rest rapidly without oscillation. In contrast, for poor shock absorbers (low damping coefficients), the characteristic modes will be exponentially decaying sinusoids, and the body will come to rest through oscillatory motion. When a series RC circuit with an initial charge on the capacitor is shorted, the capacitor will start to discharge exponentially through the resistor. This response of the RC circuit is caused entirely by its internal conditions and is sustained by this system without the aid of any external input. The exponential current waveform is therefore the characteristic mode of the RC circuit. Mathematically we know that any combination of characteristic modes can be sustained by the system alone without requiring an external input. This fact can be readily verified for the series RL circuit shown in Fig. 2.2. The loop equation for this system is

Figure 2.2: Modes always get a free ride. It has a single characteristic root λ = −2, and the characteristic mode is e −2t . We now verify that a loop current y(t) = ce-2t can be sustained through this circuit without any input voltage. The input voltage x(t) required to drive a loop current y(t) = ce−2t is given by

Clearly, the loop current y(t) = ce−2t is sustained by the RL circuit on its own, without the necessity of an external input. THE RESONANCE PHENOMENON We have seen that any signal consisting of a system's characteristic mode is sustained by the system on its own; the system offers no obstacle to such signals. Imagine what would happen if we were to drive the system with an external input that is one of its characteristic modes. This would be like pouring gasoline on a fire in a dry forest or hiring an alcoholic to taste liquor. An alcoholic would gladly do the job without pay. Think what would happen if he were paid by the amount of liquor he tasted! He would work overtime. He would work day and night, until he is burned out. The same

thing happens with a system driven by an input of the form of characteristic mode. The system response grows without limit, until it burns out.[†] We call this behavior the resonance phenomenon. An intelligent discussion of this important phenomenon requires an understanding of the zero-state response; for this reason we postpone this topic until Section 2.7-7. [1] Lathi, B. P. Signals and Systems. Berkeley-Cambridge Press, Carmichael, CA, 1987. [†] To prove this assertion, assume that y (t), y (t) ... y (t) are all solutions of Eq. (2.4). Then 1 2 N

Multiplying these equations by c 1 , c 2 ,..., c N, respectively, and adding them together yields This result shows that c 1 y 1 (t) + c 2 y 2 (t) + ... λ c Ny n (t) is also a solution of the homogeneous equation [Eq. (2.4)]. [†] Eigenvalue is German for "characteristic value." [†] y (t) may be present even before t = 0 − . However, we can be sure of its presence only from t = 0 − onward. 0 [†] The complex conjugate roots of a second-order polynomial can be determined by using the formula in Section B.7-10 or by expressing the

polynomial as a sum of two squares. The latter can be accomplished by completing the square with the first two terms, as follows:

[†] This assumes that the system will eventually come back to its original rest (or equilibrium) position. [‡] We ignore the force of gravity, which merely causes a constant displacement of the auto body without affecting the other motion. [†] In practice, the system in resonance is more likely to go in saturation because of high amplitude levels.

2.3 THE UNIT IMPULSE RESPONSE h(t) In Chapter 1 we explained how a system response to an input x(t) may be found by breaking this input into narrow rectangular pulses, as illustrated earlier in Fig. 1.27a, and then summing the system response to all the components. The rectangular pulses become impulses in the limit as their widths approach zero. Therefore, the system response is the sum of its responses to various impulse components. This discussion shows that if we know the system response to an impulse input, we can determine the system response to an arbitrary input x(t). We now discuss a method of determining h(t), the unit impulse response of an LTIC system described by the Nth-order differential equation [Eq. (2.1a)]

where Q(D) and P(D) are the polynomials shown in Eq. (2.2). Recall that noise considerations restrict practical systems to M ≤ N. Under this constraint, the most general case is M = N. Therefore, Eq. (2.16a) can be expressed as

Before deriving the general expression for the unit impulse response h(t), it is illuminating to understand qualitatively the nature of h(t). The impulse

response h(t) is the system response to an impulse input δ(t) applied at t = 0 with all the initial conditions zero at t = 0 − . An impulse input δ(t) is like lightning, which strikes instantaneously and then vanishes. But in its wake, in that single moment, objects that have been struck are rearranged. Similarly, an impulse input δ(t) appears momentarily at t = 0, and then it is gone forever. But in that moment it generates energy storages; that is, it

creates nonzero initial conditions instantaneously within the system at t = 0 + . Although the impulse input δ(t) vanishes for t > 0 so that the system has no input after the impulse has been applied, the system will still have a response generated by these newly created initial conditions. The impulse response h(t), therefore, must consist of the system's characteristic modes for t ≥ 0 + . As a result

This response is valid for t > 0. But what happens at t = 0? At a single moment t = 0, there can at most be an impulse, [†] so the form of the complete response h(t) is

because h(t) is the unit impulse response, setting x(t) = δ(t) and y(t) = h(t) in Eq. (2.16b) yields In this equation we substitute h(t) from Eq. (2.17) and compare the coefficients of similar impulsive terms on both sides. The highest order of the derivative of impulse on both sides is N, with its coefficient value as A0 on the left-hand side and b 0 on the right-hand side. The two values must be matched. Therefore, A0 = b 0 and

In Eq. (2.16b), if M < N, b 0 = 0. Hence, the impulse term b 0 δ(t) exists only if M = N. The unknown coefficients of the N characteristic modes in h(t) in Eq. (2.19) can be determined by using the technique of impulse matching, as explained in the following example. EXAMPLE 2.3 Find the impulse response h(t) for a system specified by

In this case, b 0 = 0. Hence, h(t) consists of only the characteristic modes. The characteristic polynomial is λ2 + 5λ + 6 = (λ + 2)(λ + 3). The roots are −2 and −3. Hence, the impulse response h(t) is

letting x(t) = δ(t) and y(t) = h(t) in Eq. (2.20), we obtain

Recall that initial conditions h(0 − ) and h(0 + ) = K1 and

are both zero. But the application of an impulse at t = 0 creates new initial conditions at t = 0 + . Let

. These jump discontinuities in h(t) and

at t = 0 result in impulse terms

and

on the left-hand side. Matching the coefficients of impulse terms on both sides of Eq. (2.22) yields We now use these values h(0 + ) = K1 = 1 and 1. Also setting t = 0 + in

in Eq. (2.21) to find c 1 and c 2 . Setting t = 0 + in Eq. (2.21), we obtain c 1 + c 2 =

, we obtain −2c 1 −3c 1 = −4. These two simultaneous equations yield c 1 = −1 and c 2 = 2. Therefore

Although, the method used in this example is relatively simple, we can simplify it still further by using a modified version of impulse matching. SIMPLIFIED IMPULSE MATCHING METHOD The alternate technique we present now allows us to reduce the procedure to a simple routine to determine h(t). To avoid the needless distraction, the proof for this procedure is placed in Section 2.8. There, we show that for an LTIC system specified by Eq. (2.16), the unit impulse response h(t)

is given by

where y n (t) is a linear combination of the characteristic modes of the system subject to the following initial conditions:

where y (k)n (0) is the value of the kth derivative of y n (t) at t = 0. We can express this set of conditions for various values of N (the system order) as follows:

and so on. As stated earlier, if the order of P(D) is less than the order of Q(D), that is, if M < N, then b 0 = 0, and the impulse term b 0 δ(t) in h(t) is zero. EXAMPLE 2.4 Determine the unit impulse response h(t) for a system specified by the equation

This is a second-order system (N = 2) having the characteristic polynomial The characteristic roots of this system are λ = −1 and λ = −2. Therefore

Differentiation of this equation yields

The initial conditions are [see Eq. (2.24b) for N = 2] Setting t = 0 in Eqs. (2.26a) and (2.26b), and substituting the initial conditions just given, we obtain

Solution of these two simultaneous equations yields Therefore Moreover, according to Eq. (2.25), P(D) = D, so that Also in this case, b 0 = 0 [the second-order term is absent in P(D)]. Therefore Comment. In the above discussion, we have assumed M ≤ N, as specified by Eq. (2.16b). Appendix 2.1 (i.e., Section 2.8) shows that the expression for h(t) applicable to all possible values of M and N is given by where y n (t) is a linear combination of the characteristic modes of the system subject to initial conditions (2.24). This expression reduces to Eq. (2.23) when M ≤ N. Determination of the impulse response h(t) using the procedure in this section is relatively simple. However, in Chapter 4 we shall discuss another, even simpler method using the Laplace transform. EXERCISE E2.4 Determine the unit impulse response of LTIC systems described by the following equations: a. (D + 2)y(t) = (3D + 5)x(t) b. D(D + 2)y(t) = (D + 4)x(t) c. (D 2 + 2D + 1)y(t) = Dx(t)

Answers

a. 3δ(t) − e −2t u(t) b. (2 − e −2t )u(t) c. (1 − t)e −1 u(t)

COMPUTER EXAMPLE C2.3 Determine the impulse response h(t) for an LTIC system specified by the differential equation This is a second-order system with b 0 = 0. First we find the zero-input component for initial conditions y(0 − ) = 0, and the zero-input response is differentiated and the impulse response immediately follows. >> y_n = desolve ('D2y+3*Dy+2*y=0','y (0)=0','Dy (0)=1','t'); >> Dy_n = diffy (y_n); >> disp(['h(t) = (',char (Dy_n),') u (t)']); h(t) = (-exp(-t)+2*exp (-2*t))u(t)

. Since P(D) = D,

Therefore, h(t) = b 0 δ(t) + [Dy0 (t)]u(t) = (−e −1 + 2e −2t )u(t). SYSTEM RESPONSE TO DELAYED IMPULSE If h(t) is the response of an LTIC system to the input δ(t), then h(t − T) is the response of this same system to the input δ(t − T). This conclusion follows from the time-invariance property of LTIC systems. Thus, by knowing the unit impulse response h(t), we can determine the system response to a delayed impulse δ(t − T). [†] It might be possible for the derivatives of δ(t) to appear at the origin. However, if M ≤ N, it is impossible for h(t) to have any derivatives of δ(t).

This conclusion follows from Eq. (2.16b) with x(t) = δ(t) and y(t) = h(t). The coefficients of the impulse and all its derivatives must be matched on both sides of this equation. If h(t) contains δ(1) (t), the first derivative of δ(t), the left-hand side of Eq. (2.16b) will contain a term δ(N+1) (t). But the

highest-order derivative term on the right-hand side is δ(N)(t). Therefore, the two sides cannot match. Similar arguments can be made against the presence of the impulse's higher-order derivatives in h(t).

2.4 SYSTEM RESPONSE TO EXTERNAL INPUT: ZERO-STATE RESPONSE This section is devoted to the determination of the zero-state response of an LTIC system. This is the system response y(t) to an input x(t) when the system is in the zero state, that is, when all initial conditions are zero. We shall assume that the systems discussed in this section are in the zero state unless mentioned otherwise. Under these conditions, the zero-state response will be the total response of the system. We shall use the superposition property for finding the system response to an arbitrary input x(t). Let us define a basic pulse p(t) of unit height and width Δτ, starting at t = 0 as illustrated in (Fig. 2.3a). Figure 2.3b shows an input x(t) as a sum of narrow rectangular pulses. The pulse starting at t = nΔτ in Fig. 2.3b has a height x(nΔτ), and can be expressed as x(nΔτ)p(t − nΔτ). Now, x(t) is the sum of all such pulses. Hence

Figure 2.3: Finding the system response to an arbitrary input x(t). The term [x(nΔτ)/Δτ]p(t − nΔτ) represents a pulse p(t − nΔτ) with height [x(nΔτ)/Δτ]. As Δτ → 0, the height of this strip →∞, but its area remains x(nΔτ). Hence, this strip approaches an impulse x(nΔτ)δ(t − nΔτ) as Δτ → 0 (Fig. 2.3e). Therefore

To find the response for this input x(t), we consider the input and the corresponding output pairs, as shown in Fig. 2.3c-2.3f and also shown by directed arrow notation as follows:

Therefore [†]

This is the result we seek. We have obtained the system response y(t) to an arbitrary input x(t) in terms of the unit impulse response h(t). Knowing h(t), we can determine the response y(t) to any input. Observe once again the all-pervasive nature of the system's characteristic modes. The system response to any input is determined by the impulse response, which, in turn, is made up of characteristic modes of the system. It is important to keep in mind the assumptions used in deriving Eq. (2.29). We assumed a linear, time-invariant (LTI) system. Linearity allowed us to use the principle of superposition, and time invariance made it possible to express the system's response to δ(t − nΔτ) as h(t − nΔτ).

2.4-1 The Convolution Integral The zero-state response y(t) obtained in Eq. (2.29) is given by an integral that occurs frequently in the physical sciences, engineering, and mathematics. For this reason this integral is given a special name: the convolution integral. The convolution integral of two functions x 1 (t) and x 2 (t) is denoted symbolically by x 1 (t) * x 2 (t) and is defined as

Some important properties of the convolution integral follow. THE COMMUTATIVE PROPERTY Convolution operation is commutative; that is, x 1 (t) * x 2 (t) = x 2 (t) * x 1 (t). This property can be proved by a change of variable. In Eq. (2.30), if we let z = t − τ so that τ = t − z and dτ = −dz, we obtain

THE DISTRIBUTIVE PROPERTY According to the distributive property,

THE ASSOCIATIVE PROPERTY According to the associative property,

The proofs of Eqs. (2.32) and (2.33) follow directly from the definition of the convolution integral. They are left as an exercise for the reader. THE SHIFT PROPERTY if then

and

Proof. We are given

Therefore

Equation (2.34b) follows from Eq. (2.34a). CONVOLUTION WITH AN IMPULSE Convolution of a function x(t) with a unit impulse results in the function x(t) itself. By definition of convolution

Because δ(t − τ) is an impulse located at τ = t, according to the sampling property of the impulse [Eq. (1.24)], the integral in Eq. (2.35) is the value of x(τ) at τ = t, that is, x(t). Therefore

Actually this result was derived earlier [Eq. (2.28)]. THE WIDTH PROPERTY If the durations (widths) of x 1 (t) and x 2 (t) are finite, given by T1 and T2 , respectively, then the duration (width) of x 1 (t) * x 2 (t) is T1 + T2 (Fig. 2.4). The proof of this property follows readily from the graphical considerations discussed later in Section 2.4-2.

Figure 2.4: Width property of convolution. ZERO-STATE RESPONSE AND CAUSALITY

The (zero-state) response y(t) of an LTIC system is

In deriving Eq. (2.37), we assumed the system to be linear and time invariant. There were no other restrictions either on the system or on the input signal x(t). In practice, most systems are causal, so that their response cannot begin before the input. Furthermore, most inputs are also causal, which means they start at t = 0. Causality restriction on both signals and systems further simplifies the limits of integration in Eq. (2.37). By definition, the response of a causal system cannot begin before its input begins. Consequently, the causal system's response to a unit impulse δ(t) (which is located at t = 0) cannot begin before t = 0. Therefore, a causal system's unit impulse response h(t) is a causal signal. It is important to remember that the integration in Eq. (2.37) is performed with respect to τ (not t). If the input x(t) is causal, x(τ) = 0 for τ < 0. Therefore, x(τ) = 0 for τ < 0, as illustrated in Fig. 2.5a. Similarly, if h(t) is causal, h(t − τ ) = 0 for t − τ < 0; that is, for τ > t, as depicted in Fig. 2.5a. Therefore, the product x(t)h(t − τ) = 0 everywhere except over the nonshaded interval 0 ≤ τ ≤ t shown in Fig. 2.5a (assuming t ≥ 0). Observe that if f is negative, x(τ)h(t − τ) = 0 for all τ as shown in Fig. 2.5b. Therefore, Eq. (2.37) reduces to

Figure 2.5: Limits of the convolution integral. The lower limit of integration in Eq. (2.38a) is taken as 0 − to avoid the difficulty in integration that can arise if x(t) contains an impulse at the origin. This result shows that if x(t) and h(t) are both causal, the response y(t) is also causal. Because of the convolution's commutative property [Eq. (2.31)], we can also express Eq. (2.38a) as [assuming causal x(t) and h(t)]

Hereafter, the lower limit of 0 - will be implied even when we write it as 0. As in Eq. (2.38a), this result assumes that both the input and the system are causal. EXAMPLE 2.5 For an LTIC system with the unit impulse response h(t) = e −2t u(t), determine the response y(t) for the input

Here both x(t) and h(t) are causal (Fig. 2.6). Hence, from Eq. (2.38a), we obtain

Figure 2.6: Convolution of x(t) and h(t). Because x(t) = e −t u(t) and h(t) = e −2t u(t) Remember that the integration is performed with respect to τ (not t), and the region of integration is 0 ≤ τ ≤ t. Hence, ≤ 0 and t − τ ≥ 0. Therefore, u(t) = 1 and u(t − τ) = 1; consequently

Because this integration is with respect to τ, we can pull e −2t outside the integral, giving us

Moreover, y(t) = 0 when t < 0 [see Eq. (2.38a)]. Therefore The response is depicted in Fig. 2.6c. EXERCISE E2.5

For an LTIC system with the impulse response h(t) = 6e −t u(t), determine the system response to the input: a. 2u(t) b. 3e −3t u(t)

Answers

a. 12(1−e −t )u(t) b. 9(e −t − e −3t )u(t)

EXERCISE E2.6 Repeat Exercise E2.5 for the input x(t) = e −t u(t).

Answers 6te−t u(t) THE CONVOLUTION TABLE The task of convolution is considerably simplified by a ready-made convolution table (Table 2.1). This table, which lists several pairs of signals and their convolution, can conveniently determine y (t), a system response to an input x(t), without performing the tedious job of integration. For instance, we could have readily found the convolution in Example 2.5 by using pair 4 (with λ = − 1 and λ = −2) to be (e −t − e −2t )u(t). The following example

demonstrates the utility of this table. Table 2.1: Convolution Table Open table as spreadsheet No.

x 1 (t)

x 2 (t)

x 1 (t)*x 2 (t) = x 2 (t)*x 1 (t)

1

x(t)

δ(t − T)

x(t − T)

2

e λt u(t)

u(t)

3

u(t)

u(t)

4

e λ 1 t u(t)

e λ 2 t u(t)

5

e λt u(t)

e λt u(t)

6

teλt u(t)

e λt u(t)

7

tNu(t)

e λt u(t)

8

tM u(t)

tNu(t)

9

teλ 1 t u(t)

e λ 2 t u(t)

10

tM e λt u(t)

tNe λt u(t)

11

tM e λ 1 t u(t) λ1 ≠ λ2

tNe λ 2 t u(t)

12

e −αt cos (βt + θ)u(t)

e λ 1 t u(t)

13

e λ 1 t u(t)

e λ 2 t u(−t)

14

e λ 1 t u(−t)

e λ 2 t u(−t)

tu(t)

teλt u(t)

EXAMPLE 2.6 Find the loop current y(t) of the RLC circuit in Example 2.2 for the input x(t) = 10e -3t u(t), when all the initial conditions are zero. The loop equation for this circuit [see Example 1.10 or Eq. (1.55)] is The impulse response h(t) for this system, as obtained in Example 2.4, is The input is x(t) = 10e −3 t x u(t), and the response y(t) is

Using the distributive property of the convolution [Eq. (2.32)], we obtain

Now the use of pair 4 in Table 2.1 yields

EXERCISE E2.7 Rework Exercises E2.5 and E2.6 using the convolution table. EXERCISE E2.8 Use the convolution table to determine Answers (1/2 - e -t + 1/2e −2t )u(t) EXERCISE E2.9

For an LTIC system with the unit impulse response h(t) = e -2t u(t), determine the zero-state response y(t) if the input x(t) = sin 3t u(t). [Hint: Use pair 12 from Table 2.1.]

Answers or

RESPONSE TO COMPLEX INPUTS The LTIC system response discussed so far applies to general input signals, real or complex. However, if the system is real, that is, if h(t) is real, then we shall show that the real part of the input generates the real part of the output, and a similar conclusion applies to the imaginary part. If the input is x (t) = x r (t) + jx i (t), where x r (t) and x i (t) are the real and imaginary parts of x(t), then for real h(t) where y r(t) and y i (t) are the real and the imaginary parts of y(t). Using the right-directed arrow notation to indicate a pair of the input and the corresponding output, the foregoing result can be expressed as follows. If then

MULTIPLE INPUTS Multiple inputs to LTI systems can be treated by applying the superposition principle. Each input is considered separately, with all other inputs assumed to be zero. The sum of all these individual system responses constitutes the total system output when all the inputs are applied simultaneously.

2.4-2 Graphical Understanding of Convolution Operation Convolution operation can be grasped readily by examining the graphical interpretation of the convolution integral. Such an understanding is helpful in evaluating the convolution integral of more complex signals. In addition, graphical convolution allows us to grasp visually or mentally the convolution integral's result, which can be of great help in sampling, filtering, and many other problems. Finally, many signals have no exact mathematical description, so they can be described only graphically. If two such signals are to be convolved, we have no choice but to perform their convolution graphically. We shall now explain the convolution operation by convolving the signals x(t) and g(t), illustrated in Fig. 2.7a and 2.7b, respectively. If c(t) is the convolution of x(t) with g(t), then

Figure 2.7: Graphical explanation of the convolution operation. One of the crucial points to remember here is that this integration is performed with respect to τ, so that t is just a parameter (like a constant). This consideration is especially important when we sketch the graphical representations of the functions x(τ) and g(t − τ) appearing in the integrand of Eq. (2.41). Both these functions should be sketched as functions of τ, not of t. The function x(τ) is identical to x(t), with τ replacing t (Fig. 2.7c). Therefore, x(t) and x(τ) will have the same graphical representations. Similar remarks apply to g(t) and g(τ) (Fig. 2.7d). To appreciate what g(t − τ) looks like, let us start with the function g(τ) (Fig. 2.7d). Time reversal of this function (reflection about the vertical axis τ = 0 yields g(− τ) (Fig. 2.7e). Let us denote this function by φ(τ) Now φ(τ) shifted by t seconds is φ(τ − 1), given by Therefore, we first time-reverse g(− τ) to obtain g(− τ) and then time-shift g(− τ) by t to obtain g(t− τ). For positive t, the shift is to the right (Fig. 2.7f); for negative t, the shift is to the left (Fig. 2.7g, 2.7h). The preceding discussion gives us a graphical interpretation of the functions x(τ) and g(t − τ). The convolution c(t) is the area under the product of these two functions. Thus, to compute c(t) at some positive instant t = t1 , we first obtain g(−τ) by inverting g(τ) about the vertical axis. Next, we right-shift or delay g(−τ) by t 1 to obtain g(t1 − τ) (Fig. 2.7f), and then we multiply this function by x(τ), giving us the product x( τ )g(t1 − τ) (shaded portion in Fig. 2.7f). The area A1 under this product is c(t1 ), the value of c(t) at t = t1 . We can therefore plot c(t1 ) = A1 on a curve describing c(t), as shown in Fig. 2.7i. The area under the product x( τ )g( τ ) in Fig. 2.7e is c(0), the value of the convolution for t = 0 (at the origin). A similar procedure is followed in computing the value of c(t) at t = t2 , where t2 is negative (Fig. 2.7g). In this case, the function g(− τ) is shifted by a negative amount (that is, left-shifted) to obtain g(t2 − τ). Multiplication of this function with x(τ) yields the product x(τ)g(t2 − τ). The area under this product is c(t2 ) = A2 , giving us another point on the curve c(t) at t = t2 (Fig. 2.7i). This procedure can be repeated for all values of t, from − ∞ to ∞. The result will be a curve describing c(t) for all time t. Note that when t ≤ −3, g(τ) and g(t − τ) do not overlap (see Fig. 2.7h); therefore, c(t) = 0 for t ≤ −3. SUMMARY OF THE GRAPHICAL PROCEDURE The procedure for graphical convolution can be summarized as follows 1. Keep the function x(τ) fixed. 2. Visualize the function g(τ) as a rigid wire frame, and rotate (or invert) this frame about the vertical axis (τ = 0) to obtain g(− τ). 3. Shift the inverted frame along the τ axis by t0 seconds. The shifted frame now represents g(t0 − τ).

4. The area under the product of x(τ) and g(t0 − τ) (the shifted frame) is c(t0 ), the value of the convolution at t = t0 . 5. Repeat this procedure, shifting the frame by different values (positive and negative) to obtain c(t) for all values of t. The graphical procedure discussed here appears very complicated and discouraging at first reading. Indeed, some people claim that convolution has driven many electrical engineering undergraduates to contemplate theology either for salvation or as an alternative career (IEEE Spectrum, March 1991, p. 60). [†] Actually, the bark of convolution is worse than its bite. In graphical convolution, we need to determine the area under the product x(τ)g(t − τ) for all values of t from −∞ to ∞. However, a mathematical description of x(τ)g(t −τ) is generally valid over a range of t. Therefore, repeating the procedure for every value of t amounts to repeating it only a few times for different ranges of t.

Convolution: its bark is worse than its bite! We can also use the commutative property of convolution to our advantage by computing x(t) * g(t) or g(t) * x(t), whichever is simpler. As a rule of thumb, convolution computations are simplified if we choose to invert (time-reverse) the simpler of the two functions. For example, if the mathematical description of g(t) is simpler than that of x(t), then x(t) * g(t) will be easier to compute than g(t) * x(t). In contrast, if the mathematical description of x(t) is simpler, the reverse will be true. We shall demonstrate graphical convolution with the following examples. Let us start by using this graphical method to rework Example 2.5. EXAMPLE 2.7 Determine graphically y(t) = x(t) * h(t) for x(t) = e −t u(t) and h(t) = e −2t u(t). In Fig. 2.8a and 2.8b we have x(t) and h(t), respectively; and Fig. 2.8c shows x(τ) and h (−τ) as functions of τ. The function h(t − τ) is now obtained by shifting h(− τ) by t. If t is positive, the shift is to the right (delay); if t is negative, the shift is to the left (advance). Figure 2.8d shows that for negative t, h(t − τ) [obtained by left-shifting h(− τ)] does not overlap x(τ), and the product x(τ )h(t − τ) = 0, so that

Figure 2.8: Convolution of x(t) and h(t). Figure 2.8e shows the situation for t ≥ 0. Here x(τ) and h(t − τ) do overlap, but the product is nonzero only over the interval 0 ≤ τ ≤ t (shaded interval). Therefore

All we need to do now is substitute correct expressions for x(τ) and h(t − τ) in this integral. From Fig. 2.8a and 2.8b it is clear that the segments of x(t) and g(t) to be used in this convolution (Fig. 2.8e) are described by Therefore Consequently

Moreover, y(t) = 0 for t ≤ 0, so that

EXAMPLE 2.8 Find c(t) = x(t) * g(t) for the signals depicted in Fig. 2.9a and 2.9b. Since x(t) is simpler than g(t), it is easier to evaluate g(t) * x(t) than x(t) * g(t). However, we shall intentionally take the more difficult route and evaluate x(t) * g(t). From x(t) and g(t) (Fig. 2.9a and 2.9b, respectively), observe that g(t) is composed of two segments. As a result, it can be described as

Figure 2.9: Convolution of x(t) and g(t).

Therefore

The segment of x(t) that is used in convolution is x(t) = 1, so that x(τ) = 1. Figure 2.9c shows x(τ) and g(−τ). To compute c(t) for t ≥ 0, we right-shift g(−τ) to obtain g(t − τ), as illustrated in Fig. 2.9d. Clearly, g(t − τ) overlaps with x(τ) over the shaded interval, that is, over the range ≥ 0; segment A overlaps with x(τ) over the interval (0, t), while segment B overlaps with x(τ) over (t, ∞). Remembering that x(τ) = 1, we have

Figure 2.9e shows the situation for t ≤ 0. Here the overlap is over the shaded interval, that is, over the range τ > 0, where only the segment B of g(t) is involved. Therefore

Therefore

Figure 2.9f shows a plot of c(t). EXAMPLE 2.9 Find x(t) * g(t) for the functions x(t) and g(t) shown in Fig. 2.10a and 2.10b.

Figure 2.10: Convolution of x(t) and g(t). Here, x(t) has a simpler mathematical description than that of g(t), so it is preferable to time-reverse x(t). Hence, we shall determine g(t) * x(t) rather than x(t) * g(t). Thus

First, we determine the expressions for the segments of x(t) and g(t) used in finding c(t). According to Fig. 2.10a and 2.10b, these segments can be expressed as so that Figure 2.10c shows g(τ) and x(− τ), whereas Fig. 2.10d shows g(τ) and x(t − τ), which is x(τ) shifted by t. Because the edges of x(− τ) are at τ = − 1 and 1, the edges of x(t − τ) are at − 1 + t and 1 + t. The two functions overlap over the interval (0,1 + t)(shaded interval), so that

This situation, depicted in Fig. 2.10d, is valid only for − 1 ≤ t ≤ 1. For t ≤ 1 but ≤ 2, the situation is as illustrated in Fig. 2.10e. The two functions overlap only over the range − 1+ t to 1 + t (shaded interval). Note that the expressions for g(τ) and x(t − τ) do not change; only the range of integration changes. Therefore

Also note that the expressions in Eqs. (2.42a) and (2.42b) both apply at t = 1, the transition point between their respective ranges. We can readily verify that both expressions yield a value of 2/3 at t = 1, so that c(1) = 2/3. The continuity of c(t) at transition points indicates a high probability of a

right answer. Continuity of c(t) at transition points is assured as long as there are no impulses at the edges of x(t) and g(t). For t ≥ 2 but ≤ 4 the situation is as shown in Fig. 2.10f. The functions g(τ) and x(t − τ) overlap over the interval from − 1 + t to 3 (shaded interval), so that

Again, both Eqs. (2.42b) and (2.42c) apply at the transition point t = 2. We can readily verify that c(2) = 4/3 when either of these expressions is used. For t ≥ 4, x(t − τ) has been shifted so far to the right that it no longer overlaps with g(τ) as depicted in Fig. 2.10g. Consequently

We now turn our attention to negative values of t. We have already determined c(t) up to t = − 1. For t < − 1 there is no overlap between the two functions, as illustrated in Fig. 2.10h, so that

Figure 2.10i plots c(t) according to Eqs. (2.42a) through (2.42e). WIDTH OF THE CONVOLVED FUNCTION The widths (durations) of x(t), g(t), and c(t) in Example 2.9 (Fig. 2.10) are 2, 3, and 5, respectively. Note that the width of c(t) in this case is the sum of the widths of x(t) and g(t). This observation is not a coincidence. Using the concept of graphical convolution, we can readily see that if x(t) and g(t) have the finite widths of T1 and T2 respectively, then the width of c(t) is equal to T1 + T2 . The reason is that the time it takes for a signal of width (duration) T1 to completely pass another signal of width (duration) T2 so that they become nonoverlapping is T1 + T2 . When the two signals become nonoverlapping, the convolution goes to zero. EXERCISE E2.10 Rework Example 2.8 by evaluating g(t) * x(t) EXERCISE E2.11 Use graphical convolution to show that x(t) * g(t) = g(t) * x(t) = c(t) in Fig. 2.11.

Figure 2.11: Convolution of x(t) and g(t). EXERCISE E2.12 Repeat Exercise E2.11 for the functions in Fig. 2.12.

Figure 2.12: Convolution of x(t) and g(t). EXERCISE E2.13 Repeat Exercise E2.11 for the functions in Fig. 2.13.

Figure 2.13: Convolution of x(t) and g(t). THE PHANTOM OF THE SIGNALS AND SYSTEMS OPERA In the study of signals and systems we often come across some signals such as an impulse, which cannot be generated in practice and have never

been sighted by anyone. [†] One wonders why we even consider such idealized signals. The answer should be clear from our discussion so far in this chapter. Even if the impulse function has no physical existence, we can compute the system response h(t) to this phantom input according to the procedure in Section 2.3, and knowing h(t), we can compute the system response to any arbitrary input. The concept of impulse response, therefore, provides an effective intermediary for computing system response to an arbitrary input. In addition, the impulse response h(t) itself provides a great deal of information and insight about the system behavior. In Section 2.7 we show that the knowledge of impulse response provides much valuable information, such as the response time, pulse dispersion, and filtering properties of the system. Many other useful insights about the system behavior

can be obtained by inspection of h(t). Similarly, in frequency-domain analysis (discussed in later chapters), we use an everlasting exponential (or sinusoid) to determine system response. An everlasting exponential (or sinusoid) too is a phantom, which no-body has ever seen and which has no physical existence. But it provides another effective intermediary for computing the system response to an arbitrary input. Moreover, the system response to everlasting exponential (or sinusoid) provides valuable information and insight regarding the system's behavior. Clearly, idealized impulse and everlasting sinusoids are friendly and helpful spirits. Interestingly, the unit impulse and the everlasting exponential (or sinusoid) are the dual of each other in the time-frequency duality, to be studied in Chapter 7. Actually, the time-domain and the frequency-domain methods of analysis are the dual of each other. WHY CONVOLUTION? AN INTUITIVE EXPLANATION OF SYSTEM RESPONSE On the surface, it appears rather strange that the response of linear systems (those gentlest of the gentle systems) should be given by such a tortuous operation of convolution, where one signal is fixed and the other is inverted and shifted. To understand this odd behavior, consider a hypothetical impulse response h(t) that decays linearly with time (Fig. 2.14a). This response is strongest at t = 0, the moment the impulse is applied, and it decays linearly at future instants, so that one second later (at t = 1 and beyond), it ceases to exist. This means that the closer the impulse input is to an instant t, the stronger is its response at t.

Figure 2.14: Intuitive explanation of convolution. Now consider the input x(t) shown in Fig. 2.14b. To compute the system response, we break the input into rectangular pulses and approximate these pulses with impulses. Generally the response of a causal system at some instant t will be determined by all the impulse components of the input before t. Each of these impulse components will have different weight in determining the response at the instant t, depending on its proximity to t. As seen earlier, the closer the impulse is to t, the stronger is its influence at t. The impulse at t has the greatest weight (unity) in determining the response at t. The weight decreases linearly for all impulses before t until the instant t − 1. The input before t − 1 has no influence (zero weight). Thus, to determine the system response at t, we must assign a linearly decreasing weight to impulses occurring before t, as shown in Fig. 2.14b. This weighting function is precisely the function h(t − τ). The system response at t is then determined not by the input x(τ) but by the weighted input x(τ)h(t − τ), and the summation of all these weighted inputs is the convolution integral.

2.4-3 Interconnected Systems A larger, more complex system can often be viewed as the interconnection of several smaller subsystems, each of which is easier to characterize. Knowing the characterizations of these subsystems, it becomes simpler to analyze such large systems. We shall consider here two basic interconnections, cascade and parallel. Figure 2.15a shows S1 and S2 , two LTIC subsystems connected in parallel, and Fig. 2.15b shows the same two systems connected in cascade.

Figure 2.15: Interconnected systems. In Fig. 2.15a, the device depicted by the symbol Σ inside a circle represents an adder, which adds signals at its inputs. Also the junction from which two (or more) branches radiate out is called the pickoff node. Every branch that radiates out from the pickoff node carries the same signal (the signal at the junction). In Fig. 2.15a, for instance, the junction at which the input is applied is a pickoff node from which two branches radiate out, each of which carries the input signal at the node. Let the impulse response of S1 and S2 be h 1 (t) and h 2 (t), respectively. Further assume that interconnecting these systems, as shown in Fig. 2.15, does not load them. This means that the impulse response of either of these systems remains unchanged whether observed when these systems are unconnected or when they are interconnected. To find h p (t), the impulse response of the parallel system Sp in Fig. 2.15a, we apply an impulse at the input of Sp . This results in the signal δ(t) at the inputs of S1 and S2 , leading to their outputs h 1 (t) and h 2 (t), respectively. These signals are added by the adder to yield h 1 (t) + h 2 (t) as the output of Sp . Consequently

To find h c (t), the impulse response of the cascade system Sc in Fig. 2.15b, we apply the input δ(t) at the input of Sc , which is also the input to S1 . Hence, the output of S1 is h 1 (t), which now acts as the input to S2 . The response of S2 to input h 1 (t) is h 1 (t) * h 2 (t). Therefore

Because of commutative property of the convolution, it follows that interchanging the systems S1 and S2 , as shown in Fig. 2.15c, results in the same impulse response h 1 (t)*h 2 (t). This means that when several LTIC systems are cascaded, the order of systems does not affect the impulse response of the composite system. In other words, linear operations, performed in cascade, commute. The order in which they are performed is not important, at least theoretically.[†]

We shall give here another interesting application of the commutative property of LTIC systems. Figure 2.15d shows a cascade of two LTIC systems: a system S with impulse response h(t), followed by an ideal integrator. Figure 2.15e shows a cascade of the same two systems in reverse order; an ideal integrator followed by S. In Fig. 2.15d, if the input x(t) to S yields the output y(t), then the output of the system 2.15d is the integral of y(t). In Fig. 2.15e, the output of the integrator is the integral of x(t). The output in Fig. 2.15e is identical to the output in Fig. 2.15d. Hence, it follows that if an LTIC system response to input x(t) is y(t), then the response of the same system to integral of x(t) is the integral of y(t). In other words,

Replacing the ideal integrator with an ideal differentiator in Fig. 2.15d and 2.15e, and following a similar argument, we conclude that

If we let x(t) = δ(t) and y(t) = h(t) in Eq. (2.44a), we find that g(t), the unit step response of an LTIC system with impulse h(t), is given by

We can also show that the system response to is dh(t)/dt. These results can be extended to other singularity functions. For example, the unit ramp response of an LTIC system is the integral of its unit step response, and so on. INVERSE SYSTEMS In Fig. 2.15b, if S1 and S2 are inverse systems with impulse response h(t and h i (t), respectively, then the impulse response of the cascade of these systems is h(t) * h i (t). But, the cascade of a system with its inverse is an identity system, whose output is the same as the input. In other words, the unit impulse response of the cascade of inverse systems is also an unit impulse δ(t). Hence

We shall give an interesting application of the commutivity property. As seen from Eq. (2.45), a cascade of inverse systems is an identity system. Moreover, in a cascade of several LTIC subsystems, changing the order of the subsystems in any manner does not affect the impulse response of the cascade system. Using these facts, we observe that the two systems, shown in Fig. 2.15f, are equivalent. We can compute the response of the . The impulse response of cascade system on the right-hand side, by computing the response of the system inside the dotted box to the input the dotted box is g(t), the integral of h(t), as given in Eq. (2.44c). Hence, it follows that

Recall that g(t) is the unit step response of the system. Hence, an LTIC response can also be obtained as a convolution of x(t) (the derivative of the input) with the unit step response of the system. This result can be readily extended to higher derivatives of the input. An LTIC system response is the convolution of the nth derivative of the input with the nth integral of the impulse response.

2.4-4 A Very Special Function for LTIC Systems: The Everlasting Exponential est There is a very special connection of LTIC systems with the everlasting exponential function e st , where s is a complex variable, in general. We now

show that the LTIC system's (zero-state) response to everlasting exponential input e st is also the same everlasting exponential (within a multiplicative constant). Moreover, no other function can make the same claim. Such an input for which the system response is also of the same form is called the charcteristic function (also eigenfunction) of the system. Because a sinusoid is a form of exponential (s = ±jω), everlasting sinusoid is also a characteristic function of an LTIC system. Note that we are talking here of an everlasting exponential (or sinusoid), which starts at t = −∞ If h(t) is the system's unit impulse response, then system response y(t) to an everlasting exponential e st is given by

The integral on the right-hand side is a function of a complex variable s. Let us denote it by H(s), which is also complex, in general. Thus

where

Equation (2.47) is valid only for the values of s for which H(s) exists, that is, if ∫ ∞− ∞ h(τ)e −sτ dτ exists (or converges). The region in the s plane for which this integral converges is called the region of convergence for H(s). Further elaboration of the region of convergence is presented in Chapter 4. Note that H(s) is a constant for a given s. Thus, the input and the output are the same (within a multiplicative constant) for the everlasting exponential signal. H(s), which is called the transfer function of the system, is a function of complex variable s. An alternate definition of the transfer function H(s) of an LTIC system, as seen from Eq. (2.47), is

The transfer function is defined for, and is meaningful to, LTIC systems only. It does not exist for nonlinear or time-varying systems in general. We repeat again that in this discussion we are talking of the everlasting exponential, which starts at t = − ∞, not the causal exponential e st u(t), which starts at t = 0. For a system specified by Eq. (2.1), the transfer function is given by

This follows readily by considering an everlasting input x(t) = e st . According to Eq. (2.47), the output is y(t) = H(s)e st . Substitution of this x(t) and y(t) in Eq. (2.1) yields Moreover

Hence Consequently,

EXERCISE E2.14 Show that the transfer function of an ideal integrator is H(s) = 1/s and that of an ideal differentiator is H(s) = s. Find the answer in two ways: using Eq. (2.48) and Eq. (2.50). [Hint: Find h(t) for the ideal integrator and differentiator. You also may need to use the result in Prob. 1.4-9.] A FUNDAMENTAL PROPERTY OF LTI SYSTEMS We can show that Eq. (2.47) is a fundamental property of LTI systems and it follows directly as a consequence of linearity and time invariance. To show this let us assume that the response of an LTI system to an everlasting exponential e st is y(s, t). If we define

then Because of the time-invariance property, the system response to input e s(t −T) is H(s, t− T) e s(t −T), that is,

The delayed input e s(t −T) represents the input e st multiplied by a constant e −sT . Hence, according to the linearity property, the system response to

e s(t −T) must be y(s, t) e −sT . Hence

Comparison of this result with Eq. (2.51) shows that This means H(s, t) is independent of t, and we can express H(s, t) = H(s). Hence

2.4-5 Total Response The total response of a linear system can be expressed as the sum of its zero-input and zero-state components:

assuming distinct roots. For repeated roots, the zero-input component should be appropriately modified. For the series RLC circuit in Example 2.2 with the input x(t) = 10 e -3t u(t) and the initial conditions y(0 -) = 0, v c (0 -) = 5, we determined the zero-input component in Example 2.1a [Eq. (2.11c)]. We found the zero-state component in Example 2.6. From the results in Examples 2.1a and 2.6, we obtain

Figure 2.16a shows the zero-input, zero-state, and total responses.

Figure 2.16: Total response and its components. NATURAL AND FORCED RESPONSE For the RLC circuit in Example 2.2, the characteristic modes were found to be e −1 and e −2t . As we expected, the zero-input response is composed exclusively of characteristic modes. Note, however, that even the zero-state response [Eq. (2.52a)] contains characteristic mode terms. This observation is generally true of LTIC systems. We can now lump together all the characteristic mode terms in the total response, giving us a component known as the natural response y n (t). The remainder, consisting entirely of noncharacteristic mode terms, is known as the forced response y φ (t). The total response of the RLC circuit in Example 2.2 can be expressed in terms of natural and forced components by regrouping the terms in Eq. (2.52a) as

Figure 2.16b shows the natural, forced, and total responses. [†] In deriving this result we have assumed a time-invariant system. If the system is time varying, then the system response to the input δ(t − nΔτ)

cannot be expressed as h(t − nΔτ) but instead has the form h(t, nΔτ). Use of this form modifies Eq. (2.29) to

where h(t, τ) is the system response at instant t to a unit impulse input located at τ. [†] Strange that religious establishments are not agitating for compulsory "convolution education" in schools and colleges! [†] The late Prof. S. J. Mason, the inventor of signal flow graph techniques, used to tell a story of a student frustrated with the impulse function. The student said, "The unit impulse is a thing that is so small you can't see it, except at one place (the origin), where it is so big you can't see it. In other

words, you can't see it at all; at least I can't!" [2]

[†] Mason, S. J. Electronic Circuits, Signals, and Systems. Wiley, New York, 1960. [†] Change of order, however, could affect performance because of physical limitations and sensitivities to changes in the subsystems involved.

2.5 CLASSICAL SOLUTION OF DIFFERENTIAL EQUATIONS In the classical method we solve differential equation to find the natural and forced components rather than the zero-input and zero-state components of the response. Although this method is relatively simple compared with the method discussed so far, as we shall see, it also has several glaring drawbacks. As Section 2.4-5 showed, when all the characteristic mode terms of the total system response are lumped together, they form the system's natural response y n (t) (also known as the homogeneous solution or complementary solution). The remaining portion of the response consists entirely of noncharacteristic mode terms and is called the system's forced response y φ (t) (also known as the particular solution). Equation (2.52b) showed these two components for the loop current in the RLC circuit of Fig. 2.1a. The total system response is y(t) = y n(t) + y φ (t). Since y(t) must satisfy the system equation [Eq. (2.1)], or But y n (t) is composed entirely of characteristic modes. Therefore so that

The natural response, being a linear combination of the system's characteristic modes, has the same form as that of the zero-input response; only its arbitrary constants are different. These constants are determined from auxiliary conditions, as explained later. We shall now discuss a method of determining the forced response.

2.5-1 Forced Response: The Method of Undetermined Coefficients It is a relatively simple task to determine y φ(t), the forced response of an LTIC system, when the input x(t) is such that it yields only a finite number of independent derivatives. Inputs having the form e ζt or tr fall into this category. For example, the repeated differentiation of e ζt yields the same form

as this input; that is, e ζt . Similarly, the repeated differentiation of tr yields only r independent derivatives. The forced response to such an input can be

expressed as a linear combination of the input and its independent derivatives. Consider, for example, the input has at2 + bt + c. The successive derivatives of this input are 2at + b and 2a. In this case, the input has only two independent derivatives. Therefore, the forced response can be assumed to be a linear combination of x(t) and its two derivatives. The suitable form for yφ(t) in this case is, therefore The undetermined coefficients β0 ,β1 and β2 are determined by substituting this expression for y φ (t)in Eq. (2.53) and then equating coefficients of similar terms on both sides of the resulting expression. Although this method can be used only for inputs with a finite number of derivatives, this class of inputs includes a wide variety of the most commonly encountered signals in practice. Table 2.2 shows a variety of such inputs and the form of the forced response corresponding to each input. We shall demonstrate this procedure with an example. Table 2.2: Forced Response Open table as spreadsheet No.

Input x(t)

Forced Response

1

e ζt ζ ? ? i (i = 1,2,...,N)

βe ζt

2

e ζt ζ = λi

βt ζt

3

k (a constant)

β (a constant)

4

cos (ωt + θ)

βcos (ωt + θ)

5

(t r + a r-1 tr-1 + ... + α 1 t + α 0 )e ζt )

(βrtr + βr-1 tr-1 + ... + β1 t + β0 )e ζt )

Note: By definition, y φ (t) cannot have any characteristic mode terms. If any term appearing in the right-hand column for the forced response is also a characteristic mode of the system, the correct form of the forced response must be modified to ti y φ (t), where i is the smallest possible integer that can be used and still can prevent ti y φ (t) from having a characteristic mode term. For example, when the input is e ζt , the forced response (right-hand column) has the form βe ζt . But if e ζt happens to be a characteristic mode of the system, the correct form of the forced

response is βteζt (see pair 2). If teζt also happens to be a characteristic mode of the system, the correct form of the forced response is βt 2 e ζt , and so on. EXAMPLE 2.10 Solve the differential equation if the input and the initial conditions are y(0 + ) = 2 and y(0 + ) = 3. The characteristic polynomial of the system is Therefore, the characteristic modes are e −t and e -2t . The natural response is then a linear combination of these modes, so that Here the arbitrary constants K1 and K2 must be determined from the system's initial conditions. The forced response to the input t2 + 5t + 3, according to Table 2.2 (pair 5 with ζ = 0), is Moreover, y φ (t) satisfies the system equation [Eq. (2.53)]; that is,

Now

and

Substituting these results in Eq. (2.54) yields or Equating coefficients of similar powers on both sides of this expression yields

Solution of these three simultaneous equations yields β0 = 1, β1 = 1, and β2 = 0. Therefore The total system response y(t) is the sum of the natural and forced solutions. Therefore

so that Setting t = 0 and substituting y(0) = 2 y(0) = 3 in these equations, we have

The solution of these two simultaneous equations is K1 = 4 and K2 = −3. Therefore COMMENTS ON INTIAL CONDITIONS

In the classical method, the initial conditions are required at t = 0 + . The reason is that because at t = 0 − , only the zero-input component exists, and

the initial conditions at t = 0 − can be applied to the zero-input component only. In the classical method, the zero-input and zero-state components

cannot be separated Consequently, the initial conditions must be applied to the total response, which begins at t = 0 + . EXERCISE E2.15 An LTIC system is specified by the equation The input is x(t) = 6t2 . Find the following: a. The forced response y φ (t) b. The total response y(t) if the initial conditions are y(0 + ) = 25/18 and y(0 + ) = −2/3 Answers a. b.

THE EXPONENTIAL INPUT e ζ(t) The exponential signal is the most important signal in the study of LTIC systems. Interestingly, the forced response for an exponential input signal

turns out to be very simple. From Table 2.2 we see that the forced response for the input e ζt has the form βe ζt . We now show that β = Q(ζ)/P(ζ).[†]

To determine the constant β, we substitute y φt in the system equation [Eq. (2.53)] to obtain Now observe that

Consequently Therefore, Eq. (2.53) becomes and

Thus, for the input x(t) = e ζt u(t), the forced response is given by

where

This is an interesting and significant result. It states that for an exponential input e ζt the forced response y ζ(t) is the same exponential multiplied by H(ζ) = P(ζ)/Q(ζ). The total system response y(t) to an exponential input e ζt is then given by[‡]

where the arbitrary constants K1 , K2 ,..., KN are determined from auxiliary conditions. The form of Eq. (2.57) assumes N distinct roots. If the roots are not distinct, proper form of modes should be used. Recall that the exponential signal includes a large variety of signals, such as a constant (ζ = 0), a sinusoid (ζ = ± jω), and an exponentially growing or decaying sinusoid (ζ = σ ± jω). Let us consider the forced response for some of these cases. THE CONSTANT INPUT x(t) = C

Because C = C e 0t , the constant input is a special case of the exponential input Ceζt with ζ = 0. The forced response to this input is then given by

THE EXPONENTIAL INPUT e jωt Here ζ = jω and

THE SINUSOIDA INPUT x(t) = cos ωt

We know that the forced response for the input e ±jwt is H(±jw)e ±jwt . Since cos ωt = (e jωt + e −jwt )/2, the forced response to cos ωt is

Because the two terms on the right-hand side are conjugates, But so that

This result can be generalized for the input x(t) = cos (ωt + θ). The forced response in this case is

EXAMPLE 2.11 Solve the differential equation if the initial conditions are y(0 + ) = 2 and

and the input is

a. 10e −3t b. 5 c. e −2t d. 10 cos(3t + 30°) According to Example 2.10, the natural response for this case is For this case

a. For input x(t) = 10e −3t ζ = −3, and

The total solution (the sum of the forced and the natural response) is and The initial conditions are y(0 + ) = 2 and yields

. Setting t = 0 in the foregoing equations and then substituting the initial conditions

Solution of these equations yields K1 = −8 and K2 = 25. Therefore b. For input x (t) = 5 = 5e 0t , ζ = 0, and The complete solution is K1 e −t + K2 e −2t + 2te − t. Using the initial conditions, we determine K1 and K2 as in part (a). c. Here ζ = −2, which is also a characteristic root of the system. Hence (see pair 2, Table 2.2, or the note at the bottom of the table). To find β, we substitute yφ,(t) in the system equation to obtain or But

Consequently or Therefore, β = 2 so that

The complete solution is Ke −t + K2 e −2u . Using the initial conditions, we determine K1 and K2 as in part (a). d. For the input x(t) = 10cos (3 t + 30°), the forced response [see Eq. (2.61)] is where

Therefore

and The complete solution is K1 e −1 + K2 e −2t + 2.63cos (3t − 7.9°). We then use the initial conditions to determine K1 and K2 as in part (a). EXAMPLE 2.12 Use the classical method to find the loop current y(t) in the RLC circuit of Example 2.2 (Fig. 2.1) if the input voltage x(t) = 10 e −3t and the initial conditions are y(0 − ) = 0 and υc (0 − ) = 5. The zero-input and zero-state responses for this problem are found in Examples 2.2 and 2.6, respectively. The natural and forced responses appear

in Eq. (2.52b). Here we shall solve this problem by the classical method, which requires the initial conditions at t = 0 + . These conditions, already found in Eq. (2.15), are The loop equation for this system [see Example 2.2 or Eq. (1.55)] is The characteristic polynomial is λ2 + 3λ + 2 = (λ + 1)(λ + 2) Therefore, the natural response is The forced response, already found in part (a) of Example 2.11, is The total response is Differentiation of this equation yields Setting t = 0 + and substituting y(0 + ) = 0, y(0 + ) = 5 in these equations yields

Therefore which agrees with the solution found earlier in Eq. (2.52b). COMPUTER EXAMPLE C2.4 Solve the differential equation using the input x(t) = 5t + 3 and initial conditions y0 (0) = 2 and y0 (0) = 3. >>y = dsolve('D2y+3*Dy+2*y=5*t+3', y(0)=2', 'Dy(0)=3', 't'); >>disp (['y(t) = (',char(y), ')u(t) ' ]); y(t) = (-9/4+5/2*t+9*exp(-t)-19/4*exp(-2*t))u(t) Therefore, ASSESSMENT OF THE CLASSICAL METHOD The development in this section shows that the classical method is relatively simple compared with the method of finding the response as a sum of the zero-input and zero-state components. Unfortunately, the classical method has a serious drawback because it yields the total response, which cannot be separated into components arising from the internal conditions and the external input. In the study of systems it is important to be able to express the system response to an input x(t) as an explicit function of x(t). This is not possible in the classical method. Moreover, the classical

method is restricted to a certain class of inputs; it cannot be applied to any input. Another minor problem is that because the classical method yields total response, the auxiliary conditions must be on the total response which exists only for t ≥ 0 + . In practice we are most likely to know the

conditions at t = 0 − (before the input is applied). Therefore, we need to derive a new set of auxiliary conditions at t = 0 + from the known conditions at

t = 0 −.

If we must solve a particular linear differential equation or find a response of a particular LTIC system, the classical method may be the best. In the theoretical study of linear systems, however, the classical method is not so valuable. Caution We have shown in Eq. (2.52a) that the total response of an LTI system can be expressed as a sum of the zero-input and the zerostate components. In Eq. (2.52b), we showed that the same response can also be expressed as a sum of the natural and the forced components. We have also seen that generally the zero-input response is not the same as the natural response (although both are made of natural modes). Similarly, the zero-state response is not the same as the forced response. Unfortunately, such erroneous claims are often encountered in the literature. [†] This result is valid only if ζ is not a characteristic root of the system. [‡] Observe the closeness of Eqs. (2.57) and (2.47). Why is there a difference between the two equations? Equation (2.47) is the response to an

exponential that started at −∞, while Eq. (2.57) is the response to an exponential that starts at t = 0. As t → ∞, Eq. (2.57) approaches Eq. (2.47). In Eq. (2.47), the term y n (t), which starts at t = −∞, has already decayed at t = 0, and hence, is missing.

2.6 SYSTEM STABILITY To understand the intuitive basis for the BIBO (bounded-input/bounded-output) stability of a system introduced in Section 1.7, let us examine the stability concept as applied to a right circular cone. Such a cone can be made to stand forever on its circular base, on its apex, or on its side. For this reason, these three states of the cone are said to be equilibrium states. Qualitatively, however, the three states show very different behavior. If the cone, standing on its circular base, were to be disturbed slightly and then left to itself, it would eventually return to its original equilibrium position. In such a case, the cone is said to be in stable equilibrium. In contrast, if the cone stands on its apex, then the slightest disturbance will cause the cone to move farther and farther away from its equilibrium state. The cone in this case is said to be in an unstable equilibrium. The cone lying on its side, if disturbed, will neither go back to the original state nor continue to move farther away from the original state. Thus it is said to be in a neutral equilibrium. Clearly, when a system is in stable equilibrium, application of a small disturbance (input) produces a small response. In contrast, when the system is in unstable equilibrium, even a minuscule disturbance (input) produces an unbounded response. BIBO stability definition can be

understood in the light of this concept. If every bounded input produces bounded output, the system is (BIBO) stable. [†] In contrast, if even one bounded input results in unbounded response, the system is (BIBO) unstable. For an LTIC system

Therefore

Moreover, if x(t) is bounded, then |(x − τ)t < K1 < ∞, and

Hence for BIBO stability

This is a sufficient condition for BIBO stability. We can show that this is also a necessary condition (see Prob. 2.6-4). Therefore, for an LTIC system, if its impulse response h(t) is absolutely integrale, the system is (BIBO) stable. Otherwise it is (BIBO) unstable. In addition, we shall show in Chapter 4 that a necessary (but not sufficient) condition for an LTIC system described by Eq. (2.1) to be BIBO stable is M ≤ N. If M > N, the system is unstable. This is one of the reasons to avoid systems with M > N. Because the BIBO stability of a system can be ascertained by measurements at the external terminals (input and output), this is an external stability criterion. It is no coincidence that the BIBO criterion in (2.64) is in terms of the impulse response, which is an external description of the system. As observed in Section 1.9, the internal behavior of a system is not always ascertainable from the external terminals. Therefore, the external (BIBO) stability may not be correct indication of the internal stability. Indeed, some systems that appear stable by the BIBO criterion may be internally unstable. This is like a room inside a house on fire: no trace of fire is visible from outside, but the entire house will be burned to ashes. The BIBO stability is meaningful only for systems in which the internal and the external description are equivalent (controllable and observable systems). Fortunately, most practical systems fall into this category, and whenever we apply this criterion, we implicitly assume that the system in fact belongs to this category. The internal stability is all-inclusive, and the external stability can always be determined from the internal stability. For this

reason, we now investigate the internal stability criterion.

2.6-1 Internal (Asymptotic) Stability Because of the great variety of possible system behaviors, there are several definitions of internal stability in the literature. Here we shall consider a definition that is suitable for causal, linear, time-invariant (LTI) systems. If, in the absence of an external input, a system remains in a particular state (or condition) indefinitely, then that state is said to be an equilibrium state of the system. For an LTI system, zero state, in which all initial conditions are zero, is an equilibrium state. Now suppose an LTI system is in zero state and we change this state by creating small nonzero initial conditions (small disturbance). These initial conditions will generate signals consisting of characteristic modes in the system. By analogy with the cone, if the system is stable it should eventually return to zero state. In other words, when left to itself, every mode in a stable system arising as a result of nonzero initial conditions should approach 0 as t → ∞. However, if even one of the modes grows with time, the system will never return to zero state, and the system would be identified as unstable. In the borderline case, some modes neither decay to zero nor grow indefinitely, while all the remaining modes decay to zero. This case is like the neutral equilibrium in the cone. Such a system is said to be marginally stable. The internal stability is also called asymptotic stability or stability in the sense of Lyapunov. For a system characterized by Eq. (2.1), we can restate the internal stability criterion in terms of the location of the N characteristic roots λ1 , ? 2 ,..., λN of the system in a complex plane. The characteristic modes are of the form e λ k t or tr e λ k t . Location of roots in the complex plane and the

corresponding modes are shown in Fig. 2.17. These modes → 0 as t → ∞ if Re λk < 0 In contrast, the modes → ∞* ∞ if Ra λk≥0 [†] Hence, a system is (asymptotically) stable if all its characteristic roots lie in the LHP, that is, if Re λk > MS2P1 After execution, all the resulting variables are available in the workspace. For example, to view the characteristic roots, type: >> lambda lambda = -261.8034 -38.1966 Thus, the characteristic modes are simple decaying exponentials: e −261.8034t and e −38.1966t . Script files permit simple or incremental changes, thereby saving significant effort. Consider what happens when capacitor C 1 is changed from 1.0 μF to 1.0 μF. Changing MS2PI.m so that C = [1e−9, 1e−6] , allows computation of the new characteristic roots: >> MS2P1 >> lambda lambada = 1.0e+003 * -0.1500 + 3.1587i -0.1500 - 3.1587i Perhaps surprisingly, the characteristic modes are now complex exponentials capable of supporting oscillations. The imaginary portion of λ dictates an oscillation rate of 3158.7 rad/s or about 503 Hz. The real portion dictates the rate of decay. The time expected to reduce the amplitude to 25% is approximately t = In 0.25/Re≈ λ0.01 second.

M2.2 Function M-Files It is inconvenient to modify and save a script file each time a change of parameters is desired. Function M-files provide a sensible alternative. Unlike script M-files, function M-files can accept input arguments as well as return outputs. Functions truly extend the MATLAB language in ways that script files cannot. Syntactically, a function M-file is identical to a script M-file except for the first line. The general form of the first line is: function [output1, output2, ...,outputN] = filename(input1, input2,...,inputM) For example, consider modification of MS2P1. m to make function MS2P2.m. Component values are passed to the function as two separate inputs: a length-3 vector of resistor values and a length-2 vector of capacitor values. The characteristic roots are returned as a 2 × 1 complex vector. function [lambda] = MS2P2 (R, C) % MS2P2.m : MATLAB Session 2, Program 2 % Function M-file determines characteristic roots of % op-amp circuit. % INPUTS: R =length-3 vector of resistances % C = length-2 vector of capacitances % OUTPUTS: lambda = characteristic roots % Determine coefficients for characteristic equation: a0 = 1; a1 = (1/R(1) + 1/R(2) + 1/R (3))/C(2); a2 = 1/(R(1) *R (2) *C(1) *C(2)); A = [a0 a1 a2]; % Determine characteristic roots: lambda = roots (A); As with script M-files, function M-files execute by typing the name at the command prompt. However, inputs must also be included. For example, MS2P2 easily confirms the oscillatory modes of the preceding example. >> lambda = MS2P2([le4, le4, le4], [le-9, le-6]) lambda = 1.0e + 003 * -0.1500 + 3.1587i -0.1500 - 3.1587i Although scripts and functions have similarities, they also have distinct differences that are worth pointing out. Scripts operate on workspace data; functions must either be supplied data through inputs or create their own data. Unless passed as an output, variables and data created by functions

remain local to the function; variables or data generated by scripts are global and are added to the workspace. To emphasize this point, consider polynomial coefficient vector A, which is created and used in both MS2P1.m and MS2P2.m. Following execution of function MS2P2, the variable A is not added to the workspace. Following execution of script MS2P1, however, A is available in the workspace. Recall, the workspace is easily viewed by typing either who or whos.

M2.3 For-Loops Real resistors and capacitors never exactly equal their nominal values. Suppose that the circuit components are measured as R 1 = 10.322 k, R 2 = 9.952 k, R 3 = 10.115 k C 1 = 1.120nF, and C 2 = 1.320 μF. These values are consistent with the 10 and 25% tolerance resistor and capacitor values commonly and readily available. MS2P2.m uses these component values to calculate the new values of λ. >> lambda = MS2P2 ([10322, 9592, 10115], [1.12e-9, 1.32e-6]) lambda = 1.0e+003 * -0.1136 + 2.6113i -0.1136 - 2.6113i Now the natural modes oscillate at 2611.3 rad/s or about 416 Hz. Decay to 25% amplitude is expected in t = In 0.25/(−113.6) ≈ 0.012 second. These values, which differ significantly from the nominal values of 503 Hz and t ≈ 0.01 second, warrant a more formal investigation of the effect of component variations on the locations of the characteristic roots. It is sensible to look at three values for each component: the nominal value, a low value, and a high value. Low and high values are based on component tolerances. For example, a 10% 1k Ω resistor could have an expected low value of 1000(1 − 0.1) = 900Ω and an expected high value of 1000(1 + 0.1) = 1100 Ω. For the five passive components in the design, 3 5 = 243 permutations are possible.

Using either MS2 PI.m or MS2 P2 .m to solve each of the 243 cases would be very tedious and boring. For-loops help automate repetitive tasks such as this. In MATLAB, the general structure of a for statement is: for variable = expression, statement,..., statement, end Five nested for-loops, one for each passive component, are required for the present example. % MS2P3.m : MATLAB Session 2, Program 3 % Script M-file determines characteristic roots over % a range of component values. % Pre-allocate memory for all computed roots: lambda = zeros(2, 243); % Initialize index to identify each permutation: p=0; for R1 = le4* [0.9, 1.0, 1.1], for R2 = le4* [0.9, 1.0, 1.1], for R3 = le4* [0.9, 1.0, 1.1], for C1 = le-9* [0.75, 1.0, 1.25], for C2 = le-6*[0.75,1.0,1.25], p = p+1; lambda (:, p) = MS2P2 ([R1 R2 R3], [C1 C2]); end end end end end plot (real(lambda(:)), imag(lambda(:)), 'kx',... real (lambda(:, 1)), image (lambda(:, 1)), 'kv',... real (lambda(:, end)), imag(lambda(:, end)), 'k^') xlabel ('Real'), ylabel ('Imaginary') legend('Characteristic Roots', 'Min-Component Values Roots',... 'Max-Component Values Roots', 0); The command lambda = zeros (2,243) preallocates a 2 × 243 array to store the computed roots. When necessary, MATLAB performs dynamic memory allocation, so this command is not strictly necessary. However, preallocation significantly improves script execution speed. Notice also that it would be nearly useless to call script MS2P1 from within the nested loop; script file parameters cannot be changed during execution. The plot instruction is quite long. Long commands can be broken across several lines by terminating intermediate lines with three dots (...). The three dots tell MATLAB to continue the present command to the next line. Black x's locate roots of each permutation. The command lambda (:) vectorizes the 2 × 243 matrix lambda into a 486 × 1 vector. This is necessary in this case to ensure that a proper legend is generated. Because of loop order, permutation p = 1 corresponds to the case of all components at the smallest values and permutation p = 243 corresponds to the case of all components at the largest values. This information is used to separately highlight the minimum and maximum cases using down-triangles (∇) and up-triangles (Δ), respectively. In addition to terminating each for loop, end is used to indicate the final index along a particular dimension, which eliminates the need to remember the particular size of a variable. An overloaded function, such as end, serves multiple uses and is typically interpreted based on context. The graphical results provided by MS2P3 are shown in Fig. M2.2. Between extremes, root oscillations vary from 365 to 745 Hz and decay times to 25% amplitude vary from 6.2 to 12.7 ms. Clearly, this circuit's behavior is quite sensitive to ordinary component variations.

Figure M2.2: Effect of component values on characteristic root locations.

M2.4 Graphical Understanding of Convolution MATLAB graphics effectively illustrate the convolution process. Consider the case of y(t) = x(t) * h(t), where x(t) = sin (πt)(u(t) − u(t − 1)) and h(t) =1.5(u(t) − u(t − 1.5)) −u(t − 2) + u(t − 2.5). Program MS2P4 steps through the convolution over the time interval (−0.25 ≤ t ≤ 3.75). % MS2p4.m : MATLAB Session 2, Program 4 % Script M-file graphically demonstrates the convolution process. figure (1) % Create figure window and make visible on screen x = inline('1.5*sin(pi*t).*(t>=0 & t=0&t=2&t> for k = 1:length(n)-2, >> y(k + 2) = y(k+1) - 0.24*y(k) + x(k+2) - 2*x(k+1); >> end; >> clf; stem(n,y,'k'); xlabel('n'); ylabel('y[n]'); >> disp(' n y'); disp([num2str([n,y])]); n y -2 1 -1 2 0 1.76 1 2.28 2 1.8576 3 0.3104 4 -2.13542 5 -5.20992 6 -8.69742 7 -12.447 8 -16.3597 9 -20.3724 10 -24.4461

Figure C3.3 We shall see in the future that the solution of a difference equation obtained in this direct (iterative) way is useful in many situations. Despite the many uses of this method, a closed-form solution of a difference equation is far more useful in study of the system behavior and its dependence on the input and the various system parameters. For this reason we shall develop a systematic procedure to analyze discrete-time systems along lines similar to those used for continuous-time systems. OPERATIONAL NOTATION In difference equations it is convenient to use operational notation similar to that used in differential equations for the sake of compactness. In continuous-time systems we used the operator D to denote the operation of differentiation. For discrete-time systems we shall use the operator E to denote the operation for advancing a sequence by one time unit. Thus

The first-order difference equation of the savings account problem was found to be [see Eq. (3.9b)]

Using the operational notation, we can express this equation as or

The second-order difference equation (3.10b) can be expressed in operational notation as A general Nth-order difference Eq. (3.17a) can be expressed as

or

where Q[E] and P[E] are Nth−order polynomial operators

RESPONSE OF LINEAR DISCRETE-TIME SYSTEMS Following the procedure used for continuous-time systems, we can show that Eq. (3.24) is a linear equation (with constant coefficients). A system described by such an equation is a linear time-invariant, discrete-time (LTID) system. We can verify, as in the case of LTIC systems (see the footnote on page 152), that the general solution of Eq. (3.24) consists of zero-input and zero-state components. [†] Equations such as (3.9), (3.10), (3.12), and (3.15) are considered to be linear according to the classical definition of linearity. Some authors label

such equations as incrementally linear. We prefer the classical definition. It is just a matter of individual choice and makes no difference in the final results.

3.6 SYSTEM RESPONSE TO INTERNAL CONDITIONS: THE ZERO-INPUT RESPONSE The zero-input response y 0 [n] is the solution of Eq. (3.24) with x[n] = 0; that is

or

or

We can solve this equation systematically. But even a cursory examination of this equation points to its solution. This equation states that a linear combination of y 0 [n] and advanced y 0 [n] is zero, not for some values of n, but for all n. Such situation is possible if and only if y 0 [n] and advanced y 0 [n] have the same form. Only an exponential function γ n has this property, as the following equation indicates.

Equation (3.28) shows that γ n advanced by k units is a constant (γ k ) times γ n . Therefore, the solution of Eq. (3.27) must be of the form[†]

To determine c and γ, we substitute this solution in Eq. (3.27b). Equation (3.29) yields

Substitution of this result in Eq. (3.27b) yields

For a nontrivial solution of this equation

or

Our solution cγ n [Eq. (3.29)] is correct, provided γ satisfies Eq. (3.32). Now, Q[γ] is an Nth−order polynomial and can be expressed in the factored form (assuming all distinct roots):

Clearly, γ has N solutions γ 1 , ? 2 ,...,γ N and, therefore, Eq. (3.27) also has N solutions c 1 γ n 1 , c 2 ? n 2 ,..., c n γ n N. In such a case, we have shown that the general solution is a linear combination of the N solutions (see the footnote on page 153). Thus

where ? 1 , ? 2 ,...,γ n are the roots of Eq. (3.32) and c 1 , c 2 ,..., c n are arbitrary constants determined from N auxiliary conditions, generally given in the form of initial conditions. The polynomial Q[γ] is called the characteristic polynomial of the system, and

is the characteristic equation of the system. Moreover, ? 1 , ? 2 ,...,γ n , the roots of the characteristic equation, are called characteristic roots or characteristic values (also eigenvalues) of the system. The exponentials γ n i (i = 1, 2,..., N) are the characteristic modes or natural modes of the system. A characteristic mode corresponds to each characteristic root of the system, and the zero-input response is a linear combination of the characteristic modes of the system. REPEATED ROOTS

So far we have assumed the system to have N distinct characteristic roots γ 1 , γ 2 ,...,γ N with corresponding characteristic modes γ n 1 , ? n 2 ,...,γ n N. If two or more roots coincide (repeated roots), the form of characteristic modes is modified. Direct substitution shows that if a root γ repeats r times

(root of multiplicity r), the corresponding characteristic modes for this root are γ n , nγ n ,n 2 ? n ..., n r−1 γ n . Thus, if the characteristic equation of a system is

the zero-input response of the system is

COMPLEX ROOTS As in the case of continuous-time systems, the complex roots of a discrete-time system will occur in pairs of conjugates if the system equation coefficients are real. Complex roots can be treated exactly as we would treat real roots. However, just as in the case of continuous-time systems, we can also use the real form of solution as an alternative. First we express the complex conjugate roots γ and γ * in polar form. If |γ| is the magnitude and β is the angle of γ, then The zero-input response is given by

For a real system, c 1 and c 2 must be conjugates so that y 0 [n] is a real function of n. Let

Then

where c and θ are arbitrary constants determined from the auxiliary conditions. This is the solution in real form, which avoids dealing with complex numbers. EXAMPLE 3.10 a. For an LTID system described by the difference equation

find the total response if the initial conditions are y[−1] = 0 and y[−2] = 25/4, and if the input x[n] = 4 −n u[n]. In this example we shall determine the zero-input component y 0 [n] only. The zero-state component is determined later, in Example 3.14. The system equation in operational notation is

The characteristic polynomial is

The characteristic equation is

The characteristic roots are γ 1 = −0.2 and γ 2 = 0.8. The zero-input response is

To determine arbitrary constants c 1 and c 2 , we set n = −1 and −2 in Eq. (3.40), then substitute y 0 [−1] = 0 and y 0 [−2] = 25/4 to

obtain [†]

Therefore

The reader can verify this solution by computing the first few terms using the iterative method (see Examples 3.8 and 3.9). b. A similar procedure may be followed for repeated roots. For instance, for a system specified by the equation Let us determine y 0 [n], the zero-input component of the response if the initial conditions are y 0 [−1] = −1/3 and y 0 [−2] = −2/9. The characteristic polynomial is γ 2 + 6γ + 9 = (γ + 3) 2 , and we have a repeated characteristic root at γ = −3. The characteristic modes are (−3) n and n(−3) n . Hence, the zero-input response is We can determine the arbitrary constants c 1 and c 2 from the initial conditions following the procedure in part (a). It is left as an exercise for the reader to show that c 1 = 4 and c 2 = 3 so that c. For the case of complex roots, let us find the zero-input response of an LTID system described by the equation when the initial conditions are y 0 [−1] = 2 and y 0 [−2] = 1. The characteristic polynomial is (γ 2 − 1.56γ + 0.81) = (γ − 0.78 − j0.45)(γ − 0.78 + j0.45). The characteristic roots are 0.78 ± j0.45; that is, 0.9e ±j(π/6). We could immediately write the solution as

Setting n = −1 and −2 and using the initial conditions y 0 [−1] = 2 and y 0 [−2] = 1, we find c = 2.34e −j0.17 and c* = 2.34e j0.17. Alternately, we could also find the solution by using the real form of solution, as given in Eq. (3.37b). In the present case, the roots

are 0.9e ±j(π/6). Hence, |γ| = 0.9 and β = π/6, and the zero-input response, according to Eq. (3.37b), is given by

To determine the arbitrary constants c and θ, we set n = −1 and −2 in this equation and substitute the initial conditions y 0 [−1] = 2, y 0 [−2] = 1 to obtain

or

These are two simultaneous equations in two unknowns c cos θ and c sin θ. Solution of these equations yields

Dividing c sin θ by c cos θ yields

Substituting θ = −0.17 radian in c cos θ = 2.308 yields c = 2.34 and

Observe that here we have used radian unit for both β and θ. We also could have used the degree unit, although this practice is not recommended. The important consideration is to be consistent and to use the same units for both β and θ. EXERCISE E3.11

Find and sketch the zero-input response for the systems described by the following equations: a. y[n + 1] − 0.8y[n] = 3x[n + 1] b. y[n + 1] + 0.8y[n] = 3x[n + 1] In each case the initial condition is y[−1] = 10. Verify the solutions by computing the first three terms using the iterative method.

Answers

a. 8(0.8)n b. −8(−0.8) n

EXERCISE E3.12

Find the zero-input response of a system described by the equation The initial conditions are y 0 [−1] = 1 and y 0 [−2] = 33. Verify the solution by computing the first three terms iteratively.

Answers y [n] = (0.2)n + 2(−0.5) n 0 EXERCISE E3.13

Find the zero-input response of a system described by the equation The initial conditions are y 0 [−1] = −1/(2√2) and y 0 [−2] = 1/(4√2). Verify the solution by computing the first three terms iteratively.

Answers

COMPUTER EXAMPLE C3.4 Using the initial conditions y[−1] = 2 and y[−2] = 1, find and sketch the zero-input response for the system described by (E2 − 1.56E + 0.81)y[n] = (E + 3)x[n]. >> n = (-2:20)'; y=[1;2;zeros(length(n)-2,1)]; >> for k = 1:length(n)-2 >> y(k+2) = 1.56*y(k+1) -0.81*y(k); >> end >> clf; stem(n,y,'k'); xlabel('n'); ylabel(y[n]');

Figure C3.4 [†] A signal of the form n m γ n also satisfies this requirement under certain conditions (repeated roots), discussed later. [†] The initial conditions y[−1] and y[−2] are the conditions given on the total response. But because the input does not start until n = 0, the zero-

state response is zero for n < 0. Hence, at n = −1 and −2 the total response consists of only the zero-input component, so that y[−1] = y 0 [−1] and y[−2] = y 0 [−2].

3.7 THE UNIT IMPULSE RESPONSE h[n] Consider an nth-order system specified by the equation

or

The unit impulse response h[n] is the solution of this equation for the input δ[n] with all the initial conditions zero; that is,

subject to initial conditions

Equation (3.43) can be solved to determine h[n] iteratively or in a closed form. The following example demonstrates the iterative solution. EXAMPLE 3.11: (Iterative Determination of h[n]) Find h[n], the unit impulse response of a system described by the equation

To determine the unit impulse response, we let the input x[n] = δ[n] and the output y[n] = h[n] in Eq. (3.45) to obtain

subject to zero initial state; that is, h[−1] = h[−2] = 0. Setting n = 0 in this equation yields Next, setting n = 1 in Eq. (3.46) and using h[0] = 5, we obtain Continuing this way, we can determine any number of terms of h[n]. Unfortunately, such a solution does not yield a closed-form expression for h[n]. Nevertheless, determining a few values of h[n] can be useful in determining the closed-form solution, as the following development shows. THE CLOSED-FORM SOLUTION OF h[n] Recall that h[n] is the system response to input δ[n], which is zero for n > 0. We know that when the input is zero, only the characteristic modes can be sustained by the system. Therefore, h[n] must be made up of characteristic modes for n > 0. At n = 0, it may have some nonzero value A0 ,

so that a general form of h[n] can be expressed as[†]

where y c [n] is a linear combination of the characteristic modes. We now substitute Eq. (3.47) in Eq. (3.43) to obtain Q[E] (A0 δ[n] + y c [n]u[n] = P[E]δ[n]). Because y c [n] is made up of characteristic modes. Q[E]y c [n]u[n] = 0, and we obtain A0 Q[E]δ[n] = P[E]δ[n], that is, Setting n = 0 in this equation and using the fact that δ[m] = 0 for all m ≠ 0, and δ[0] = 1, we obtain

Hence [‡]

The N unknown coefficients in y c [n] (on the right-hand side) can be determined from a knowledge of N values of h[n]. Fortunately, it is a straightforward task to determine values of h[n] iteratively, as demonstrated in Example 3.11. We compute N values h[0], h[1], h[2],..., h[N - 1] iteratively. Now, setting n = 0,1,2,..., N − 1 in Eq. (3.49), we can determine the N unknowns in y c [n]. This point will become clear in the following example. EXAMPLE 3.12 Determine the unit impulse response h[n] for a system in Example 3.11 specified by the equation This equation can be expressed in the advance operator form as

or

The characteristic polynomial is The characteristic modes are (−0.2) n and (0.8)n . Therefore

Also, from Eq. (3.51), we have a N = −0.16 and b N = 0. Therefore, according to Eq. (3.49)

To determine c 1 and c 2 , we need to find two values of h[n] iteratively. This step is already taken in Example 3.11, where we determined that h[0] = 5 and h[1] = 3. Now, setting n = 0 and 1 in Eq. (3.53) and using the fact that h[0] = 5 and h[1] = 3, we obtain

Therefore

COMPUTER EXAMPLE C3.5 Use MATLAB to solve Example 3.12. There are several ways to find the impulse response using MATLAB. In this method, we first specify the input as a unit impulse function. Vectors a and b are created to specify the system. The filter command is then used to determine the impulse response. In fact, this method can be used to determine the zero-state response for any input. >> n = (0: 19); x = inline ('n==0'); >> a = [1 -0.6 -0.16]; b = [5 0 0]; >> h = filter (b,a,x(n)); >> clf; stem(n,h,'k'); xlabel ('n'); ylabel('h[n]');

Figure C3.5 Comment. Although it is relatively simple to determine the impulse response h[n] by using the procedure in this section, in Chapter 5 we shall discuss the much simpler method of the z−transform. EXERCISE E3.14 Find h[n], the unit impulse response of the LTID systems specified by the following equations: a. y[n + 1] − y[n] = x[n] b. y[n] − 5y[n − 1] + 6y[n − 2] = 8x[n − 1] − 19x[n − 2] c. y[n + 2] − 4y[n + 1] + 4y[n] = 2x[n + 2] − 2x[n + 1] d. y[n] = 2x[n] − 2x[n − 1] Answers

a. h[n] = u[n − 1] b. c. h[n] = (2 + n)2 n u[n] d. h[n] = 2δ[n] − 2δ[n − 1]

[†] We assumed that the term y [n] consists of characteristic modes for n > 0 only. To reflect this behavior, the characteristic terms should be c expressed in the form γ n j u[n − 1]. But because u[n − 1] = u[n] − δ[n], c j γ n j u[n − 1] = c j γ n j u[n] − c j δ[n], and y c [n] can be expressed in terms of exponentials δn j u[n] (which start at n = 0), plus an impulse at n = 0. [‡] If a = 0, then A cannot be determined by Eq. (3.48). In such a case, we show in Section 3.12 that h[n] is of the form A δ[n] + A δ[n − 1] + N 0 0 1

y c [n]u[n]. We have here N + 2 unknowns, which can be determined from N + 2 values h[0], h[1],..., h[N + 1] found iteratively.

3.8 SYSTEM RESPONSE TO EXTERNAL INPUT: THE ZERO-STATE RESPONSE The zero-state response y[n] is the system response to an input x[n] when the system is in the zero state. In this section we shall assume that systems are in the zero state unless mentioned otherwise, so that the zero-state response will be the total response of the system. Here we follow the procedure parallel to that used in the continuous-time case by expressing an arbitrary input x[n] as a sum of impulse components. A signal x[n] in Fig. 3.16a can be expressed as a sum of impulse components such as those depicted in Fig. 3.16b-3.16f. The component of x[n] at n = m is x[m]δ[n − m], and x[n] is the sum of all these components summed from m = −∞ to ∞. Therefore

Figure 3.16: Representation of an arbitrary signal x[n] in terms of impulse components. For a linear system, knowing the system response to impulse δ[n], the system response to any arbitrary input could be obtained by summing the system response to various impulse components. Let h[n] be the system response to impulse input δ[n]. We shall use the notation to indicate the input and the corresponding response of the system. Thus, if then because of time invariance and because of linearity and again because of linearity

The left-hand side is x[n] [see Eq. (3.55)], and the right-hand side is the system response y[n] to input x[n]. Therefore [†]

The summation on the right-hand side is known as the convolution sum of x[n] and h[n], and is represented symbolically by x[n] * h[n]

PROPERTIES OF THE CONVOLUTION SUM The structure of the convolution sum is similar to that of the convolution integral. Moreover, the properties of the convolution sum are similar to those of the convolution integral. We shall enumerate these properties here without proof. The proofs are similar to those for the convolution integral and may be derived by the reader. The Commutative Property.

The Distributive Property.

The Associative Property.

The Shifting Property. If then

The Convolution with an Impulse.

The Width Property. If x 1 [n] and x 2 [n] have finite widths of W 1 and W 2 , respectively, then the width of x 1 [n] * x 2 [n] is W 1 + W 2 . The width of a signal is one less than the number of its elements (length). For instance, the signal in Fig. 3.17h has six elements (length of 6) but a width of only 5. Alternately, the property may be stated in terms of lengths as follows: if x 1 [n] and x 2 [n] have finite lengths of L 1 and L 2 elements, respectively, then the length of x 1 [n] * x 2 [n] is L 1 + L 2 − 1 elements. CAUSALITY AND ZERO-STATE RESPONSE In deriving Eq. (3.56), we assumed the system to be linear and time invariant. There were no other restrictions on either the input signal or the system. In our applications, almost all the input signals are causal, and a majority of the systems are also causal. These restrictions further simplify the limits of the sum in Eq. (3.56). If the input x[n] is causal, x[m] = 0 for m < 0. Similarly, if the system is causal (i.e., if h[n] is causal), then h[x] = 0 for negative x, so that h[n − m] = 0 when m > n. Therefore, if x[n] and h[n] are both causal, the product x[m]h[n − m] = 0 for m < 0 and for m > n, and it is nonzero only for the range 0 ≤ m ≤ n. Therefore, Eq. (3.56) in this case reduces to

We shall evaluate the convolution sum first by an analytical method and later with graphical aid. EXAMPLE 3.13 Determine c[n] = x[n] * g[n] for We have

Note that Both x[n] and g[n] are causal. Therefore, [see Eq. (3.63)]

In this summation, m lies between 0 and n (0 ≤ m ≤ n). Therefore, if n ≥ 0, then both m and n − m ≤ 0, so that u[m] = u[n − m] = 1. If n < 0, m is negative because m lies between 0 and n, and u[m] = 0. Therefore, Eq. (3.64) becomes

and

This is a geometric progression with common ratio (0.8/0.3). From Section B.7-4 we have

EXERCISE E3.15 Show that (0.8)n u[n] * u[n] = 5[1 − (0.8)n+1 ]u[n]. CONVOLUTION SUM FROM A TABLE Just as in the continuous-time case, we have prepared a table (Table 3.1) from which convolution sums may be determined directly for a variety of signal pairs. For example, the convolution in Example 3.13 can be read directly from this table (pair 4) as

Table 3.1: Convolution Sums

We shall demonstrate the use of the convolution table in the following example. EXAMPLE 3.14 Find the (zero-state) response y[n] of an LTID system described by the equation If the input x[n] = 4 −n u[n]. The input can be expressed as x[n] = 4 −n u[n] = (1/4)n u[n] = (0.25)n u[n]. The unit impulse response of this system was obtained in Example 3.12. Therefore

We use pair 4 (Table 3.1) to find the foregoing convolution sums.

Recognizing that We can express y[n] as

EXERCISE E3.16 Show that

EXERCISE E3.17 Show that

EXERCISE E3.18 Show that

COMPUTER EXAMPLE C3.6 Find and sketch the zero-state response for the system described by (E2 + 6E + 9)y[n] = (2E2 + 6E)x[n] for the input x[n] = 4 −n u[n]. Although the input is bounded and quickly decays to zero, the system itself is unstable and an unbounded output results. >> n = (0:11); x = inline('(4.^(-n)).*(n>=0)'); >> a = [1 6 9]; b = [2 6 0]; >> y = filter (b,a,x(n)); >> clf; stem(n,y,'k'); xlabel ('n'); ylabel('y[n]');

Figure C3.6 RESPONSE TO COMPLEX INPUTS As in the case of real continuous-time systems, we can show that for an LTID system with real h[n], if the input and the output are expressed in terms of their real and imaginary parts, then the real part of the input generates the real part of the response and the imaginary part of the input generates the imaginary part. Thus, if

using the right-directed arrow to indicate the input-output pair, we can show that

The proof is similar to that used to derive Eq. (2.40) for LTIC systems. MULTIPLE INPUTS Multiple inputs to LTI systems can be treated by applying the superposition principle. Each input is considered separately, with all other inputs assumed to be zero. The sum of all these individual system responses constitutes the total system output when all the inputs are applied simultaneously.

3.8-1 Graphical Procedure for the Convolution Sum The steps in evaluating the convolution sum are parallel to those followed in evaluating the convolution integral. The convolution sum of causal signals x[n] and g[n] is given by

We first plot x[m] and g[n − m] as functions of m (not n), because the summation is over m. Functions x[m] and g[m] are the same as x[n] and g[n], plotted respectively as functions of m (see Fig. 3.17). The convolution operation can be performed as follows: 1. Invert g[m] about the vertical axis (m = 0) to obtain g[−m] (Fig. 3.17d). Figure 3.17e shows both x[m] and g[−m]. 2. Shift g[−m] by n units to obtain g[n − m]. For n > 0, the shift is to the right (delay); for n < 0, the shift is to the left (advance). Figure 3.17f shows g[n − m] for n > 0; for n < 0, see Fig. 3.17g.

3. Next we multiply x[m] and g[n − m] and add all the products to obtain c[n]. The procedure is repeated for each value of n over the range −∞ to ∞. We shall demonstrate by an example the graphical procedure for finding the convolution sum. Although both the functions in this example are causal, this procedure is applicable to general case. EXAMPLE 3.15 Find where x[n] and g[n] are depicted in Fig. 3.17a and 3.17b, respectively.

Figure 3.17: Graphical understanding of convolution of x[n] and g[n]. We are given Therefore Figure 3.17f shows the general situation for n ≥ 0. The two functions x[m] and g[n − m] overlap over the interval 0 ≤ m ≤ n. Therefore

For n < 0, there is no overlap between x[m] and g[n − m], as shown in Fig. 3.17g so that and which agrees with the earlier result in Eq. (3.65). EXERCISE E3.19

Find (0.8)n u[n] * u[n] graphically and sketch the result. Answers

AN ALTERNATIVE FORM OF GRAPHICAL PROCEDURE: THE SLIDING-TAPE METHOD This algorithm is convenient when the sequences x[n] and g[n] are short or when they are available only in graphical form. The algorithm is basically the same as the graphical procedure in Fig. 3.17. The only difference is that instead of presenting the data as graphical plots, we display it as a sequence of numbers on tapes. Otherwise the procedure is the same, as will become clear in the following example. EXAMPLE 3.16 Use the sliding-tape method to convolve the two sequences x[n] and g[n] depicted in Fig. 3.18a and 3.18b, respectively.

Figure 3.18: Sliding-tape algorithm for discrete-time convolution. In this procedure we write the sequences x[n] and g[n] in the slots of two tapes: x tape and g tape (Fig. 3.18c). Now leave the x tape stationary (to correspond to x[m]). The g[−m] tape is obtained by inverting the g[m] tape about the origin (m = 0) so that the slots corresponding to x[0] and g[0] remain aligned (Fig. 3.18d). We now shift the inverted tape by n slots, multiply values on two tapes in adjacent slots, and add all the products to find c[n]. Figure 3.18d-3.18i shows the cases for n = 0-5. Figure 3.18j-3.18k, and 3.181 shows the cases for n = −1, −2, and −3, respectively. For the case of n = 0, for example (Fig. 3.18d) For n = 1 (Fig. 3.18e) Similarly,

Figure 3.18i shows that c[n] = 7 for n ≥ 4 Similarly, we compute c[n] for negative n by sliding the tape backward, one slot at a time, as shown in the plots corresponding to n = −1, −2, and −3, respectively (Fig. 3.18j, 3.18k, and 3.181).

Figure 3.181 shows that c[n] = 0 for n ≤ 3. Figure 3.18m shows the plot of c[n]. EXERCISE E3.20 Use the graphical procedure of Example 3.16 (sliding-tape technique) to show that x[n]*g[n] = c[n] in Fig. 3.19. Verify the width property of convolution.

Figure 3.19 COMPUTER EXAMPLE C3.7 For the signals x[n] and g[n] depicted in Fig. 3.19, use MATLAB to compute and plot c[n] = x[n] * g[n]. >> x = [0 1 2 3 2 1]; [1 1 1 1 1 1]; >> n= (0:1:length(x)+length(g)-2); >> c=conv(x,g); >> clf; stem(n, c, 'k'); xlabel('n'); ylabel('c[n]');

Figure C3.7

3.8-2 Interconnected Systems As with continuous-time case, we can determine the impulse response of systems connected in parallel (Fig. 3.20a) and cascade (Fig. 3.20b, 3.20c). We can use arguments identical to those used for the continuous-time systems in Section 2.4-3 to show that if two LTID systems S1 and S2 with impulse response h 1 [n] and h 2 [n], respectively, are connected in parallel, the composite parallel system impulse response is h 1 [n] + h 2 [n]. Similarly, if these systems are connected in cascade (in any order), the impulse response of the composite system is h 1 [n] *h 2 [n]. Moreover, because h 1 [n] *h 2 [n] = h 2 [n] *h 1 [n], linear systems commute. Their orders can be interchanged without affecting the composite system behavior.

Figure 3.20: Interconnected systems. INVERSE SYSTEMS If the two systems in cascade are inverse of each other, with impulse responses h[n] and h i [n], respectively, then the impulse response of the cascade of these systems is h[n] * h i [n]. But, the cascade of a system with its inverse is an identity system, whose output is the same as the input. Hence, the unit impulse response of an identity system is δ[n]. Consequently

As an example, we show that an accumulator system and a backward difference system are inverse of each other. An accumulator system is specified by[†]

The backward difference system is specified by

From Eq. (3.68a), we find h acc [n], the impulse response of the accumulator, as

Similarly, from Eq. (3.68b), h bdf [n], the impulse response of the backward difference system is given by

We can verify that Roughly speaking, in discrete-time systems, an accumulator is analogous to an integrator in continuous-time systems, and a backward difference system is analogous to a differentiator. We have already encountered examples of these systems in Examples 3.6 and 3.7 (digital differentiator and integrator). SYSTEM RESPONSE TO ∑ nk=−∞ x[k] Figure 3.20d shows a cascade of two LTID systems: a system S with impulse response h[n], followed by an accumulator. Figure 3.20e shows a cascade of the same two systems in reverse order: an accumulator followed by S. In Fig. 3.20d, if the input x[n] to S results in the output y[n], then the output of the system 3.20d is the ∑ y[k]. In Fig. 3.20e, the output of the accumulator is the sum ∑ x[k]. Because the output of the system in Fig. 3.20e is identical to that of system Fig. 3.20d, it follows that

If we let x[n] = δ[n] and y[n] = h[n] in Eq. (3.70a), we find that g[n], the unit step response of an LTID system with impulse response h[n], is given by

The reader can readily prove the inverse relationship

3.8-3 A Very Special Function for LTID Systems: The Everlasting Exponential zn In Section 2.4-4, we showed that there exists one signal for which the response of an LTIC system is the same as the input within a multiplicative constant. The response of an LTIC system to an everlasting exponential input e st is H(s)e st , where H(s) is the system transfer function. We now show that for an LTID system, the same role is played by an everlasting exponential z n . The system response y[n] in this case is given by

For causal h[n], the limits on the sum on the right-hand side would range from 0 to ∞. In any case, this sum is a function of z. Assuming that this sum converges, let us denote it by H[z]. Thus,

where

Equation (3.71a) is valid only for values of z for which the sum on the right-hand side of Eq. (3.71b) exists (converges). Note that H[z] is a

constant for a given z. Thus, the input and the output are the same (within a multiplicative constant) for the everlasting exponential input z n . H[z], which is called the transfer function of the system, is a function of the complex variable z. An alternate definition of the transfer function H[z] of an LTID system from Eq. (3.71a) as

The transfer function is defined for, and is meaningful to, LTID systems only. It does not exist for nonlinear or time-varying systems in general. We repeat again that in this discussion we are talking of the everlasting exponential, which starts at n = −∞, not the causal exponential z n u[n], which starts at n = 0. For a system specified by Eq. (3.24), the transfer function is given by

This follows readily by considering an everlasting input x[n] = z n . According to Eq. (3.72), the output is y[n] = H[z]z n . Substitution of this x[n] and y[n] in Eq. (3.24b) yields Moreover Hence Consequently,

EXERCISE E3.21 Show that the transfer function of the digital differentiator in Example 3.6 (big shaded block in Fig. 3.14b) is given by H[z] = (z − 1)/Tz, and the transfer function of an unit delay, specified by y[n] = x[n − 1], is given by 1/z.

3.8-4 Total Response The total response of an LTID system can be expressed as a sum of the zero-input and zero-state components:

In this expression, the zero-input component should be appropriately modified for the case of repeated roots. We have developed procedures to determine these two components. From the system equation, we find the characteristic roots and characteristic modes. The zero-input response is a linear combination of the characteristic modes. From the system equation, we also determine h[n], the impulse response, as discussed in Section 3.7. Knowing h[n] and the input x[n], we find the zero-state response as the convolution of x[n] and h[n]. The arbitrary constants c 1 , c 2 ,..., c n in the zero-input response are determined from the n initial conditions. For the system described by the equation with initial conditions y[−1] = 0, y[−2] = 25/4 and input x[n] = (4)−n u[n], we have determined the two components of the response in Examples 3.10a and 3.14, respectively. From the results in these examples, the total response for n ≥ 0 is

NATURAL AND FORCED RESPONSE

The characteristic modes of this system are (−0.2) n and (0.8)n . The zero-input component is made up of characteristic modes exclusively, as expected, but the characteristic modes also appear in the zero-state response. When all the characteristic mode terms in the total response are lumped together, the resulting component is the natural response. The remaining part of the total response that is made up of noncharacteristic modes is the forced response. For the present case, Eq. (3.74) yields

[†] In deriving this result, we have assumed a time-invariant system. The system response to input δ[n − m] for a time-varying system cannot be

expressed as h[n − m], but instead has the form h[n, m]. Using this form, Eq. (3.56) is modified as follows:

[†] Equations (3.68a) and (3.68b) are identical to Eqs. (3.14a) and (3.12), respectively, with T = 1.

3.9 CLASSICAL SOLUTION OF LINEAR DIFFERENCE EQUATIONS As in the case of LTIC systems, we can use the classical method, in which the response is obtained as a sum of natural and forced components of the response, to analyze LTID systems. FINDING NATURAL AND FORCED RESPONSE As explained earlier, the natural response of a system consists of all the characteristic mode terms in the response. The remaining noncharacteristic mode terms form the forced response. If y c [n] and y φ [n] denote the natural and the forced response respectively, then the total response is given by

Because the total response y c [n] + y φ [n] is a solution of the system equation (3.24b), we have

But since y c [n] is made up of characteristic modes,

Substitution of this equation in Eq. (3.77) yields

The natural response is a linear combination of characteristic modes. The arbitrary constants (multipliers) are determined from suitable auxiliary conditions usually given as y[0], y[1],..., y[n − 1]. The reasons for using auxiliary instead of initial conditions are explained later. If we are given initial conditions y[-1], y[-2],..., y[−N], we can readily use iterative procedure to derive the auxiliary conditions y[0], y[1],..., y[N − 1]. We now turn our attention to the forced response. Table 3.2: Forced Response Open table as spreadsheet No.

Input x[n]

Forced response y φ[n]

1

r n r ? ? i (i = 1, 2,..., N)

crn

2

rn r = γi

cnr n

3

cos (βn + θ)

c cos (βn + φ)

4

Note: By definition, yφ[n] cannot have any characteristic mode terms. Should any term shown in the right-hand column for the forced response be a characteristic mode of the system, the correct form of the forced response must be modified to n i yφ[n], where i is the smallest integer

that will prevent n i yφ[n] from having a characteristic mode term. For example, when the input is r n , the forced response in the right-hand

column is of the form crn . But if r n happens to be a natural mode of the system, the correct form of the forced response is cnr n (see pair 2).

The forced response yφ[n] satisfies Eq. (3.79) and, by definition, contains only nonmode terms. To determine the forced response, we shall use the method of undetermined coefficients, the same method used for the continuous-time system. However, rather than retracing all the steps of the continuous-time system, we shall present a table (Table 3.2) listing the inputs and the corresponding forms of forced function with undetermined coefficients. These coefficients can be determined by substituting yφ[n] in Eq. (3.79) and equating the coefficients of similar terms. EXAMPLE 3.17 Solve

if the input x[n] = (3n + 5)u[n] and the auxiliary conditions are y[0] = 4, y[1] = 13. The characteristic equation is Therefore, the natural response is To find the form of forced response yφ[n], we use Table 3.2, pair 4, with r = 1, m = 1. This yields Therefore

Also and Substitution of these results in Eq. (3.79) yields or Comparison of similar terms on the two sides yields

Therefore The total response is

To determine arbitrary constants B1 and B2 we set n = 0 and 1 and substitute the auxiliary conditions y[0] = 4, y[1] = 13 to obtain

Therefore

and

COMPUTER EXAMPLE C3.8 Use MATLAB to solve Example 3.17. >> n = (-0:10)'; y=[4;13;zeros(length(n)-2,1); x = [3*n+5).*(n>=0); >> for k = 1:length(n)-2 >> y(k+2) = 5*y(k+1) - 6*y(k) + x(k+1) - 5*x(k); >> end; >> clf; stem(n,y,'k'); xlabel('n'); ylabel('y[n]'); >> disp(' n y'); disp([num2str([n,y])]); n y 0 4 1 13 2 24 3 13 4 −120 5 −731 6 −3000 7 −10691 8 −35544 9 −113675 10 −355224

Figure C3.8 EXAMPLE 3.18 Find the sum y[n] if

Such problems can be solved by finding an appropriate difference equation that has y[n] as the response. From Eq. (3.83), we observe that y[n +

1] = y[n] + (n + 1) 2 . Hence

This is the equation we seek. For this first-order difference equation, we need one auxiliary condition, the value of y[n] at n = 0. From Eq. (3.83), it follows that y[0] = 0. Thus, we seek the solution of Eq. (3.83) subject to an auxiliary condition y[0] = 0.

The characteristic equation of Eq. (3.83) is γ − 1 = 0, the characteristic root is γ = 1, and the characteristic mode is c(1)n = cu[n], where c is an arbitrary constant. Clearly, the natural response is cu[n]. The input, x[n] = (n + 1) 2 = n 2 + 2n + 1, is of the form in pair 4 (Table 3.2) with r = 1 and m = 2. Hence, the desired forced response is Note, however, the term β0 in yφ[n] is of the form of characteristic mode. Hence, the correct form is yφ[n] = β3 n 3 + β1 n 2 + β0 n. Therefore From Eq. (3.79), we obtain or Equating the coefficients of similar powers, we obtain Hence

Setting n = 0 in this equation and using the auxiliary condition y[0] = 0, we find c = 0 and

COMMENTS ON AUXILIARY CONDITIONS This (classical) method requires auxiliary conditions y[0], y[1],..., y[N - 1]. This is because at n = -1, -2,..., −N, only the zero-input component exists, and these initial conditions can be applied to the zero-input component only. In the classical method, the zero-input and zero-state components cannot be separated. Consequently, the initial conditions must be applied to the total response, which begins at n = 0. Hence, we need the auxiliary conditions y[0], y[1],..., y[N - 1]. If we are given the initial conditions y[-1], y[-2],..., y[-N], we can use iterative procedure to derive the auxiliary conditions y[0], y[1],..., y[n − 1]. AN EXPONENTIAL INPUT As in the case of continuous-time systems, we can show that for a system specified by the equation

the forced response for the exponential input x[n] = r n is given by

where

The proof follows from the fact that if the input x[n] = r n , then from Table 3.2 (pair 4), yφ[n] = crn . Therefore

so that Eq. (3.85) reduces to which yields c = P[r]/Q[r] = H[r]. This result is valid only if r is not a characteristic root of the system. If r is a characteristic root, then the forced response is cnr n where c is

determined by substituting yφ[n] in Eq. (3.79) and equating coefficients of similar terms on the two sides. Observe that the exponential r n includes

a wide variety of signals such as a constant C, a sinusoid cos (βn + θ), and an exponentially growing or decaying sinusoid |γ| n cos (βn + θ). A Constant Input x[n] = C. This is a special case of exponential Crn with r = 1. Therefore, from Eq. (3.86), we have

A Sinusoidal Input. The input e jΩn is an exponential r n with r = e jΩ. Hence

−jΩn

Similarly, for the input e Consequently, if the input x[n] = cos Ωn = 1/2(e jΩn + e −jΩn ), then Since the two terms on the right-hand side are conjugates, If then

Using a similar argument, we can show that for the input

EXAMPLE 3.19 For a system specified by the equation find the forced response for the input x[n] = (3)n u[n]. In this case

and the forced response to input (3)n u[n] is H[3](3) n u[n]; that is,

EXAMPLE 3.20 For an LTID system described by the equation determine the forced response yφ[n] if the input is

Here

For the input cos (2n + (π/3))u[n], the forced response is

where

Therefore so that

ASSESSMENT OF THE CLASSICAL METHOD The remarks in Chapter 2 concerning the classical method for solving differential equations also apply to difference equations.

3.10 SYSTEM STABILITY: THE EXTERNAL (BIBO) STABILITY CRITERION

Concepts and criteria for the BIBO (external) stability and the internal (asymptotic) stability for discrete-time systems are identical to those corresponding to continuous-time systems. The comments in Section 2.6 for LTIC systems concerning the distinction between the external and the internal stability are also valid for LTID systems. Recall that

and

If x[n] is bounded, then |x[n − m]| < K1 < ∞, and

Clearly the output is bounded if the summation on the right-hand side is bounded; that is, if

This is a sufficient condition for BIBO stability. We can show that this is also a necessary condition (see Prob. 3.10-1). Therefore, for an LTID system, if its impulse response h[n] is absolutely summable, the system is (BIBO) stable. Otherwise it is unstable. All the comments about the nature of the external and the internal stability in Chapter 2 apply to discrete-time case. We shall not elaborate them further.

3.10-1 Internal (Asymptotic) Stability For LTID systems, as in the case of LTIC systems, the internal stability, called the asymptotical stability or the stability in the sense of Lyapunov (also the zero-input stability) is defined in terms of the zero-input response of a system. For an LTID system specified by a difference equation of the form (3.17) [or (3.24)], the zero-input response consists of the characteristic modes of the system. The mode corresponding to a characteristic root γ is γ n . To be more general, let γ be complex so that Since the magnitude of e nβn is always unity regardless of the value of n, the magnitude of γ n is |γ| n . Therefore

Figure 3.21 shows the characteristic modes corresponding to characteristic roots at various locations in the complex plane

Figure 3.21: Characteristic roots location and the corresponding characteristic modes. These results can be grasped more effectively in terms of the location of characteristic roots in the complex plane. Figure 3.22 shows a circle of unit radius, centered at the origin in a complex plane. Our discussion shows that if all characteristic roots of the system lie inside the unit circle, |γi| < 1 for all i and the system is asymptotically stable. On the other hand, even if one characteristic root lies outside the unit circle, the system is unstable. If none of the characteristic roots lie outside the unit circle, but some simple (unrepeated) roots lie on the circle itself, the system is marginally stable. If two or more characteristic roots coincide on the unit circle (repeated roots), the system is unstable. The reason is that for repeated roots, the zero-input response is of the form n r−1 γ n , and if |γ| = 1, then |n r−1 γ n | = n r−1 → ∞ as n → ∞.[†]

Figure 3.22: Characteristic root locations and system stability. Note, however, that repeated roots inside the unit circle do not cause instability. To summarize: 1. An LTID system is asymptotically stable if and only if all the characteristic roots are inside the unit circle. The roots may be simple or repeated. 2. An LTID system is unstable if and only if either one or both of the following conditions exist: (i) at least one root is outside the unit circle; (ii) there are repeated roots on the unit circle. 3. An LTID system is marginally stable if and only if there are no roots outside the unit circle and there are some unrepeated roots on the unit circle.

3.10-2 Relationship Between BIBO and Asymptotic Stability

For LTID systems, the relation between the two types of stability is similar to those in LTIC systems. For a system specified by Eq. (3.17), we can readily show that if a characteristic root γ k is inside the unit circle, the corresponding mode γ n k is absolutely summable. In contrast, if γ k lies outside the unit circle, or on the unit circle, γ n k is not absolutely summable. [†]

This means that an asymptotically stable system is BIBO stable. Moreover, a marginally stable or asymptotically unstable system is BIBO unstable. The converse is not necessarily true. The stability picture portrayed by the external description is of questionable value. BIBO (external) stability cannot ensure internal (asymptotic) stability, as the following example shows. EXAMPLE 3.21 An LTID systems consists of two subsystems S1 and S2 in cascade (Fig. 3.23). The impulse response of these systems are h 1 [n] and h 2 [n], respectively, given by

Figure 3.23: BIBO and asymptotic stability. The composite system impulse response h[n] is given by

If the composite cascade system were to be enclosed in a black box with only the input and the output terminals accessible, any measurement

from these external terminals would show that the impulse response of the system is (0.5)n u[n], without any hint of the unstable system sheltered inside the composite system. The composite system is BIBO stable because its impulse response (0.5)n u[n] is absolutely summable. However, the system S2 is asymptotically unstable because its characteristic root, 2, lies outside the unit circle. This system will eventually burn out (or saturate) because of the unbounded characteristic response generated by intended or unintended initial conditions, no matter how small. The system is asymptotically unstable, though BIBO stable. This example shows that BIBO stability does not necessarily ensure asymptotic stability when a system is either uncontrollable, or unobservable, or both. The internal and the external descriptions of a system are equivalent only when the system is controllable and observable. In such a case, BIBO stability means the system is asymptotically stable, and vice versa. Fortunately, uncontrollable or unobservable systems are not common in practice. Henceforth, in determining system stability, we shall assume that unless otherwise mentioned, the internal and the external descriptions of the system are equivalent, implying that the system is controllable and observable. EXAMPLE 3.22 Determine the internal and external stability of systems specified by the following equations. In each case plot the characteristic roots in the complex plane. a. y[n + 2] + 2.5y[n + 1] + y[n] = x[n + 1] − 2x[n] b. y[n] − y[n − 1] + 0.21y[n − 2] = 2x[n − 1] + 3x[n − 2] c. d. (E2 − E + 1) 2 y[n] = (3E + 1)x[n] a. The characteristic polynomial is The characteristic roots are −0.5 and −2. Because |−2| > 1 (−2 lies outside the unit circle), the system is BIBO unstable and also asymptotically unstable (Fig. 3.24a).

Figure 3.24: Location of characteristic roots for the systems. b. The characteristic polynomial is The characteristic roots are 0.3 and 0.7, both of which lie inside the unit circle. The system is BIBO stable and asymptotically stable (Fig. 3.24b). c. The characteristic polynomial is The characteristic roots are −1, −0.5 ± j0.5 (Fig. 3.24c). One of the characteristic roots is on the unit circle and the remaining two roots are inside the unit circle. The system is BIBO unstable but marginally stable. d. The characteristic polynomial is

The characteristic roots are (1/2) ± j(√3/2) = 1e ±j(π/3) repeated twice, and they lie on the unit circle (Fig. 3.24d). The system is BIBO unstable and asymptotically unstable. EXERCISE E3.22

Find and sketch the location in the complex plane of the characteristic roots of the system specified by the following equation: Determine the external and the internal stability of the system.

Answers BIBO and asymptotically unstable EXERCISE E3.23 Repeat Exercise E3.22 for Answers BIBO and asymptotically unstable [†] If the development of discrete−time systems is parallel to that of continuous-time systems, we wonder why the parallel breaks down here. Why, for instance, are LHP and RHP not the regions demarcating stability and instability? The reason lies in the form of the characteristic modes. In

continuous-time systems, we chose the form of characteristic mode as e λit . In discrete-time systems, for computational convenience, we choose the

form to be γ n i . Had we chosen this form to be e λin where γ i = e λi , then the LHP and RHP (for the location of λi ) again would demarcate stability and instability. The reason is that if γ = e λ |γ| = 1 implies |e λ | = 1, and therefore λ = jω. This shows that the unit circle in γ plane maps into the imaginary axis in the λ plane.

[†] This conclusion follows from the fact that (see Section B.7-4)

Moreover, if |γ| ≥ 1, the sum diverges and goes to ∞. These conclusions are valid also for the modes of the form n rγ n k

3.11 INTUITIVE INSIGHTS INTO SYSTEM BEHAVIOR The intuitive insights into the behavior of continuous-time systems and their qualitative proofs, discussed in Section 2.7, also apply to discrete-time systems. For this reason, we shall merely mention here without discussion some of the insights presented in Section 2.7. The system's entire (zero-input and zero-state) behavior is strongly influenced by the characteristic roots (or modes) of the system. The system responds strongly to input signals similar to its characteristic modes and poorly to inputs very different from its characteristic modes. In fact, when the input is a characteristic mode of the system, the response goes to infinity, provided the mode is a nondecaying signal. This is the resonance phenomenon. The width of an impulse response h[n] indicates the response time (time required to respond fully to an input) of the system. It is the

time constant of the system.[†] Discrete-time pulses are generally dispersed when passed through a discrete-time system. The amount of dispersion (or spreading out) is equal to the system time constant (or width of h[n]). The system time constant also determines the rate at which the system can transmit information. Smaller time constant corresponds to higher rate of information transmission, and vice versa. [†] This part of the discussion applies to systems with impulse response h[n] that is a mostly positive (or mostly negative) pulse.

3.12 APPENDIX 3.1: IMPULSE RESPONSE FOR A SPECIAL CASE When a N = 0, A0 = b N/a N becomes indeterminate, and the procedure needs to be modified slightly. When a N = 0, Q[E] can be expressed as and Eq. (3.43) can be expressed as Hence In this case the input vanishes not for n ≥ 1, but for n ≥ 2. Therefore, the response consists not only of the zero-input term and an impulse A0 δ[n] (at n = 0), but also of an impulse A1 δ[n − 1] (at n = 1). Therefore We can determine the unknowns A0 , A1 , and the N − 1 coefficients in y c [n] from the N + 1 number of initial values h[0], h[1],..., h[N], determined

as usual from the iterative solution of the equation Q[E]h[n] = P[E]δ[n]. [‡] Similarly, if a N = a N−1 = 0, we need to use the form h[n] = A0 δ[n] + A1 δ[n − 1] + A2 δ[n − 2] + y c [n]u[n]. The N + 1 unknown constants are determined from the N + 1 values h[0], h[1],..., h[N], determined iteratively, and so on. [‡]

is now an (N − 1)-order polynomial. Hence there are only N − 1 unknowns in y c [n].

3.13 SUMMARY This chapter discusses time-domain analysis of LTID (linear, time-invariant, discrete-time) systems. The analysis is parallel to that of LTIC systems, with some minor differences. Discrete-time systems are described by difference equations. For an Nth-order system, N auxiliary conditions must be specified for a unique solution. Characteristic modes are discrete-time exponentials of the form γ n corresponding to an unrepeated root γ, and the

modes are of the form n i γ n corresponding to a repeated root γ.

The unit impulse function δ[n] is a sequence of a single number of unit value at n = 0. The unit impulse response h[n] of a discrete-time system is

a linear combination of its characteristic modes.[†]

The zero-state response (response due to external input) of a linear system is obtained by breaking the input into impulse components and then adding the system responses to all the impulse components. The sum of the system responses to the impulse components is in the form of a sum, known as the convolution sum, whose structure and properties are similar to the convolution integral. The system response is obtained as the convolution sum of the input x[n] with the system's impulse response h[n]. Therefore, the knowledge of the system's impulse response allows us to determine the system response to any arbitrary input. LTID systems have a very special relationship to the everlasting exponential signal z n because the response of an LTID system to such an input

signal is the same signal within a multiplicative constant. The response of an LTID system to the everlasting exponential input z n is H[z]z n , where H[z] is the transfer function of the system. Difference equations of LTID systems can also be solved by the classical method, in which the response is obtained as a sum of the natural and the forced components. These are not the same as the zero-input and zero-state components, although they satisfy the same equations, respectively. Although simple, this method is applicable to a restricted class of input signals, and the system response cannot be expressed as an

explicit function of the input. These limitations diminish its value considerably in the theoretical study of systems. The external stability criterion, the bounded-input/bounded-output (BIBO) stability criterion, states that a system is stable if and only if every bounded input produces a bounded output. Otherwise the system is unstable. The internal stability criterion can be stated in terms of the location of characteristic roots of the system as follows: 1. An LTID system is asymptotically stable if and only if all the characteristic roots are inside the unit circle. The roots may be repeated or unrepeated. 2. An LTID system is unstable if and only if either one or both of the following conditions exist: (i) at least one root is outside the unit circle; (ii) there are repeated roots on the unit circle. 3. An LTID system is marginally stable if and only if there are no roots outside the unit circle and some unrepeated roots on the unit circle. An asymptotically stable system is always BIBO stable. The converse is not necessarily true. [†] There is a possibility of an impulse δ[n] in addition to characteristic modes.

MATLAB SESSION 3: DISCRETE-TIME SIGNALS AND SYSTEMS MATLAB is naturally and ideally suited to discrete-time signals and systems. Many special functions are available for discrete-time data operations, including the stem, filter, and conv commands. In this session, we investigate and apply these and other commands.

M3.1 Discrete-Time Functions and Stem Plots Consider the discrete-time function f[n] = e −n/5 cos (πn/5)u[n]. In MATLAB, there are many ways to represent f[n] including M-files or, for particular n, explicit command line evaluation. In this example, however, we use an inline object >> f = inline('exp(-n/5).*cos(pi*n/5).*(n>=0)','n'); A true discrete-time function is undefined (or zero) for noninteger n. Although inline object f is intended as a discrete-time function, its present construction does not restrict n to be integer, and it can therefore be misused. For example, MATLAB dutifully returns 0.8606 to f (0.5) when a NaN (not-a-number) or zero is more appropriate. The user is responsible for appropriate function use. Next, consider plotting the discrete-time function f[n] over (−10 ≤ n ≤ 10). The stem command simplifies this task. >> n = (-10:10)'; >> stem(n, f(n),'k'); >> xlabel ('n'); ylabel('f[n]'); Here, stem operates much like the plot command: dependent variable f (n) is plotted against independent variable n with black lines. The stem command emphasizes the discrete-time nature of the data, as Fig. M3.1 illustrates.

Figure M3.1: f[n] over (−10 ≤ n ≤ 10). For discrete-time functions, the operations of shifting, inversion, and scaling can have surprising results. Compare f[−2n] with f[−2n + 1]. Contrary to the continuous case, the second is not a shifted version of first. We can use separate subplots, each over (−10 ≤ n ≤ 10), to help illustrate this fact. Notice that unlike the plot command, the stem command cannot simultaneously plot multiple functions on a single axis; overlapping stem lines would make such plots difficult to read anyway. >> subplot (2,1,1); stem(n, f(-2*n), 'k'); ylabel('f[-2n]'); >> subplot(2,1,2); stem(n, f(-2*n+1),'k'); ylabel('f[-2n+1]'); xlabel('n'); The results are shown in Fig. M3.2. Interestingly, the original function f[n] can be recovered by interleaving samples of f[−2n] and f[−2n + 1] and

then time-reflecting the result.

Figure M3.2: f[−2n] and f[−2n + 1] over (−10 ≤ n ≤ 10). Care must always be taken to ensure that MATLAB performs the desired computations. Our inline function f is a case in point: although it correctly downsamples, it does not properly upsample (see Prob. 3.M-1). MATLAB does what it is told, but it is not always told how to do everything correctly!

M3.2 System Responses Through Filtering MATLAB's filter command provides an efficient way to evaluate the system response of a constant coefficient linear difference equation represented in delay form as

In the simplest form, filter requires three input arguments: a length−(N + 1) vector of feedforward coefficients [b 0 , b 1 ,..., b N], a length-(N + 1)

vector of feedback coefficients [a 0 , a 1 ,..., a N], and an input vector. [†] Since no initial conditions are specified, the output corresponds to the system's zero-state response.

To serve as an example, consider a system described by y[n] − y[n − 1] + y[n − 2] = x[n]. When x[n] = δ[n], the zero-state response is equal to the impulse response h[n], which we compute over (0 ≤ n ≤ 30). >> b = [1 0 0]; a = [1 -1 1]; >> n = (0:30)'; delta = inline('n==0','n'); >> h = filter(b,a,delta(n)); >> stem(n,h,'k'); axis([-.5 30.5 -1.1 1.1]); >> xlabel ('n'); ylabel('h[n]'); As shown in Fig. M3.3, h[n] appears to be (N 0 = 6)−periodic for n ≥ 0. Since periodic signals are not absolutely summable, ∑ ∞n = −∞ |h[n]| is not finite and the system is not BIBO stable. Furthermore, the sinusoidal input x[n] = cos (2πn/6)u[n], which is (N 0 = 6)−periodic for n ≥ 0, should generate a resonant zero-state response. >> x = inline('cos(2*pi*n/6).*(n>=0)','n'); >> y = filter(b,a,x(n)); >> stem(n,y,'k'); xlabel('n'); ylabel('y[n]');

Figure M3.3: h[n] for y[n] − y[n − 1] + y[n − 2] = x[n].

The response's linear envelope, shown in Fig. M3.4, confirms a resonant response. The characteristic equation of the system is γ 2 − γ + 1, which

has roots γ = e ±jπ/3 . Since the input x[n] = cos (2πn/6)u[n] = (1/2)(e jπn/3 + e −jπn/3 )u[n] coincides with the characteristic roots, a resonant response is guaranteed.

Figure M3.4: Resonant zero-state response y[n] for x[n] = cos(2πn/6)u[n]. By adding initial conditions, the filter command can also compute a system's zero-input response and total response. Continuing the preceding example, consider finding the zero-input response for y[−1] = 1 and y[−2] = 2 over (0 ≤ n ≤ 30). >> z_i = filtic(b,a,[1 2]); >> y_0 = filter(b,a,zeros(size(n)),z_i); >> stem(n,y_0,'k'); xlabel('n'); ylabel('y_{0} [n]'); >> axis([-0.5 30.5 -2.1 2.1]); There are many physical ways to implement a particular equation. MATLAB implements Eq. (M3.1) by using the popular direct form II transposed

structure. [†] Consequently, initial conditions must be compatible with this implementation structure. The signal processing toolbox function filtic converts the traditional y[-1], y[-2],..., y[−N] initial conditions for use with the filter command. An input of zero is created with the zeros command. The dimensions of this zero input are made to match the vector n by using the size command. Finally, −{ } forces subscript text in the graphics window, and ^{ } forces superscript text. The results are shown in Fig. M3.5.

Figure M3.5: Zero-input response y 0 [n] for y[−1] = 1 and y[−2] = 2. Given y[−1] = 1 and y[−2] = 2 and an input x[n] = cos (2πn/6)u[n], the total response is easy to obtain with the filter command. >> y_total = filter(b,a,x(n),z_i); Summing the zero-state and zero-input response gives the same result. Computing the total absolute error provides a check. >> sum(abs(y_total-(y + y_0))) ans = 1.8430e-014 Within computer round-off, both methods return the same sequence.

M3.3 A Custom Filter Function The filtic command is only available if the signal processing toolbox is installed. To accommodate installations without the signal processing toolbox and to help develop your MATLAB skills, consider writing a function similar in syntax to filter that directly uses the ICS y[-1], y[2]....y[−N]. Normalizing a 0 = 1 and solving Eq. (M3.1) for y[n] yields

This recursive form provides a good basis for our custom filter function. function [y] = MS3P1(b, a, x, yi); % MS3P1.m : MATLAB Session 3, Program 1 % Function M-file filters data x to create y % INPUTS: b = vector of feedforward coefficients % a = vector of veedback coefficients % x = input data vector % yi = vector of initial conditions [y[-1], y[-2], ...] % OUTPUTS: y = vector of filtered output data yi = flipud(yi(:)); % Properly format IC's. y = [yi;zeros(length(x),1)]; % Preinitialize y, beginning with IC's x = [zeros(length(yi),1);x(:)]; % Append x with zeros to match size of y. b = b/a(1);a = a/a(1); % Normalize coefficients. for n = length(yi)+1:length(y), for nb = 0:length(b)-1, y(n) = y(n) + b(nb+1)*x(n-na); % Feedforward terms. end for na = 1:length(a)-1 y(n) = y(n) − a(na+1)*y(n-na); % Feedback terms. end end y = y(length)(yi)+1:end); % Strip of IC's for final output. Most instructions in MS3P1 have been discussed; now we turn to the flipud instruction. The flip up-down command flipud reverses the order of elements in a column vector. Although not used here, the flip left-right command fliplr reverses the order of elements in a row vector. Note that typing help filename displays the first contiguous set of comment lines in an M-file. Thus, it is good programming practice to document M-files, as in MS3P1, with an initial block of clear comment lines. As an exercise, the reader should verify that MS3P1 correctly computes the impulse response h[n], the zero-state response y[n], the zero-input response y 0 [n], and the total response y[n] + y 0 [n].

M3.4 Discrete-Time Convolution Convolution of two finite-duration discrete-time signals is accomplished by using the conv command. For example, the discrete-time convolution of two length-4 rectangular pulses, g[n] = (u[n] − u[n − 4]) * (u[n] − u[n − 4]), is a length-(4 + 4 − 1 = 7) triangle. Representing u[n] − u[n − 4] by the vector [1, 1, 1, 1], the convolution is computed by: >> conv ( [1 1 1 1], [1 1 1 1]) ans = 1 2 3 4 3 2 1 Notice that (u[n+4] − u[n])*(u[n] − u[n−4]) is also computed by conv ([1 1 1 1], [1 1 1 1]) and obviously yields the same result. The difference between these two cases is the regions of support: (0 ≤ n ≤ 6) for the first and (−4 ≤ n ≤ 2) for the second. Although the conv command does not compute the region of support, it is relatively easy to obtain. If vector w begins at n = n w and vector v begins at n = n ν , then conv (w, v) begins at n = n w + n ν . In general, the conv command cannot properly convolve infinite-duration signals. This is not too surprising, since computers themselves cannot store an infinite-duration signal. For special cases, however, conv can correctly compute a portion of such convolution problems. Consider the common case of convolving two causal signals. By passing the first N samples of each, conv returns a length-(2N − 1) sequence. The first N samples of this sequence are valid; the remaining N − 1 samples are not. To illustrate this point, reconsider the zero-state response y[n] over (0 ≤ n ≤ 30) for system y[n] − y[n − 1] + y[n − 2] = x[n] given input x[n] = cos (2πn/6)u[n]. The results obtained by using a filtering approach are shown in Fig. M3.4. The response can also be computed using convolution according to y[n] = h[n]*x[n]. The impulse response of this system is [†]

Both h[n] and x[n] are causal and have infinite duration, so conv can be used to obtain a portion of the convolution. >> h = inline('(cos(pi*n/3)+sin(pi*n/3)/sqrt(3)).*(n>=0)','n'); >> y = conv(h(n), x(n)); >> stem([0:60],y,'k'); xlabel('n'); ylabel('y[n]'); The conv output is fully displayed in Fig. M3.6. As expected, the results are correct over (0 ≤ n ≤ 30). The remaining values are clearly incorrect; the output envelope should continue to grow, not decay. Normally, these incorrect values are not displayed. >> stem(n,y(1:31),'k'); xlabel('n'); ylabel('y[n]');

Figure M3.6: y[n] for x[n] = cos (2ダn/6)u[n] computed with conv. The resulting plot is identical to Fig. M3.4. [†] It is important to pay close attention to the inevitable notational differences found throughout engineering documents. In MATLAB help documents, coefficient subscripts begin at 1 rather than 0 to better conform with MATLAB indexing conventions. That is, MATLAB labels a 0 as a (1), b 0 as b (1), and so forth. [†] Implementation structures, such as direct form II transposed, are discussed in Chapter 4. [†] Techniques to analytically determine h[n] are presented in Chapter 5.

PROBLEMS 3.1.1

3.1.2

Find the energy of the signals depicted in Figs. P3.1-1.

Figure P3.1-1 Find the power of the signals illustrated in Figs. P3.1-2.

3.1.3

Figure P3.1-2 Show that the power of a signal Dej(2π/N0 )n is |D| 2 . Hence, show that the power of a signal

Use the fact that

3.1.4

a. Determine even and odd components of the signal x[n] = (0.8)n u[n]. b. Show that the energy of x[n] is the sum of energies of its odd and even components found in part (a).

3.1.5

c. Generalize the result in part (b) for any finite energy signal. a. If x e [n] and x 0 [n] are the even and the odd components of a real signal x[n], then show that Ex e = Ex 0 = 0.5Ex . b. Show that the cross-energy of x e and x 0 is zero, that is,

3.2.1

If the energy of a signal x[n] is Ex , then find the energy of the following: a. x[−n] b. x[n − m] c. x[m − n]

3.2.2

d. Kx[n] (m integer and K constant) If the power of a periodic signal x[n] is Px , find and comment on the powers and the rms values of the following: a. −x[n] b. x[−n] c. x[n − m] (m integer) d. cx[n]

3.2.3

e. x[m − n] (m integer) For the signal shown in Fig. P3.1-1b, sketch the following signals: a. x[−n] b. x[n + 6] c. x[n − 6]

d. x[3n] e.

f. x[3 − n]

3.2.4

Repeat Prob. 3.2-3 for the signal depicted in Fig.P3.1-1c.

3.3.1

Sketch, and find the power of, the following signals: a. (1)n b. (−1) n c. u[n] d. (−1) n u[n]

3.3.2

e. Show that a. δ[n] + δ[n − 1] = u[n] − u[n − 2] b. c. n(n − 1)γ n u[n] = n(n − 1)γ n u[n − 2] d.

3.3.3

e. Sketch the following signals: a. u[n − 2] − u[n − 6] b. n{u[n] − u[n − 7]} c. (n − 2) {u[n − 2] − u[n − 6]} d. (−n + 8){u[n − 6] − u[n − 9]}

e. (n − 2){u[n − 2] − u[n − 6]} + (− n + 8){u[n − 6] − u[n − 9]}

3.3.4

Describe each of the signals in Fig. P3.1-1 by a single expression valid for all n.

3.3.5

The following signals are in the form e λn . Express them in the form γ n :

a. e −0.5n b. e 0.5n c. e −jπn d. e jπn

3.3.6

In each case show the locations of λ and γ in the complex plane. Verify that an exponential is growing if γ lies outside the unit circle (or if λ lies in the RHP), is decaying if γ lies within the unit circle (or if λ lies in the LHP), and has a constant amplitude if γ lies on the unit circle (or if λ lies on the imaginary axis). Express the following signals, which are in the form e λn , in the form n : a. e −(1+jπ)n b. e −(1−jπ)n c. e (1+jπ)n d. e (1−jπ)n

e. e −[1+j(π/3)]n

3.3.7

f. e [1−j(π/3)]n The concepts of even and odd functions for discrete-time signals are identical to those of the continuous-time signals discussed in Section 1.5. Using these concepts, find and sketch the odd and the even components of the following: a. u[n] b. nu[n] c. d.

3.4.1

A cash register output y[n] represents the total cost of n items rung up by a cashier. The input x[n] is the cost of the nth item. a. Write the difference equation relating y[n] to x[n].

3.4.2

3.4.3

b. Realize this system using a time-delay element. Let p[n] be the population of a certain country at the beginning of the nth year. The birth and death rates of the population during any year are 3.3 and 1.3%, respectively. If i[n] is the total number of immigrants entering the country during the nth year, write the difference equation relating p[n + 1], p[n], and i[n]. Assume that the immigrants enter the country throughout the year at a uniform rate. A moving average is used to detect a trend of a rapidly fluctuating variable such as the stock market average. A variable may fluctuate (up and down) daily, masking its long-term (secular) trend. We can discern the long-term trend by smoothing or averaging the past N values of the variable. For the stock market average, we may consider a 5-day moving average y[n] to be the mean of the past 5 days' market closing values x[n], x[n - 1],..., x[n − 4]. a. Write the difference equation relating y[n] to the input x[n].

3.4.4

3.4.5

3.4.6

b. Use time-delay elements to realize the 5-day moving-average filter. The digital integrator in Example 3.7 is specified by If an input u[n] is applied to such an integrator, show that the output is (n + 1)Tu[n], which approaches the desired ramp nTu[n] as T → 0. Approximate the following second-order differential equation with a difference equation.

The voltage at the nth node of a resistive ladder in Fig. P3.4-6 is v[n]

Figure P3.4-6 (n = 0, 1, 2,..., N). Show that ν[n] satisfies the second-order difference equation

3.4.7

[Hint: Consider the node equation at the nth node with voltage ν[n].] Determine whether each of the following statements is true or false. If the statement is false, demonstrate by proof or example why the statement is false. If the statement is true, explain why. a. A discrete-time signal with finite power cannot be an energy signal. b. A discrete-time signal with infinite energy must be a power signal. c. The system described by y[n] = (n+1)x[n] is causal. d. The system described by y[n − 1] = x[n] is causal.

3.4.8

e. If an energy signal x[n] has energy E, then the energy of x[an] is E/|a|. A linear, time-invariant system produces output y 1 [n] in response to input x 1 [n], as shown in Fig. P3.4-8. Determine and sketch the output y 2 [n] that results when input x 2 [n] is applied to the same system.

3.4.9

Figure P3.4-8: Input-output plots. A system is described by

a. Explain what this system does. b. Is the system BIBO stable? Justify your answer. c. Is the system linear? Justify your answer. d. Is the system memoryless? Justify your answer. e. Is the system causal? Justify your answer.

3.4.10

f. Is the system time invariant? Justify your answer. A discrete-time system is given by

a. Is the system BIBO stable? Justify your answer. b. Is the system memoryless? Justify your answer.

3.4.11

3.4.12

c. Is the system causal? Justify your answer. Explain why the continuous-time system y(t) = x(2t) is always invertible and yet the corresponding discrete-time system y[n] = x[2n] is not invertible. Consider the input-output relationships of two similar discrete-time systems:

and

3.4.13

Explain why x[n] can be recovered from y 1 [n] yet x[n] cannot be recovered from y 2 [n]. Consider a system that multiplies a given input by a ramp function, r[n]. That is, y[n] = x[n]r[n]. a. Is the system BIBO stable? Justify your answer. b. Is the system linear? Justify your answer. c. Is the system memoryless? Justify your answer. d. Is the system causal? Justify your answer.

3.4.14

e. Is the system time invariant? Justify your answer. A jet-powered car is filmed using a camera operating at 60 frames per second. Let variable n designate the film frame, where n = 0 corresponds to engine ignition (film before ignition is discarded). By analyzing each frame of the film, it is possible to determine the car position x[n], measured in meters, from the original starting position x[0] = 0.

From physics, we know that velocity is the time derivative of position,

Furthermore, we know that acceleration is the time derivative of velocity,

We can estimate the car velocity from the film data by using a simple difference equation ν[n] = k(x[n] − x[n − 1]) a. Determine the appropriate constant k to ensure ν[n] has units of meters per second.

3.4.15

3.5.1

b. Determine a standard-form constant coefficient difference equation that outputs an estimate of acceleration, a[n], using an input of position, x[n]. Identify the advantages and shortcomings of estimating acceleration a(t) with a[n]. What is the impulse response h[n] for this system? Do part (a) of Prob. 3.M-2. Solve recursively (first three terms only): a. y[n + 1] − 0.5y[n] = 0, with y[−1] = 10

3.5.2

b. y[n + 1] + 2y[n] = x[n + 1], with x[n] = e −n u[n] and y[−1] = 0 Solve the following equation recursively (first three terms only): with

3.5.3

3.5.4

3.5.5

Solve recursively the second-order difference Eq. (3.10b) for sales estimate (first three terms only), assuming y[−1] = y[−2] = 0 and x[n] = 100u[n]. Solve the following equation recursively (first three terms only):

with x[n] = (3)n u[n], y[−1] = 3, and y[−2] = 2 Repeat Prob. 3.5−4 for with x[n] = (3)−n u[n], y[−1] = 2, and y[−2] = 3.

3.6.1

3.6.2

3.6.3

3.6.4

Solve

Solve

Solve

For the general Nth-order difference Eq. (3.17b), letting results in a general causal Nth-order LTI nonrecursive difference equation

3.6.5

Show that the characteristic roots for this system are zero, and hence, the zero-input response is zero. Consequently, the total response consists of the zero-state component only. Leonardo Pisano Fibonacci, a famous thirteenth-century mathematician, generated the sequence of integers {0, 1, 1, 2, 3, 5, 8, 13, 21, 34,....} while addressing, oddly enough, a problem involving rabbit reproduction. An element of the Fibonacci sequence is the sum of the previous two. a. Find the constant-coefficient difference equation whose zero-input response f[n] with auxiliary conditions f[1] = 0 and f[2] = 1 is a Fibonacci sequence. Given f[n] is the system output, what is the system input?

b. What are the characteristic roots of this system? Is the system stable?

3.6.6

c. Designating 0 and 1 as the first and second Fibonacci numbers, determine the fiftieth Fibonacci number. Determine the thousandth Fibonacci number. Find ν[n], the voltage at the nth node of the resistive ladder depicted in Fig. P3.4-6, if V = 100 volts and a = 2. [Hint 1: Consider the node equation at the nth node with voltage ν[n]. Hint 2: See Prob. 3.4-6 for the equation for ν[n]. The auxiliary conditions are ν[0] = 100 and ν[N] = 0.]

3.6.7

Consider the discrete-time system y[n] + y[n − 1] + 0.25y[n − 2] = √x[n − 8]. Find the zero input response, y 0 [n], if y 0 [−1] = 1 and y 0 [1] = 1

3.7.1

Find the unit impulse response h[n] of systems specified by the following equations: a. y[n + 1] + 2y[n] = x[n]

3.7.2

3.7.3

b. y[n] + 2y[n − 1] = x[n] Repeat Prob. 3.7−1 for Repeat Prob. 3.7−1 for

3.7.4

a. For the general Nth-order difference Eq. (3.17), letting results in a general causal Nth-order LTI nonrecursive difference equation

Find the impulse response h[n] for this system. [Hint: The characteristic equation for this case is γ n = 0. Hence, all the characteristic roots are zero. In this case, y c [n] = 0, and the approach in Section 3.7 does not work. Use a direct method to find h[n] by realizing that h[n] is the response to unit impulse input.] b. Find the impulse response of a nonrecursive LTID system described by the equation Observe that the impulse response has only a finite (N) number of nonzero elements. For this reason, such systems are called finite-impulse response (FIR) systems. For a general recursive case [Eq. (3.24)], the impulse response has an infinite number of nonzero elements, and such systems are called infinite-impulse response (IIR) systems. 3.8.1

3.8.2

3.8.3

3.8.4

3.8.5

Find the (zero-state) response y[n] of an LTID system whose unit impulse response is and the input is x[n] = e −n u[n + 1]. Find your answer by computing the convolution sum and also by using the convolution table (Table 3.1). Find the (zero-state) response y[n] of an LTID system if the input is x[n] = 3 n−1 u[n + 2] and Find the (zero-state) response y[n] of an LTID system if the input x[n] = (3)n+2 u[n + 1], and Find the (zero-state) response y[n] of an LTID system if the input x[n] = (3)−n+2 u[n + 3], and Find the (zero-state) response y[n] of an LTID system if its input x[n] = (2)n u[n − 1], and

Find your answer using only Table 3.1, the convolution table.

3.8.6

Derive the results in entries 1, 2 and 3 in Table 3.1. [Hint: You may need to use the information in Section B.7-4.]

3.8.7

Derive the results in entries 4, 5, and 6 in Table 3.1.

3.8.8

Derive the results in entries 7 and 8 in Table 3.1. [Hint: You may need to use the information in Section B.7-4.]

3.8.9

Derive the results in entries 9 and 11 in Table 3.1. [Hint: You may need to use the information in Section B.7-4.]

3.8.10

3.8.11

Find the total response of a system specified by the equation if y[−1] = 10, and the input x[n] = e −n u[n]. Find an LTID system (zero-state) response if its impulse response h[n] = (0.5)n u[n], and the input x[n] is a. 2 n u[n] b. 2 n−3 u[n] c. 2 n u[n − 2]

3.8.12

3.8.13

[Hint: You may need to use the shift property (3.61) of the convolution.] For a system specified by equation Find the system response to input x[n] = u[n]. What is the order of the system? What type of system (recursive or nonrecursive) is this? Is the knowledge of initial condition(s) necessary to find the system response? Explain. a. A discrete-time LTI system is shown in Fig. P3.8-13. Express the overall impulse response of the system, h[n], in terms of h 1 [n], h 2 [n], h 3 [n], h 4 [n], and h 5 [n]. b. Two LTID systems in cascade have impulse response h 1 [n] and h 2 [n], respectively. Show that if h 1 [n] = (0.9)n u[n] − 0.5(0.9)n−1 u[n −1] and h 2 [n] = (0.5)n u[n] − 0.9(0.5)n−1 u[n − 1], the cascade system is an identity system.

3.8.14

3.8.15

3.8.16

3.8.17

3.8.18

Figure P3.8-13 a. Show that for a causal system, Eq. (3.70b) can also be expressed as

b. How would the expressions in part (a) change if the system is not causal? In the savings account problem described in Example 3.4, a person deposits $500 at the beginning of every month, starting at n = 0 with the exception at n = 4, when instead of depositing $500, she withdraws $1000. Find y[n] if the interest rate is 1% per month (r = 0.01). To pay off a loan of M dollars in N number of payments using a fixed monthly payment of P dollars, show that

where r is the interest rate per dollar per month. [Hint: This problem can be modeled by Eq. (3.9a) with the payments of P dollars starting at n = 1. The problem can be approached in two ways (1) Consider the loan as the initial condition y 0 [0] = −M, and the input x[n] = Pu[n − 1]. The loan balance is the sum of the zero-input component (due to the initial condition) and the zero-state component h[n] * x[n]. (2) Consider the loan as an input −M at n = 0 along with the input due to payments. The loan balance is now exclusively a zero-state component h[n] * x[n]. Because the loan is paid off in N payments, set y[N] = 0.] A person receives an automobile loan of $10,000 from a bank at the interest rate of 1.5% per month. His monthly payment is $500, with the first payment due one month after he receives the loan. Compute the number of payments required to pay off the loan. Note that the last payment may not be exactly $500. [Hint: Follow the procedure in Prob. 3.8−16 to determine the balance y[n]. To determine N, the number of payments, set y[N] = 0. In general, N will not be an integer. The number of payments K is the largest integer ≤ N. The residual payment is |y[K]|.] Using the sliding-tape algorithm, show that a. u[n] * u[n] = (n + 1)u[n] b. (u[n] − u[n − m]) * u[n] = (n + 1)u[n] − (n − m + 1)u[n − m]

3.8.19

3.8.20

3.8.21

3.8.22

Using the sliding-tape algorithm, find x[n] * g[n] for the signals shown in Fig. P3.8-19.

Figure P3.8-19 Repeat Prob. 3.8-19 for the signals shown in Fig. P3.8-20.

Figure P3.8-20 Repeat Prob. 3.8-19 for the signals depicted in Fig. P3.8-21.

Figure P3.8-21 The convolution sum in Eq. (3.63) can be expressed in a matrix form as

or and Knowing h[n] and the output y[n], we can determine the input x[n]. This operation is the reverse of the convolution and is known as the deconvolution. Moreover, knowing x[n] and y[n], we can determine h[n]. This can be done by expressing the foregoing matrix equation as n + 1 simultaneous equations in terms of n + 1 unknowns h[0], h[1],..., h[n]. These equations can readily be solved iteratively. Thus, we can synthesize a system that yields a certain output y[n] for a given input x[n]. a. Design a system (i.e., determine h[n]) that will yield the output sequence (8, 12, 14, 15, 15.5, 15.75,...) for the input sequence (1, 1, 1, 1, 1, 1,...).

3.8.23

b. For a system with the impulse response sequence (1, 2, 4,...), the output sequence was (1, 7/3, 43/9,...). Determine the input sequence. A second-order LTID system has zero-input response

a. Determine the characteristic equation of this system, a 0 γ 2 + a 1 γ + a 2 = 0. b. Find a bounded, causal input with infinite duration that would cause a strong response from this system. Justify your choice.

3.8.24

c. Find a bounded, causal input with infinite duration that would cause a weak response from this system. Justify your choice. An LTID filter has an impulse response function given by h 1 [n] = δ[n + 2] − δ[n − 2]. A second LTID system has an impulse response function given by h 2 [n] = n(u[n + 4] − u[n − 4]). a. Carefully sketch the functions h 1 [n] and h 2 [n] over (−10 ≤ n ≤ 10). b. Assume that the two systems are connected in parallel as shown in Fig. P3.8-24. Determine the impulse response h p [n] for the parallel system in terms of h 1 [n] and h 2 [n]. Sketch h p [n] over (−10 ≤ n ≤ 10).

Figure P3.8-24: Parallel and series system connections.

3.8.25

c. Assume that the two systems are connected in cascade as shown in Fig. P3.8-24. Determine the impulse response h s [n] for the cascade system in terms of h 1 [n] and h 2 [n]. Sketch h s [n] over (−10 ≤ n ≤ 10). This problem investigates an interesting application of discrete-time convolution: the expansion of certain polynomial expressions. a. By hand, expand (z 3 + z 2 + z + 1) 2 . Compare the coefficients to [1, 1, 1, 1] * [1, 1, 1, 1]. b. Formulate a relationship between discrete-time convolution and the expansion of constant-coefficient polynomial expressions. c. Use convolution to expand (z −4 − 2z −3 + 3z −2 ) 4 .

3.8.26

d. Use convolution to expand (z 5 + 2z 4 + 3z 2 + 5) 2 (z −4 − 5z −2 + 13). Joe likes coffee, and he drinks his coffee according to a very particular routine. He begins by adding two teaspoons of sugar to his mug, which he then fills to the brim with hot coffee. He drinks 2/3 of the mug's contents, adds another two teaspoons of sugar, and tops the mug off with steaming hot coffee. This refill procedure continues, sometimes for many, many cups of coffee. Joe has noted that his coffee tends to taste sweeter with the number of refills. Let independent variable n designate the coffee refill number. In this way, n = 0 indicates the first cup of coffee, n = 1 is the first refill, and so forth. Let x[n] represent the sugar (measured in teaspoons) added into the system (a coffee mug) on refill n. Let y[n] designate the amount of sugar (again, teaspoons) contained in the mug on refill n. a. The sugar (teaspoons) in Joe's coffee can be represented using a standard second-order constant coefficient difference equation y[n] + a 1 y[n − 1] + a 2 y[n − 2] = b 0 x[n] + b 1 x[n − 1] + b 2 x[n − 2]. Determine the constants a 1 , a 2 , b 0 , b 1 , and b 2 . b. Determine x[n], the driving function to this system. c. Solve the difference equation for y[n]. This requires finding the total solution. Joe always starts with a clean mug from the dishwasher, so y[−1] (the sugar content before the first cup) is zero.

3.8.27

d. Determine the steady-state value of y[n]. That is, what is y[n] as n → ∞? If possible, suggest a way of modifying x[n] so that the sugar content of Joe's coffee remains a constant for all nonnegative n. A system is called complex if a real-valued input can produce a complex-valued output. Consider a causal complex system described by a first-order constant coefficient linear difference equation: a. Determine the impulse response function h[n] for this system.

3.8.28

b. Given input x[n] = u[n − 5] and initial condition y 0 [−1] = j, determine the system's total output y[n] for n ≥ 0. A discrete-time LTI system has impulse response function h[n] = n(u[n − 2] − u[n + 2]). a. Carefully sketch the function h[n] over (−5 ≤ n ≤ 5).

b. Determine the difference equation representation of this system, using y[n] to designate the output and x[n] to designate the input.

3.8.29

Do part (a) of Prob. 3.M-3.

3.8.30

Consider three discrete-time signals: x[n], y[n], and z[n]. Denoting convolution as *, identify the expression(s) that is(are) equivalent to x[n](y[n] * z[n]):

a. (x[n] * y[n])z[n]

b. (x[n]y[n]) * (x[n]z[n]) c. (x[n]y[n]) * z[n] d. none of the above Justify your answer! 3.9.1

3.9.2

3.9.3

Use the classical method to solve with the input x[n] = e −n u[n], and the auxiliary condition y[0] = 1. Use the classical method to solve with the input x[n] = e −n u[n] and the auxiliary condition y[−1] = 0. [Hint: You will have to determine the auxiliary condition y[0] by using the iterative method.] a. Use the classical method to solve

with the input x[n] = (3)n and the auxiliary conditions y[0] = 1, y[1] = 3.

3.9.4

3.9.5

b. Repeat part (a) for auxiliary conditions y[−1] = y[−2] = 1. [Hint: Use the iterative method to determine to y[0] and y[1].] Use the classical method to solve

with the input x[n] = 3 −n u[n] and the auxiliary conditions y[0] = 2 and y[1] = −13/3. Use the classical method to find the following sums:

a.

3.9.6

3.9.7

3.9.8

b. Repeat Prob. 3.9-5 to find ∑ n k=0 krk . Use the classical method to solve with the input x[n] = (0.2)n u[n] and the auxiliary conditions y[0] = 1, y[1] = 2. [Hint: The input is a natural mode of the system.] Use the classical method to solve with the input

and the initial conditions y[−1] = y[−2] = 0. [Hint: Find y[0] and y[1] iteratively.] 3.10.1

3.10.2

In Section 3.10 we showed that for BIBO stability in an LTID system, it is sufficient for its impulse response h[n] to satisfy Eq. (3.90). Show that this is also a necessary condition for the system to be BIBO stable. In other words, show that if Eq. (3.90) is not satisfied, there exists a bounded input that produces unbounded output. [Hint: Assume that a system exists for which h[n] violates Eq. (3.90), yet its output is bounded for every bounded input. Establish the contradiction in this statement by considering an input x[n] defined by x[n 1 − m] = 1 when h[m] > 0 and x[n 1 − m] = −1 when h[m] < 0, where n 1 is some fixed integer.] Each of the following equations specifies an LTID system. Determine whether each of these systems is BIBO stable or unstable. Determine also whether each is asymptotically stable, unstable, or marginally stable. a. y[n+2]+0.6y[n+1]−0.16y[n] = x[n+1]−2x[n] b. y[n]+3y[n−1]+2y[n−2] = x[n−1]+2x[n−2] c. (E − 1) 2 (E + 1/2) y[n] = x[n]

d. y[n]+2y[n−1]+0.96y[n−2] = x[n] e. y[n]+y[n−1]−2y[n−2] = x[n] + 2x[n−1]

3.10.3

3.10.4

f. (E 2 − 1)(E2 + 1)y[n] = x[n] Consider two LTIC systems in cascade, as illustrated in Fig. 3.23. The impulse response of the system S1 is h 1 [n] = 2 n u[n] and the impulse response of the system S2 is h 2 [n] = δ[n] − 2δ[n − 1]. Is the cascaded system asymptotically stable or unstable? Determine the BIBO stability of the composite system. Figure P3.10-4 locates the characteristic roots of nine causal, LTID systems, labeled A through I. Each system has only two roots and is described using operator notation as Q(E)y[n] = P(E)x[n]. All plots are drawn to scale, with the unit circle shown for reference. For each of the following parts, identify all the answers that are correct. a. Identify all systems that are unstable. b. Assuming all systems have P(E) = E2 , identify all systems that are real. Recall that a real system always generates a real-valued response to a real-valued input. c. Identify all systems that support oscillatory natural modes. d. Identify all systems that have at least one mode whose envelop decays at a rate of 2 −n . e. Identify all systems that have only one mode.

3.10.5

Figure P3.10-4: Characteristic roots for systems A through I. A discrete-time LTI system has impulse response given by a. Is the system stable? Is the system causal? Justify your answers. b. Plot the signal x[n] = u[n − 3] − u[n + 3].

3.10.6

c. Determine the system's zero-state response y[n] to the input x[n] = u[n − 3] − u[n + 3]. Plot y[n] over (−10 ≤ n ≤ 10). An LTID system has impulse response given by a. Is the system causal? Justify your answer. b. Compute ∑ ∞n = −∞ |h[n]|. Is this system BIBO stable? c. Compute the energy and power of input signal x[n] = 3u[n − 5]. d. Using input x[n] = 3u[n − 5], determine the zero-state response of this system at time n = 10. That is, determine y zs[10].

3.m.1

Consider the discrete-time function f[n] = e −n/5 cos(πn/5)u[n]. MATLAB Session 3 uses an inline object in describing this function. >> f = inline('exp(-n/5).* cos(pi*n/5).* (n>=0)','n'); While this inline object operates correctly for a downsampling operation such as f[2n], it does not operate correctly for an

3.m.2

upsampling operation such as f[n/2]. Modify the inline object f so that it also correctly accommodates upsampling operations. Test your code by computing and plotting f[n/2] over (−10 ≤ n ≤ 10). An indecisive student contemplates whether he should stay home or take his final exam, which is being held 2 miles away. Starting at home, the student travels half the distance to the exam location before changing his mind. The student turns around and travels half the distance between his current location and his home before changing his mind again. This process of changing direction and traveling half the remaining distance continues until the student either reaches a destination or dies from exhaustion. a. Determine a suitable difference equation description of this system. b. Use MATLAB to simulate the difference equation in part (a). Where does the student end up as n → ∞? How do your answer change if the student goes two-thirds the way each time, rather than halfway?

3.m.3

c. Determine a closed-form solution to the equation in part (a). Use this solution to verify the results in part (b). The cross-correlation function between x[n] and y[n] is given as

Notice that r xy[k] is quite similar to the convolution sum. The independent variable k corresponds to the relative shift between the two inputs. a. Express r xy[k] in terms of convolution. Is r xy[k] = r yx[k]? b. Cross-correlation is said to indicate similarity between two signals. Do you agree? Why or why not? c. If x[n] and y[n] are both finite duration, MATLAB's conv command is well suited to compute r xy[k]. i. Write a MATLAB function that computes the cross-correlation function using the conv command. Four vectors are passed to the function (x, y, nx, and ny) corresponding to the inputs x[n], y[n], and their respective time vectors. Notice that, x and y are not necessarily the same length. Two outputs should be created (rxy and k) corresponding to r xy[k] and its shift vector.

3.m.4

ii. Test your code from part c(i), using x[n] = u[n − 5] − u[n − 10] over (0≤n = n x ≤ 20) and y[n] = u[−n − 15] − u[−n − 10] + δ[n − 2] over (−20 ≤ n = n y ≤ 10). Plot the result rxy as a function of the shift vector k. What shift k gives the largest magnitude of r xy[k]? Does this make sense? A causal N-point max filter assigns y[n] to the maximum of {x[n],..., x[n − (N − 1)]}. a. Write a MATLAB function that performs N-point max filtering on a length-M input vector x. The two function inputs are vector x and scalar N. To create the length-M output vector Y, initially pad the input vector with N − 1 zeros. The MATLAB command max may be helpful.

3.m.5

b. Test your filter and MATLAB code by filtering a length-45 input defined as x[n] = cos(πn/5) + δ[n − 30] − δ[n − 35]. Separately plot the results for N = 4, N = 8, and N = 12. Comment on the filter behavior. A causal N-point min filter assigns y[n] to the minimum of {x[n],..., x[n − (N − 1)]}. a. Write a MATLAB function that performs N-point min filtering on a length-M input vector x. The two function inputs are vector x and scalar N. To create the length-M output vector Y, initially pad the input vector with N − 1 zeros. The MATLAB command min may be helpful.

3.m.6

b. Test your filter and MATLAB code by filtering a length-45 input defined as x[n] = cos(πn/5) + δ[n − 30] − δ[n − 35]. Separately plot the results for N = 4, N = 8, and N = 12. Comment on the filter behavior. A causal N-point median filter assigns y[n] to the median of {x[n],..., x[n − (N - 1)]}. The median is found by sorting sequence {x[n],..., x[n − (N − 1)]} and choosing the middle value (odd N) or the average of the two middle values (even N). a. Write a MATLAB function that performs N-point median filtering on a length-M input vector x. The two function inputs are vector x and scalar N. To create the length-M output vector Y, initially pad the input vector with N − 1 zeros. The MATLAB command sort or median may be helpful.

3.m.7

b. Test your filter and MATLAB code by filtering a length-45 input defined as x[n] = cos(πn/5) + δ[n − 30] − δ[n − 35]. Separately plot the results for N = 4, N = 8, and N = 12. Comment on the filter behavior. Recall that y[n] = x[n/N] represents an up-sample by N operation. An interpolation filter replaces the inserted zeros with more realistic values. A linear interpolation filter has impulse response

a. Determine a constant coefficient difference equation that has impulse response h[n]. b. The impulse response h[n] is noncausal. What is the smallest time shift necessary to make the filter causal? What is the

effect of this shift on the behavior of the filter? c. Write a MATLAB function that will compute the parameters necessary to implement an interpolation filter using MATLAB's filter command. That is, your function should output filter vectors b and a given an input scalar N.

3.m.8

d. Test your filter and MATLAB code. To do this, create x[n] = cos(n) for (0 ≤ n ≤ 9). Upsample x[n] by N = 10 to create a new signal x up [n]. Design the corresponding N = 10 linear interpolation filter, filter x up [n] to produce y[n], and plot the results. A causal N-point moving-average filter has impulse response h[n] = (u[n]−u[n−N])/N. a. Determine a constant coefficient difference equation that has impulse response h[n]. b. Write a MATLAB function that will compute the parameters necessary to implement an N-point moving-average filter using MATLAB's filter command. That is, your function should output filter vectors b and a given a scalar input N. c. Test your filter and MATLAB code by filtering a length-45 input defined as x[n] = cos(πn/5) + δ[n − 30] − δ[n − 35]. Separately plot the results for N = 4, N = 8, and N = 12. Comment on the filter behavior. d. Problem 3.M-7 introduces linear interpolation filters, for use following an up-sample by N operation. Within a scale factor, show that a cascade of two N−point moving-average filters is equivalent to the linear interpolation filter. What is the scale factor difference? Test this idea with MATLAB. Create x[n] = cos(n) for (0 ≤ n ≤ 9). Upsample x[n] by N = 10 to create a new signal x up [n]. Design an N = 10 moving-average filter. Filter x up [n] twice and scale to produce y[n]. Plot the results. Does the output from the cascaded pair of moving-average filters linearly interpolate the upsampled data?

Chapter 4: Continuous-Time System Analysis Using the Laplace Transform OVERVIEW Because of the linearity (superposition) property of linear time-invariant systems, we can find the response of these systems by breaking the input x(t) into several components and then summing the system response to all the components of x(t). We have already used this procedure in time-domain analysis, in which the input x(t) is broken into impulsive components. In the frequency-domain analysis developed in this chapter, we break up the input x(t) into exponentials of the form e st , where the parameter s is the complex frequency of the signal e st , as explained in Section 1.4-3. This method offers an insight into the system behavior complementary to that seen in the time-domain analysis. In fact, the time-domain and the frequency-domain methods are duals of each other.

The tool that makes it possible to represent arbitrary input x(t) in terms of exponential components is the Laplace transform, which is discussed in the following section.

4.1 THE LAPLACE TRANSFORM For a signal x(t), its Laplace transform X(s) is defined by

The signal x(t) is said to be the inverse Laplace transform of X(s). It can be shown that[1]

where c is a constant chosen to ensure the convergence of the integral in Eq. (4.1), as explained later. This pair of equations is known as the bilateral Laplace transform pair, where X(s) is the direct Laplace transform of x(t) and x(t) is the inverse Laplace transform of X(s). Symbolically,

Note that It is also common practice to use a bidirectional arrow to indicate a Laplace transform pair, as follows: The Laplace transform, defined in this way, can handle signals existing over the entire time interval from −∞ to ∞ (causal and noncausal signals). For this reason it is called the bilateral (or two-sided) Laplace transform. Later we shall consider a special case-the unilateral or one-sided Laplace transform-which can handle only causal signals. LINEARITY OF THE LAPLACE TRANSFORM We now prove that the Laplace transform is a linear operator by showing that the principle of superposition holds, implying that if then The proof is simple. By definition

This result can be extended to any finite sum. THE REGION OF CONVERGENCE (ROC) The region of convergence (ROC), also called the region of existence, for the Laplace transform X(s), is the set of values of s (the region in the complex plane) for which the integral in Eq. (4.1) converges. This concept will become clear in the following example. EXAMPLE 4.1 For a signal x(t) = e −at u(t), find the Laplace transform X(s) and its ROC. By definition

Because u(t) = 0 for t < 0 and u(t) = 1 for t ≥ 0,

Note that s is complex and as t → ∞, the term e −(s+a)t does not necessarily vanish. Here we recall that for a complex number z = α + jβ, Now |e −jβt | = 1 regardless of the value of βt. Therefore, as t → ∞, e −zt → 0 only if α > 0, and e zt → if α < 0. Thus

Clearly

Use of this result in Eq. (4.5) yields

or

The ROC of X(s) is Re s > −a, as shown in the shaded area in Fig. 4.1a. This fact means that the integral defining X(s) in Eq. (4.5) exists only for the values of s in the shaded region in Fig. 4.1 a. For other values of s, the integral in Eq. (4.5) does not converge. For this reason the shaded region is called the ROC (or the region of existence) for X(s).

Figure 4.1: Signals (a) e −at u(t) and (b) −e at u(−t) have the same Laplace transform but different regions of convergence. REGION OF CONVERGENCE FOR FINITE-DURATION SIGNALS A finite-duration signal x f (t) is a signal that is nonzero only for t1 ≤ t ≤ t2 , where both t1 and t2 are finite numbers and t2 > t1 . For a finite-duration, absolutely integrable signal, the ROC is the entire s plane. This is clear from the fact that if x f (t) is absolutely integrable and a finite-duration signal,

then x(t)e −σt is also absolutely integrable for any value of σ because the integration is over only finite range of t. Hence, the Laplace transform of such a signal converges for every value of s. This means that the ROC of a general signal x(t) remains unaffected by addition of any absolutely represents the ROC of a signal x(t), then the ROC of a signal x(t) + x f (t) is also . integrable, finite-duration signal x f (t) to x(t). In other words, if ROLE OF THE REGION OF CONVERGENCE The ROC is required for evaluating the inverse Laplace transform x(t) from X(s), as defined by Eq. (4.2). The operation of finding the inverse transform requires an integration in the complex plane, which needs some explanation. The path of integration is along c + jω, with ω varying from −∞ to ∞.[†] Moreover, the path of integration must lie in the ROC (or existence) for X(s). For the signal e −at u(t), this is possible if c > −a. One possible path of integration is shown (dotted) in Fig. 4.1a. Thus, to obtain x(t) from X(s), the integration in Eq. (4.2) is performed along this path.

When we integrate [1/(s + a)]e st along this path, the result is e −at u(t). Such integration in the complex plane requires a background in the theory of functions of complex variables. We can avoid this integration by compiling a table of Laplace transforms (Table 4.1), where the Laplace transform pairs are tabulated for a variety of signals. To find the inverse Laplace transform of, say, 1/(s + a), instead of using the complex integral of Eq. (4.2), we look up the table and find the inverse Laplace transform to be e −at u(t) (assuming that the ROC is Re s > −a). Although the table given here is rather short, it comprises the functions of most practical interest. A more comprehensive table appears in Doetsch. [2]

Table 4.1: A Short Table of (Unilateral) Laplace Transforms Open table as spreadsheet

No.

x(t)

X(s)

1

δ(t)

1

2

u(t)

3

tu(t)

4

tn u(t)

5

e λt u(t)

6

teλt u(t)

7

tn e λt u(t)

8a

cos bt u(t)

8b

sin bt u(t)

9a

e −at cos bt u(t)

9b

e −at sin bt u(t)

10a

re −at cos (bt + θ)u(t)

10b

re −at cos (bt + θ)u(t)

10c

re −at cos (bt + θ)u(t)

10d

THE UNILATERAL LAPLACE TRANSFORM To understand the need for defining unilateral transform, let us find the Laplace transform of signal x(t) illustrated in Fig. 4.1b: The Laplace transform of this signal is

Because u(−t) = 1 for t < 0 and u(−t) = 0 for t > 0,

Equation (4.6) shows that

Hence

The signal −e −at u(−t) and its ROC (Re s < −a) are depicted in Fig. 4.1b. Note that the Laplace transforms for the signals e −at u(t) and −e −at u(−t) are identical except for their regions of convergence. Therefore, for a given X(s), there may be more than one inverse transform, depending on the ROC. In other words, unless the ROC is specified, there is no one-to-one correspondence between X(s) and x(t). This fact increases the complexity in using the Laplace transform. The complexity is the result of trying to handle causal as well as noncausal signals. If we restrict all our signals to the

causal type, such an ambiguity does not arise. There is only one inverse transform of X(s) = 1/(s + a), namely, e −at u(t). To find x(t) from X(s), we need not even specify the ROC. In summary, if all signals are restricted to the causal type, then, for a given X(s), there is only one inverse transform x(t).[†]

The unilateral Laplace transform is a special case of the bilateral Laplace transform in which all signals are restricted to being causal; consequently the limits of integration for the integral in Eq. (4.1) can be taken from 0 to ∞. Therefore, the unilateral Laplace transform X(s) of a signal x(t) is defined as

We choose 0 − (rather than 0 + used in some texts) as the lower limit of integration. This convention not only ensures inclusion of an impulse function at t = 0, but also allows us to use initial conditions at 0 − (rather than at 0 + ) in the solution of differential equations via the Laplace transform. In

practice, we are likely to know the initial conditions before the input is applied (at 0 − ), not after the input is applied (at 0 + ). Indeed, the very meaning of the term "initial conditions" implies conditions at t = 0 − (conditions before the input is applied). Detailed analysis of desirability of using t = 0 − appears in Section 4.3.

The unilateral Laplace transform simplifies the system analysis problem considerably because of its uniqueness property, which says that for a given X(s), there is a unique inverse transform. But there is a price for this simplification: we cannot analyze noncausal systems or use noncausal inputs. However, in most practical problems, this restriction is of little consequence. For this reason, we shall first consider the unilateral Laplace transform and its application to system analysis. (The bilateral Laplace transform is discussed later, in Section 4.11.) Basically there is no difference between the unilateral and the bilateral Laplace transform. The unilateral transform is the bilateral transform that deals with a subclass of signals starting at t = 0 (causal signals). Therefore, the expression [Eq. (4.2)] for the inverse Laplace transform remains unchanged. In practice, the term Laplace transform means the unilateral Laplace transform. EXISTENCE OF THE LAPLACE TRANSFORM The variable s in the Laplace transform is complex in general, and it can be expressed as s = σ + jω. By definition

Because |e jωt | = 1, the integral on the right-hand side of this equation converges if

Hence the existence of the Laplace transform is guaranteed if the integral in expression (4.9) is finite for some value of σ. Any signal that grows no

faster than an exponential signal Me σ0 t for some M and σ0 satisfies the condition (4.9). Thus, if for some M and σ0 ,

2

we can choose σ > σ0 to satisfy (4.9).[†] The signal e t , in contrast, grows at a rate faster than e σ0 t , and consequently not Laplace transformable. [‡] Fortunately such signals (which are not Laplace transformable) are of little consequence from either a practical or a theoretical viewpoint. If σ0 is the smallest value of σ for which the integral in (4.9) is finite, σ0 is called the abscissa of convergence and the ROC of X(s) is Re s > σ0 . The abscissa

of convergence for e −at u(t) is −a (the ROC is Re s > −a). EXAMPLE 4.2 Determine the Laplace transform of the following: a. δ(t) b. u(t) 0

c. cos ω t u(t)

a. Using the sampling property [Eq. (1.24a)], we obtain that is,

b. To find the Laplace transform of u(t), recall that u(t) = 1 for t ≥ 0. Therefore

We also could have obtained this result from Eq. (4.7b) by letting a = 0. c. Because

From Eq. (4.7), it follows that

For the unilateral Laplace transform, there is a unique inverse transform of X(s); consequently, there is no need to specify the ROC explicitly. For this reason, we shall generally ignore any mention of the ROC for unilateral transforms. Recall, also, that in the unilateral Laplace transform it is understood that every signal x(t) is zero for t < 0, and it is appropriate to indicate this fact by multiplying the signal by u(t). EXERCISE E4.1

By direct integration, find the Laplace transform X(s) and the region of convergence of X (s) for the signals shown in Fig. 4.2.

Figure 4.2 Answers

a. for all s b. for all s

4.1-1 Finding the Inverse Transform Finding the inverse Laplace transform by using the Eq. (4.2) requires integration in the complex plane, a subject beyond the scope of this book (but see, e.g., Ref. 3). For our purpose, we can find the inverse transforms from the transform table (Table 4.1). All we need is to express X(s) as a sum of simpler functions of the forms listed in the table. Most of the transforms X(s) of practical interest are rational functions, that is, ratios of polynomials in s. Such functions can be expressed as a sum of simpler functions by using partial fraction expansion (see Section B.5).

Values of s for which X(s) = 0 are called the zeros of X(s); the values of s for which X(s) → ∞ are called the poles of X(s). If X(s) is a rational function of the form P(s)/Q(s), the roots of P(s) are the zeros and the roots of Q(s) are the poles of X(s). EXAMPLE 4.3 Find the inverse Laplace transforms of a.

b.

c.

d.

In no case is the inverse transform of these functions directly available in Table 4.1. Rather, we need to expand these functions into partial fractions, as discussed in Section B.5-1. In this computer age, it is very easy to find partial fractions on a computers. However, just as the availability of a handheld computer does not obviate the need for learning the mechanics of arithmetical operations (addition, multiplication, etc.), the widespread availability of computers does not eliminate the need to learn the mechanics of partial fraction expansion.

a. To determine k 1 , corresponding to the term (s + 2), we cover up (conceal) the term (s + 2) in X(s) and substitute s = −2 (the value of s that makes s + 2 = 0) in the remaining expression (see Section B.5-2):

Similarly, to determine k 2 corresponding to the term (s − 3), we cover up the term (s − 3) in X(s) and substitute s = 3 in the remaining expression

Therefore

CHECKING THE ANSWER It is easy to make a mistake in partial fraction computations. Fortunately it is simple to check the answer by recognizing that X(s) and its partial fractions must be equal for every value of s if the partial fractions are correct. Let us verify this assertion in Eq. (4.15a) for some convenient value, say s = 0. Substitution of s = 0 in Eq. (4.15a) yields [†]

We can now be sure of our answer with a high margin of confidence. Using pair 5 of Table 4.1 in Eq. (4.15a), we obtain

b.

Observe that X(s) is an improper function with M = N. In such a case we can express X(s) as a sum of the coefficient of the highest power in the numerator plus partial fractions corresponding to the poles of X(s) (see Section B.5-5). In the present case the coefficient of the highest power in the numerator is 2. Therefore

where

and

Therefore

From Table 4.1, pairs 1 and 5, we obtain

Note that the coefficients (k 2 and k* 2 ) of the conjugate terms must also be conjugate (see Section B.5). Now

Therefore To use pair 10b of Table 4.1, we need to express k 2 and k* 2 in polar form. Observe that tan −1 (4/−3) ≠ tan −1 (−4/3). This fact is evident in Fig. 4.3. For further discussion of this topic, see Example B.1.

Figure 4.3: tan −1 (−4/3) ≠ tan −1 (4/−3). From Fig. 4.3, we observe that so that Therefore

From Table 4.1 (pairs 2 and 10b), we obtain

ALTERNATIVE METHOD USING QUADRATIC FACTORS The foregoing procedure involves considerable manipulation of complex numbers. Pair 10c (Table 4.1) indicates that the inverse transform of quadratic terms (with complex conjugate poles) can be found directly without having to find first-order partial fractions. We discussed such a procedure in Section B.5-2. For this purpose, we shall express X(s) as

We have already determined that k 1 = 6 by the (Heaviside) "cover-up" method. Therefore

Clearing the fractions by multiplying both sides by s(s 2 + 10s + 34) yields Now, equating the coefficients of s 2 and s on both sides yields and

We now use pairs 2 and 10c to find the inverse Laplace transform. The parameters for pair 10c are A = −6, B = −54, a = 5, c −34, b = √c − a 2 = 3, and

Therefore which agrees with the earlier result. SHORTCUTS The partial fractions with quadratic terms also can be obtained by using shortcuts. We have

We can determine A by eliminating B on the right-hand side. This step can be accomplished by multiplying both sides of the equation for X(s) by s and then letting s → ∞. This procedure yields Therefore

To find B, we let s take on any convenient value, say s = 1, in this equation to obtain

a result that agrees with the answer found earlier.

c. where

Therefore

and

ALTERNATIVE METHOD: A HYBRID OF HEAVISIDE AND CLEARING FRACTIONS In this method, the simpler coefficients k 1 and a 0 are determined by the Heaviside "cover-up" procedure, as discussed earlier. To determine the remaining coefficients, we use the clearing-fraction method. Using the values k 1 = 2 and a 0 = 6 obtained earlier by the Heaviside "cover-up" method, we have

We now clear fractions by multiplying both sides of the equation by (s + 1)(s + 2) [3] . This procedure yields [†]

Equating coefficients of s 3 and s 2 on both sides, we obtain

We can stop here if we wish, since the two desired coefficients a 1 and a 2 have already been found. However, equating the coefficients of s 1 and s 0 serves as a check on our answers. This step yields

Substitution of a 1 = a 2 = −2, obtained earlier, satisfies these equations. This step assures the correctness of our answers. ANOTHER ALTERNATIVE: A HYBRID OF HEAVISIDE AND SHORTCUTS In this method, the simpler coefficients k 1 and a 0 are determined by the Heaviside "cover-up" procedure, as discussed earlier. The usual shortcuts are then used to determine the remaining coefficients. Using the values k 1 = 2 and a 0 = 6, determined earlier by the Heaviside method, we have

There are two unknowns, a 1 and a 2 . If we multiply both sides by s and then let s → ∞, we elminate a 1 . This procedure yields Therefore

There is now only one unknown, a 1 . This value can be determined readily by setting s equal to any convenient value, say s = 0. This step yields

COMPUTER EXAMPLE C4.1

Using the MATLAB residue command, determine the inverse Laplace transform of each of the following functions: a.

b.

c.

>> num = [2 0 5]; den = [1 3 2]; >> [r, p, k] = residue(num,den); >> disp([ '(a) r = [ ',num2str(r. ', ' %0.5g '), '] ']);... >> disp([ ' p = [ ',num2str(p. ', ' %0.5g '), '] ']);... >> disp([ ' k = [ ',num2str(k. ', ' %0.5g '), '] ']);... (a) r = [-13 7] p [-2 -1] k = [2] Therefore, Xa (s) = −13/(s + 2) + 7/(s + 1)+2 and x a (t) = (−13e −2t +7e −t )u(t)+2δ(t). >> num = [2 7 4]; den = [conv([1 1],conv([1 2], [1 2])]); >> [r, p, k] = residue(num,den); >> disp([ '(b) r = [ ',num2str(r. ', ' %0.5g '), '] ']);... >> disp([ ' p = [ ',num2str(p. ', ' %0.5g '), '] ']);... >> disp([ ' k = [ ',num2str(k. ', ' %0.5g '), '] ']);... (b) r = [3 2 -1] p [-2 -2 -1] k = [] Therefore, Xb (s) = 3/(s + 2) + 2/(s + 2) 2 − 1/(s + 1) and x b (t) = (3e −2t + 2te−2t −e −t )u(t). >> >> >> >> >> >> >>

num = [8 21 19]; den = [conv([1 2], ([1 1 7])]; [r, p, k] = residue(num,den); disp([ '(c) r = [ ',num2str(r. ', ' %0.5g '), '] ']);... disp([ ' p = [ ',num2str(p. ', ' %0.5g '), '] ']);... disp([ ' k = [ ',num2str(k. ', ' %0.5g '), '] ']);... disp([ ' rad = [ ',num2str(rad. ', ' %0.5g '), '] ']);... disp([ ' mag = [ ',num2str(mag. ', ' %0.5g '), '] ']);

(c) r = [3.5-0.48113i 3.5+0.48113i 1+0i] p [-0.5+2.5981i -0.5-2.5981i -2+0i] k = [] rad = [-0.13661 0.13661 0] mag = [3.5329 3.5329 1] Thus,

and COMPUTER EXAMPLE C4.2 Using MATLAB 's symbolic math toolbox, determine the following: a. the direct Laplace transform of x a (t) = sin (at) + cos (bt) b. the inverse Laplace transform of Xb (s) = as2 /(s 2 + b 2 ) *** Therefore, Xa = (s 3 + as2 + a 2 s + b 2 a)/(s 2 + a 2 )(s 2 + b 2 ) *** Therefore, x b (t) = aδ(t) − ab sin (bt)u(t). EXERCISE E4.2

i. Show that the Laplace transform of 10e −3t cos (4t + 53.13°) is (6s − 14)/ (s 2 + 6s + 25). Use pair 10a from Table 4.1. ii. Find the inverse Laplace transform of the following:

a.

b.

c. Answers

a. (3e t − 2e −5t )u(t) b. c. [3e 2t + (t − 3)e −3t ]u{t)

A HISTORICAL NOTE: MARQUIS PIERRE-SIMON DE LAPLACE (1749-1827) The Laplace transform is named after the great French mathematician and astronomer Laplace, who first presented the transform and its applications to differential equations in a paper published in 1779.

Pierre-Simon de Laplace Laplace developed the foundations of potential theory and made important contributions to special functions, probability theory, astronomy, and celestial mechanics. In his Exposition du système du monde (1796), Laplace formulated a nebular hypothesis of cosmic origin and tried to explain the universe as a pure mechanism. In his Traité de mécanique céleste (celestial mechanics), which completed the work of Newton, Laplace used mathematics and physics to subject the solar system and all heavenly bodies to the laws of motion and the principle of gravitation. Newton had been unable to explain the irregularities of some heavenly bodies; in desperation, he concluded that God himself must intervene now and then to prevent such catastrophes as Jupiter eventually falling into the sun (and the moon into the earth) as predicted by Newton 's calculations. Laplace proposed to show that these irregularities would correct themselves periodically and that a little patience -in Jupiter 's case, 929 years -would see everything returning automatically to order; thus there was no reason why the solar and the stellar systems could not continue to operate by the laws of Newton and Laplace to the end of time. [4]

Laplace presented a copy of Mécanique céleste to Napoleon, who, after reading the book, took Laplace to task for not including God in his scheme: "You have written this huge book on the system of the world without once mentioning the author of the universe." "Sire," Laplace retorted, "I had no need of that hypothesis." Napoleon was not amused, and when he reported this reply to another great mathematician-astronomer, Louis de Lagrange, the latter remarked, "Ah, but that is a fine hypothesis. It explains so many things."[5]

Napoleon, following his policy of honoring and promoting scientists, made Laplace the minister of the interior. To Napoleon 's dismay, however, the new appointee attempted to bring "the spirit of infinitesimals" into administration, and so Laplace was transferred hastily to the senate.

OLIVER HEAVISIDE (1850-1925) Although Laplace published his transform method to solve differential equations in 1779, the method did not catch on until a century later. It was

rediscovered independently in a rather awkward form by an eccentric British engineer, Oliver Heaviside (1850-1925), one of the tragic figures in the history of science and engineering. Despite his prolific contributions to electrical engineering, he was severely criticized during his lifetime and was neglected later to the point that hardly a textbook today mentions his name or credits him with contributions. Nevertheless, his studies had a major impact on many aspects of modern electrical engineering. It was Heaviside who made transatlantic communication possible by inventing cable loading, but no one ever mentions him as a pioneer or an innovator in telephony. It was Heaviside who suggested the use of inductive cable loading, but the credit is given to M. Pupin, who was not even responsible for building the first loading coil. [†] In addition, Heaviside was [6] The first to find a solution to the distortionless transmission line. The innovator of lowpass filters. The first to write Maxwell 's equations in modern form. The codiscoverer of rate energy transfer by an electromagnetic field. An early champion of the now-common phasor analysis. An important contributor to the development of vector analysis. In fact, he essentially created the subject independently of Gibbs.[7] An originator of the use of operational mathematics used to solve linear integro-differential equations, which eventually led to rediscovery of the ignored Laplace transform. The first to theorize (along with Kennelly of Harvard) that a conducting layer (the Kennelly-Heaviside layer) of atmosphere exists, which allows radio waves to follow earth 's curvature instead of traveling off into space in a straight line. The first to posit that an electrical charge would increase in mass as its velocity increases, an anticipation of an aspect of Einstein 's special theory of relativity. [8] He also forecast the possibility of superconductivity.

Heaviside was a self-made, self-educated man. Although his formal education ended with elementary school, he eventually became a pragmatically successful mathematical physicist. He began his career as a telegrapher, but increasing deafness forced him to retire at the age of 24. He then devoted himself to the study of electricity. His creative work was disdained by many professional mathematicians because of his lack of formal education and his unorthodox methods. Heaviside had the misfortune to be criticized both by mathematicians, who faulted him for lack of rigor, and by men of practice, who faulted him for using too much mathematics and thereby confusing students. Many mathematicians, trying to find solutions to the distortionless transmission line, failed because no rigorous tools were available at the time. Heaviside succeeded because he used mathematics not with rigor, but with insight and intuition. Using his much maligned operational method, Heaviside successfully attacked problems that the rigid mathematicians could not solve, problems such as the flow of heat in a body of spatially varying conductivity. Heaviside brilliantly used this method in 1895 to demonstrate a fatal flaw in Lord Kelvin 's determination of the geological age of the earth by secular cooling; he used the same flow of heat theory as for his cable analysis. Yet the mathematicians of the Royal Society remained unmoved and were not the least impressed by the fact that Heaviside had found the answer to problems no one else could solve. Many mathematicians who examined his work dismissed it with contempt, asserting that his methods were either complete nonsense or a rehash of known ideas.[6]

Sir William Preece, the chief engineer of the British Post Office, a savage critic of Heaviside, ridiculed Heaviside 's work as too theoretical and, therefore, leading to faulty conclusions. Heaviside 's work on transmission lines and loading was dismissed by the British Post Office and might have remained hidden, had not Lord Kelvin himself publicly expressed admiration for it. [6]

Heaviside 's operational calculus may be formally inaccurate, but in fact it anticipated the operational methods developed in more recent years. [9] Although his method was not fully understood, it provided correct results. When Heaviside was attacked for the vague meaning of his operational calculus, his pragmatic reply was, "Shall I refuse my dinner because I do not fully understand the process of digestion?" Heaviside lived as a bachelor hermit, often in near-squalid conditions, and died largely unnoticed, in poverty. His life demonstrates the persistent arrogance and snobbishness of the intellectual establishment, which does not respect creativity unless it is presented in the strict language of the establishment. [1] Lathi, B. P. Signal Processing and Linear Systems, 1st ed. Oxford University Press, New York, 1998. [†] The discussion about the path of convergence is rather complicated, requiring the concepts of contour integration and understanding of the theory of complex variables. For this reason, the discussion here is somewhat simplified. [2] Doetsch, G. Introduction to the Theory and Applications of the Laplace Transformation with a Table of Laplace Transformations. Springer-Verlag, New York, 1974. [†] Actually, X(s) specifies x(t), within a null function n(t), which has the property that the area under |n(t)|2 is zero over any finite interval 0 to t (t >

0) (Lerch 's theorem). For example, if two functions are identical everywhere except at finite number of points, they differ by a null function.

[†] Condition (4.10) is sufficient but not necessary for the existence of the Laplace transform. For example x(t) = 1/√t is infinite at t = 0 and, (4.10)

cannot be satisfied, but the transform of 1/√t exists and is given by √π/s.

[‡] However, if we consider a truncated (finite duration) signal e t 2 , the Laplace transform exists. [†] Because X(s) = ∞ at its poles, we should avoid the pole values (−2 and 3 in the present case) for checking. The answers may check even if

partial fractions are wrong. This situation can occur when two or more errors cancel their effects. But the chances of this problem arising for randomly selected values of s are extremely small. [3] LePage, W. R. Complex Variables and the Laplace Transforms for Engineers. McGraw-Hill, New York, 1961. [†] We could have cleared fractions without finding k and a . This alternative, however, proves more laborious because it increases the number of 1 0 unknowns to 4. By predetermining k 1 and a 0 , we reduce the unknowns to 2. Moreover, this method provides a convenient check on the solution. This hybrid procedure achieves. the best of both methods. [4] Durant, Will, and Ariel Durant. The Age of Napoleon, Part XI in The Story of Civili ation Series. Simon & Schuster, New York, 1975. [5] Bell, E. T. Men of Mathematics. Simon & Schuster, New York, 1937. [†] Heaviside developed the theory for cable loading, George Campbell built the first loading coil, and the telephone circuits using Campbell 's coils were in operation before Pupin published his paper. In the legal fight over the patent, however, Pupin won the battle because of his shrewd selfpromotion and the poor legal support for Campbell. [6] Nahin, P. J. "Oliver Heaviside: Genius and Curmudgeon." IEEE Spectrum, vol. 20, pp. 63 -69, July 1983. [7] Berkey, D. Calculus, 2nd ed. Saunders, Philadelphia, 1988. [8] Encyclopaedia Britannica. Micropaedia IV, 15th ed., p. 981, Chicago, 1982. [9] Churchill, R. V. Operational Mathematics, 2nd ed. McGraw-Hill, New York, 1958.

4.2 SOME PROPERTIES OF THE LAPLACE TRANSFORM Properties of the Laplace transform are useful not only in the derivation of the Laplace transform of functions but also in the solutions of linear integro-differential equations. A glance at Eqs. (4.2) and (4.1) shows that there is a certain measure of symmetry in going from x(t) to X(s), and vice versa. This symmetry or duality is also carried over to the properties of the Laplace transform. This fact will be evident in the following development. We are already familiar with two properties; linearity [Eq. (4.4)] and the uniqueness property of the Laplace transform discussed earlier.

4.2-1 Time Shifting The time-shifting property states that if then for t0 ≥ 0

Observe that x(t) starts at t = 0, and, therefore, x(t − t0 ) starts at t = t0 . This fact is implicit, but is not explicitly indicated in Eq. (4.19a). This often leads to inadvertent errors. To avoid such a pitfall, we should restate the property as follows. If then

Proof.

Setting t − t0 = τ, we obtain

Because u(τ) = 0 for τ < 0 and u(τ) = 1 for τ ≥ 0, the limits of integration can be taken from 0 to ∞. Thus

Note that x(t − t0 )u(t − t0 ) is the signal x(t)u(t) delayed by t0 seconds. The time-shifting property states that delaying a signal by t0 seconds amounts to multiplying its transform e −st 0 .

This property of the unilateral Laplace transform holds only for positive t0 because if t0 were negative, the signal x(t − t0 )u(t − t0 ) may not be causal. We can readily verify this property in Exercise E4.1. If the signal in Fig. 4.2a is x(t)u(t), then the signal in Fig. 4.2b is x(t − 2)u(t − 2). The Laplace transform for the pulse in Fig. 4.2a is (1/s)(1 − e −2s ). Therefore, the Laplace transform for the pulse in Fig. 4.2b is (1/s)(1 − e −2s)e −2 s.

The time-shifting property proves very convenient in finding the Laplace transform of functions with different descriptions over different intervals, as the following example demonstrates. EXAMPLE 4.4 Find the Laplace transform of x(t) depicted in Fig. 4.4a.

Figure 4.4: Finding a mathematical description of a function x(t). Describing mathematically a function such as the one in Fig. 4.4a is discussed in Section 1.4. The function x(t) in Fig. 4.4a can be described as a sum of two components shown in Fig. 4.4b. The equation for the first component is t − 1 over 1 ≤ t ≤ 2, so that this component can be described by (t − 1)[u(t − 1) − u(t − 2)]. The second component can be described by u(t − 2) − u(t − 4). Therefore

The first term on the right-hand side is the signal tu(t) delayed by 1 second. Also, the third and fourth terms are the signal u(t) delayed by 2 and 4 seconds, respectively. The second term, however, cannot be interpreted as a delayed version of any entry in Table 4.1. For this reason, we rearrange it as We have now expressed the second term in the desired form as tu(t) delayed by 2 seconds plus u(t) delayed by 2 seconds. With this result, Eq. (4.20a) can be expressed as

Application of the time-shifting property to tu(t)

1/s 2 yields

Also

Therefore

EXAMPLE 4.5 Find the inverse Laplace transform of

Observe the exponential term e −2s in the numerator of X(s), indicating time delay. In such a case we should separate X(s) into terms with and without delay factor, as

where

Therefore

Also, because We can write

EXERCISE E4.3 Find the Laplace transform of the signal illustrated in Fig. 4.5.

Figure 4.5 Answers

EXERCISE E4.4 Find the inverse Laplace transform of

Answers [e t−2 − e −2(t−2)]u(t−2)

4.2-2 Frequency Shifting The frequency-shifting property states that if then

Observe the symmetry (or duality) between this property and the time-shifting property (4.19a). Proof.

EXAMPLE 4.6 Derive pair 9a in Table 4.1 from pair 8a and the frequency-shifting property. Pair 8a is

From the frequency-shifting property [Eq. (4.23)] with s 0 = −a we obtain

EXERCISE E4.5 Derive pair 6 in Table 4.1 from pair 3 and the frequency-shifting property. We are now ready to consider the two of the most important properties of the Laplace transform: time differentiation and time integration.

4.2-3 The Time-Differentiation Property[†] The time-differentiation property states that if then

Repeated application of this property yields

where x (r)(0 − ) is d r x/dtr at t = 0 − . Proof.

Integrating by parts, we obtain

For the Laplace integral to converge [i.e., for X (s) to exist], it is necessary that x(t)e −st → 0 as t → ∞ for the values of s in the ROC for X(s). Thus,

Repeated application of this procedure yields Eq. (4.24c). EXAMPLE 4.7 Find the Laplace transform of the signal x(t) in Fig. 4.6a by using Table 4.1 and the time-differentiation and time-shifting properties of the Laplace transform.

Figure 4.6: Finding the Laplace transform of a piecewise-linear function by using the time-differentiation property. Figures 4.6b and 4.6c show the first two derivatives of x(t). Recall that the derivative at a point of jump discontinuity is an impulse of strength equal to the amount of jump [see Eq. (1.27)]. Therefore

The Laplace transform of this equation yields

Using the time-differentiation property Eq. (4.24b), the time-shifting property (4.19a), and the facts that Therefore

which confirms the earlier result in Exercise E4.3.

4.2-4 The Time-Integration Property The time-integration property states that if then [†]

and

Proof. We define

, and δ(t)

1, we obtain

so that

Now, if then

Therefore

or

To prove Eq. (4.26), observe that

Note that the first term on the right-hand side is a constant for t ≥ 0. Taking the Laplace transform of the foregoing equation and using Eq. (4.25), we obtain

Scaling The scaling property states that if then for a > 0

The proof is given in Chapter 7. Note that a is restricted to positive values because if x(t) is causal, then x(at) is anticausal (is zero for t ≥ 0) for negative a, and anticausal signals are not permitted in the (unilateral) Laplace transform. Recall that x(at) is the signal x(t) time-compressed by the factor a, and is X(s) expanded along the s-scale by the same factor a (see Section 1.2-2). The scaling property states that time compression of a signal by a factor a causes expansion of its Laplace transform in the s-scale by the same factor. Similarly, time expansion x(t) causes compression of X(s) in the s-scale by the same factor.

4.2-5 Time Convolution and Frequency Convolution Another pair of properties states that if then (time-convolution property)

and (frequency-convolution property)

Observe the symmetry (or duality) between the two properties. Proofs of these properties are postponed to Chapter 7. Equation (2.48) indicates that H(s), the transfer function of an LTIC system, is the Laplace transform of the system's impulse response h(t); that is,

If the system is causal, h(t) is causal, and, according to Eq. (2.48), H(s) is the unilateral Laplace transform of h(t). Similarly, if the system is noncausal, h(t) is noncausal, and H(s) is the bilateral transform of h(t). We can apply the time-convolution property to the LTIC input-output relationship y(t) = x(t) * h(t) to obtain

The response y(t) is the zero-state response of the LTIC system to the input x(t). From Eq. (4.31), it follows that

This may be considered to be an alternate definition of the LTIC system transfer function H(s). It is the ratio of the transform of zero-state response to the transform of the input. EXAMPLE 4.8 Using the time-convolution property of the Laplace transform to determine c(t) = e at u(t)*e bt u(t). From Eq. (4.28), it follows that

The inverse transform of this equation yields

Table 4.2: The Laplace Transform Properties Open table as spreadsheet Operation

x(t)

X(s)

Addition

x 1 (t) + x 2 (t)

X1 (s) + X2 (s)

Scalar multiplication

kx(t)

kX(s)

Time differentiation

sX(s) − x(0 − )

Time integration

Time shifting

x(t − t0 )u(t − t0 )

X(s)e −st 0 t0 ≥ 0

Frequency shifting

x(t)e s 0 t

X(s − s 0 )

Frequency differentiation

−tx(t)

Frequency integration

Scaling

x(at), a ≥ 0

Time convolution

x 1 (t)x 2 (t)

Frequency convolution

x 1 (t)x 2 (t)

Initial value

x(0 + )

Final value

x(∞)

Initial and Final Values

X1 (s) X2 (s)

In certain applications, it is desirable to know the values of x(t) as t → 0 and t → ∞ [initial and final values of x(t)] from the knowledge of its Laplace transform X(s). Initial and final value theorems provide such information. The initial value theorem states that if x(t) and its derivative dx/dt are both Laplace transformable, then

provided the limit on the right-hand side of Eq. (4.33) exists. The final value theorem states that if both x(t) and dx/dt are Laplace transformable, then

provided sX(s) has no poles in the RHP or on the imaginary axis. To prove these theorems, we use Eq. (4.24a)

Therefore

and

Comment. The initial value theorem applies only if X(s) is strictly proper (M < N), because for M ≥ N, lim s→∞ sX(s) does not exist, and the theorem does not apply. In such a case, we can still find the answer by using long division to express X(s) as a polynomial in s plus a strictly proper fraction, where M ≤ N. For example, by using long division, we can express

The inverse transform of the polynomial in s is in terms of δ(t), and its derivatives, which are zero at t = 0 + . In the foregoing case, the inverse transform of s + 1 is applies. In the present case

. Hence, the desired x(0 + ) is the value of the remainder (strictly proper) fraction, for which the initial value theorem

To prove the final value theorem, we let s → 0 in Eq. (4.24a) to obtain

a deduction that leads to the desired result, Eq. (4.34). Comment. The final value theorem applies only if the poles of X(s) are in the LHP (including s = 0). If X(s) has a pole in the RHP, x(t) contains an exponentially growing term and x(∞) does not exist. If there is a pole on the imaginary axis, then x(t) contains an oscillating term and x(∞) does not exist. However, if there is a pole at the origin, then x(t) contains a constant term, and hence, x(∞) exists and is a constant. EXAMPLE 4.9 Determine the initial and final values of y(t) if its Laplace transform Y(s) is given by

Equations (4.33) and (4.34) yield

[†] The dual of the time-differentiation property is the frequency-differentiation property, which states that

[†] The dual of the time-integration property is the frequency-integration property, which states that

4.3 SOLUTION OF DIFFERENTIAL AND INTEGRO-DIFFERENTIAL EQUATIONS The time-differentiation property of the Laplace transform has set the stage for solving linear differential (or integro-differential) equations with

constant coefficients. Because d k y/dtk s k Y(s), the Laplace transform of a differential equation is an algebraic equation that can be readily solved for Y(s). Next we take the inverse Laplace transform of Y(s) to find the desired solution y(t). The following examples demonstrate the Laplace transform procedure for solving linear differential equations with constant coefficients. EXAMPLE 4.10 Solve the second-order linear differential equation

for the initial conditions y(0 − ) = 2 and

and the input x(t) = e −4t u(t).

The equation is

Let Then from Eqs. (4.24)

and

Moreover, for x(t) = e −4t u(t),

Taking the Laplace transform of Eq. (4.35b), we obtain

Collecting all the terms of Y(s) and the remaining terms separately on the left-hand side, we obtain

Therefore

and

Expanding the right-hand side into partial fractions yields

The inverse Laplace transform of this equation yields

Example 4.10 demonstrates the ease with which the Laplace transform can solve linear differential equations with constant coefficients. The method is general and can solve a linear differential equation with constant coefficients of any order. Zero-Input and Zero-State Components of Response The Laplace transform method gives the total response, which includes zero-input and zero-state components. It is possible to separate the two components if we so desire. The initial condition terms in the response give rise to the zero-input response. For instance, in Example 4.10, the terms

in Eq. (4.36a) generate the zero-input response. These initial condition terms are −(2s + attributable to initial conditions y(0 − ) = 2 and 11), as seen in Eq. (4.36b). The terms on the right-hand side are exclusively due to the input. Equation (4.36b) is reproduced below with the proper labeling of the terms.

so that

Therefore

Taking the inverse transform of this equation yields

COMMENTS ON INITIAL CONDITIONS AT 0 − AND AT 0 +

The initial conditions in Example 4.10 are y(0 − ) = 2 and

. If we let t = 0 in the total response in Eq. (4.37), we find y(0) = 2 and

, which is at odds with the given initial conditions. Why? Because the initial conditions are given at t = 0 − (just before the input is applied), when only the zero-input response is present. The zero-state response is the result of the input x(t) applied at t = 0. Hence, this component does not exist at t = 0 − . Consequently, the initial conditions at t = 0 − are satisfied by the zero-input response, not by the total response. We can readily

verify in this example that the zero-input response does indeed satisfy the given initial conditions at t = 0 − . It is the total response that satisfies the initial conditions at t = 0 + , which are generally different from the initial conditions at 0 − . There also exists a

version of the Laplace transform, which uses the initial conditions at t = 0 + rather than at 0 − (as in our present

version).

The version, which was in vogue till the early 1960s, is identical to the version except the limits of Laplace integral [Eq. (4.8)] are from 0 + to ∞. Hence, by definition, the origin t = 0 is excluded from the domain. This version, still used in some math books, has some serious difficulties. For

instance, the Laplace transform of δ(t) is zero because δ(t) = 0 for t ≥ 0 + . Moreover, this approach is rather clumsy in the theoretical study of linear systems because the response obtained cannot be separated into zero-input and zero-state components. As we know, the zero-state component represents the system response as an explicit function of the input, and without knowing this component, it is not possible to assess the effect of the version can separate the response in terms of the natural and the forced components, input on the system response in a general way. The which are not as interesting as the zero-input and the zero-state components. Note that we can always determine the natural and the forced components from the zero-input and the zero-state components [see Eqs. (2.52)], but the converse is not true. Because of these and some other problems, electrical engineers (wisely) started discarding the

version in the early sixties.

It is interesting to note the time-domain duals of these two Laplace versions. The classical method is the dual of the

method, and the convolution

(zero-input/zero-state) method is the dual of the

method. The first pair uses the initial conditions at 0 + , and the second pair uses those at t = 0 − .

The first pair (the classical method and the version) is awkward in the theoretical study of linear system analysis. It was no coincidence that the version was adopted immediately after the introduction to the electrical engineering community of state-space analysis (which uses zeroinput/zero-state separation of the output). EXERCISE E4.6 Solve

for the input x(t) = u(t). The initial conditions are y(0 − ) = 1 and

.

Answers y(t) = (1 + 9e −t − 7e −3t )u(t)u(t) EXAMPLE 4.11 In the circuit of Fig. 4.7a, the switch is in the closed position for a long time before t = 0, when it is opened instantaneously. Find the inductor current y(t) for t ≥ 0.

Figure 4.7: Analysis of a network with a switching action. When the switch is in the closed position (for a long time), the inductor current is 2 amperes and the capacitor voltage is 10 volts. When the switch is

opened, the circuit is equivalent to that depicted in Fig. 4.7b, with the initial inductor current y(0 − ) = 2 and the initial capacitor voltage v C(0 − ) = 10. The input voltage is 10 volts, starting at t = 0, and, therefore, can be represented by 10u(t). The loop equation of the circuit in Fig. 4.7b is

If

then

and [see Eq. (4.26)]

− Because y(t) is the capacitor current, the integral ∫ 0 −∞ y(τ)dτ is q c (0 − ), the capacitor charge at t = 0 − , which is given by C times the capacitor voltage at t = 0 − . Therefore

From Eq. (4.39c) it follows that

Taking the Laplace transform of Eq. (4.38) and using Eqs. (4.39a), (4.39b), and (4.40), we obtain

or

and

To find the inverse Laplace transform of Y(s), we use pair 10c (Table 4.1) with values A = 2, B = 0, a = 1, and c = 5. This yields

Therefore This response is shown in Fig. 4.7c. Comment. In our discussion so far, we have multiplied input signals by u(t), implying that the signals are zero prior to t = 0. This is needlessly restrictive. These signals can have any arbitrary value prior to t = 0. As long as the initial conditions at t = 0 are specified, we need only the knowledge of the input for t ≥ 0 to compute the response for t ≥ 0. Some authors use the notation 1(t) to denote a function that is equal to u(t) for t ≥ 0 and that has arbitrary value for negative t. We have abstained from this usage to avoid needless confusion caused by introduction of a new function, which is very similar to u(t).

4.3-1 Zero-State Response Consider an Nth-order LTIC system specified by the equation or

We shall now find the general expression for the zero-state response of an LTIC system. Zero-state response y(t), by definition, is the system response to an input when the system is initially relaxed (in zero state). Therefore, y(t) satisfies the system equation (4.41) with zero initial conditions Moreover, the input x(t) is causal, so that Let Because of zero initial conditions

Therefore, the Laplace transform of Eq. (4.41) yields or

But we have shown in Eq. (4.31) that Y(s) = H(s)X(s). Consequently,

This is the transfer function of a linear differential system specified in Eq. (4.41). The same result has been derived earlier in Eq. (2.50) using an

alternate (time-domain) approach. We have shown that Y(s), the Laplace transform of the zero-state response y(t), is the product of X(s) and H(s), where X(s) is the Laplace transform of the input x(t) and H(s) is the system transfer function [relating the particular output y(t) to the input x(t)]. INTUITIVE INTERPRETATION OF THE LAPLACE TRANSFORM So far we have treated the Laplace transform as a machine, which converts linear integro-differential equations into algebraic equations. There is no physical understanding of how this is accomplished or what it means. We now discuss a more intuitive interpretation and meaning of the Laplace transform. In Chapter 2, Eq. (2.47), we showed that LTI system response to an everlasting exponential e st is H (s)e st . If we could express every signal as a

linear combination of everlasting exponentials of the form e st , we could readily obtain the system response to any input. For example, if

The response of an LTIC system to such input x(t) is given by

Unfortunately, a very small class of signals can be expressed in this form. However, we can express almost all signals of practical utility as a sum of everlasting exponentials over a continuum of frequencies. This is precisely what the Laplace transform in Eq. (4.2) does.

Invoking the linearity property of the Laplace transform, we can find the system response y(t) to input x(t) in Eq. (4.44) as[†]

Clearly We can now represent the transformed version of the system, as depicted in Fig. 4.8a. The input X(s) is the Laplace transform of x(t), and the output Y(s) is the Laplace transform of (the zero-input response) y(t). The system is described by the transfer function H(s). The output Y(s) is the product X(s)H(s).

Figure 4.8: Alternate interpretation of the Laplace transform. Recall that s is the complex frequency of e st . This explains why the Laplace transform method is also called the frequency-domain method. Note that in Fig. X(s), Y(s), and H(s) are the frequency-domain representations of x(t), y(t), and h(t), respectively. We may view the boxes marked and 4.8a as the interfaces that convert the time-domain entities into the corresponding frequency-domain entities, and vice versa. All real-life signals begin in the time domain, and the final answers must also be in the time domain. First, we convert the time-domain input(s) into the frequencydomain counterparts. The problem itself is solved in the frequency domain, resulting in the answer Y(s), also in the frequency domain. Finally, we convert Y(s) to y(t). Solving the problem is relatively simpler in the frequency domain than in the time domain. Henceforth, we shall omit the explicit , representing signals and systems in the frequency domain, as shown in Fig. 4.8b. representation of the interface boxes and THE DOMINANCE CONDITION In this intuitive interpretation of the Laplace transform, one problem should have puzzled the reader. In Section 2.5 (classical solution of differential

equations), we showed in Eq. (2.57) that an LTI system response to input e st is H(s) e st plus characteristic mode terms. In the intuitive interpretation, an LTI system response is found by adding the system responses to all the infinite exponential components of the input. These components are exponentials of the form e st starting at t = −∞. We showed in Eq. (2.47) that the response to everlasting input e st is also an everlasting exponential

H(s) e st . Does this result not conflict with the result in Eq. (2.57)? Why are there no characteristic mode terms in Eq. (2.47), as predicted by Eq.

(2.57)? The answer is that the mode terms are also present. The system response to an everlasting input e st is indeed an everlasting exponential

H(s) e st plus mode terms. All these signals start at t = −∞. Now, if a mode e λ it is such that it decays faster than (or grows slower than) e st , that is, if Re λi < Re s, then after some time interval, e st will be overwhelmingly stronger than e λ it , and hence will completely dominate such a mode term. In such a case, at any finite time (which is long time after the start at t = −∞), we can ignore the mode terms and say that the complete response is st

H(s) e . Hence, we can reconcile Eq. (2.47) to Eq. (2.57) only if the dominance condition is satisfied, that is, if Re λi < Re s for all i. If the dominance condition is not satisfied, the mode terms dominate e st and Eq. (2.47) does not hold. [10] Careful examination shows that the dominance condition is implied in Eq. (2.47). This is because of the caviat in Eq. (2.47) that the response of an

LTIC system to everlasting e st is H(s) e st , provided H(s) exists (or converges). We can show that this condition amounts to dominance condition. If a

system has characteristic roots ? 1 , ? 2 , ..., λN, then h(t) consists of exponentials of the form e λ it (i = 1, 2, ..., N) and the convergence of H (s) requires that Re s > Re λi for i = 1, 2, ..., N, which precisely is the dominance condition. Clearly, the dominance condition is implied in Eq. (2.47), and also in the entire fabric of the Laplace transform. It is interesting to note that the elegant structure of convergence in Laplace transform is rooted in such a lowly, mundane origin, as Eq. (2.57). EXAMPLE 4.12 Find the response y(t) of an LTIC system described by the equation

if the input x(t) = 3e −5t u(t) and all the initial conditions are zero; that is, the system is in the zero state. The system equation is

Therefore

Also

and

The inverse Laplace transform of this equation is EXAMPLE 4.13 Show that the transfer function of a. an ideal delay of T seconds is e −sT b. an ideal differentiator is s c. an ideal integrator is 1/s a. Ideal Delay. For an ideal delay of T seconds, the input x(t) and output y(t) are related by or Therefore

b. Ideal Differentiator. For an ideal differentiator, the input x(t) and the output y(t) are related by

The Laplace transform of this equation yields and

c. Ideal Integrator. For an ideal integrator with zero initial state, that is, y(0 − ) = 0,

and

Therefore

EXERCISE E4.7

For an LTIC system with transfer function

a. Describe the differential equation relating the input x(t) and output y(t). b. Find the system response y(t) to the input x(t) = e −2t u(t) if the system is initially in zero state. Answers

a.

b. y(t) = (2e −t − 3e −2t − 3e −2t + e −3t )u(t)

4.3-2 Stability Equation (4.43) shows that the denominator of H(s) is Q(s), which is apparently identical to the characteristic polynomial Q(λ) defined in Chapter 2. Does this mean that the denominator of H(s) is the characteristic polynomial of the system? This may or may not be the case, since if P(s) and Q(s) in Eq. (4.43) have any common factors, they cancel out, and the effective denominator of H(s) is not necessarily equal to Q(s). Recall also that the system transfer function H(s), like h(t), is defined in terms of measurements at the external terminals. Consequently, H(s) and h(t) are both external descriptions of the system. In contrast, the characteristic polynomial Q(s) is an internal description. Clearly, we can determine only external stability, that is, BIBO stability, from H(s). If all the poles of H(s) are in LHP, all the terms in h(t) are decaying exponentials, and h(t) is absolutely integrable [see Eq. (2.64)]. [†] Consequently, the system is BIBO stable. Otherwise the system is BIBO unstable.

Beware of the RHP poles! So far, we have assumed that H(s) is a proper function, that is, M ≥ N. We now show that if H(s) is improper, that is, if M > N, the system is BIBO unstable. In such a case, using long division, we obtain H(s) = R(s) + H′(s), where R(s) is an (M − N)th-order polynomial and H′(s) is a proper transfer function. For example,

As shown in Eq. (4.47), the term s is the transfer function of an ideal differentiator. If we apply step function (bounded input) to this system, the output will contain an impulse (unbounded output). Clearly, the system is BIBO unstable. Moreover, such a system greatly amplifies noise because differentiation enhances higher frequencies, which generally predominate in a noise signal. These are two good reasons to avoid improper systems (M > N). In our future discussion, we shall implicitly assume that the systems are proper, unless stated otherwise. If P(s) and Q(s) do not have common factors, then the denominator of H(s) is identical to Q(s), the characteristic polynomial of the system. In this case, we can determine internal stability by using the criterion described in Section 2.6. Thus, if P(s) and Q(s) have no common factors, the asymptotic stability criterion in Section 2.6 can be restated in terms of the poles of the transfer function of a system, as follows: 1. An LTIC system is asymptotically stable if and only if all the poles of its transfer function H(s) are in the LHP. The poles may be simple or repeated. 2. An LTIC system is unstable if and only if either one or both of the following conditions exist: (i) at least one pole of H(s) is in the RHP; (ii) there are repeated poles of H(s) on the imaginary axis. 3. An LTIC system is marginally stable if and only if there are no poles of H(s) in the RHP and some unrepeated poles on the imaginary axis. Location of zeros of H(s) have no role in determining the system stability. EXAMPLE 4.14 followed by . The transfer functions of these systems are H 1 (s) = 1/(s − 1) and Figure 4.9a shows a cascade connection of two LTIC systems H 2 (s) = (s − 1)/(s + 1), respectively. We shall find the BIBO and asymptotic stability of the composite (cascade) system.

Figure 4.9: Distinction between BIBO and asymptotic stability. and are h 1 (t) and h 2 (t), respectively, then the impulse response of the cascade system is h(t) = h 1 (t) * h 2 (t). If the impulse response of Hence, H(s) = H 1 (s)H 2 (s). In the present case,

The pole of at s = 1 cancels with the zero at s = 1 of . This results in a composite system having a single pole at s = − 1. If the composite cascade system were to be enclosed inside a black box with only the input and the output terminals accessible, any measurement from these external terminals would show that the transfer function of the system is 1/(s + 1), without any hint of the fact that the system is housing an unstable system (Fig. 4.9b). The impulse response of the cascade system is h(t) = e −t u(t), which is absolutely integrable. Consequently, the system is BIBO stable. has one characteristic root at 1, and also has one root at − 1. Recall that the two systems To determine the asymptotic stability, we note that are independent (one does not load the other), and the characteristic modes generated in each subsystem are independent of the other. Clearly, the

mode e t will not be eliminated by the presence of asymptotically unstable, though BIBO stable.

. Hence, the composite system has two characteristic roots, located at ±1, and the system is

and makes no difference in this conclusion. This example shows that BIBO stability can be misleading. If a Interchanging the positions of system is asymptotically unstable, it will destroy itself (or, more likely, lead to saturation condition) because of unchecked growth of the response due to intended or unintended stray initial conditions. BIBO stability is not going to save the system. Control systems are often compensated to realize certain desirable characteristics. One should never try to stabilize an unstable system by canceling its RHP pole(s) by RHP zero(s). Such a misguided attempt will fail, not because of the practical impossibility of exact cancellation but for the more fundamental reason, as just explained. EXERCISE E4.8 Show that an ideal integrator is marginally stable but BIBO unstable.

4.3-3 Inverse Systems If H(s) is the transfer function of a system

, then

, its inverse system has a transfer function H i (s) given by

This follows from the fact the cascade of with its inverse system is an identity system, with impulse response δ(t), implying H(s)H i (s) = 1. For example, an ideal integrator and its inverse, an ideal differentiator, have transfer functions 1/s and s, respectively, leading to H(s)H i (s) = 1. [†] Recall that H(s) has its own region of validity. Hence, the limits of integration for the integral in Eq. (4.44) are modified in Eq. (4.45) to

accommodate the region of existence (validity) of X(s) as well as H(s).

[10] Lathi, B. P. Signals, Systems, and Communication. Wiley, New York, 1965. [†] Values of s for which H(s) is ∞ are the poles of H(s). Thus poles of H(s) are the values of s for which the denominator of H(s) is zero.

4.4 ANALYSIS OF ELECTRICAL NETWORKS: THE TRANSFORMED NETWORK Example 4.10 shows how electrical networks may be analyzed by writing the integro-differential equation(s) of the system and then solving these equations by the Laplace transform. We now show that it is also possible to analyze electrical networks directly without having to write the integrodifferential equations. This procedure is considerably simpler because it permits us to treat an electrical network as if it were a resistive network. For this purpose, we need to represent a network in the "frequency domain" where all the voltages and currents are represented by their Laplace transforms. For the sake of simplicity, let us first discuss the case with zero initial conditions. If v(t) and i(t) are the voltage across and the current through an inductor of L henries, then

The Laplace transform of this equation (assuming zero initial current) is Similarly, for a capacitor of C farads, the voltage-current relationship is i(t) = C(dv/dt) and its Laplace transform, assuming zero initial capacitor voltage, yields I(s) = CsV(s); that is,

For a resistor of R ohms, the voltage-current relationship is v(t) = Ri(t), and its Laplace transform is Thus, in the "frequency domain," the voltage-current relationships of an inductor and a capacitor are algebraic; these elements behave like resistors of "resistance" Ls and 1/Cs, respectively. The generalized "resistance" of an element is called its impedance and is given by the ratio V(s)/I(s) for the element (under zero initial conditions). The impedances of a resistor of R ohms, an inductor of L henries, and a capacitance of C farads are R, Ls, and 1/Cs, respectively. Also, the interconnection constraints (Kirchhoff's laws) remain valid for voltages and currents in the frequency domain. To demonstrate this point, let v j (t) (j = 1, 2, ..., k) be the voltages across k elements in a loop and let ij (t)(j = 1, 2, ..., m) be the j currents entering a node. Then

Now if then

This result shows that if we represent all the voltages and currents in an electrical network by their Laplace transforms, we can treat the network as if it consisted of the "resistances" R, Ls, and 1/Cs corresponding to a resistor R, an inductor L, and a capacitor C, respectively. The system equations (loop or node) are now algebraic. Moreover, the simplification techniques that have been developed for resistive circuits-equivalent series and parallel impedances, voltage and current divider rules, Thevenin and Norton theorems-can be applied to general electrical networks. The following examples demonstrate these concepts. EXAMPLE 4.15 Find the loop current i(t) in the circuit shown in Fig. 4.10a if all the initial conditions are zero.

Figure 4.10: (a) A circuit and (b) its transformed version. In the first step, we represent the circuit in the frequency domain, as illustrated in Fig. 4.10b. All the voltages and currents are represented by their Laplace transforms. The voltage 10u(t) is represented by 10/s and the (unknown) current i(t) is represented by its Laplace transform I(s). All the circuit elements are represented by their respective impedances. The inductor of 1 henry is represented by s, the capacitor of 1/2 farad is represented by 2/s, and the resistor of 3 ohms is represented by 3. We now consider the frequency-domain representation of voltages and currents. The voltage across any element is I(s) times its impedance. Therefore, the total voltage drop in the loop is I(s) times the total loop impedance, and it must be equal to V(s), (transform of) the input voltage. The total impedance in the loop is

The input "voltage" is V(s) = 10/s. Therefore, the "loop current" I(s) is

The inverse transform of this equation yields the desired result: INITIAL CONDITION GENERATORS The discussion in which we assumed zero initial conditions can be readily extended to the case of nonzero initial conditions because the initial

condition in a capacitor or an inductor can be represented by an equivalent source. We now show that a capacitor C with an initial voltage v(0 − ) (Fig. 4.11a) can be represented in the frequency domain by an uncharged capacitor of impedance 1/Cs in series with a voltage source of value v(0 − )/s

(Fig. 4.11b) or as the same uncharged capacitor in parallel with a current source of value Cv(0 − ) (Fig. 4.11c). Similarly, an inductor L with an initial

current i(0 − ) (Fig. 4.11d) can be represented in the frequency domain by an inductor of impedance Ls in series with a voltage source of value Li(0 − )

(Fig. 4.11e) or by the same inductor in parallel with a current source of value i(0 − )/s (Fig. 4.11f). To prove this point, consider the terminal relationship of the capacitor in Fig. 4.11a

Figure 4.11: Initial condition generators for a capacitor and an inductor. The Laplace transform of this equation yields This equation can be rearranged as

Observe that V(s) is the voltage (in the frequency domain) across the charged capacitor and I(s)/Cs is the voltage across the same capacitor without

any charge. Therefore, the charged capacitor can be represented by the uncharged capacitor in series with a voltage source of value v(0 − )/s, as depicted in Fig. 4.11b. Equation (4.51a) can also be rearranged as

This equation shows that the charged capacitor voltage V(s) is equal to the uncharged capacitor voltage caused by a current I(s) + Cv(0 − ). This

result is reflected precisely in Fig. 4.11c, where the current through the uncharged capacitor is I(s) + Cv(0 − ).[†] For the inductor in Fig. 4.11d, the terminal equation is

and

We can verify that Fig. 4.11e satisfies Eq. (4.52a) and that Fig. 4.11f satisfies Eq. (4.52b). Let us rework Example 4.11 using these concepts. Figure 4.12a shows the circuit in Fig. 4.7b with the initial conditions y(0 − ) = 2 and v c (0 − ) = 10. Figure 4.12b shows the frequency-domain representation (transformed circuit) of the circuit in Fig. 4.12a. The resistor is represented by its impedance 2; the inductor with initial current of 2 amperes is represented according to the arrangement in Fig. 4.11e with a series voltage source

Ly(0 − ) = 2. The capacitor with initial voltage of 10 volts is represented according to the arrangement in Fig. 4.11b with a series voltage source v(0 − )/s = 10/s. Note that the impedance of the inductor is s and that of the capacitor is 5/s. The input of 10u(t) is represented by its Laplace transform 10/s.

Figure 4.12: A circuit and its transformed version with initial condition generators. The total voltage in the loop is (10/s) + 2 − (10/s) = 2, and the loop impedance is (s + 2 + (5/s)). Therefore

which confirms our earlier result in Example 4.11. EXAMPLE 4.16 The switch in the circuit of Fig. 4.13a is in the closed position for a long time before t = 0, when it is opened instantaneously. Find the currents y 1 (t) and y 2 (t) for t ≥ 0.

Figure 4.13: Using initial condition generators and Thévenin equivalent representation. Inspection of this circuit shows that when the switch is closed and the steady-state conditions are reached, the capacitor voltage v c = 16 volts, and the inductor current y 2 = 4 amperes. Therefore, when the switch is opened (at t = 0), the initial conditions are v c (0 − ) = 16 and y 2 (0 − ) = 4. Figure 4.13b shows the transformed version of the circuit in Fig. 4.13a. We have used equivalent sources to account for the initial conditions. The initial capacitor voltage of 16 volts is represented by a series voltage of 16/s and the initial inductor current of 4 amperes is represented by a source of value Ly2 (0 − ) = 2

From Fig. 4.13b, the loop equations can be written directly in the frequency domain as

Application of Cramer 's rule to this equation yields

and Similarly, we obtain

and We also could have used Thévenin's theorem to compute Y1 (s) and Y2 (s) by replacing the circuit to the right of the capacitor (right of terminals ab) with its Thévenin equivalent, as shown in Fig. 4.13c. Figure 4.13b shows that the Thévenin impedance Z(s) and the Thévenin source V(s) are

According to Fig. 4.13c, the current Y1 (s) is given by

which confirms the earlier result. We may determine Y2 (s) in a similar manner. EXAMPLE 4.17 The switch in the circuit in Fig. 4.14a is at position a for a long time before t = 0, when it is moved instantaneously to position b. Determine the current y 1 (t) and the output voltage v 0 (t) for t ≥ 0.

Figure 4.14: Solution of a coupled inductive network by the transformed circuit method. Just before switching, the values of the loop currents are 2 and 1, respectively, that is, y 1 (0 − ) = 2 and y 2 (0 − ) = 1. The equivalent circuits for two types of inductive coupling are illustrated in Fig. 4.14b and 4.14c. For our situation, the circuit in Fig. 4.14c applies. Figure 4.14d shows the transformed version of the circuit in Fig. 4.14a after switching. Note that the inductors L 1 + M, L 2 + M, and − M are 3,4, and −1 henries with impedances 3s, 4s, and −s respectively. The initial condition voltages in the three branches are (L 1 + M)y 1 (0 − ) = 6, (L 2 + M)y 2 (0 − ) = 4, and −M[y 1 (0 − ) − y 2 (0 − )] = − 1, respectively. The two loop equations of the circuit are[†]

or

and

Therefore Similarly

and The output voltage EXERCISE E4.9

For the RLC circuit in Fig. 4.15, the input is switched on at t = 0. The initial conditions are y(0 − ) = 2 amperes and v c (0 − )

= 50 volts. Find the loop current y(t) and the capacitor voltage v c (t) for ≥ 0.

Figure 4.15 Answers y(t) = 10√2e −t cos (2t + 81.8°)u(t)

v C(t) = [24 + 31.62e −t cos (2t − 34.7°)]u(t)

4.4-1 Analysis of Active Circuits Although we have considered examples of only passive networks so far, the circuit analysis procedure using the Laplace transform is also applicable to active circuits. All that is needed is to replace the active elements with their mathematical models (or equivalent circuits) and proceed as before. The operational amplifier (depicted by the triangular symbol in Fig. 4.16a) is a well-known element in modern electronic circuits. The terminals with the positive and the negative signs correspond to noninverting and inverting terminals, respectively. This means that the polarity of the output voltage v 2 is the same as that of the input voltage at the terminal marked by the positive sign (noninverting). The opposite is true for the inverting terminal, marked by the negative sign.

Figure 4.16: Operational amplifier and its equivalent circuit. Figure 4.16b shows the model (equivalent circuit) of the operational amplifier (op amp) in Fig. 4.16a. A typical op amp has a very large gain. The

output voltage v 2 = −Av 1 , where A is typically 10 5 to 10 6 . The input impedance is very high, of the order of 10 12 Ω and the output impedance is very low (50-100 Ω). For most applications, we are justified in assuming the gain A and the input impedance to be infinite and the output impedance to be zero. For this reason we see an ideal voltage source at the output.

Consider now the operational amplifier with resistors R a and R b connected, as shown in Fig. 4.16c. This configuration is known as the noninverting amplifier. Observe that the input polarities in this configuration are inverted in comparison to those in Fig. 4.16a. We now show that the output voltage v 2 and the input voltage v 1 in this case are related by

First, we recognize that because the input impedance and the gain of the operational amplifier approach infinity, the input current ix and the input voltage v x in Fig. 4.16c are infinitesimal and may be taken as zero. The dependent source in this case is Av x instead of −Av x because of the input polarity inversion. The dependent source Av x (see Fig. 4.16b) at the output will generate current io , as illustrated in Fig. 4.16c. Now also

Therefore

or The equivalent circuit of the noninverting amplifier is depicted in Fig. 4.16d. EXAMPLE 4.18 The circuit in Fig. 4.17a is called the Sallen-Key circuit, which is frequently used in filter design. Find the transfer function H(s) relating the output voltage v o (t) to the input voltage v i (t).

Figure 4.17: (a) Sallen-Key circuit and (b) its equivalent. We are required to find

assuming all initial conditions to be zero. Figure 4.17b shows the transformed version of the circuit in Fig. 4.17a. The noninverting amplifier is replaced by its equivalent circuit. All the voltages are replaced by their Laplace transforms and all the circuit elements are shown by their impedances. All the initial conditions are assumed to be zero, as required for determining H(s). We shall use node analysis to derive the result. There are two unknown node voltages, Va (s) and Vb (s) requiring two node equations. At node a, IR1 (s), the current in R 1 (leaving the node a), is [Va (s) − Vj (s)]/R 2 ], Similarly, IR2 (s), the current in R 2 (leaving the node a), is [Va (s) − Vb (s)]R 2 , and Ic , (s), the current in capacitor C 1 (leaving the node a), is [Va (s) − Va (s)]C 1 s = [Va (s) − KV b (s)]C 1 s. The sum of all the three currents is zero. Therefore

or

Similarly, the node equation at node b yields

or

The two node equations (4.55a) and (4.55b) in two unknown node voltages Va (s) and Vb (s) can be expressed in matrix form as

where

Application of Cramer 's rule to Eq. (4.56) yields

where

Now Therefore

[†] In the time domain, a charged capacitor C with initial voltage v(0 − ) can be represented as the same capacitor uncharged in series with a voltage source v(0 − )u(t) or in parallel with a current source Cv(0 − )δ(t). Similarly, an inductor L with initial current i(0 − ) can be represented by the same

inductor with zero initial current in series with a voltage source Li(0 − )δ(t) or with a parallel current source i(0 − )u(t).

[†] The time domain equations (loop equations) are

The Laplace transform of these equations yields Eq. (4.53).

4.5 BLOCK DIAGRAMS Large systems may consist of an enormous number of components or elements. As anyone who has seen the circuit diagram of a radio or a television receiver can appreciate, analyzing such systems all at once could be next to impossible. In such cases, it is convenient to represent a system by suitably interconnected subsystems, each of which can be readily analyzed. Each subsystem can be characterized in terms of its inputoutput relationships. A linear system can be characterized by its transfer function H(s). Figure 4.18a shows a block diagram of a system with a transfer function H(s) and its input and output X(s) and Y(s), respectively. Subsystems may be interconnected by using cascade, parallel, and feedback interconnections (Fig. 4.18b, 4.18c, 4.18d), the three elementary types. When transfer functions appear in cascade, as depicted in Fig. 4.18b, then, as shown earlier, the transfer function of the overall system is the product of the two transfer functions. This result can also be proved by observing that in Fig. 4.18b

Figure 4.18: Elementary connections of blocks and their equivalents. We can extend this result to any number of transfer functions in cascade. It follows from this discussion that the subsystems in cascade can be interchanged without affecting the overall transfer function. This commutation property of LTI systems follows directly from the commutative (and associative) property of convolution. We have already proved this property in Section 2.4-3. Every possible ordering of the subsystems yields the same overall transfer function. However, there may be practical consequences (such as sensitivity to parameter variation) affecting the behavior of different ordering. Similarly, when two transfer functions, H(s) and H 2 (s), appear in parallel, as illustrated in Fig. 4.18c, the overall transfer function is given by H 1 (s) + H 2 (s), the sum of the two transfer functions. The proof is trivial. This result can be extended to any number of systems in parallel. When the output is fed back to the input, as shown in Fig. 4.18d, the overall transfer function Y(s)/X(s) can be computed as follows. The inputs to the adder are X(s) and −H(s)Y(s). Therefore, E(s), the output of the adder, is But

Therefore so that

Therefore, the feedback loop can be replaced by a single block with the transfer function shown in Eq. (4.59) (see Fig. 4.18d). In deriving these equations, we implicitly assume that when the output of one subsystem is connected to the input of another subsystem, the latter does not load the former. For example, the transfer function H 1 (s) in Fig. 4.18b is computed by assuming that the second subsystem H 2 (s) was not connected. This is the same as assuming that H 2 (s) does not load H 1 (s). In other words, the input-output relationship of H 1 (s) will remain unchanged regardless of whether H 2 (s) is connected. Many modern circuits use op amps with high input impedances, so this assumption is justified. When such an assumption is not valid, H 1 (s) must be computed under operating conditions [i.e., with H 2 (s) connected]. COMPUTER EXAMPLE C4.3 Using the feedback system ofFig 4.18d with G(s) = K/(s(s + 8)) and H(s) = 1, determine the transfer function for each of the following cases: a. K = 7 b. K = 16 c. K = 80 >> H = tf(1, 1); K = 7; G = tf([0 0 K], [1 8 0]); >> disp(['(a) K = ',num2str(K)]); TFa = feedback(G,H) (a) K = 7 Transfer function: 7 ------------s^2 + 8 s + 7

Thus, H a (s) = 7/s 2 + 8s + 7). >> H = tf(1, 1); K = 16; G = tf([0 0 K], [1 8 0]); >> disp(['(b) K = ',num2str(K)]); TFa = feedback(G,H) (b) K = 16 Transfer function: 16 ------------s^2 + 8 s + 16 Thus, H B (s) = 16/(s2 + 8s+ 16). >> H = tf(1, 1); K = 80; G = tf([0 0 K], [1 8 0]); >> disp(['(c) K = ',num2str(K)]); TFa = feedback(G,H) (c) K = 80 Transfer function: 80 ------------s^2 + 8 s + 80 Thus, H c (s) = 80/(s2 + 8s + 80).

4.6 SYSTEM REALIZATION We now develop a systematic method for realization (or implementation) of an arbitrary Nth-order transfer function. The most general transfer function with M = N is given by

Since realization is basically a synthesis problem, there is no unique way of realizing a system. A given transfer function can be realized in many different ways. A transfer function H(s) can be realized by using integrators or differentiators along with adders and multipliers. We avoid use of differentiators for practical reasons discussed in Sections 2.1 and 4.3-2. Hence, in our implementation, we shall use integrators along with scalar multipliers and adders. We are already familiar with representation of all these elements except the integrator. The integrator can be represented by a box with integral sign (time-domain representation, Fig. 4.19a) or by a box with transfer function 1/s (frequency-domain representation, 4.19b).

Figure 4.19: (a) Time-domain and (b) frequency-domain representations of an integrator.

4.6-1 Direct Form I Realization Rather than realize the general Nth-order system described by Eq. (4.60), we begin with a specific case of the following third-order system and then extend the results to the Nth-order case

We can express H (s) as

We can realize H(s) as a cascade of transfer function H 1 (s) followed by H 2 (s), as depicted in Fig. 4.20a, where the output of H 1 (s) is denoted by W(s). Because of the commutative property of LTI system transfer functions in cascade, we can also realize H(s) as a cascade of H 2 (s) followed by H 1 (s), as illustrated in Fig. 4.20b, where the (intermediate) output of H 2 (s) is denoted by V(s).

Figure 4.20: Realization of a transfer function in two steps. The output of H 1 (s) in Fig. 4.20a is given by W(s) = H 1 (s)X(s). Hence

Also, the output Y(s) and the input W(s) of H 2 (s) in Fig. 4.20a are related by Y(s) = H 2 (s)W(s). Hence

We shall first realize H 1 (s). Equation (4.63) shows that the output W(s) can be synthesized by adding the input b 0 X(s) to b 1 (X(s)/s), b 2 (X(s)/s 2 ), and b 3 (X(s)/s 3 ). Because the transfer function of an integrator is 1/s, the signals X(s)/s, X(s)/s 2 , and X(s)/s 3 can be obtained by successive integration of the input x(t). The left-half section of Fig. 4.21a shows how W(s) can be synthesized from X(s), according to Eq. (4.63). Hence, this section represents a realization of H 1 (s).

Figure 4.21: Direct form I realization of an LTIC system: (a) third-order and (b) Nth-order. To complete the picture, we shall realize H 2 (s), which is specified by Eq. (4.64). We can rearrange Eq. (4.64) as

Hence, to obtain Y(s), we subtract a 1 Y(s)/s, a 2 Y(s)/s 2 , and a 3 Y(s)/s 3 from W(s). We have already obtained W(s) from the first step [output of H 1 (s)]. To obtain signals Y(s)/s, Y(s)/s 2 , and Y(s)/s 3 , we assume that we already have the desired output Y(s). Successive integration of Y(s) yields the needed signals Y(s)/s, Y(s)/s 2 , and Y(s)/s 3 . We now synthesize the final output Y(s) according to Eq. (4.65), as seen in the right-half section of Fig. 4.21a.[†] The left-half section in Fig. 4.21a represents H 1 (s) and the right-half is H 2 (s). We can generalize this procedure, known as the direct form I (DFI) realization, for any value of N. This procedure requires 2N integrators to realize an Nth-order transfer function, as shown in Fig. 4.21b.

4.6-2 Direct Form II Realization In the direct form I, we realize H(s) by implementing H 1 (s) followed by H 2 (s), as shown in Fig. 4.20a. We can also realize H(s), as shown in Fig. 4.20b, where H 2 (s) is followed by H 1 (s). This procedure is known as the direct form II realization. Figure 4.22a shows direct form II realization, where we have interchanged sections representing H 1 (s) and H 2 (s) in Fig. 4.21b. The output of H 2 (s) in this case is denoted by V(s).[†]

Figure 4.22: Direct form II realization of an Nth-order LTIC system. An interesting observation in Fig. 4.22a is that the input signal to both the chains of integrators is V(s). Clearly, the outputs of integrators in the leftside chain are identical to the corresponding outputs of the right-side integrator chain, thus making the right-side chain redundant. We can eliminate this chain and obtain the required signals from the left-side chain, as shown in Fig. 4.22b. This implementation halves the number of integrators to N, and, thus, is more efficient in hardware utilization than either Fig. 4.21b or 4.22a. This is the direct form II (DFII) realization. An Nth-order differential equation with N = M has a property that its implementation requires a minimum of N integrators. A realization is canonic if the number of integrators used in the realization is equal to the order of the transfer function realized. Thus, canonic realization has no redundant integrators. The DFII form in Fig. 4.22b is a canonic realization, and is also called the direct canonic form. Note that the DFI is noncanonic. The direct form I realization (Fig. 4.21b) implements zeros first [the left-half section represented by H 1 (s)] followed by realization of poles [the righthalf section represented by H 2 (s)] of H(s). In contrast, canonic direct implements poles first followed by zeros. Although both these realizations result in the same transfer function, they generally behave differently from the viewpoint of sensitivity to parameter variations. EXAMPLE 4.19

Find the canonic direct form realization of the following transfer functions: a.

b.

c.

d.

All four of these transfer functions are special cases of H(s) in Eq. (4.60). a. The transfer function 5/(s + 7) is of the first order (N = 1); therefore, we need only one integrator for its realization. The feedback and feedforward coefficients are The realization is depicted in Fig. 4.23a. Because N = 1, there is a single feedback connection from the output of the integrator to the input adder with coefficient a 1 = 7. For N = 1, generally, there are N + 1 = 2 feedforward connections. However, in this case, b 0 = 0, and there is only one feedforward connection with coefficient b 1 = 5 from the output of the integrator to the output adder. Because there is only one input signal to the output adder, we can do away with the adder, as shown in Fig. 4.23a.

Figure 4.23: Realization of H(s).

b. In this first-order transfer function, b 1 = 0. The realization is shown in Fig. 4.23b. Because there is only one signal to be added at the output adder, we can discard the adder.

c. The realization appears in Fig. 4.23c. Here H(s) is a first-order transfer function with a 1 = 7 and b 0 = 1, b 1 = 5. There is a single feedback connection (with coefficient 7) from the integrator output to the input adder. There are two feedforward connections (Fig. 4.23c).[†]

d. This is a second-order system with b 0 = 0, b 1 = 4, b 2 = 28, a 1 = 6, and a 2 = 5. Figure 4.23d shows a realization with two feedback connections and two feedforward connections. EXERCISE E4.10 Give canonic direct realization of

4.6-3 Cascade and Parallel Realizations An Nth-order transfer function H(s) can be expressed as a product or a sum of N first-order transfer functions. Accordingly, we can also realize H(s) as a cascade (series) or parallel form of these N first-order transfer functions. Consider, for instance, the transfer function in part (d) of the Example 4.19.

We can express H(s) as

We can also express H(s) as a sum of partial fractions as

Equations (4.66) give us the option of realizing H(s) as a cascade of H 1 (s) and H 2 (s), as shown in Fig. 4.24a, or a parallel of H 3 (s) and H 4 (s), as depicted in Fig. 4.24b. Each of the first-order transfer functions in Fig. 4.24 can be implemented by using canonic direct realizations, discussed earlier.

Figure 4.24: Realization of (4s + 28)/((s + 1)(s + 5)): (a) cascade form and (b) parallel form. This discussion by no means exhausts all the possibilities. In the cascade form alone, there are different ways of grouping the factors in the numerator and the denominator of H(s), and each grouping can be realized in DFI or canonic direct form. Accordingly, several cascade forms are possible. In Section 4.6-4, we shall discuss yet another form that essentially doubles the numbers of realizations discussed so far. From a practical viewpoint, parallel and cascade forms are preferable because parallel and certain cascade forms are numerically less sensitive than canonic direct form to small parameter variations in the system. Qualitatively, this difference can be explained by the fact that in a canonic realization all the coefficients interact with each other, and a change in any coefficient will be magnified through its repeated influence from feedback and feedforward connections. In a parallel realization, in contrast, the change in a coefficient will affect only a localized segment; the case with a cascade realization is similar. In the examples of cascade and parallel realization, we have separated H(s) into first-order factors. For H(s) of higher orders, we could group H(s) into factors, not all of which are necessarily of the first order. For example, if H(s) is a third-order transfer function, we could realize this function as a cascade (or a parallel) combination of a first-order and a second-order factor. REALIZATION OF COMPLEX CONJUGATE POLES The complex poles in H(s) should be realized as a second-order (quadratic) factor because we cannot implement multiplication by complex numbers. Consider, for example,

We cannot realize first-order transfer functions individually with the poles −2 ± j3 because they require multiplication by complex numbers in the

feedback and the feedforward paths. Therefore, we need to combine the conjugate poles and realize them as a second-order transfer function. [†] In the present case, we can express H(s) as

Now we can realize H(s) in cascade form by using Eq. (4.67a) or in parallel form by using Eq. (4.67b).

REALIZATION OF REPEATED POLES When repeated poles occur, the procedure for canonic and cascade realization is exactly the same as before. In parallel realization, however, the procedure requires special handling, as explained in Example 4.20. EXAMPLE 4.20 Determine the parallel realization of

This third-order transfer function should require no more than three integrators. But if we try to realize each of the three partial fractions separately, we require four integrators because of the one second-order term. This difficulty can be avoided by observing that the terms 1 / (s + 3) and 1 / (s +

3) 2 can be realized with a cascade of two subsystems, each having a transfer function 1 / (s + 3), as shown in Fig. 4.25. Each of the three firstorder transfer functions in Fig. 4.25 may now be realized as in Fig. 4.23.

Figure 4.25: Parallel realization of (7s 2 + 37s + 51)/((s + 2)(s + 3) 2 ). EXERCISE E4.11 Find the canonic, cascade, and parallel realization of

4.6-4 Transposed Realization Two realizations are said to be equivalent if they have the same transfer function. A simple way to generate an equivalent realization from a given realization is to use its transpose. To generate a transpose of any realization, we change the given realization as follows: 1. Reverse all the arrow directions without changing the scalar multiplier values. 2. Replace pickoff nodes by adders and vice versa. 3. Replace the input X(s) with the output Y(s) and vice versa. Figure 4.26a shows the transposed version of the canonic direct form realization in Fig. 4.22b found according to the rules just listed. Figure 4.26b is Fig. 4.26a reoriented in the conventional form so that the input X(s) appears at the left and the output Y(s) appears at the right. Observe that this realization is also canonic.

Figure 4.26: Realization of an Nth-order LTI transfer function in the transposed form. Rather than prove the theorem on equivalence of the transposed realizations, we shall verify that the transfer function of the realization in Fig. 4.26b is identical to that in Eq. (4.60).

Figure 4.26b shows that Y(s) is being fed back through N paths. The fed-back signal appearing at the input of the top adder is

The signal X(s), fed to the top adder through N + 1 forward paths, contributes

The output Y(s) is equal to the sum of these two signals (feed forward and feed back). Hence

Transporting all the Y(s) terms to the left side and multiplying throughout by s N, we obtain Consequently

Hence, the transfer function H(s) is identical to that in Eq. (4.60). We have essentially doubled the number of possible realizations. Every realization that was found earlier has a transpose. Note that the transpose of a transpose results in the same realization. EXAMPLE 4.21 Find the transpose of the canonic direct realization found in parts (a) and (d) of Example 4.19 (Fig. 4.23c and 4.23d). The transfer functions are a.

b.

Both these realizations are special cases of the one in Fig. 4.26b. a. In this case, N = 1 with a 1 = 7, b 0 = 1, b 1 = 5. The desired realization can be obtained by transposing Fig. 4.23c. However, we already have the general model of the transposed realization in Fig. 4.26b. The desired solution is a special case of Fig. 4.26b with N = 1 and a 1 = 7, b 0 = 1, b 1 = 5, as shown in Fig. 4.27a.

Figure 4.27: Transposed form realization of (a) (s + 5)/(s + 7) and (b) (4s + 28)/(s 2 + 6s + 5). b. In this case N = 2 with b 0 = 0, b 1 = 4, b 2 = 28, a 1 = 6, a 2 = 5. Using the model of Fig. 4.26b, we obtain the desired realization, as shown in Fig. 4.27b. EXERCISE E4.12 Find the realization that is the transposed version of (a) DFI realization and (b) canonic direct realization of H(s) in Exercise E4.10.

4.6-5 Using Operational Amplifiers for System Realization In this section, we discuss practical implementation of the realizations described in Section 4.6-4. Earlier we saw that the basic elements required for the synthesis of an LTIC system (or a given transfer function) are (scalar) multipliers, integrators, and adders. All these elements can be realized by operational amplifier (op-amp) circuits.

OPERATIONAL AMPLIFIER CIRCUITS Figure 4.28 shows an op-amp circuit in the frequency domain (the transformed circuit). Because the input impedance of the op amp is infinite (very high), all the current I (s) flows in the feedback path, as illustrated. Moreover Vx (s), the voltage at the input of the op amp, is zero (very small) because of the infinite (very large) gain of the op amp. Therefore, for all practical purposes, Moreover, because v x ≈ 0,

Substitution of the second equation in the first yields

Therefore, the op-amp circuit in Fig. 4.28 has the transfer function

Figure 4.28: A basic inverting configuration op-amp circuit. By properly choosing Z(s) and Zf (s), we can obtain a variety of transfer functions, as the following development shows. THE SCALAR MULTIPLIER If we use a resistor R f in the feedback and a resistor R at the input (Fig. 4.29a), then Zf (s) = R f , Z(s) = R, and

Figure 4.29: (a) Op-amp inverting amplifier. (b) Integrator. The system acts as a scalar multiplier (or an amplifier) with a negative gain R f /R. A positive gain can be obtained by using two such multipliers in cascade or by using a single noninverting amplifier, as depicted in Fig. 4.16c. Figure 4.29a also shows the compact symbol used in circuit diagrams for a scalar multiplier.

THE INTEGRATOR If we use a capacitor C in the feedback and a resistor R at the input (Fig. 4.29b), then Zf (s) = 1/C s , Z(s) = R, and

The system acts as an ideal integrator with a gain −1/RC. Figure 4.29b also shows the compact symbol used in circuit diagrams for an integrator. THE ADDER Consider now the circuit in Fig. 4.30a with r inputs X1 (s), X2 (s),..., Xr(s). As usual, the input voltage Vx (s) ≈ 0 because the gain of op amp → ∞. Moreover, the current going into the op amp is very small (≈0) because the input impedance → ∞. Therefore, the total current in the feedback resistor R f is I1 (s) + I2 (s) +...+ Ir(s). Moreover, because Vx (s) = 0,

Figure 4.30: Op-amp summing and amplifying circuit. Also

where

Clearly, the circuit in Fig. 4.30 serves a adder and an amplifier with any desired gain for each of the input signals. Figure 4.30b shows the compact symbol used in circuit diagrams for a adder with r inputs. EXAMPLE 4.22 Use op-amp circuits to realize the canonic direct form of the transfer function

The basic canonic realization is shown in Fig. 4.31a. The same realization with horizontal reorientation is shown in Fig. 4.31b. Signals at various points are also indicated in the realization. For convenience, we denote the output of the last integrator by W(s). Consequently, the signals at the

inputs of the two integrators are sW(s) and s 2 W(s), as shown in Fig. 4.31a and 4.31b. Op-amp elements (multipliers, integrators, and adders) change the polarity of the output signals. To incorporate this fact, we modify the canonic realization in Fig. 4.31b to that depicted in Fig. 4.31c. In Fig.

4.31b, the successive outputs of the adder and the integrators are s 2 W(s), sW(s), and W(s) respectively. Because of polarity reversals in opamp

circuits, these outputs are −s 2 W(s), sW(s), and −W(s), respectively, in Fig. 4.31c. This polarity reversal requires corresponding modifications in the signs of feedback and feedforward gains. According to Fig. 4.31b

Figure 4.31: Op-amp realization of a second-order transfer function (2s + 5)/(s 2 + 4s + 10). Therefore Because the adder gains are always negative (see Fig. 4.30b), we rewrite the foregoing equation as Figure 4.31c shows the implementation of this equation. The hardware realization appears in Fig. 4.31d. Both integrators have a unity gain which requires RC = 1. We have used R = 100 kΩ and C = 10 μF. The gain of 10 in the outer feedback path is obtained in the adder by choosing the feedback resistor of the adder to be 100 kΩ and an input resistor of 10 kΩ. Similarly, the gain of 4 in the inner feedback path is obtained by using the corresponding input resistor of 25 kΩ. The gains of 2 and 5, required in the feedforward connections, are obtained by using a feedback resistor of 100 kΩ and input resistors of 50 and 20 kΩ, respectively. [†]

The op-amp realization in Fig. 4.31 is not necessarily the one that uses the fewest op amps. This example is given just to illustrate a systematic procedure for designing an op-amp circuit of an arbitrary transfer function. There are more efficient circuits (such as Sallen-Key or biquad) that use fewer op amp to realize a second-order transfer function. EXERCISE E4.13 Show that the transfer functions of the op-amp circuits in Fig. 4.32a and 4.32b are H 1 (s) and H 2 (s), respectively, where

Figure 4.32 [†] It may seem odd that we first assumed the existence of Y(s), integrated it successively, and then in turn generated Y(s) from W(s) and the three

successive integrals of signal Y(s). This procedure poses a dilemma similar to "Which came first, the chicken or the egg?" The problem here is satisfactorily resolved by writing the expression for Y(s) at the output of the right-hand adder (at the top) in Fig. 4.21a and verifying that this expression is indeed the same as Eq. (4.64). [†] The reader can show that the equations relating X(s), V(s), and Y(s) in Fig. 4.22a are

and

[†] When M = N (as in this case), H(s) can also be realized in another way by recognizing that

We now realize H(s) as a parallel combination of two transfer functions, as indicated by this equation. [†] It is possible to realize complex, conjugate poles indirectly by using a cascade of two first-order transfer functions and feedback. A transfer

function with poles −a ±jb can be realized by using a cascade of two identical first-order transfer functions, each having a pole at −a. (See Prob. 4.6-13.) [†] It is possible to avoid the two inverting op amps (with gain −1) in Fig. 4.31d by adding signal sW(s) to the input and output adders directly, using the noninverting amplifier configuration in Fig. 4.16d.

4.7 APPLICATION TO FEEDBACK AND CONTROLS Generally, systems are designed to produce a desired output y(t) for a given input x(t). Using the given performance criteria, we can design a system, as shown in Fig. 4.33a. Ideally, such an open-loop system should yield the desired output. In practice, however, the system characteristics change with time, as a result of aging or replacement of some components or because of changes in the environment in which the system is operating. Such variations cause changes in the output for the same input. Clearly, this is undesirable in precision systems.

Figure 4.33: (a) Open-loop and (b) closed-loop (feedback) systems. A possible solution to this problem is to add a signal component to the input that is not a predetermined function of time but will change to counteract the effects of changing system characteristics and the environment. In short, we must provide a correction at the system input to account for the undesired changes just mentioned. Yet since these changes are generally unpredictable, it is not clear how to preprogram appropriate corrections to the input. However, the difference between the actual output and the desired output gives an indication of the suitable correction to be applied to the system input. It may be possible to counteract the variations by feeding the output (or some function of output) back to the input. We unconsciously apply this principle in daily life. Consider an example of marketing a certain product. The optimum price of the product is the value that maximizes the profit of a merchant. The output in this case is the profit, and the input is the price of the item. The output (profit) can be controlled (within limits) by varying the input (price). The merchant may price the product too high initially, in which case, he will sell too few items, reducing the profit. Using feedback of the profit (output), he adjusts the price (input), to maximize his profit. If there is a sudden or unexpected change in the business environment, such as a strike-imposed shutdown of a large factory in town, the demand for the item goes down, thus reducing his output (profit). He adjusts his input (reduces price) using the feedback of the output (profit) in a way that will optimize his profit in the changed circumstances. If the town suddenly becomes more prosperous because of a new factory opens, he will increase the price to maximize the profit. Thus, by continuous feedback of the output to the input, he realizes his goal of maximum profit (optimum output) in any given circumstances. We observe thousands of examples of feedback systems around us in everyday life. Most social, economical, educational, and political processes

are, in fact, feedback processes. A block diagram of such a system, called the feedback or closed-loop system is shown in Fig. 4.33b. A feedback system can address the problems arising because of unwanted disturbances such as random-noise signals in electronic systems, a gust of wind affecting a tracking antenna, a meteorite hitting a spacecraft, and the rolling motion of antiaircraft gun platforms mounted on ships or moving tanks. Feedback may also be used to reduce nonlinearities in a system or to control its rise time (or bandwidth). Feedback is used to achieve, with a given system, the desired objective within a given tolerance, despite partial ignorance of the system and the environment. A feedback system, thus, has an ability for supervision and self-correction in the face of changes in the system parameters and external disturbances (change in the environment). Consider the feedback amplifier in Fig. 4.34. Let the forward amplifier gain G = 10,000. One-hundredth of the output is fed back to the input (H = 0.01). The gain T of the feedback amplifier is obtained by [see Eq. (4.59)]

Figure 4.34: Effects of negative and positive feedback. Suppose that because of aging or replacement of some transistors, the gain G of the forward amplifier changes from 10,000 to 20,000. The new gain of the feedback amplifier is given by

Surprisingly, 100% variation in the forward gain G causes only 0.5% variation in the feedback amplifier gain T. Such reduced sensitivity to parameter variations is a must in precision amplifiers. In this example, we reduced the sensitivity of gain to parameter variations at the cost of forward gain, which is reduced from 10,000 to 99. There is no dearth of forward gain (obtained by cascading stages). But low sensitivity is extremely precious in precision systems. Now, consider what happens when we add (instead of subtract) the signal fed back to the input. Such addition means the sign on the feedback connection is + instead of − (which is same as changing the sign of H in Fig. 4.34). Consequently

If we let G = 10,000 as before and H = 0.9 × 10 −4 , then

Suppose that because of aging or replacement of some transistors, the gain of the forward amplifier changes to 11,000. The new gain of the feedback amplifier is

Observe that in this case, a mere 10% increase in the forward gain G caused 1000% increase in the gain T (from 100,000 to 1,100,000). Clearly, the amplifier is very sensitive to parameter variations. This behavior is exactly opposite of what was observed earlier, when the signal fed back was subtracted from the input. What is the difference between the two situations? Crudely speaking, the former case is called the negative feedback and the latter is the positive feedback. The positive feedback increases system gain but tends to make the system more sensitive to parameter variations. It can also lead to instability. In our example, if G were to be 111,111, then GH = 1, T = ∞, and the system would become unstable because the signal fed back was exactly equal to the input signal itself, since GH = 1. Hence, once a signal has been applied, no matter how small and how short in duration, it comes back to reinforce the input undiminished, which further passes to the output, and is fed back again and again and again. In essence, the signal perpetuates itself forever. This perpetuation, even when the input ceases to exist, is precisely the symptom of instability. Generally speaking, a feedback system cannot be described in black and white terms, such as positive or negative. Usually H is a frequencydependent component, more accurately represented by H(s), varies with frequency. Consequently, what was negative feedback at lower frequencies can turn into positive feedback at higher frequencies and may give rise to instability. This is one of the serious aspects of feedback systems, which warrants careful attention of a designer.

4.7-1 Analysis of a Simple Control System Figure 4.35a represents an automatic position control system, which can be used to control the angular position of a heavy object (e.g., a tracking antenna, an antiaircraft gun mount, or the position of a ship). The input θi is the desired angular position of the object, which can be set at any given value. The actual angular position θo of the object (the output) is measured by a potentiometer whose wiper is mounted on the output shaft. The difference between the input θi (set at the desired output position) and the output θo (actual position) is amplified; the amplified output, which is proportional to θi − θo , is applied to the motor input. If θi − θo = 0 (the output being equal to the desired angle), there is no input to the motor, and the motor stops. But if θo ≠ θi , there will be a nonzero input to the motor, which will turn the shaft until θo = θi . It is evident that by setting the input

potentiometer at a desired position in this system, we can control the angular position of a heavy remote object.

Figure 4.35: (a) An automatic position control system. (b) Its block diagram. (c) The unit step response. (d) The unit ramp response. The block diagram of this system is shown in Fig. 4.35b. The amplifier gain is K, where K is adjustable. Let the motor (with load) transfer function that relates the output angle θo to the motor input voltage be G(s) [see Eq. (1.77)]. This feedback arrangement is identical to that in Fig. 4.18d with H(s) = 1. Hence, T(s), the (closed-loop) system transfer function relating the output θo to the input θi , is

From this equation, we shall investigate the behavior of the automatic position control system in Fig. 4.35a for a step and a ramp input. STEP INPUT If we desire to change the angular position of the object instantaneously, we need to apply a step input. We may then want to know how long the system takes to position itself at the desired angle, whether it reaches the desired angle, and whether it reaches the desired position smoothly (monotonically) or oscillates about the final position. If the system oscillates, we may want to know how long it takes for the oscillations to settle down. All these questions can be readily answered by finding the output θo (t) when the input θi (t) = u(t). A step input implies instantaneous change in the angle. This input would be one of the most difficult to follow; if the system can perform well for this input, it is likely to give a good account of itself under most other expected situations. This is why we test control systems for a step input. For the step input θi (t) = u(t), θi (s) = 1/s and

Let the motor (with load) transfer function relating the load angle θo (t) to the motor input voltage be G(s) = 1/(s(s + 8)) [see Eq. (1.77)]. This yields

Let us investigate the system behavior for three different values of gain K. For K = 7,

and

This response, illustrated in Fig. 4.35c, shows that the system reaches the desired angle, but at a rather leisurely pace. To speed up the response let us increase the gain to, say, 80. For K = 80,

and

This response, also depicted in Fig. 4.35c, achieves the goal of reaching the final position at a faster rate than that in the earlier case (K = 7). Unfortunately the improvement is achieved at the cost of ringing (oscillations) with high overshoot. In the present case the percent overshoot (PO) is 21%. The response reaches its peak value at peak time tp = 0.393 second. The rise time, defined as the time required for the response to rise from

10% to 90% of its steady-state value, indicates the speed of response. [†] In the present case tp = 0.175 second. The steady-state value of the response is unity so that the steady-state error is zero. Theoretically it takes infinite time for the response to reach the desired value of unity. In practice, however, we may consider the response to have settled to the final value if it closely approaches the final value. A widely accepted measure of closeness is within 2% of the final value. The time required for the response to reach and stay within 2% of the final value is called the settling time ts .[‡] In Fig. 4.35c, we find ts ≈ 1 second (when K = 80). A good system has a small overshoot, small tr and ts and a small steady-state error. A large overshoot, as in the present case, may be unacceptable in many applications. Let us try to determine K (the gain) that yields the fastest response without oscillations. Complex characteristic roots lead to oscillations; to avoid oscillations, the characteristic roots should be real. In the

present case the characteristic polynomial is s 2 +8s+K. For K > 16, the characteristic roots are complex; for K < 16, the roots are real. The fastest response without oscillations is obtained by choosing K = 16. We now consider this case. For K = 16,

and This response also appears in Fig. 4.35c. The system with K > 16 is said to be underdamped (oscillatory response), whereas the system with K < 16 is said to be overdamped. For K = 16, the system is said to be critically damped. There is a trade-off between undesirable overshoot and rise time. Reducing overshoots leads to higher rise time (sluggish system). In practice, a small overshoot, which is still faster than the critical damping, may be acceptable. Note that percent overshoot PO and peak time tp are meaningless for the overdamped or critically damped cases. In addition to adjusting gain K, we may need to augment the system with some type of compensator if the specifications on overshoot and the speed of response are too stringent. RAMP INPUT If the antiaircraft gun in Fig. 4.35a is tracking an enemy plane moving with a uniform velocity, the gun-position angle must increase linearly with t. Hence, the input in this case is a ramp; that is, θi (t) = tu(t). Let us find the response of the system to this input when K = 80. In this case, θi (s) = 1/s 2 , and

Use of Table 4.1 yields This response, sketched in Fig. 4.35d, shows that there is a steady-state error e r = 0.1 radian. In many cases such a small steady-state error may be tolerable. If, however, a zero steady-state error to a ramp input is required, this system in its present form is unsatisfactory. We must add some form of compensator to the system. COMPUTER EXAMPLE C4.4 Using the feedback system of Fig. 4.18d with G(s) = K/(s(s + 8)) and H(s) = 1, determine the step response for each of the following cases: a. K = 7 b. K = 16 c. K = 80

Additionally, d. Find the unit ramp response when K = 80. Computer Example C4.3 computes the transfer functions of these feedback systems in a simple way. In this example, the conv command is used to demonstrate polynomial multiplication of the two denominator factors of G(s). Step responses are computed by using the step command. (a-c) >> H = tf(1,1); K = 7; G = tf([0 0 K], conv([0 1 0], [0 1 8])); >> TFa = feedback(G, H); >> H = tf(1,1); K = 16; G = tf([0 0 K]. conv([0 1 0], [0 1 8])); >> TFb = feeback (G,H); >> H = tf(1,1); K = 80; G = tf([0 0 K]. conv([0 1 0], [0 1 8])); >> TFc = feeback (G,H); >> figure(1); clf; step(TFa, 'k-',TFb, 'k - ',TFc, 'k-. '); >> legend( '(a) K = 7 ', '(b) K = 16 ', ' (c) K = 80 ',0);

Figure C4.4-1 The unit ramp response is equivalent to the derivative of the unit step response. >> TFd = series(TFc, tf([0 1], [1 0])); >> figure(2); clf; step(TFd, 'k-'); legend( '(d) k = 80 ', 0); >> title( 'Unit Ramp Response ')

Figure C4.4-2 Design Specifications Now the reader has some idea of the various specifications a control system might require. Generally, a control system is designed to meet given transient specifications, steady-state error specifications, and sensitivity specifications. Transient specifications include overshoot, rise time, and settling time of the response to step input. The steady-state error is the difference between the desired response and the actual response to a test input in steady-state. The system should also satisfy a specified sensitivity specifications to some system parameter variations, or to certain disturbances. Above all, the system must remain stable under operating conditions. Discussion of design procedures used to realize given specifications is beyond the scope of this book. [†] Delay time t , defined as the time required for the response to reach 50% of its steady-state value, is another indication of speed. For the present d

case, t d = 0.141 second.

[‡] Typical percentage values used are 2 to 5% for t . s

4.8 FREQUENCY RESPONSE OF AN LTIC SYSTEM Filtering is an important area of signal processing. Filtering characteristics of a system are indicated by its response to sinusoids of various

frequencies varying from 0 to ∞. Such characteristics are called the frequency response of the system. In this section, we shall find the frequency response of LTIC systems. In Section 2.4-4 we showed that an LTIC system response to an everlasting exponential input x(t) = e st is also an everlasting exponential H(s)e st . As before, we use an arrow directed from the input to the output to represent an input -output pair:

Setting s = jω in this relationship yields

Noting that cos ωt is the real part of e jωt , use of Eq. (2.40) yields

We can express H(jω) in the polar form as

With this result, the relationship (4.73) becomes In other words, the system response y(t) to a sinusoidal input cos ωt is given by Using a similar argument, we can show that the system response to a sinusoid cos (ωt + θ) is

This result is valid only for BIBO-stable systems. The frequency response is meaningless for BIBO-unstable systems. This follows from the fact that the frequency response in Eq. (4.72) is obtained by setting s = jω in Eq. (4.71). But, as shown in Section 2.4-4 [Eqs. (2.47) and (2.48)], the relationship (4.71) applies only for the values of s for which H(s) exists. For BIBO-unstable systems, the ROC for H(s) does not include the jω axis

where s = jω [see Eq. (4.14)]. This means that H(s) when s = jω, is meaningless for BIBO-unstable systems. [†]

Equation (4.75b) shows that for a sinusoidal input of radian frequency ω, the system response is also a sinusoid of the same frequency ω. The amplitude of the output sinusoid is |H(jω)| times the input amplitude, and the phase of the output sinusoid is shifted by ∠H(jω) with respect to the input phase (see later Fig. 4.36 in Example 4.23). For instance, a certain system with |H(j10)| = 3 and ∠H(j10) = −30° amplifies a sinusoid of frequency ω = 10 by a factor of 3 and delays its phase by 30°. The system response to an input 5 cos (10t + 50°) is 3 × 5 cos (10t + 50° − 30°) = 15 cos (10t + 20°).

Figure 4.36: Frequency responses of the LTIC system. Clearly |H(jω)| is the amplitude gain of the system, and a plot of |H(jω)| versus ω shows the amplitude gain as a function of frequency ω. We shall call ∠H(jω) the amplitude response. It also goes under the name magnitude response in the literature. [‡] Similarly, ∠H(jω) is the phase response and a plot of ∠H(jω) versus ω shows how the system modifies or changes the phase of the input sinusoid. Observe that H(jω) has the information of |H(jω)| and ∠H(jω). For this reason, H(jω) is also called the frequency response of the system. The frequency response plots |H(jω)| and ∠H(jω) show at a glance how a system responds to sinusoids of various frequencies. Thus, the frequency response of a system represents its filtering characteristic. EXAMPLE 4.23 Find the frequency response (amplitude and phase response) of a system whose transfer function is

Also, find the system response y(t) if the input x(t) is a. cos 2t b. cos (10t − 50°) In this case

Therefore

Both the amplitude and the phase response are depicted in Fig. 4.36a as functions of ω. These plots furnish the complete information about the frequency response of the system to sinusoidal inputs. a. For the input x(t) = cos 2t, ω = 2, and

We also could have read these values directly from the frequency response plots in Fig. 4.36a corresponding to ω = 2. This result means that for a sinusoidal input with frequency ω = 2, the amplitude gain of the system is 0.372, and the phase shift is 65.3°. In other words, the output amplitude is 0.372 times the input amplitude, and the phase of the output is shifted with respect to that of the input by 65.3°. Therefore, the system response to an input cos 2t is The input cos 2t and the corresponding system response 0.372 cos (2t + 65.3°) are illustrated in Fig. 4.36b. b. For the input cos (10t − 50°), instead of computing the values |H(jω)| and ∠H(jω) as in part (a), we shall read them directly from the frequency response plots in Fig. 4.36a corresponding to ω = 10. These are: Therefore, for a sinusoidal input of frequency ω = 10, the output sinusoid amplitude is 0.894 times the input amplitude, and the output sinusoid is shifted with respect to the input sinusoid by 26°. Therefore, y(t), the system response to an input cos (10t = 50°), is If the input were sin (10t − 50°), the response would be 0.894 sin (10t − 50° + 26°) = 0.894 sin (10t − 24°). The frequency response plots in Fig. 4.36a show that the system has highpass filtering characteristics; it responds well to sinusoids of higher frequencies (ω well above 5), and suppresses sinusoids of lower frequencies (ω well below 5). COMPUTER EXAMPLE C4.5 Plot the frequency response of the transfer function H(s) = (s + 5)/(s 2 + 3s + 2). >> H = tf([1 5], [1 3 2]); >> bode(H, 'k-',{0.1 100});

Figure C4.5 EXAMPLE 4.24

Find and sketch the frequency response (amplitude and phase response) for the following. a. an ideal delay of T seconds b. an ideal differentiator c. an ideal integrator a. Ideal delay of T seconds. The transfer function of an ideal delay is [see Eq. (4.46)] Therefore Consequently

These amplitude and phase responses are shown in Fig. 4.37a. The amplitude response is constant (unity) for all frequencies. The phase shift increases linearly with frequency with a slope of −T. This result can be explained physically by recognizing that if a sinusoid cos ωt is passed through an ideal delay of T seconds, the output is cos ω(t − T). The output sinusoid amplitude is the same as that of the input for all values of ω. Therefore, the amplitude response (gain) is unity for all frequencies. Moreover, the output cos ω(t − T) = cos (ωt − ωT) has a phase shift − ωT with respect to the input cos ωt. Therefore, the phase response is linearly proportional to the frequency ω with a slope −T.

Figure 4.37: Frequency response of an ideal (a) delay, (b) differentiator, and (c) integrator. b. An ideal differentiator. The transfer function of an ideal differentiator is [see Eq. (4.47)] Therefore Consequently

This amplitude and phase response are depicted in Fig. 4.37b. The amplitude response increases linearly with frequency, and phase response is constant (π/2) for all frequencies. This result can be explained physically by recognizing that if a sinusoid cos ωt is passed through an ideal differentiator, the output is −ω sin ωt = ωcos[ωt + (π/2)]. Therefore, the output sinusoid amplitude is ω times the input amplitude; that is, the amplitude response (gain) increases linearly with frequency ω. Moreover, the output sinusoid undergoes a phase shift π/2 with respect to the input cos ωt. Therefore, the phase response is constant (π/2) with frequency. In an ideal differentiator, the amplitude response (gain) is proportional to frequency [|H(jω)| = ω], so that the higher-frequency components are enhanced (see Fig. 4.37b). All practical signals are contaminated with noise, which, by its nature, is a broadband (rapidly varying) signal containing components of very high frequencies. A differentiator can increase the noise disproportionately to the point of drowning out the desired signal. This is why ideal differentiators are avoided in practice. c. An ideal integrator. The transfer function of an ideal integrator is [see Eq. (4.48)]

Therefore

Consequently

These amplitude and the phase responses are illustrated in Fig. 4.37c. The amplitude response is inversely proportional to frequency, and the phase shift is constant (−π/2) with frequency. This result can be explained physically by recognizing that if a sinusoid cos ωt is passed through an ideal integrator, the output is (1/ω) sin ωt = (1/ω) cos [ωt − (π/2)]. Therefore, the amplitude response is inversely proportional to ω, and the phase response is constant (−π/2) with frequency.[†] Because its gain is 1/ω, the ideal integrator suppresses higher-frequency components but enhances lower-frequency components with ω < 1. Consequently, noise signals (if they do not contain an appreciable amount of very-low-frequency components) are suppressed (smoothed out) by an integrator.

EXERCISE E4.14 Find the response of an LTIC system specified by

if the input is a sinusoid 20 sin (3t + 35°). Answers 10.23 sin (3t −61.91°)

4.8-1 Steady-State Response to Causal Sinusoidal Inputs So far we have discussed the LTIC system response to everlasting sinusoidal inputs (starting at t = −∞). In practice, we are more interested in

causal sinusoidal inputs (sinusoids starting at t = 0). Consider the input e jωt u(t), which starts at t = 0 rather than at t = −∞. In this case X(s) = 1/(s + jω). Moreover, according to Eq. (4.43), H(s) = P(s)/Q(s), where Q(s) is the characteristic polynomial given by Q(s) = (s − λ1 )(s − λ2 ) (s − λN).[‡] Hence,

In the partial fraction expansion of the right-hand side, let the coefficients corresponding to the N terms (s -? 1 ), (s -? 2 ), ..., (s - ? N) be k 1 , k 2 ,..., k N. The coefficient corresponding to the last term (s − jω) is P(s)/Q(s)|s=jω = H(jω). Hence,

and

For an asymptotically stable system, the characteristic mode terms e jωt decay with time, and, therefore, constitute the so-called transient component

of the response. The last term H(jω)e jωt persists forever, and is the steady-state component of the response given by

This result also explains why an everlasting exponential input e jωt results in the total response H(jω)e jωt for BIBO systems. Because the input started at t = −∞, at any finite time the decaying transient component has long vanished, leaving only the steady-state component. Hence, the total response appears to be H(jω)e jωt .

From the argument that led to Eq. (4.75a), it follows that for a causal sinusoidal input cos ωt, the steady-state response y ss(t) is given by

In summary, |H(jω)|cos[ωt + ∠H(jω)] is the total response to everlasting sinusoid cos ωt. In contrast, it is the steady-state response to the same input applied at t = 0. [†] This may also be argued as follows. For BIBO-unstable systems, the zero-input response contains nondecaying natural mode terms of the form cos ω0 t or e at cos ω0 t (a > 0). Hence, the response of such a system to a sinusoid cos ωt will contain not just the sinusoid of frequency ω, but

also nondecaying natural modes, rendering the concept of frequency response meaningless. Alternately, we can argue that when s = jω, a BIBOunstable system violates the dominance condition Re λi < Re jω for all i, where λi , represents ith characteristic root of the system (see Section 4.31). [‡] Strictly speaking, |H(ω)| is magnitude response. There is a fine distinction between amplitude and magnitude. Amplitude A can be positive and negative. In contrast, the magnitude |A| is always nonnegative. We refrain from relying on this useful distinction between amplitude and magnitude in the interest of avoiding proliferation of essentially similar entities. This is also why we shall use the "amplitude" (instead of "magnitude") spectrum for |H(ω)|.

[†] A puzzling aspect of this result is that in deriving the transfer function of the integrator in Eq. (4.48), we have assumed that the input starts at t = 0. In contrast, in deriving its frequency response, we assume that the everlasting exponential input e jωt starts at t = −∞. There appears to be a

fundamental contradiction between the everlasting input, which starts at t = −∞, and the integrator, which opens its gates only at t = 0. What use is everlasting input, since the integrator starts integrating at t = 0? The answer is that the integrator gates are always open, and integration begins whenever the input starts. We restricted the input to start at t = 0 in deriving Eq. (4.48) because we were finding the transfer function using the unilateral transform, where the inputs begin at t = 0. So the integrator starting to integrate at t = 0 is restricted because of the limitations of the unilateral transform method, not because of the limitations of the integrator itself. If we were to find the integrator transfer function using Eq. (2.49), where there is no such restriction on the input, we would still find the transfer function of an integrator as 1/s. Similarly, even if we were to use the bilateral Laplace transform, where t starts at −∞, we would find the transfer function of an integrator to be 1/s. The transfer function of a system is the property of the system and does not depend on the method used to find it.

[‡] For simplicity, we have assumed nonrepeating characteristic roots. The procedure is readily modified for repeated roots, and the same conclusion

results.

4.9 BODE PLOTS Sketching frequency response plots (|H(jω)| and ∠H(jω) versus ω) is considerably facilitated by the use of logarithmic scales. The amplitude and phase response plots as a function of ω on a logarithmic scale are known as Bode plots. By using the asymptotic behavior of the amplitude and the phase responses, we can sketch these plots with remarkable ease, even for higher-order transfer functions. Let us consider a system with the transfer function

where the second-order factor (s 2 + b 2 s + b 3 ) is assumed to have complex conjugate roots. [†] We shall rearrange Eq. (4.81a) in the form

and

This equation shows that H(jω) is a complex function of ω. The amplitude response |H(jω)) and the phase response ∠H(jω) are given by

and

From Eq. (4.82b) we see that the phase function consists of the addition of only three kinds of term: (i) the phase of jω), which is 90° for all values of ω, (ii) the phase for the first-order term of the form 1 + jω/a, and (iii) the phase of the second-order term

We can plot these three basic phase functions for ω in the range 0 to ∞ and then, using these plots, we can construct the phase function of any transfer function by properly adding these basic responses. Note that if a particular term is in the numerator, its phase is added, but if the term is in the denominator, its phase is subtracted. This makes it easy to plot the phase function ∠H(jω) as a function of ω. Computation of |H(jω)|, unlike that of the phase function, however, involves the multiplication and division of various terms. This is a formidable task, especially when, we have to plot this function for the entire range of ω (0 to ∞). We know that a log operation converts multiplication and division to addition and subtraction. So, instead of plotting |H(jω)|, why not plot log |H(jω)| to simplify our task? We can take advantage of the fact that logarithmic units are desirable in several applications, where the variables considered have a very large range of variation. This is particularly true in frequency response plots, where we may have to plot frequency response over a range from a very low frequency, near 0, to a very high frequency, in the range of 10 10 or higher. A plot on a linear scale of frequencies for such a

large range will bury much of the useful information at lower frequencies. Also, the amplitude response may have a very large dynamic range from a low of 10 −6 to a high of 10 6 . A linear plot would be unsuitable for such a situation. Therefore, logarithmic plots not only simplify our task of plotting, but, fortunately, they are also desirable in this situation.

There is another important reason for using logarithmic scale. The Weber-Fechner law (first observed by Weber in 1834) states that human senses (sight, touch, hearing, etc.) generally respond in logarithmic way. For instance, when we hear sound at two different power levels, we judge one sound twice as loud when the ratio of the two sound powers is 10. Human senses respond to equal ratios of power, not equal increments in power. [11] This is clearly a logarithmic response. [†]

The logarithmic unit is the decibel and is equal to 20 times the logarithm of the quantity (log to the base 10). Therefore, 20 log 10 |H(jω)| is simply the log amplitude in decibels (dB). [‡] Thus, instead of plotting |H(jω)|, we shall plot 20 log 10 |H(jω)| as a function of ω. These plots (log amplitude and phase) are called Bode plots. For the transfer function in Eq. (4.82a), the log amplitude is

The term 20 log(Ka1 a 2 /b 1 b 3 ) is a constant. We observe that the log amplitude is a sum of four basic terms corresponding to a constant, a pole or

zero at the origin (20 log |jω|), a first-order pole or zero (20 log |1 + jω/a|), and complex-conjugate poles or zeros (20 log |1 + jωb 2 /b 3 + (jω) 2 /b 3 |). We can sketch these four basic terms as functions of ω and use them to construct the log-amplitude plot of any desired transfer function. Let us discuss each of the terms.

4.9-1 Constant ka1 a2 /b1 b3 The log amplitude of the constant ka1 a 2 /b 1 b 2 term is also a constant, 20 log(Ka1 a 2 /b 1 b 3 ). The phase contribution from this term is zero for positive value and π for negative value of the constant.

4.9-2 Pole (or Zero) at the Origin LOG MAGNITUDE A pole at the origin gives rise to the term −20 log |jω|, which can be expressed as This function can be plotted as a function of ω. However, we can effect further simplification by using the logarithmic scale for the variable ω itself. Let us define a new variable u such that Hence The log-amplitude function −20u is plotted as a function of u in Fig. 4.38a. This is a straight line with a slope of −20. It crosses the u axis at u = 0. The ω-scale (u = log ω) also appears in Fig. 4.38a. Semilog graphs can be conveniently used for plotting, and we can directly plot ω on semilog paper. A ratio of 10 is a decade, and a ratio of 2 is known as an octave. Furthermore, a decade along the ω-scale is equivalent to 1 unit along the u-scale. We can also show that a ratio of 2 (an octave) along the ω-scale equals to 0.3010 (which is log 10 2) along the u-scale.[†]

Figure 4.38: (a) Amplitude and (b) phase responses of a pole or a zero at the origin. Note that equal increments in u are equivalent to equal ratios on the ω-scale. Thus, one unit along the u-scale is the same as one decade along the ω-scale. This means that the amplitude plot has a slope of −20 dB/decade or −20(0.3010) = −6.02 dB/octave (commonly stated as −6 dB/octave). Moreover, the amplitude plot crosses the ω axis at ω = 1, since u = log 10 ω = 0 when ω = 1. For the case of a zero at the origin, the log-amplitude term is 20 log ω. This is a straight line passing through ω = 1 and having a slope of 20

dB/decade (or 6 dB/octave). This plot is a mirror image about the ω axis of the plot for a pole at the origin and is shown dashed in Fig. 4.38a. PHASE The phase function corresponding to the pole at the origin is −∠jω [see Eq. (4.82b)]. Thus The phase is constant (−90°) for all values of ω, as depicted in Fig. 4.38b. For a zero at the origin, the phase is ∠jω = 90°. This is a mirror image of the phase plot for a pole at the origin and is shown dotted in Fig. 4.38b.

4.9-3 First-Order Pole (or Zero) THE LOG MAGNITUDE The log amplitude of a first-order pole at -a is −20 log |1 + jω/a|. Let us investigate the asymptotic behavior of this function for extreme values of ω (ω ≪ a and ω >> a). a. For ω ≪ a,

Hence, the log-amplitude function → 0 asymptotically for ω ≪ a (Fig. 4.39a).

Figure 4.39: (a) Amplitude and (b) phase responses of a first-order pole or zero at s = −a. b. For the other extreme case, where ω >> a,

This represents a straight line (when plotted as a function of u, the log of ω) with a slope of −20 dB/decade (or −6 dB/octave). When ω = a, the log amplitude is zero [Eq. (4.84b)]. Hence, this line crosses the ω axis at ω = a, as illustrated in Fig. 4.39a. Note that the asymptotes in (a) and (b) meet at ω = a. The exact log amplitude for this pole is

This exact log magnitude function also appears in Fig. 4.39a. Observe that the actual and the asymptotic plots are very close. A maximum error of 3 dB occurs at ω = a. This frequency is known as the corner frequency or break frequency. The error everywhere else is less than 3 dB. A plot of the error as a function of ω is shown in Fig. 4.40a. This figure shows that the error at one octave above or below the corner frequency is 1 dB and the error at two octaves above or below the corner frequency is 0.3 dB. The actual plot can be obtained by adding the error to the asymptotic plot.

Figure 4.40: Errors in asymptotic approximation of a first-order pole at s = −a. The amplitude response for a zero at −a (shown dotted in Fig. 4.39a) is identical to that of the pole at −a with a sign change and therefore is the mirror image (about the 0 dB line) of the amplitude plot for a pole at −a. PHASE The phase for the first-order pole at −a is

Let us investigate the asymptotic behavior of this function. For ω ≪ a,

and, for >> a,

The actual plot along with the asymptotes is depicted in Fig. 4.39b. In this case, we use a three-line segment asymptotic plot for greater accuracy. The asymptotes are a phase angle of 0° for ω ≤ a/10, a phase angle of −90° for ω ≥ 10a, and a straight line with a slope −45°/decade connecting these two asymptotes (from ω = a/10 to 10a) crossing the ω axis at ω = a/10. It can be seen from Fig. 4.39b that the asymptotes are very close to the curve and the maximum error is 5.7°. Figure 4.40b plots the error as a function of ω; the actual plot can be obtained by adding the error to the asymptotic plot. The phase for a zero at −a (shown dotted in Fig. 4.39b) is identical to that of the pole at −a with a sign change, and therefore is the mirror image (about the 0° line) of the phase plot for a pole at −a.

4.9-4 Second-Order Pole (or Zero) Let us consider the second-order pole in Eq. (4.81a). The denominator term is s 2 + b 2 s + b 3 . We shall introduce the often-used standard form s 2 +

2ζωn s + ω2 n instead of s 2 + b 2 s + b 3 . With this form, the log amplitude function for the second-order term in Eq. (4.83) becomes

and the phase function is

THE LOG MAGNITUDE The log amplitude is given by

For ω ≪ ωn , the log amplitude becomes For ω >> ωn , the log amplitude is

The two asymptotes are zero for ω < ωn and − 40u − 40 logωn for ω > ωn . The second asymptote is a straight line with a slope of −40 dB/decade (or −12 dB/octave) when plotted against the log ω scale. It begins at ω = ωn [see Eq. (4.87b)]. The asymptotes are depicted in Fig. 4.41a. The exact log amplitude is given by [see Eq. (4.86)]

Figure 4.41: Amplitude and phase response of a second-order pole. The log amplitude in this case involves a parameter ζ, resulting in a different plot for each value of ζ. For complex-conjugate poles,[†] ζ < 1. Hence, we must sketch a family of curves for a number of values of ζ in the range 0 to 1. This is illustrated in Fig. 4.41a. The error between the actual plot and the asymptotes is shown in Fig. 4.42. The actual plot can be obtained by adding the error to the asymptotic plot.

Figure 4.42: Errors in the asymptotic approximation of a second-order pole.

For second-order zeros (complex-conjugate zeros), the plots are mirror images (about the 0dB line) of the plots depicted in Fig. 4.41a. Note the resonance phenomenon of the complex-conjugate poles. This phenomenon is barely noticeable for ζ > 0.707 but becomes pronounced as ζ → 0. PHASE The phase function for second-order poles, as apparent in Eq. (4.85b), is

For ω ≪ ωn , For ω >> ωn , Hence, the phase → −180° as ω → ∞. As in the case of amplitude, we also have a family of phase plots for various values of ζ, as illustrated in Fig. 4.41b. A convenient asymptote for the phase of complex-conjugate poles is a step function that is 0° for ω < ωn and −180° for ω > ωn . An error plot for such an asymptote is shown in Fig. 4.42 for various values of ζ. The exact phase is the asymptotic value plus the error. For complex-conjugate zeros, the amplitude and phase plots are mirror images of those for complex conjugate-poles. We shall demonstrate the application of these techniques with two examples. EXAMPLE 4.25 Sketch Bode plots for the transfer function

First, we write the transfer function in normalized form

Here, the constant term is 100; that is, 40 dB (20 log 100 = 40). This term can be added to the plot by simply relabeling the horizontal axis (from which the asymptotes begin) as the 40 dB line (see Fig. 4.43a). Such a step implies shifting the horizontal axis upward by 40 dB. This is precisely what is desired.

Figure 4.43: (a) Amplitude and (b) phase responses of the second-order system. In addition, we have two first-order poles at −2 and −10, one zero at the origin, and one zero at −100. Step 1. For each of these terms, we draw an asymptotic plot as follows (shown in Fig. 4.43a by dotted lines):

i. For the zero at the origin, draw a straight line with a slope of 20 dB/decade passing through ω = 1. ii. For the pole at −2, draw a straight line with a slope of −20 dB/decade (for ω > 2) beginning at the corner frequency ω = 2 iii. For the pole at −10, draw a straight line with a slope of −20 dB/decade beginning at the corner frequency ω = 10. iv. For the zero at −100, draw a straight line with a slope of 20 dB/decade beginning at the corner frequency ω = 100. Step 2. Add all the asymptotes, as depicted in Fig. 4.43a by solid line segments. Step 3. Apply the following corrections (see Fig. 4.40a): i. The correction at ω = 1 because of the corner frequency at ω = 2 is −1 dB. The correction at ω = 1 because of the corner frequencies at ω − 10 and ω = 100 are quite small (see Fig. 4.40a) and may be ignored. Hence, the net correction at ω = 1 is −1 dB. ii. The correction at ω = 2 because of the corner frequency at ω = 2 is − 3 dB, and the correction because of the corner frequency at ω = 10 is −0.17 dB. The correction because of the corner frequency ω = 100 can be safely ignored. Hence the net correction at ω = 2 is −3.17 dB. iii. The correction at ω = 10 because of the corner frequency at ω = 10 is −3 dB, and the correction because of the corner frequency at ω = 2 is −0.17 dB. The correction. because of ω = 100 can be ignored. Hence the net correction at ω = 10 is − 3.17dB. iv. The correction at ω = 100 because of the corner frequency at ω = 100 is 3 dB, and the corrections because of the other corner frequencies may be ignored. v. In addition to the corrections at corner frequencies, we may consider corrections at intermediate points for more accurate plots. For instance, the corrections at ω = 4 because of corner frequencies at ω = 2 and 10 are −1 and about −0.65, totaling − 1.65 dB. In the same way the correction at ω = 5 because of corner frequencies at ω = 2 and 10 are −0.65 and −1, totaling −1.65 dB. With these corrections, the resulting amplitude plot is illustrated in Fig. 4.43a. PHASE PLOTS We draw the asymptotes corresponding to each of the four factors: i. The zero at the origin causes a 90° phase shift. ii. The pole at s = − 2 has an asymptote with a zero value for − ∞ < ω < 0.2 and a slope of −45°/decade beginning at ω = 0.2 and going up to ω = 20. The asymptotic value for ω > 20 is −90°. iii. The pole at s = −10 has an asymptote with a zero value for − ∞ < ω < 1 and a slope of − 45°/decade beginning at ω = 10 and going up to ω = 100. The asymptotic value for ω > 100 is −90°. iv. The zero at s = −100 has an asymptote with a zero value for − ∞ < ω < 10 and a slope of −45°/decade beginning at ω = 10 and going up to ω = 1000. The asymptotic value for ω > 1000 is 90°. All the asymptotes are added, as shown in Fig. 4.43b. The appropriate corrections are applied from Fig. 4.40b, and the exact phase plot is depicted in Fig. 4.43b. EXAMPLE 4.26 Sketch the amplitude and phase response (Bode plots) for the transfer function

Here, the constant term is 10: that is, 20 dB(20 log 10 = 20). To add this term, we simply label the horizontal axis (from which the asymptotes begin) as the 20 dB line, as before (see Fig. 4.44a).

Figure 4.44: (a) Amplitude and (b) phase responses of the second-order system. In addition, we have a real zero at s = −100 and a pair of complex conjugate poles. When we express the second-order factor in standard form, we have Step 1. Draw an asymptote of −40 dB/decade (−12 dB/octave) starting at ω = 10 for the complex conjugate poles, and draw another asymptote of 20 dB/decade, starting at ω = 100 for the (real) zero. Step 2. Add both asymptotes. Step 3. Apply the correction at ω = 100, where the correction because of the corner frequency ω = 100 is 3 dB. The correction because of the corner frequency ω = 10, as seen from Fig. 4.42a for ζ =0.1, can be safely ignored. Next, the correction at ω = 10, because of the corner frequency ω = 10 is 13.90 dB (see Fig. 4.42a for ζ = 0.1). The correction because of the real zero at −100 can be safely ignored at ω = 10. We may find corrections at a few more points. The resulting plot is illustrated in Fig. 4.44a. PHASE PLOT The asymptote for the complex conjugate poles is a step function with a jump of −90° at ω = 10. The asymptote for the zero at s = −100 is zero for ω > 10 and is a straight line with a slope of 45°/decade, starting at ω = 10 and going to ω = 1000. For ω ≥ 1000, the asymptote is 90°. The two asymptotes add to give the sawtooth shown in Fig. 4.44b. We now apply the corrections from Figs. 4.42b and 4.40b to obtain the exact plot. Comment. These two examples demonstrate that actual frequency response plots are very close to asymptotic plots, which are so easy to construct. Thus, by mere inspection of H(s) and its poles and zeros, one can rapidly construct a mental image of the frequency response of a system. This is the principal virtue of Bode plots. COMPUTER EXAMPLE C4.6 Use MATLAB function bode to solve Examples 4.25 and 4.26. >> bode(tf(conv([20 0],[1 100]), conv([1 2],[1 10])), 'k-',... >> tf([10 1000], [1 2 100]), 'k: '); >> legend( 'Ex. 4.25 ', 'Ex. 4.26 ',0)

Figure C4.6

POLES AND ZEROS IN THE RIGHT-HAND PLANE In our discussion so far, we have assumed the poles and zeros of the transfer function to be in the left-hand plane. What if some of the poles and/or zeros of H(s) lie in the RHP? If there is a pole in the RHP, the system is unstable. Such systems are useless for any signal processing application. For this reason, we shall consider only the case of the RHP zero. The term corresponding to RHP zero at s = a is (s/a) − 1, and the corresponding frequency response is (jω/a) − 1. The amplitude response is

This shows that the amplitude response of an RHP zero at s = a is identical to that of an LHP zero or s = −a. Therefore, the log amplitude plots remain unchanged whether the zeros are in the LHP or the RHP. However, the phase corresponding to the RHP zero at s = a is

whereas the phase corresponding to the LHP zero at s = −a is tan −1 (ω/a). The complex-conjugate zeros in the RHP give rise to a term s 2 − 2ζωns + ω2 n , which is identical to the term s 2 + 2ζωn s + ω2 n with a sign change in ζ. Hence, from Eqs. (4.88) and (4.89) it follows that the amplitudes are identical, but the phases are of opposite signs for the two terms. Systems whose poles and zeros are restricted to the LHP are classified as minimum phase systems

4.9-5 The Transfer Function from the Frequency Response In the preceding section we were given the transfer function of a system. From a knowledge of the transfer function, we developed techniques for determining the system response to sinusoidal inputs. We can also reverse the procedure to determine the transfer function of a minimum phase system from the system 's response to sinusoids. This application has significant practical utility. If we are given a system in a black box with only the input and output terminals available, the transfer function has to be determined by experimental measurements at the input and output terminals. The frequency response to sinusoidal inputs is one of the possibilities that is very attractive because the measurements involved are so simple. One only needs to apply a sinusoidal signal at the input and observe the output. We find the amplitude gain |H(jω)| and the output phase shift ∠H(jω) (with respect to the input sinusoid) for various values of ω over the entire range from 0 to ∞. This information yields the frequency response plots (Bode plots) when plotted against log ω. From these plots we determine the appropriate asymptotes by taking advantage of the fact that the slopes of all asymptotes must be multiples of ±20 dB/decade if the transfer function is a rational function (function that is a ratio of two polynomials in s). From the asymptotes, the corner frequencies are obtained. Corner frequencies determine the poles and zeros of the transfer function. Because of the ambiguity about the location of zeros since LHP and RHP zeros (zeros at s = ±a) have identical magnitudes, this procedure works only for minimum phase systems. [†] Coefficients a , a and b , b , b used in this section are not to be confused with those used in the representation of Nth-order LTIC system 1 2 1 2 3

equations given earlier [Eqs. (2.1) or (4.41)].

[11] Truxal, J. G. The Age of Electronic Messages. McGraw-Hill, New York, 1990. [†] Observe that that the frequencies of musical notes are spaced logarithmically (not linearly). The octave is a ratio of 2. The frequencies of the same

note in the successive octaves have a ratio of 2. On the Western musical scale, there are 12 distinct notes in each octave. The frequency of each note is about 6% higher than the frequency of the preceding note. Thus, the successive notes are separated not by some constant frequency, but by constant ratio of 1.06. [‡] Originally, the unit bel (after the inventor of telephone, Alexander Graham Bell) was introduced to represent power ratio as log , P /P bels. A 10 2 1

tenth of this unit is a decibel, as in 10 log 10 P2 /P2 decibels. Since, the power ratio of two signals is proportional to the amplitude ratio squared, or |H(jω)|2 , we have 10 log 10 P2 /P1 = 10 log 10 |H(jω)|2 = 20 log 10 |H(jω)| dB. [†] This point can be shown as follows. Let ω and ω along the ω-scale correspond to u and u along the u-scale so that log ω = u , and log 1 2 1 2 1 1

ω2 = u 2 . Then

Thus, if

then and if then [†] For ζ ≥ 1, the two poles in the second-order factor are no longer complex but real, and each of these two real poles can be dealt with as a

separate first-order factor.

4.10 FILTER DESIGN BY PLACEMENT OF POLES AND ZEROS OF H(s) In this section we explore the strong dependence of frequency response on the location of poles and zeros of H(s). This dependence points to a simple intuitive procedure to filter design.

4.10-1 Dependence of Frequency Response on Poles and Zeros of H(s) Frequency response of a system is basically the information about the filtering capability of the system. A system transfer function can be expressed as

where 1, 2, N are ? 1 , ? 2 ,..., λN are the poles of H(s). Now the value of the transfer function H(s) at some frequency s = p is

This equation consists of factors of the form p − i and p − λi . The factor p − i is a complex number represented by a vector drawn from point to the point p in the complex plane, as illustrated in Fig. 4.45a. The length of this line segment is | p − i | the magnitude of p − i . The angle of this directed line segment (with the horizontal axis) is ∠(p − i ). To compute H(s) at s = p, we draw line segments from all poles and zeros of H(s) to the point p, as shown in Fig. 4.45b. The vector connecting a zero i to the point p is p − i . Let the length of this vector be r j , and let its angle with the horizontal axis be φ i . Then p − i = r i e jφ i. Similarly, the vector connecting a pole λi to the point p is p − λi = d e e jθi, where d i and θi , are the length and the angle (with the horizontal axis), respectively, of the vector p − λi Now from Eq. (4.90b) it follows that

Figure 4.45: Vector representations of (a) complex numbers and (b) factors of H(s). Therefore

and

Here, we have assumed positive b 0 . If b 0 is negative, there is an additional phase π. Using this procedure, we can determine H(s) for any value of s. To compute the frequency response H(jω), we use s = jω (a point on the imaginary axis), connect all poles and zeros to the point jω, and determine |H(jω)| and ∠H(jω) from Eqs. (4.91). We repeat this procedure for all values of ω from 0 to ∞ to obtain the frequency response. GAIN ENHANCEMENT BY A POLE To understand the effect of poles and zeros on the frequency response, consider a hypothetical case of a single pole −α + jω0 , as depicted in Fig. 4.46a. To find the amplitude response |H(jω)| for a certain value of ω, we connect the pole to the point jω (Fig. 4.46a). If the length of this line is d, then |H(jω)| is proportional to 1/d,

where the exact value of constant K is not important at this point. As ω increases from zero, d decreases progressively until ω reaches the value ω0 . As ω increases beyond ω0 , d increases progressively. Therefore, according to Eq. (4.92), the amplitude response |H(jω)| increases from ω − 0 until ω = ω0 , and it decreases continuously as ω increases beyond ω0 , as illustrated in Fig. 4.46b. Therefore, a pole at −α + jω0 results in a frequency-selective behavior that enhances the gain at the frequency ω0 (resonance). Moreover, as the pole moves closer to the imaginary axis (as α is reduced), this enhancement (resonance) becomes more pronounced. This is because α, the distance between the pole and jω0 (d corresponding to jω0 ), becomes smaller, which increases the gain K/d. In the extreme case, when α = 0 (pole on the imaginary axis), the gain at α 0 goes to infinity. Repeated poles further enhance the frequency-selective effect. To summarize, we can enhance a gain at a frequency ω0 by placing a pole opposite the point jω0 . The closer the pole is to jω0 , the higher is the gain at ω0 , and the gain variation is more rapid (more frequency selective) in the vicinity of frequency ω0 - Note that a pole must be placed in the LHP for stability.

Figure 4.46: The role of poles and zeros in determining the frequency response of an LTIC system. Here we have considered the effect of a single complex pole on the system gain. For a real system, a complex pole −α + jω0 must accompany its conjugate −α − jω0 . We can readily show that the presence of the conjugate pole does not appreciably change the frequency-selective behavior in the vicinity of ω0 . This is because the gain in this case is K/dd′, where d′ is the distance of a point jω from the conjugate pole −α − jω0 . Because the conjugate pole is far from jω0 , there is no dramatic change in the length d′ as ω varies in the vicinity of ω0 . There is a gradual increase in the value of d′ as ω increases, which leaves the frequency-selective behavior as it was originally, with only minor changes. GAIN SUPPRESSION BY A ZERO Using the same argument, we observe that zeros at −α ±jω0 (Fig. 4.46d) will have exactly the opposite effect of suppressing the gain in the vicinity of ω0 , as shown in Fig. 4.46e). A zero on the imaginary axis at jω0 will totally suppress the gain (zero gain) at frequency ω0 . Repeated zeros will further enhance the effect. Also, a closely placed pair of a pole and a zero (dipole) tend to cancel out each other 's influence on the frequency response. Clearly, a proper placement of poles and zeros can yield a variety of frequency-selective behavior. We can use these observations to design lowpass, highpass, bandpass, and bandstop (or notch) filters. Phase response can also be computed graphically. In Fig. 4.46a, angles formed by the complex conjugate poles −α ± jω0 ), at ω − 0 (the origin) are equal and opposite. As ω increases from 0 up, the angle θ1 (due to the pole −α + jω0 ), which has a negative value at ω = 0,is reduced in magnitude; the angle θ2 because of the pole −α − jω0 , which has a positive value at ω = 0, increases in magnitude. As a result, θ1 + θ2 , the sum of the two angles, increases continuously, approaching a value π as ω → ∞. The resulting phase response ∠H(jω)) = −(θ1 + θ2 ) is illustrated in Fig. 4.46c. Similar arguments apply to zeros at −α ± jω0 . The resulting phase response ∠H(jω) = (φ 1 + φ 2 ) is depicted in Fig. 4.46f. We now focus on simple filters, using the intuitive insights gained in this discussion. The discussion is essentially qualitative.

4.10-2 Lowpass Filters A typical lowpass filter has a maximum gain at ω = 0. Because a pole enhances the gain at frequencies in its vicinity, we need to place a pole (or poles) on the real axis opposite the origin (jω = 0), as shown in Fig. 4.47a. The transfer function of this system is

Figure 4.47: Pole-zero configuration and the amplitude response of a lowpass (Butterworth) filter. We have chosen the numerator of H(s) to be ωc to normalize the dc gain H(0) to unity. If d is the distance from the pole −ωc to a point jω (Fig. 4.47a), then

with H(0) = 1. As ω to increases, d increases and |H (jω)| decreases monotonically with ω, as illustrated in Fig. 4.47d with label N = 1. This is clearly a lowpass filter with gain enhanced in the vicinity of ω = 0. WALL OF POLES An ideal lowpass filter characteristic (shaded in Fig. 4.47d) has a constant gain of unity up to frequency ωc . Then the gain drops suddenly to 0 for ω > ω. To achieve the ideal lowpass characteristic, we need enhanced gain over the entire frequency band from 0 to ωc . We know that to enhance a gain at any frequency ω, we need to place a pole opposite ω. To achieve an enhanced gain for all frequencies over the band (0 to ωc ), we need to place a pole opposite every frequency in this band. In other words, we need a continuous wall of poles facing the imaginary axis opposite the frequency band 0 to ωc (and from 0 to − ωc for conjugate poles), as depicted in Fig. 4.47b. At this point, the optimum shape of this wall is not obvious because our arguments are qualitative and intuitive. Yet, it is certain that to have enhanced gain (constant gain) at every frequency over this range, we need an infinite number of poles on this wall. We can show that for a maximally flat [†] response over the frequency range (0 to ωc ), the

wall is a semicircle with an infinite number of poles uniformly distributed along the wall. [12] . In practice, we compromise by using a finite number (N) of poles with less-than-ideal characteristics. Figure 4.47c shows the pole configuration for a fifth-order (N = 5) filter. The amplitude response for various values of N are illustrated in Fig. 4.47d. As N → ∞, the filter response approaches the ideal. This family of filters is known as the Butterworth filters. There are also other families. In Chebyshev filters, the wall shape is a semiellipse rather than a semicircle. The characteristics of a Chebyshev filter are inferior to those of Butterworth over the passband (0, ωc ), where the characteristics show a rippling effect instead of the maximally flat response of Butterworth. But in the stopband (ω > ωc ), Chebyshev behavior is superior in the sense that Chebyshev filter gain drops faster than that of the Butterworth.

4.10-3 Bandpass Filters The shaded characteristic in Fig. 4.48b shows the ideal bandpass filter gain. In the bandpass filter, the gain is enhanced over the entire passband. Our earlier discussion indicates that this can be realized by a wall of poles opposite the imaginary axis in front of the passband centered at ω0 . (There is also a wall of conjugate poles opposite −ω0 ) Ideally, an infinite number of poles is required. In practice, we compromise by using a finite number of poles and accepting less-than-ideal characteristics (Fig. 4.48).

Figure 4.48: (a) Pole-zero configuration and (b) the amplitude response of a bandpass filter.

4.10-4 Notch (Bandstop) Filters

An ideal notch filter amplitude response (shaded in Fig. 4.49b) is a complement of the amplitude response of an ideal bandpass filter. Its gain is zero over a small band centered at some frequency ω0 and is unity over the remaining frequencies. Realization of such a characteristic requires an infinite number of poles and zeros. Let us consider a practical second-order notch filter to obtain zero gain at a frequency ω = ω0 . For this purpose we must have zeros at ±jω0 . The requirement of unity gain at ω = ∞ requires the number of poles to be equal to the number of zeros (M = N). This ensures that for very large values of ω, the product of the distances of poles from ω will be equal to the product of the distances of zeros from ω. Moreover, unity gain at ω = 0 requires a pole and the corresponding zero to be equidistant from the origin. For example, if we use two (complexconjugate) zeros, we must have two poles; the distance from the origin of the poles and of the zeros should be the same. This requirement can be met by placing the two conjugate poles on the semicircle of radius ω0 , as depicted in Fig. 4.49a. The poles can be any where on the semicircle to satisfy the equidistance condition. Let the two conjugate poles be at angles ±θ with respect to the negative real axis. Recall that a pole and a zero in the vicinity tend to cancel out each other's influences. Therefore, placing poles closer to zeros (selecting θ closer to π/2) results in a rapid recovery of the gain from value 0 to 1 as we move away from ω0 in either direction. Figure 4.49b shows the gain |H(jω)| for three different values of θ.

Figure 4.49: (a) Pole-zero configuration and (b) the amplitude response of a bandstop (notch) filter. EXAMPLE 4.27 Design a second-order notch filter to suppress 60 Hz hum in a radio receiver. We use the poles and zeros in Fig. 4.49a with ω0 = 120π. The zeros are at s = ±jω0 . The two poles are at −ω0 cos θ ± jω0 sin θ. The filter transfer function is (with ω0 = 120π)

and

The closer the poles are to the zeros (the closer θ is to π/2), the faster the gain recovery from 0 to 1 on either side of ω0 = 120π. Figure 4.49b shows the amplitude response for three different values of θ. This example is a case of very simple design. To achieve zero gain over a band, we need an infinite number of poles as well as of zeros. COMPUTER EXAMPLE C4.7 The transfer function of a second-order notch filter is

Using ω0 = 2π60, plot the magnitude response for the following cases: a. θa = 60° b. θb = 80° >> >> >> >> >> >> >> >> >>

c. θc = 87° omega_0 = 2*pi*60; theta = [60 80 87]*(pi/180); omega = (0:.5:1000) '; mag = zeros(3,length(omega)); for m=1:length (theta) H = tf([1 0 omega_0^2],{1 2*omega_0*cos (theta(m)) omega_0^2]); [mag(m,:),phase] = bode (H,omega); end f = omega/(2*pi); plot (f,mag (1,:) ,'k-',f,mag (2,:),'k--',f,mag(3,:),'k-.'); xlabel ('f [Hz] '); ylabel ('|H(j2\pi f)|'); legend (\theta = 60^\circ','\theta = 80^\circ','\theta = 87^\circ',0)

Figure C4.7 EXERCISE E4.15 Use the qualitative method of sketching the frequency response to show that the system with the pole-zero configuration in Fig. 4.50a is a highpass filter and the configuration in Fig. 4.50b is a bandpass filter.

Figure 4.50: Pole-zero configuration of (a) a highpass filter and (b) a bandpass filter.

4.10-5 Practical Filters and Their Specifications For ideal filters, everything is black and white; the gains are either zero or unity over certain bands. As we saw earlier, real life does not permit such a worldview. Things have to be gray or shades of gray. In practice, we can realize a variety of filter characteristics that can only approach ideal characteristics. An ideal filter has a passband (unity gain) and a stopband (zero gain) with a sudden transition from the passband to the stopband. There is no transition band. For practical (or realizable) filters, on the other hand, the transition from the passband to the stopband (or vice versa) is gradual and takes place over a finite band of frequencies. Moreover, for realizable filters, the gain cannot be zero over a finite band (Paley-Wiener condition). As a result, there can no true stopband for practical filters. We therefore define a stopband to be a band over which the gain is below some small number G s , as illustrated in Fig. 4.51. Similarly, we define a passband to be a band over which the gain is between 1 and some number G p (G p < 1), as shown in Fig. 4.51. We have selected the passband gain of unity for convenience. It could be any constant. Usually the gains are specified in terms of decibels. This is simply 20 times the log (to base 10) of the gain. Thus

Figure 4.51: Passband, stopband, and transition band in filters of various types. A gain of unity is 0 dB and a gain of √2 is 3.01 dB, usually approximated by 3 dB. Sometimes the specification may be in terms of attenuation, which is the negative of the gain in dB. Thus a gain of √2; that is, 0.707, is −3 dB, but is an attenuation of 3 dB. In a typical design procedure, G p (minimum passband gain) and G s (maximum stopband gain) are specified. Figure 4.51 shows the passband, the stopband, and the transition band for typical lowpass, bandpass, highpass, and bandstop filters. Fortunately, the highpass, bandpass, and bandstop filters can be obtained from a basic lowpass filter by simple frequency transformations. For example, replacing s with ωc/s in the lowpass filter transfer function results in a highpass filter. Similarly, other frequency transformations yield the bandpass and bandstop filters. Hence, it is necessary to develop a design procedure only for a basic lowpass filter. Then, by using appropriate transformations, we can design filters of other types. The design procedures are beyond our scope here and will not be discussed. Interested reader is referred to Ref. 1. [†] Maximally flat amplitude response means the first 2N − 1 derivatives of |H(jω)| with respect to ω are zero at ω = 0. [12] Van Valkenberg, M. Analog Filter Design. Oxford University Press, New York, 1982.

4.11 THE BILATERAL LAPLACE TRANSFORM Situations involving noncausal signals and/or systems cannot be handled by the (unilateral) Laplace transform discussed so far. These cases can be analyzed by the bilateral (or two-sided) Laplace transform defined by

and x(t) can be obtained from X(s) by the inverse transformation

Observe that the unilateral Laplace transform discussed so far is a special case of the bilateral Laplace transform, where the signals are restricted to the causal type. Basically, the two transforms are the same. For this reason we use the same notation for the bilateral Laplace transform. Earlier we showed that the Laplace transforms of e −at u(t) and of −e at u(−t) are identical. The only difference is in their regions of convergence (ROC). The ROC for the former is Re s > −a; that for the latter is Re s < −a; as illustrated in Fig. 4.1. Clearly, the inverse Laplace transform of X(s) is not unique unless the ROC is specified. If we restrict all our signals to the causal type, however, this ambiguity does not arise. The inverse transform of 1/(s + a) is e −at u(t). Thus, in the unilateral Laplace transform, we can ignore the ROC in determining the inverse transform of X(s). We now show that any bilateral transform can be expressed in terms of two unilateral transforms. It is, therefore, possible to evaluate bilateral transforms from a table of unilateral transforms. Consider the function x(t) appearing in Fig. 4.52a. We separate x(t) into two components, x 1 (t) and x 2 (t), representing the positive time (causal) component and the negative time (anticausal) component of x(t), respectively (Fig. 4.52b and 4.52c):

Figure 4.52: Expressing a signal as a sum of causal and anticausal components. The bilateral Laplace transform of x(t) is given by

where X1 (s) is the Laplace transform of the causal component x 1 (t) and X2 (s) is the Laplace transform of the anticausal component x 2 (t). Consider X2 (S), given by

Therefore

If x(t) has any impulse or its derivative(s) at the origin, they are included in x 1 (t). Consequently, x 2 (t) = 0 at the origin; that is, x 2 (0) = 0. Hence, the lower limit on the integration in the preceding equation can be taken as 0 − instead of 0 + . Therefore

Because x 2 (−t) is causal (Fig. 4.52d), X2 (−s) can be found from the unilateral transform table. Changing the sign of s in X2 (−s) yields X2 (s). To summarize, the bilateral transform X(s) in Eq. (4.93) can be computed from the unilateral transforms in two steps: 1. Split x(t) into its causal and anticausal components, x 1 (t) and x 2 (t), respectively. 2. The signals x 1 (t) and x 2 (−t) are both causal. Take the (unilateral) Laplace transform of x 1 (t) and add to it the (unilateral) Laplace transform of x 2 (−t), with s replaced by −s. This procedure gives the (bilateral) Laplace transform of x(t). Since x 1 (t) and x 2 (−t) are both causal, X1 (s) and X2 (−s) are both unilateral Laplace transforms. Let σc1 and σc2 be the abscissas of convergence

of X1 (s) and X2 (−s), respectively. This statement implies that X1 (s) exists for all s with Re s > σc1 , and X2 (−s) exists for all s with Re s > σc2 . Therefore, X2 (s) exists for all s with Res < σc2 [†] . Therefore, X (s) = X1 (s)+X2 (s) exists for all s such that The regions of convergence (or existence) of X1 (s), X2 (s), and X(s) are shown in Fig. 4.53. Because X(s) is finite for all values of s lying in the strip of convergence (σc1 < Re s < −σc2 ), poles of X (s) must lie outside this strip. The poles of X(s) arising from the causal component x 1 (t) lie to the left of the strip (region) of convergence, and those arising from its anticausal component x 2 (t) lie to its right (see Fig. 4.53). This fact is of crucial importance in finding the inverse bilateral transform.

Figure 4.53 This result can be generalized to left-sided and right-sided signals. We define a signal x(t) as a right-sided signal if x(t) = 0 for t < T1 for some finite positive or negative number T1 . A causal signal is always a right-sided signal, but the converse is not necessarily true. A signal is said to left sided if it is zero for t > T2 for some finite, positive, or negative number T2 . An anticausal signal is always a left-sided signal, but the converse is not necessarily true. A two-sided signal is of infinite duration on both positive and negative sides of t and is neither right sided nor left sided. We can show that the conclusions for ROC for causal signals also hold for right-sided signals, and those for anticausal signals hold for left-sided signals. In other words, if x(t) is causal or right-sided, the poles of X(s) lie to the left of the ROC, and if x(t) is anticausal or left-sided, the poles of X(s) lie to the right of the ROC. To prove this generalization, we observe that a right-sided signal can be expressed as x(t) + x(t), where x(t) is a causal signal and x f (t) is some finite-duration signal. ROC of any finite-duration signal is the entire s-plane (no finite poles). Hence, the ROC of the right-sided signal x(t) + x(t) is the region common to the ROCs of x(t) and x f (t), which is same as the ROC for x(t). This proves the generalization for right-sided signals. We can use a similar argument to generalize the result for left-sided signals. Let us find the bilateral Laplace transform of

We already know the Laplace transform of the causal component

For the anticausal component, x 2 (t) = e bt u(−t), we have

so that

Therefore

and the Laplace transform of x(t) in Eq. (4.94) is

Figure 4.54 shows x(t) and the ROC of X(s) for various values of a and b. Equation (4.97) indicates that the ROC of X(s) does not exist if a > b, which is precisely the case in Fig. 4.54g.

Figure 4.54 Observe that the poles of X (s) are outside (on the edges) of the ROC. The poles of X (s) because of the anticausal component of x(t) lie to the right of the ROC, and those due to the causal component of x(t) lie to its left. When X(s) is expressed as a sum of several terms, the ROC for X(s) is the intersection of (region common to) the ROCs of all the terms. In general,

if x(t) = ∑ k i=1 x i (t), then the ROC for X(s) is the intersection of the ROCs (region common to all ROCs) for the transforms X1 (s), X2 (s),...,Xk (s). EXAMPLE 4.28 Find the inverse Laplace transform of

if the ROC is a. −2 < Re s < 1 b. Re s > 1 c. Re s < −2

a. Now, X(s) has poles at −2 and 1. The strip of convergence is −2 < Re s < 1. The pole at −2, being to the left of the strip of convergence, corresponds to the causal signal. The pole at 1, being to the right of the strip of convergence, corresponds to the anticausal signal. Equations (4.95) and (4.96) yield b. Both poles lie to the left of the ROC, so both poles correspond to causal signals. Therefore c. Both poles lie to the right of the region of convergence, so both poles correspond to anticausal signals, and Figure 4.55 shows the three inverse transforms corresponding to the same X (s) but with different regions of convergence.

Figure 4.55: Three possible inverse transforms of −3/((s + 2)(s −1)).

4.11-1 Properties of Bilateral Laplace Transform Properties of the bilateral Laplace transform are similar to those of the unilateral transform. We shall merely state the properties here without proofs. Let the ROC of X(s) be a < Re s < b. Similarly, let the ROC of Xi (s) is a i < Re s < b i for (i = 1, 2). LINEARITY The ROC for a 1 X1 (s) + a 2 X2 (s) is the region common to (intersection of) the ROCs for X1 (s) and X2 (s). TIME SHIFT The ROC for X(s)e −sT is identical to the ROC for X(s). FREQUENCY SHIFT The ROC for X(s − s 0 ) is a + c < Re s < b + c, where c = Re s 0 . TIME DIFFERENTIATION

The ROC for sX (s) contains the ROC for X(s) and may be larger than that of X(s) under certain conditions [e.g., if X(s) has a first-order pole at s = 0 that is canceled by the factor s in sX(s)]. TIME INTEGRATION

The ROC for sX(s) is max (a, 0) < Re s < b. TIME SCALING

The ROC for X (s/β) is βa < Re s < βb. For β > 1, x(βt) represents time compression and the corresponding ROC expands by factor β. For 0 > β > 1, x(βt) represents time expansion and the corresponding ROC is compressed by factor β. TIME CONVOLUTION The ROC for X1 (s)X2 (s) is the region common to (intersection of) the ROCs for X1 (s) and X2 (s). FREQUENCY CONVOLUTION

The ROC for X1 (s) * X2 (s) is a 1 + a 2 < Re s < b 1 + b 2 . TIME REVERSAL

The ROC for X(−s) is −b < Re s < −a.

4.11-2 Using the Bilateral Transform for Linear System Analysis Since the bilateral Laplace transform can handle noncausal signals, we can analyze noncausal LTIC systems using the bilateral Laplace transform. We have shown that the (zero-state) output y(t) is given by

This expression is valid only if X(s)H(s) exists. The ROC of X(s)H(s) is the region in which both X (s) and H (s) exist. In other words, the ROC of X(s)H (s) is the region common to the regions of convergence of both X(s) and H(s). These ideas are clarified in the following examples. EXAMPLE 4.29 Find the current y(t) for the RC circuit in Fig. 4.56a if the voltage x(t) is

Figure 4.56: Response of a circuit to a noncausal input. The transfer function H(s) of the circuit is given by

Because h(t) is a causal function, the ROC of H(s) is Re s > −1. Next, the bilateral Laplace transform of x (t) is given by

The response y(t) is the inverse transform of X(s)H(s)

The ROC of X(s)H(s) is that ROC common to both X(s) and H(s). This is 1 < Re s < 2. The poles s = ±1 lie to the left of the ROC and, therefore, correspond to causal signals; the pole s = 2 lies to the right of the ROC and thus represents an anticausal signal. Hence Figure 4.56c shows y(t). Note that in this example, if then the ROC of X(s) is −4 < Re s < −2. Here no region of convergence exists for X(s)H(s). Such a situation means that the dominance condition cannot be satisfied by any permissible value of s in the range (1 < Re s < 2). Hence, the response y(t) goes to infinity. EXAMPLE 4.30 Find the response y(t) of a noncausal system with the transfer function

to the input x(t) = e −2 t u(t). We have

and

The ROC of X(s)H(s) is the region −2 < Re s < 1. By partial fraction expansion

and Note that the pole of H(s) lies in the RHP at 1. Yet the system is not unstable. The pole(s) in the RHP may indicate instability or noncausality, depending on its location with respect to the region of convergence of H(s). For example, if H(s) = −1/(s − 1) with Re s > 1, the system is causal

and unstable, with h(t) = −e t u(t). In contrast, if H(s) = −1/(s −1) with Re s < 1, the system is noncausal and stable, with h(t) = e t u(−t). EXAMPLE 4.31 Find the response y(t) of a system with the transfer function

and the input The input x(t) is of the type depicted in Fig. 4.54g, and the region of convergence for X(s) does not exist. In this case, we must determine separately the system response to each of the two input components, x 1 (t) = e −1 u(t) and x 2 (t) = e −2t u(−t).

If y 1 (t) and y 2 (t) are the system responses to x 1 (t) and x 2 (t), respectively, then

so that and

so that Therefore

[†] For instance, if x(t) exists for all t > 10, then x(−t), its time-inverted form, exists for t < −10.

4.12 SUMMARY This chapter discusses analysis of LTIC (linear, time-invariant, continuous-time) systems by the Laplace transform, which transforms integrodifferential equations of such systems into algebraic equations. Therefore solving these integro-differential equations reduces to solving algebraic equations. The Laplace transform method cannot be used for time-varying-parameter systems or for nonlinear systems in general. The transfer function H(s) of an LTIC system is the Laplace transform of its impulse response. It may also be defined as a ratio of the Laplace transform of the output to the Laplace transform of the input when all initial conditions are zero (system in zero state). If X(s) is the Laplace transform of the input x(t) and Y(s) is the Laplace transform of the corresponding output y(t) (when all initial conditions are zero), then Y(s) =

X(s)H(s). For an LTIC system described by an Nth-order differential equation Q(D)y(t) = P(D)x(t), the transfer function H(s) = P(s)/Q(s). Like the impulse response h(t), the transfer function H(s) is also an external description of the system. Electrical circuit analysis can also be carried out by using a transformed circuit method, in which all signals (voltages and currents) are represented by their Laplace transforms, all elements by their impedances (or admittances), and initial conditions by their equivalent sources (initial condition generators). In this method, a network can be analyzed as if it were a resistive circuit. Large systems can be depicted by suitably interconnected subsystems represented by blocks. Each subsystem, being a smaller system, can be readily analyzed and represented by its input-output relationship, such as its transfer function. Analysis of large systems can be carried out with the knowledge of input-output relationships of its subsystems and the nature of interconnection of various subsystems. LTIC systems can be realized by scalar multipliers, adders, and integrators. A given transfer function can be synthesized in many different ways, such as canonic, cascade, and parallel. Moreover, every realization has a transpose, which also has the same transfer function. In practice, all the building blocks (scalar multipliers, adders, and integrators) can be obtained from operational amplifiers. The system response to an everlasting exponential e st is also an everlasting exponential H(s)e st . Consequently, the system response to an

everlasting exponential e jωt is H(jω)e jωt . Hence, H(jω) is the frequency response of the system. For a sinusoidal input of unit amplitude and having frequency ω, the system response is also a sinusoid of the same frequency (ω) with amplitude |H(jω)|, and its phase is shifted by ∠H(jω) with respect to the input sinusoid. For this reason |H(jω)| is called the amplitude response (gain) and ∠H(jω) is called the phase response of the system. Amplitude and phase response of a system indicate the filtering characteristics of the system. The general nature of the filtering characteristics of a system can be quickly determined from a knowledge of the location of poles and zeros of the system transfer function. Most of the input signals and practical systems are causal. Consequently we are required most of the time to deal with causal signals. When all signals must be causal, the Laplace transform analysis is greatly simplified; the region of convergence of a signal becomes irrelevant to the analysis process. This special case of the Laplace transform (which is restricted to causal signals) is called the unilateral Laplace transform. Much of the chapter deals with this variety of Laplace transform. Section 4.11 discusses the general Laplace transform (the bilateral Laplace transform), which can handle causal and noncausal signals and systems. In the bilateral transform, the inverse transform of X(s) is not unique but depends on the region of convergence of X(s). Thus the region of convergence plays a very crucial role in the bilateral Laplace transform.

REFERENCES 1. Lathi, B. P. Signal Processing and Linear Systems, 1st ed. Oxford University Press, New York, 1998. 2. Doetsch, G. Introduction to the Theory and Applications of the Laplace Transformation with a Table of Laplace Transformations. Springer-Verlag, New York, 1974. 3. LePage, W. R. Complex Variables and the Laplace Transforms for Engineers. McGraw-Hill, New York, 1961. 4. Durant, Will, and Ariel Durant. The Age of Napoleon, Part XI in The Story of Civili ation Series. Simon & Schuster, New York, 1975. 5. Bell, E. T. Men of Mathematics. Simon & Schuster, New York, 1937. 6. Nahin, P. J. "Oliver Heaviside: Genius and Curmudgeon." IEEE Spectrum, vol. 20, pp. 63 -69, July 1983. 7. Berkey, D. Calculus, 2nd ed. Saunders, Philadelphia, 1988. 8. Encyclopaedia Britannica. Micropaedia IV, 15th ed., p. 981, Chicago, 1982. 9. Churchill, R. V. Operational Mathematics, 2nd ed. McGraw-Hill, New York, 1958. 10. Lathi, B. P. Signals, Systems, and Communication. Wiley, New York, 1965. 11. Truxal, J. G. The Age of Electronic Messages. McGraw-Hill, New York, 1990. 12. Van Valkenberg, M. Analog Filter Design. Oxford University Press, New York, 1982.

MATLAB SESSION 4: CONTINUOUS-TIME FILTERS Continuous-time filters are essential to many if not most engineering systems, and MATLAB is an excellent assistant for filter design and analysis. Although a comprehensive treatment of continuous-time filter techniques is outside the scope of this book, quality filters can be designed and realized with minimal additional theory. A simple yet practical example demonstrates basic filtering concepts. Telephone voice signals are often lowpass-filtered to eliminate frequencies above a cutoff of 3 kHz, or ωc = 3000(2π) ≈ 18.850 rad/s. Filtering maintains satisfactory speech quality and reduces signal bandwidth, thereby increasing the phone company 's call capacity. How, then, do we design and realize an acceptable 3 kHz lowpass filter?

M4.1 Frequency Response and Polynomial Evaluation Magnitude response plots help assess a filter 's performance and quality. The magnitude response of an ideal filter is a brick-wall function with unity passband gain and perfect stopband attenuation. For a lowpass filter with cutoff frequency ωc , the ideal magnitude response is

Unfortunately, ideal filters cannot be implemented in practice. Realizable filters require compromises, although good designs will closely approximate the desired brick-wall response. A realizable LTIC system often has a rational transfer function that is represented in the s-domain as

Frequency response H(jω) is obtained by letting s = jω, where frequency ω is in radians per second. MATLAB is ideally suited to evaluate frequency response functions. Defining a length-(N + 1) coefficient vector A = [a 0 , a 1 ,...,a N] and a length-(M + 1) coefficient vector B = [b N-M , b N-M+1 ,...,b N], program MS4P1 computes H(jω) for each frequency in the input vector ω. function [H] = MS4P1(B,A,omega); %MS4P1.m : MATLAB Session 4, Program 1 % Function M-file computers frequency response for LTIC system % INPUTS: B = vector of feedforward coefficients % A = vector of feedback coefficients % omega =vector of frequencies [rad/s]. % OUTPUTS: H = frequency response H = polyval (B,j*omega)./polyval(A,j*omega); The function polyval efficiently evaluates simple polynomials and makes the program nearly trivial. For example, when A is the vector of coefficients [a 0 ,a 1 ,...,a N), polyval (A, j * omega) computes

for each value of the frequency vector omega. It is also possible to compute frequency responses by using the signal processing toolbox function freqs.

M4.2 Design and Evaluation of a Simple RC Filter One of the simplest lowpass filters is realized by using the RC circuit shown in Fig. M4.1. This one-pole system has transfer function H RC(s) = (RCs + 1) −1 and magnitude response . Independent of component values R and C, this magnitude function possesses many desirable characteristics such as a gain that is unity at ω = 0 and that monotonically decreases to zero as ω → ∞.

Figure M4.1: An RC filter. Components R and C are chosen to set the desired 3 kHz cutoff frequency. For many filter types, the cutoff frequency corresponds to the half-power point, or |H RC (jωc ) | = 1/√2. Assigning C a realistic capacitance of 1 nF, the required resistance is computed by . >> omega_c = 2-pi*3000; >> C = 1e-9; >> R = 1/sqrt(C^2*omega_c^2) R = 5.3052e+004 The root of this first-order RC filter is directly related to the cutoff frequency, λ = −1/RC = −18,850 = −ωc . To >> >> >> >> >>

evaluate the RC filter performance, the magnitude response is plotted over the mostly audible frequency range (0 ≤ f 20 kHz). f = linspace(0,20000,200); B = 1; A = [R*C 1]; Hmag_RC = abs(MS4P1(B,A,f*2*pi)); plot(f,abs(f*2*pi)> R = sqrt(2^(1/10)-1)/(C*omega_c) R = 1.4213e+004 This cascaded filter has a 10th-order pole at λ = −1/RC and no finite zeros. To compute the magnitude response, polynomial coefficient vectors A and B are needed. Setting B = [1] ensures there are no finite zeros or, equivalently, that all zeros are at infinity. The poly command, which expands a vector of roots into a corresponding vector of polynomial coefficients, is used to obtain A. >> B = 1; A = poly(-1/(R*C)*ones(10,1));A = A/A(end); >> Hmag_cascade = abs (MS4P1(B,A,f*2*pi)); Notice that scaling a polynomial by a constant does not change its roots. Conversely, the roots of a polynomial specify a polynomial within a scale factor. The command A = A/A (end) properly scales the denominator polynomial to ensure unity gain at ω = 0. The magnitude response plot of the cascaded RC filter is included in Fig. M4.4. The passband remains relatively unchanged, but stopband attenuation is greatly improved to over 60 dB at 20 kHz.

Figure M4.4: Lowpass filter comparison.

M4.4 Butterworth Filters and the Find Command The pole location of a first-order lowpass filter is necessarily fixed by the cutoff frequency. There is little reason, however, to place all the poles of a 10th-order filter at one location. Better pole placement will improve our filter 's magnitude response. One strategy, discussed in Section 4.10, is to place a wall of poles opposite the passband frequencies. A semicircular wall of poles leads to the Butterworth family of filters, and a semielliptical shape leads to the Chebyshev family of filters. Butterworth filters are considered first. To begin, notice that a transfer function H(s) with real coefficients has a squared magnitude response given by |H(jω)|2 = H(jω)H*(jω) =

H(jω)H(−jω) = H(s)−s)|s=jω. Thus, half the poles of |H(jω)|2 correspond to the filter H(s) and the other half correspond to H(−s). Filters that are both stable and causal require H(s) to include only left-half-plane poles.

The squared magnitude response of a Butterworth filter is

This function has the same appealing characteristics as the first-order RC filter: a gain that is unity at ω = 0 and monotonically decreases to zero as ω → ∞. By construction, the half-power gain occurs at ωc . Perhaps most importantly, however, the first 2N − 1 derivatives of |H B (jω)| with respect to ω are zero at ω = 0. Put another way, the passband is constrained to be very flat for low frequencies. For this reason, Butterworth filters are sometimes called maximally flat filters. As discussed in MATLAB Session B, the roots of minus one must lie equally spaced on a circle centered at the origin. Thus, the 2N poles of

|H B (jω)|2 naturally lie equally spaced on a circle of radius ωc centered at the origin. Figure M4.5 displays the 20 poles corresponding to the case N

= 10 and ωc = 3000(2π) rad/s. An Nth-order Butterworth filter that is both causal and stable uses the N left-half-plane poles of |H B (jω)|2 .

Figure M4.5: Roots of |H B (jω)|2 for N = 10 and ωc = 3000(2π). To design a 10th-order Butterworth filter, we first compute the 20 poles of |H B (jω)|2 : >> N=10; >> poles = roots([(j*omega_c)^(-2*N), zeros(1,2*N-1),1]); The find command is an extremely powerful function that returns the indices of a vector 's nonzero elements. Combined with relational operators, the find command allows us to extract the 10 left-half-plane roots that correspond to the poles of our Butterworth filter. >> B_poles = poles (find(real(poles) > A = poly (B_poles); A = A/A (end); >> Hmag_B = abs (MS4P1 (B,A,f*2*pi)); The magnitude response plot of the Butterworth filter is included in Fig. M4.4. The Butterworth response closely approximates the brick-wall function and provides excellent filter characteristics: flat passband, rapid transition to the stopband, and excellent stopband attenuation (>40dB at 5kHz).

M4.5 Using Cascaded Second-Order Sections for Butterworth Filter Realization For our RC filters, realization preceded design. For our Butterworth filter, however, design has preceded realization. For our Butterworth filter to be useful, we must be able to implement it. Since the transfer function H B (s) is known, the differential equation is also known. Therefore, it is possible to try to implement the design by using op-amp integrators, summers, and scalar multipliers. Unfortunately, this approach will not work well. To understand why, consider the denominator

coefficients a 0 = 1.766 × 10 −43 and a 10 = 1. The smallest coefficient is 43 orders of magnitude smaller than the largest coefficient! It is practically impossible to accurately realize such a broad range in scale values. To understand this, skeptics should try to find realistic resistors such that R f /R =

1.766 × 10 −43. Additionally, small component variations will cause large changes in actual pole location.

A better approach is to cascade five second-order sections, where each section implements one complex conjugate pair of poles. By pairing poles in complex conjugate pairs, each of the resulting second-order sections have real coefficients. With this approach, the smallest coefficients are only about nine orders of magnitude smaller than the largest coefficients. Furthermore, pole placement is typically less sensitive to component variations for cascaded structures.

The Sallen-Key circuit shown in Fig. M4.6 provides a good way to realize a pair of complex-conjugate poles.[†] The transfer function of this circuit is

Figure M4.6: Sallen-Key filter stage. Geometrically, ω0 is the distance from the origin to the poles and Q = 1/2 cos ψ, where ψ is the angle between the negative real axis and the pole. Termed the "quality factor" of a circuit, Q provides a measure of the peakedness of the response. High-Q filters have poles close to the ω axis, which boost the magnitude response near those frequencies. Although many ways exist to determine suitable component values, a simple method is to assign R 1 a realistic value and then let R 2 = R 1 , C 1 = 2Q/ω0 R 1 and C 2 = 1/2Qω0 R 2 . Butter-worth poles are a distance ωc from the origin, so ω0 = ωc . For our 10th-order Butterworth filter, the angles ψ are regularly spaced at 9, 27, 45, 63, and 81 degrees. MATLAB program MS4P2 automates the task of computing component values and magnitude responses for each stage. % MS4P2.m : MATLAB Session 4, Program 2 % Script M-file computes Sallen---Key component values and magnitude % responses for each of the five cascaded second-order filter sections. omega_0 = 3000*2*pi; % Filter cut---off frequency psi = [9 27 45 63 81]*pi/180; % Butterworth pole angles f = linspace(0, 6000, 200); % Frequency range for magnitude response calculations Hmag_SK = zeros(5,200); % Pre-allocate array for magnitude responses for stage = 1:5, Q = 1/(2* cos(psi(stage))); % Compute Q for current stage % Compute and display filter components to the screen: disp([ 'Stage ',num2str(stage),... ' (Q = ',num2str(Q),... '): R1 = R2 = ',num2str(56000),... ', C1 = ' ,num2str (2*Q/(omega_0*56000) ), ... ', C2 = ' ,num2str (1/(2*Q*omega_0*56000) ) ] ) ; B = omega_0^2; A = [1 omega_0/Q omega_0^2] ; % Compute filter coefficients Hmag_SK(stage,:) = abs(MS4P1(B, A, 2*pi*f)); % Compute magnitude response end plot (f, Hmag_SK, 'k ', f, prod (Hmag_SK), 'k: ') xlabel ( 'f [Hz] '); ylabel ( 'Magnitude Response ') The disp command displays a character string to the screen. Character strings must be enclosed in single quotation marks. The num2str command converts numbers to character strings and facilitates the formatted display of information. The prod command multiplies along the columns of a matrix; it computes the total magnitude response as the product of the magnitude responses of the five stages. Executing the >> MS4P2 Stage 1 (Q Stage 2 (Q Stage 3 (Q Stage 4 (Q Stage 5 (Q

program produces the following output: = = = = =

0.50623): R1 = R2 = 56000, C1 = 9.5916e-010, C2 = 9.3569e-010 0.56116): R1 = R2 = 56000, C1 = 1.0632e-009, C2 = 8.441e-010 0.70711): R1 = R2 = 56000, C1 = 1.3398e-009, C2 = 6.6988e-010 1.1013): R1 = R2 = 56000, C1 = 2.0867e-009, C2 = 4.3009e-010 3.1962): R1 = R2 = 56000, C1 = 6.0559e-009, C2 = 1.482e-010

Since all the component values are practical, this filter is possible to implement. Figure M4.7 displays the magnitude responses for all five stages (solid lines). The total response (dotted line) confirms a 10th-order Butterworth response. Stage 5, which has the largest Q and implements the pair of conjugate poles nearest the ω axis, is the most peaked response. Stage 1, which has the smallest Q and implements the pair of conjugate poles furthest from the ω axis, is the least peaked response. In practice, it is best to order high-Q stages last; this reduces the risk of the high gains saturating the filter hardware.

Figure M4.7: Magnitude responses for Sallen-Key filter stages.

M4.6 Chebyshev Filters Like an order-N Butterworth lowpass filter (LPF), an order-N Chebyshev LPF is an all-pole filter that possesses many desirable characteristics. Compared with an equal-order Butterworth filter, the Chebyshev filter achieves better stopband attenuation and reduced transition band width by allowing an adjustable amount of ripple within the passband. The squared magnitude response of a Chebyshev filter is

where ∊ controls the passband ripple, C N(ω/ωc ) is a degree-N Chebyshev polynomial, and ωc is the radian cutoff frequency. Several characteristics of Chebyshev LPFs are noteworthy: An order-N Chebyshev LPF is equiripple in the passband (|ω| ≤ ωc ), has a total of N maxima and minima over (0 ≤ ω ≤ ωc ), and is monotonic decreasing in the stopband (|ω| > ωc ). In the passband, the maximum gain is 1 and the minimum gain is

. For oddvalued N, |H(j0)| = 1. For even-valued

. Ripple is controlled by setting , where R is the allowable passband ripple expressed in decibels. Reducing ∊ adversely affects filter performance (see Prob. 4.M-8). Unlike Butterworth filters, the cutoff frequency ωc rarely specifies the 3 dB point. For ∊ ≠ 1, |H(jωc )|2 = 1/(1 + ∊2 ) ≠ 0.5. The cutoff frequency ωc simply indicates the frequency after which

.

The Chebyshev polynomial C N(x) is defined as In this form, it is difficult to verify that C N(x) is a degree-N polynomial in x. A recursive form of C N(x) makes this fact more clear (see Prob. 4.M-11). With C 0 (x) = 1 and C 1 (x) = x, the recursive form shows that any C N is a linear combination of degree-N polynomials and is therefore a degree-N polynomial itself. For N ≥ 2, MATLAB program MS4P3 generates the (N + 1) coefficients of Chebyshev polynomial C N(x). function [C_N] = MS4P3 (N); % MS4P3 .m : MATLAB Session 4, Program 3 % Function M-file computes Chebyshev polynomial coefficients % using the recursion relation C_N(x) = 2xC_{N- 1} (x) - C_{N-2} (x) % INPUTS: N = degree of Chebyshev polynomial % OUTPUTS: C_N = vector of Chebyshev polynomial coefficients C_Nm2 = 1; C_Nm1 = [1 0]; % Initial polynomial coefficients: for t = 2:N; C_N =2*conv([1 0], C_Nm1) - [zeros (1, length (C_Nm1) - length(C_Nm2) + 1), C_Nm2]; C_Nm2 = C_Nm1; C_Nm1 = C_N; end As examples, consider C 2 (x) = 2xC1 (x) − C 0 (x) = 2x(x) − 1 = 2x 2 − 1 and C 3 (x) = 2xC2 (x) − C 1 (x) = 2x(2x 2 − 1) − x = 4x 3 = 3x. MS4P3 easily confirms these cases. >> MS4P3 (2) ans = 2 0 -1 >> MS4P3(3) ans = 4 0 -3 0

Since C N(ω/ωc ) is a degree-N polynomial, |H(jω)|2 is an all-pole rational function with 2N finite poles. Similar to the Butterworth case, the N poles

specifying a causal and stable Chebyshev filter can be found by selecting the N left-half plane roots of 1 + ∊2 C 2 N[s/(jωc )].

Root locations and dc gain are sufficient to specify a Chebyshev filter for a given N and ∊. To demonstrate, consider the design of an order-8 Chebyshev filter with cutoff frequency fc = 1 kHz and allowable passband ripple R = 1 dB. First, filter parameters are specified. >> omega_c = 2*pi*1000; R = 1; N = 8; >> epsilon = sqrt (10^(R/10)-1); The coefficients of C N (s/(jωc )) are obtained with the help of MS4P3, and then the coefficients of (1 + ∊2 C 2 N(s/(jωc )) are computed by using convolution to perform polynomial multiplication. >> CN = MS4P3 (N).* ((1/(j*omega_c)).^ [N:-1:0]); >> CP = epsilon^2*conv(CN, CN); CP(end) = CP (end) +1; Next, the polynomial roots are found, and the left-half-plane poles are retained and plotted. >> poles = roots(CP); i = find (real (poles) < 0); C_poles = poles(i); >> plot(real (C_poles),imag(C_poles), 'kx '); axis equal; >> axis(omega_c* [-1.1 1.1 -1.1 1.1]); >> xlabel ( ' \sigma '); ylabel ( '\omega '); As shown in Fig. M4.8, the roots of a Chebyshev filter lie on an ellipse[†] (see Prob. 4.M-12).

Figure M4.8: Pole-zero plot for an order-8 Chebyshev LPF with fc = 1 kHz and r = 1 dB. To compute the filter's magnitude response, the poles are expanded into a polynomial, the dc gain is set based on the even value of N, and MS4P1 is used. >> A = poly (C_poles); >> B = A (end)/sqrt (1+epsilon^2) ; >> omega = linspace(0,2*pi*2000,2001); >> H = MS4P1 (B, A, omega); >> plot (omega/2/pi,abs(H), 'k '); grid >> xlabel ( 'f [Hz] '); ylabel ( '|H (j2\pi f)| '); >> axis([0 2000 0 1.1]); As seen in Fig. M4.9, the magnitude response exhibits correct Chebyshev filter characteristics: passband ripples are equal in height and never exceed R = 1 dB; there are a total of N = 8 maxima and minima in the passband; and the gain rapidly and monotonically decreases after the cutoff frequency of fc = 1 kHz.

Figure M4.9: Magnitude responses for an order-8 Chebyshev LPF with fc = 1 kHz and r = 1 dB. For higher-order filters, polynomial rooting may not provide reliable results. Fortunately, Chebyshev roots can also be determined analytically. For

the Chebyshev poles are Continuing the same example, the poles are recomputed and again plotted. The result is identical to Fig. M4.8. >> k = [1:N]; xi = 1/N*asinh(1/epsilon); phi = (k*2-1)/(2*N)*pi; >> C_poles = omega_c*(-sinh(xi)*sin(phi)+j*cosh(xi)*cos(phi)); >> plot(real(C_poles),imag(C_poles), 'kx '); axis equal; >> axis(omega_c*[-1.1 1.1 -1.1 1.1]); >> xlabel( '\sigma '); ylabel( '\omega '); As in the case of high-order Butterworth filters, a cascade of second-order filter sections facilitates practical implementation of Chebyshev filters. Problems 4.M-3 and 4.M-6 use second-order Sallen-Key circuit stages to investigate such implementations. [†] A more general version of the Sallen-Key circuit has a resistor R from the negative terminal to ground and a resistor R between the negative a b

terminal and the output. In Fig. M4.6, R a = ∞ and R b = 0.

[†] E. A. Guillemin demonstrates a wonderful relationship between the Chebyshev ellipse and the Butterworth circle in his book, Synthesis of Passive Networks (Wiley, New York, 1957).

PROBLEMS 4.1.1

By direct integration [Eq. (4.1)] find the Laplace transforms and the region of convergence of the following functions: a. u(t) − u(t − 1) b. te−t u(t) c. t cos ω0 t u(t) d. (e 2t − 2e −t )u(t) e. cos ω1 t cos ω2 t u(t) f. cosh (at)u(t) g. sinh (at)u(t)

4.1.2

h. e −2t cos (5t + θ)u(t) By direct integration find the Laplace transforms of the signals shown in Fig. P4.1-2.

Figure P4.1-2

4.1.3

Find the inverse (unilateral) Laplace transforms of the following functions: a.

b.

c.

d.

e.

f.

g.

h.

i.

4.2.1

Find the Laplace transforms of the following functions using only Table 4.1 and the time-shifting property (if needed) of the unilateral Laplace transform: a. u(t) − u(t − 1) b. e −(t− τ)u(t − τ) c. e −(t− τ)u(t) d. e −t u(t − τ) e. te−t u(t − τ) f. sin [ω0 (t − τ)] u(t − τ) g. sin [ω0 (t − τ)] u(t)

4.2.2

4.2.3

h. sin ω0 t u(t − τ) Using only Table 4.1 and the time-shifting property, determine the Laplace transform of the signals in Fig. P4.1-2. [Hint: See Section 1.4 for discussion of expressing such signals analytically.] Find the inverse Laplace transforms of the following functions: a.

b.

c.

d.

4.2.4

The Laplace transform of a causal periodic signal can be determined from the knowledge of the Laplace transform of its first cycle (period). a. If the Laplace transform of x(t) in Fig. P4.2-4a is X (s), then show that G(s), the Laplace transform of g(t) (Fig. P4.2-4b), is

Figure P4.2-4

4.2.5

4.2.6

4.2.7

4.2.8

4.2.9

b. Use this result to find the Laplace transform of the signal p(t) illustrated in Fig. P4.2-4c. Starting only with the fact that δ(t)

1, build pairs 2 through 10b in Table 4.1, using various properties of the Laplace transform.

a. Find the Laplace transform of the pulses in Fig. 4.2 in the text by using only the time-differentiation property, the time1. shifting property, and the fact that δ(t) b. In Example 4.7, the Laplace transform of x(t) is found by finding the Laplace transform of d 2 x/dt2 . Find the Laplace transform of x(t) in that example by finding the Laplace transform of dx/dt and using Table 4.1, if necessary. Determine the inverse unilateral Laplace transform of

Since 13 is such a lucky number, determine the inverse Laplace transform of X(s) = 1/(s+1) 13 given region of convergence σ > − 1. [Hint: What is the nth derivative of 1/(s + a)?] It is difficult to compute the Laplace transform X(s) of signal

by using direct integration. Instead, properties provide a simpler method. a. Use Laplace transform properties to express the Laplace transform of tx(t) in terms of the unknown quantity X(s). b. Use the definition to determine the Laplace transform of y(t) = tx(t). c. Solve for X(s) by using the two pieces from a and b. Simplify your answer. 4.3.1

Using the Laplace transform, solve the following differential equations: a. and x(t) = u(t) b.

and x(t) = e −1 u(t)

c.

4.3.2

4.3.3

and x(t) = 25u(t) Solve the differential equations in Prob. 4.3-1 using the Laplace transform. In each case determine the zero-input and zero-state components of the solution. Solve the following simultaneous differential equations using the Laplace transform, assuming all initial conditions to be zero and the

input x(t) = u(t): a. (D + 3)y 1 (t) − 2y 2 (t)=x(t) − 2y 1 (t) + (2D + 4)y2(t) = 0 b. (D + 2)y 1 (t) − (D + 1)y2(t) = 0 − (D + 1)y 1 (t) + (2D + 1)y2(t)= x(t)

4.3.4

Determine the transfer functions relating outputs y 1 (t) and y 2 (t) to the input x(t). For the circuit in Fig. P4.3-4, the switch is in open position for a long time before t = 0, when it is closed instantaneously. a. Write loop equations (in time domain) for t ≥ 0.

4.3.5

b. Solve for y 1 (t) and y 2 (t) by taking the Laplace transform of loop equations found in part (a). For each of the systems described by the following differential equations, find the system transfer function: a.

b.

c.

d.

4.3.6

Figure P4.3-4 For each of the systems specified by the following transfer functions, find the differential equation relating the output y(t) to the input x(t) assuming that the systems are controllable and observable: a.

b.

c.

4.3.7

For a system with transfer function

a. Find the (zero-state) response for input x(t) of (i) 10u(t) and (ii) u(t − 5).

4.3.8

b. For this system write the differential equation relating the output y(t) to the input x(t) assuming that the systems are controllable and observable. For a system with transfer function

a. Find the (zero-state) response if the input x(t) = (1 −e −1 )u(t)

4.3.9

b. For this system write the differential equation relating the output y(t) to the input x(t) assuming that the systems are controllable and observable. For a system with transfer function

a. Find the (zero-state) response for the following values of input x(t): i. e −3t u(t) ii. e −4t u(t) iii. e −4(t−5)u(t − 5) iv. e −4(t−5)u(t) v. e −4t u(t − 5)

4.3.10

4.3.11

b. For this system write the differential equation relating the output y(t) to the input x(t) assuming that the systems are controllable and observable. An LTI system has a step response given by s(t) = e −1 u(t) − e −2 u(t). Determine the output of this system y(t) given an input x(t) = δ(t−π)−cos (√3)u(t). For an LTIC system with zero initial conditions (system initially in zero state), if an input x(t) produces an output y(t), then using the Laplace transform show the following. a. The input dx/dt produces an output dy/dt. b. The input ∫ t 0 x(τ) dτ produces an output ∫ t 0 y(τ) dτ. Hence, show that the unit step response of a system is an

4.3.12

integral of the impulse response; that is, ∫ t 0 h(τ) dτ.

a. Discuss asymptotic and BIBO stabilities for the systems described by the following transfer functions assuming that the systems are controllable and observable: i.

ii.

iii.

iv.

v.

b. Repeat part (a) for systems described by the following differential equations. Systems may be uncontrollable and/or unobservable. i. (D 2 + 3D + 2)y(t) = (D + 3)x(t) ii. (D 2 + 3D + 2)y(t) = (D + 1)x(t) iii. (D 2 + D − 2)y(t) = (D − 1)x(t) iv. (D 2 − 3D + 2)y(t) = (D − 3)x(t)

4.4.1

4.4.2

4.4.3

Find the zero-state response y(t) of the network in Fig. P4.4-1 if the input voltage x(t) = te−t u(t). Find the transfer function relating the output y(t) to the input x(t). From the transfer function, write the differential equation relating y(t) to x(t).

Figure P4.4-1 The switch in the circuit of Fig. P4.4-2 is closed for a long time and then opened instantaneously at t = 0. Find and sketch the current y(t).

Figure P4.4-2 Find the current y(t) for the parallel resonant circuit in Fig. P4.4-3 if the input is a. x(t) = A cos ω0 t u(t) b. x(t) = A sin ω0 t u(t) Assume all initial conditions to be zero and, in both cases, ω2 0 = 1/LC.

4.4.4

4.4.5

Figure P4.4-3 Find the loop currents y 1 (t) and y 2 (t) for t≥ 0 in the circuit of Fig. P4.4-4a for the input x(t) in Fig. P4.4-4b.

Figure P4.4-4 For the network in Fig. P4.4-5 the switch is in a closed position for a long time before t = 0, when it is opened instantaneously. Find y 1 (t) and v s (t) for t ≥ 0.

4.4.6

4.4.7

4.4.8

4.4.9

Figure P4.4-5 Find the output voltage v 0 (t) for t ≥ 0 for the circuit in Fig. P4.4-6, if the input x(t) = 100u(t). The system is in the zero state initially.

Figure P4.4-6 Find the output voltage y(t) for the network in Fig. P4.4-7 for the initial conditions iL (0) = 1 A and v c (0) = 3 V.

Figure P4.4-7 For the network in Fig. P4.4-8, the switch is in position a for a long time and then is moved to position b instantaneously at t = 0. Determine the current y(t) for t > 0.

Figure P4.4-8 Show that the transfer function that relates the output voltage y(t) to the input voltage x(t) for the op-amp circuit in Fig. P4.4-9a is given by

and that the transfer function for the circuit in Fig. P4.4-9b is given by

4.4.10

Figure P4.4-9 For the second-order op-amp circuit in Fig. P4.4-10, show that the transfer function H(s) relating the output voltage y(t) to the input

voltage x(t) is given by

4.4.11

Figure P4.4-10 a. Using the initial and final value theorems, find the initial and final value of the zero-state response of a system with the transfer function

and the input (i) u(t) and (ii) e −t u(t). b. Find y(0 + ) and y(∞) if Y(s) is given by i.

ii.

4.5.1

Figure P4.5-1a shows two resistive ladder segments. The transfer function of each segment (ratio of output to input voltage) is 1/2. Figure P4.5-1b shows these two segments connected in cascade. a. Is the transfer function (ratio of output to input voltage) of this cascaded network (1/2)(1/2) = 1/4? b. If your answer is affirmative, verify the answer by direct computation of the transfer function. Does this computation confirm the earlier value 1/4? If not, why? c. Repeat the problem with R 3 = R 4 = 20 kΩ. Does this result suggest the answer to the problem in part (b)?

4.5.2

Figure P4.5-1 In communication channels, transmitted signal is propagated simultaneously by several paths of varying lengths. This causes the signal to reach the destination with varying time delays and varying gains. Such a system generally distorts the received signal. For error-free communication, it is necessary to undo this distortion as much as possible by using the system that is inverse of the channel model. For simplicity, let us assume that a signal is propagated by two paths whose time delays differ by τ seconds. The channel over the intended path has a delay of T seconds and unity gain. The signal over the unintended path has a delay of T + τ seconds and gain a. Such a channel can be modeled, as shown in Fig. P4.5-2. Find the inverse system transfer function to correct the delay distortion and show that the inverse system can be realized by a feedback system. The inverse system should be causal to be realizable. [Hint: We want to correct only the distortion caused by the relative delay τ seconds. For distortionless transmission, the signal may be delayed. What is important is to maintain the shape of x(t). Thus a received signal of the form c x(t − T) is considered to be distortionless.]

Figure P4.5-2

4.5.3

Discuss BIBO stability of the feedback systems depicted in Fig. P4.5-3. For the case in Fig. P4.5-3b, consider three cases: i. K = 10 ii. K = 50 iii. K = 48

Figure P4.5-3 4.6.1

Realize

by canonic direct, series, and parallel forms.

4.6.2

Realize the transfer function in Prob. 4.6-1 by using the transposed form of the realizations found in Prob. 4.6-1.

4.6.3

Repeat Prob. 4.6-1 for

a.

b.

4.6.4

Realize the transfer functions in Prob. 4.6-3 by using the transposed form of the realizations found in Prob. 4.6-3.

4.6.5

Repeat Prob. 4.6-1 for

4.6.6

Realize the transfer function in Prob. 4.6-5 by using the transposed form of the realizations found in Prob. 4.6-5.

4.6.7

Repeat Prob. 4.6-1 for

4.6.8

Realize the transfer function in Prob. 4.6-7 by using the transposed form of the realizations found in Prob. 4.6-7.

4.6.9

Repeat Prob. 4.6-1 for

4.6.10

Realize the transfer function in Prob. 4.6-9 by using the transposed form of the realizations found in Prob. 4.6-9.

4.6.11

Repeat Prob. 4.6-1 for

4.6.12

Realize the transfer function in Prob. 4.6-11 by using the transposed form of the realizations found in Prob. 4.6-11.

4.6.13

In this problem we show how a pair of complex conjugate poles may be realized by using a cascade of two first-order transfer functions and feedback. Show that the transfer functions of the block diagrams in Fig. P4.6-13a and P4.6-13b are

a.

b.

Hence, show that the transfer function of the block diagram in Fig. P4.6-13c is c.

4.6.14

Figure P4.6-13 Show op-amp realizations of the following transfer functions: i.

ii.

iii.

4.6.15

4.6.16

4.6.17

4.7.1

Show two different op-amp circuit realizations of the transfer function

Show an op-amp canonic direct realization of the transfer function

Show an op-amp canonic direct realization of the transfer function

Feedback can be used to increase (or decrease) the system bandwidth. Consider the system in Fig. P4.7-1a with transfer function G(s) = ωc /(s + ωc ). a. Show that the 3 dB bandwidth of this system is ωc and the dc gain is unity, that is, |H(j0)| = 1. b. To increase the bandwidth of this system, we use negative feedback with H(s) = 9, as depicted in Fig. P4.7-1b. Show that the 3 dB bandwidth of this system is 10ωc . What is the dc gain? c. To decrease the bandwidth of this system, we use positive feedback with H(s) = −0.9, as illustrated in Fig. P4.7-1c. Show that the 3 dB bandwidth of this system is ωc /10. What is the dc gain? d. The system gain at dc times its 3 dB bandwidth is the gain-bandwidth product of a system. Show that this product is the same for all the three systems in Fig. P4.7-1. This result shows that if we increase the bandwidth, the gain decreases and vice versa.

Figure P4.7-1 4.8.1

For an LTIC system described by the transfer function

find the response to the following everlasting sinusoidal inputs: a. 5 cos (2t + 30°) b. 10 sin (2t + 45°) c. 10 cos (3t + 40°)

4.8.2

Observe that these are everlasting sinusoids. For an LTIC system described by the transfer function

find the steady-state system response to the following inputs: a. 10u(t) b. cos (2t + 60°)u(t) c. sin (3t − 45°)u(t)

4.8.3

d. e j 3 t u(t) For an allpass filter specified by the transfer function

find the system response to the following (everlasting) inputs: a. e jωt b. cos (ωt + θ) c. cos t d. sin 2t e. cos 10t f. cos 100t

4.8.4

Comment on the filter response. The pole-zero plot of a second-order system H(s) is shown in Fig. P4.8-4. The dc response of this system is minus one, H(j0) = −1. a. Letting H(s) = k(s 2 + b 1 s + b 2 )/(s 2 + a 1 s + a 2 ), determine the constants k, b 1 , b 2 , a 1 , and a 2 . b. What is the output y(t) of this system in response to the input x(t) = 4 + cos (t/2 + π/3)?

Figure P4.8-4: System pole-zero plot. 4.9.1

Sketch Bode plots for the following transfer functions: a.

b.

c.

4.9.2

Repeat Prob. 4.9-1 for a.

b.

c.

4.9.3

4.9.4

Using the lowest order possible, determine a system function H(s) with real-valued roots that matches the frequency response in Fig. P4.9-3 Verify your answer with MATLAB.

Figure P4.9-3: Bode plot and frequency response for H(s). A graduate student recently implemented an analog phase lock loop (PLL) as part of his thesis. His PLL consists of four basic components: a phase/frequency detector, a charge pump, a loop filter, and a voltage-controlled oscillator. This problem considers only the loop filter, which is shown in Fig. P4.9-4a. The loop filter input is the current x(t), and the output is the voltage y(t). a. Derive the loop filter 's transfer function H(s). Express H(s) in standard form. b. Figure P4.9-4b provides four possible frequency response plots, labeled A through D. Each log-log plot is drawn to the same scale, and line slopes are either 20 dB/decade, 0 dB/decade, or −20 dB/decade. Clearly identify which plot(s), if

any, could represent the loop filter. c. Holding the other components constant, what is the general effect of increasing the resistance R on the magnitude response for low-frequency inputs? d. Holding the other components constant, what is the general effect of increasing the resistance R on the magnitude response for high-frequency inputs?

Figure P4.9-4: (a) Circuit diagram for PLL loop filter. (b) Possible magnitude response plots for PLL loop filter. 4.10.1

4.10.2

Using the graphical method of Section 4.10-1, draw a rough sketch of the amplitude and phase response of an LTIC system described by the transfer function

What kind of filter is this? Using the graphical method of Section 4.10-1, draw a rough sketch of the amplitude and phase response of LTIC systems whose polezero plots are shown in Fig. P4.10-2.

4.10.3

4.10.4

4.10.5

4.10.6

Figure P4.10-2 Design a second-order bandpass filter with center frequency ω = 10. The gain should be zero at ω = 0 and at ω = ∞. Select poles at −a ± j10. Leave your answer in terms of a. Explain the influence of a on the frequency response. The LTIC system described by H(s) = (s − 1)/(s + 1) has unity magnitude response |H(jω)| = 1. Positive Pat claims that the output y(t) of this system is equal the input x(t) since the system is allpass. Cynical Cynthia doesn 't think so. "This is signals and systems class," she complains. "It has to be more complicated!" Who is correct, Pat or Cynthia? Justify your answer. Two students, Amy and Jeff, disagree about an analog system function given by H 1 (s) = s. Sensible Jeff claims the system has a zero at s = 0. Rebellious Amy, however, notes that the system function can be rewritten as H 1 (s) = 1/s −1 and claims that this implies a system pole at s = ∞. Who is correct? Why? What are the poles and zeros of the system H 2 (s) = 1/s? A rational transfer function H(s) is often used to represent an analog filter. Why must H(s) be strictly proper for lowpass and bandpass filters? Why must H(s) be proper for highpass and bandstop filters?

4.10.7

For a given filter order N, why is the stopband attenuation rate of an all-pole lowpass filter better than filters with finite zeros?

4.10.8

Is it possible, with real coefficients (

4.10.9

4.10.10

), for a system

to function as a lowpass filter? Explain your answer. Nick recently built a simple second-order But-terworth lowpass filter for his home stereo. Although the system performs pretty well, Nick is an overachiever and hopes to improve the system performance. Unfortunately, Nick is pretty lazy and doesn 't want to design another filter. Thinking "twice the filtering gives twice the performance," he suggests filtering the audio signal not once but twice with a cascade of two identical filters. His overworked, underpaid signals professor is skeptical and states, "If you are using identical filters, it makes no difference whether you filter once or twice!" Who is correct? Why? An LTIC system impulse response is given by h(t) = u(t)-u(t − 1). a. Determine the transfer function H(s). Using H(s), determine and plot the magnitude response |H(jω)|. Which type of filter most accurately describes the behavior of this system: lowpass, highpass, bandpass, or bandstop? b. What are the poles and zeros of H(s)? Explain your answer.

4.10.11

4.10.12

c. Can you determine the impulse response of the inverse system? If so, provide it. If not, suggest a method that could be used to approximate the impulse response of the inverse system. An ideal lowpass filter H LP (s) has magnitude response that is unity for low frequencies and zero for high frequencies. An ideal highpass filter H HP (s) has an opposite magnitude response: zero for low frequencies and unity for high frequencies. A student suggests a possible lowpass-to-highpass filter transformation: H HP (s) = 1 − H LP (s). In general, will this transformation work? Explain your answer. An LTIC system has a rational transfer function H(s). When appropriate, assume that all initial conditions are zero. a. Is is possible for this system to output y(t) = sin (100πt) u(t) in response to an input x(t) = cos (100πt)u(t)? Explain. b. Is is possible for this system to output y(t) = sin (100πt)u(t) in response to an input x(t) = sin (50πt)u(t)? Explain. c. Is is possible for this system to output y(t) = sin (100πt) in response to an input x(t) = cos (100πt)? Explain. d. Is is possible for this system to output y(t) = sin (100πt) in response to an input x(t) = sin (50πt)? Explain.

4.11.1

Find the ROC, if it exists, of the (bilateral) Laplace transform of the following signals: a. etu(t) b. e−tu(t) c.

d.

4.11.2

e. e −kt

2

Find the (bilateral) Laplace transform and the corresponding region of convergence for the following signals: a. e −|t|

b. e −|t| cos t c. e tu(t) + e 2t u(−t) d. e− tu(t) e. e− tu(−t)

4.11.3

f. cos ω0 t u(t) + e t u(−t) Find the inverse (bilateral) Laplace transforms of the following functions:

a.

b.

c.

d.

e.

4.11.4

Find

if the ROC is a. Re s > 1 b. Re s < −2 c. −1 < Re s < 1

4.11.5

d. −2 < Re s < −1 For a causal LTIC system having a transfer function H(s) = 1/(s + 1), find the output y(t) if the input x(t) is given by a. e −|t|/2 b. e t u(t) + e 2t u(−t) c. e −t/2 u(t) + e −t/4 u(−t) d. e 2t u(t) + e t u(−t) e. e −t/4 u(t) + e −t/2 u(−t)

4.11.6

4.11.7

4.11.8

f. e −3t u(t) + e −2t u(−t) The autocorrelation function r xx(t) of a signal x(t) is given by

Derive an expression for

in terms of X(s), where

.

Determine the inverse Laplace transform of

given that the region of convergence is σ < 0. An absolutely integrable signal x(t) has a pole at s = π. It is possible that other poles may be present. Recall that an absolutely integrable signal satisfies

a. Can x(t) be left sided? Explain. b. Can x(t) be right sided? Explain. c. Can x(t) be two sided? Explain.

4.11.9

d. Can x(t) be of finite duration? Explain. Using the definition, compute the bilateral Laplace transform, including the region of convergence (ROC), of the following complexvalued functions: a. x 1 (t) = (j + e jt )u(t) b. x 2 (t) = j cosh (t)u(−1) c.

4.11.10

d. x 4 (t) = jt u(−t) + δ(t − π) A bounded-amplitude signal x(t) has bilateral Laplace transform X(s) given by

a. Determine the corresponding region of convergence. b. Determine the time-domain signal x(t). 4.m.1

4.m.2

Express the polynomial C 20 (x) in standard form. That is, determine the coefficients a k of C 20 (x) = ∑ 20 k=0 a k x 20−k . Design an order-12 Butterworth lowpass filter with a cutoff frequency of ωc = 2π5000 by completing the following. a. Locate and plot the filter 's poles and zeros in the complex plane. Plot the corresponding magnitude response |H LP (jω)| to verify proper design. b. Setting all resistor values to 100,000, determine the capacitor values to implement the filter using a cascade of six secondorder Sallen-Key circuit sections. The form of a Sallen-Key stage is shown in Fig. P4.M-2. On a single plot, plot the magnitude response of each section as well as the overall magnitude response. Identify the poles that correspond to each section 's magnitude response curve. Are the capacitor values realistic?

Figure P4.M-2: Sallen-Key filter stage. c. Rather than a Butterworth filter, repeat Prob. P4.M-2 for a Chebyshev LPF with R = 3 dB of passband ripple. Since each Sallen-Key stage is constrained to have unity gain at dc, an overall gain error of 1/√1 + ∊2 is acceptable.

d. An analog lowpass filter with cutoff frequency ωc can be transformed into a highpass filter with cutoff frequency ωc by using an RCCR transformation rule: each resistor R i is replaced by a capacitor C ' i = 1/R i ωc and each capacitor C i ′ = 1/R i ωc and each capacitor C i is replaced by a resistor R i ′ = 1/C i ωc . Use this rule to design an order-8 Butterworth highpass filter with ωc = 2π4000 by completing the following. a. Design an order-8 Butterworth lowpass filter with ωc = 2π4000 by using four second-order Sallen-Key circuit stages, the form of which is shown in Fig. P4.M-2. Give resistor and capacitor values for each stage. Choose the resistors so that the RC-CR transformation will result in 1 nF capacitors. At this point, are the component values realistic? b. Draw an RC-CR transformed Sallen-Key circuit stage. Determine the transfer function H(s) of the transformed stage in terms of the variables R′ 1 , R′ 2 , C′ 1 , and C′ 2 . c. Transform the LPF designed in part a by using an RC-CR transformation. Give the resistor and capacitor values for each stage. Are the component values realistic?

Using H(s) derived in part b, plot the magnitude response of each section as well as the overall magnitude response. Does the overall response look like a highpass Butterworth filter? Plot the HPF system poles and zeros in the complex s plane. How do these locations compare with those of the Butterworth LPF? e. Repeat Prob. P4.M-4, using ωc = 2π1500 and an order-16 filter. That is, eight second-order stages need to be designed. f. Rather than a Butterworth filter, repeat Prob. P4.M-4 for a Chebyshev LPF with R = 3 dB of passband ripple. Since each transformed Sallen-Key stage is constrained to have unity gain at ω = ∞, an overall gain error of acceptable.

is

g. The MATLAB signal processing toolbox function butter helps design analog Butter-worth filters. Use MATLAB help to learn how butter works. For each of the following cases, design the filter, plot the filter's poles and zeros in the complex s plane, and plot the decibel magnitude response 20 log 10 |H(jω)|. a. Design a sixth-order analog lowpass filter with ωc = 2π3500. b. Design a sixth-order analog highpass filter with ωc = 2π3500. c. Design a sixth-order analog bandpass filter with a passband between 2 and 4 kHz. d. Design a sixth-order analog bandstop filter with a stopband between 2 and 4 kHz. h. The MATLAB signal processing toolbox function cheby1 helps design analog Chebyshev type I filters. A Chebyshev type I filter has a passband ripple and a smooth stopband. Setting the passband ripple to R p = 3 dB, repeat Prob. P4.M7 using the cheby1 command. With all other parameters held constant, what is the general effect of reducing R p , the allowable passband ripple? i. The MATLAB signal processing toolbox function cheby2 helps design analog Chebyshev type II filters. A Chebyshev type II filter has a smooth passband and ripple in the stopband. Setting the stopband ripple R s = 20 dB down, repeat Prob. P4.M-7 using the cheby2 command. With all other parameters held constant, what is the general effect of increasing R s , the minimum stopband attenuation? j. The MATLAB signal processing toolbox function ellip helps design analog elliptic filters. An elliptic filter has ripple in both the passband and the stopband. Setting the passband ripple to R p = 3 dB and the stopband ripple R s = 20 dB down, repeat Prob. P4.M-7 using the ellip command. k. Using the definition C N(x) = cosh(N cosh −1 (x)), prove the recursive relation C N(x) = 2xCN−1 (x) − C N−2 (x). l. Prove that the poles of a Chebyshev filter, which are located at p k = ωc sinh (ξ) sin (φ k ) + jωc cosh(ξ) cos(φ k ), lie on an ellipse. [Hint: The equation of an ellipse in the x−y plane is (x/a)2 + (y/b) 2 = 1, where constants a and b define the major and minor axes of the ellipse.]

Chapter 5: Discrete-Time System Analysis Using the z-Transform OVERVIEW The counterpart of the Laplace transform for discrete-time systems is the z-transform. The Laplace transform converts integrodifferential equations into algebraic equations. In the same way, the z-transforms changes difference equations into algebraic equations, thereby simplifying the analysis of discrete-time systems. The z-transform method of analysis of discrete-time systems parallels the Laplace transform method of analysis of continuous-time systems, with some minor differences. In fact, we shall see that the ztransform is the Laplace transform in disguise. The behavior of discrete-time systems is similar to that of continuous-time systems (with some differences). The frequency-domain analysis of discrete-time systems is based on the fact (proved in Section 3.8-3) that the response of a linear, time-invariant, discrete-

time (LTID) system to an everlasting exponential z n is the same exponential (within a multiplicative constant) given by H [z]z n . We then

express an input x [n] as a sum of (everlasting) exponentials of the form z n . The system response to x [n] is then found as a sum of the system's responses to all these exponential components. The tool that allows us to represent an arbitrary input x [n] as a sum of

(everlasting) exponentials of the form z n is the z-transform.

5.1 THE z-TRANSFORM We define X[z], the direct z-transform of x[n], as

where z is a complex variable. The signal x [n], which is the inverse z-transform of X [z], can be obtained from X[z] by using the following inverse z-transformation:

The symbol ∮ indicates an integration in counterclockwise direction around a closed path in the complex plane (see Fig. 5.1). We derive this z-transform pair later, in Chapter 9, as an extension of the discrete-time Fourier transform pair.

Figure 5.1: γ n u[n] and the region of convergence of its z-transform. As in the case of the Laplace transform, we need not worry about this integral at this point because inverse z-transforms of many signals of engineering interest can be found in a z-transform table. The direct and inverse z-transforms can be expressed symbolically as or simply as Note that LINEARITY OF THE z-TRANSFORM Like the Laplace transform, the z-transform is a linear operator. If then

The proof is trivial and follows from the definition of the z-transform. This result can be extended to finite sums. THE UNILATERAL z-TRANSFORM For the same reasons discussed in Chapter 4, we find it convenient to consider the unilateral z-transform. As seen for the Laplace case, the bilateral transform has some complications because of nonuniqueness of the inverse transform. In contrast, the unilateral transform has a unique inverse. This fact simplifies the analysis problem considerably, but at a price: the unilateral version can handle only causal signals and systems. Fortunately, most of the practical cases are causal. The more general bilateral z-transform is discussed later, in Section 5.9. In practice, the term z-transform generally means the unilateral z-transform. In a basic sense, there is no difference between the unilateral and the bilateral z-transform. The unilateral transform is the bilateral transform that deals with a subclass of signals starting at n = 0 (causal signals). Hence, the definition of the unilateral transform is the same as that of the bilateral [Eq. (5.1)], except that the limits of the sum are from 0 to ∞

The expression for the inverse z-transform in Eq. (5.2) remains valid for the unilateral case also. THE REGION OF CONVERGENCE (ROC) OF X[z] The sum in Eq. (5.1) [or (5.4)] defining the direct z-transform X [z] may not converge (exist) for all values of z. The values of z (the region in the complex plane) for which the sum in Eq. (5.1) converges (or exists) is called the region of existence, or more commonly the region of convergence (ROC), for X[z]. This concept will become clear in the following example. EXAMPLE 5.1 Find the z-transform and the corresponding ROC for the signal γ n u[n]. By definition

Since u[n] = 1 for all n ≥ 0,

It is helpful to remember the following well-known geometric progression and its sum:

Use of Eq. (5.6) in Eq. (5.5) yields

Observe that X [z] exists only for |z| > |γ|. For |z| < |γ|, the sum in Eq. (5.5) may not converge; it goes to infinity. Therefore, the ROC of X [z] is the shaded region outside the circle of radius |γ|, centered at the origin, in the z-plane, as depicted in Fig. 5.1b. Later in Eq. (5.85), we show that the z-transform of another signal −γ n u[−(n + 1)] is also z/(z − γ). However, the ROC in this case is |z| < |γ|. Clearly, the inverse z-transform of z/(z − γ) is not unique. However, if we restrict the inverse transform to be causal, then the inverse transform is unique, namely, γ n u [n].

The ROC is required for evaluating x [n] from X[z], according to Eq. (5.2). The integral in Eq. (5.2) is a contour integral, implying integration in a counterclockwise direction along a closed path centered at the origin and satisfying the condition |z| > |γ|. Thus, any circular path centered at the origin and with a radius greater than |γ| (Fig. 5.1b) will suffice. We can show that the integral in Eq. (5.2)

along any such path (with a radius greater than |γ|) yields the same result, namely x[n]. [†] Such integration in the complex plane requires a background in the theory of functions of complex variables. We can avoid this integration by compiling a table of z-transforms (Table 5.1), where z-transform pairs are tabulated for a variety of signals. To find the inverse z-transform of say, z/(z − γ), instead of

using the complex integration in Eq. (5.2), we consult the table and find the inverse z-transform of z/(z − γ) as γ n u[n]. Because of uniqueness property of the unilateral z-transform, there is only one inverse for each X[z]. Although the table given here is rather short, it comprises the functions of most practical interest. Table 5.1: (Unilateral) z-Transform Pairs Open table as spreadsheet No.

X[n]

X[z]

1

delta[n−n]

z −k

2

u[n]

3

nu[n]

4

n 2 u[n]

5

n 3 u[n]

6

y n u[n]

7

y n−1 u[n − 1]

8

nyn u[n]

9

n 2 y n u[n]

10

11a

|γ n | cosβn u[n]

11b

|γ| n sinβn u[n]

12a

r|γ| n cos(βn+ θ)u[n]

12b

r|γ| n cos(γn+ θ)u[n] γ=|γ|e jγ

12c

r|γ| n cos(γn+θ)u[n]

The situation of the z-transform regarding the uniqueness of the inverse transform is parallel to that of the Laplace transform. For the bilateral case, the inverse z-transform is not unique unless the ROC is specified. For the unilateral case, the inverse transform is

unique; the region of convergence need not be specified to determine the inverse z-transform. For this reason, we shall ignore the ROC in the unilateral z-transform Table 5.1. EXISTENCE OF THE z-TRANSFORM By definition

The existence of the z-transform is guaranteed if

for some |z|. Any signal x[n] that grows no faster than an exponential signal r n 0 , for some r 0 , satisfies this condition. Thus, if

then

Therefore, X[z] exists for |z| > r 0 . Almost all practical signals satisfy condition (5.8) and are therefore z-transformable. Some signal 2

models (e.g., γ n ) grow faster than the exponential signal r n 0 (for any r 0 ) and do not satisfy Eq. (5.8) and therefore are not ztransformable. Fortunately, such signals are of little practical or theoretical interest. Even such signals over a finite interval are ztransformable. EXAMPLE 5.2 Find the z-transforms of a. δ[n] b. u[n] c. cos βn u[n] d. The signal shown in Fig. 5.2

Figure 5.2 Recall that by definition

a. For x[n] = δ[n], x[0] = 1 and x[2] = x[3] = x[4] = ... = 0. Therefore

b. For x[n] = u[n], x[0] = x[1] = x[3] = ... = 1. Therefore

From Eq. (5.6) it follows that

Therefore

c. Recall that cos βn = (e jβn + e −jβn )/2. Moreover, according to Eq. (5.7),

Therefore

d. Here x[0] = x[1] = x[2] = x[3] = x[4] = 1 and x[5] = x[6] = ... = 0. Therefore, according to Eq. (5.9)

We can also express this result in a more compact form by summing the geometric progression on the right-hand side of the foregoing equation. From the result in Section B.7-4 with r = 1/z, m = 0, and n = 4, we obtain

EXERCISE E5.1 1. Find the z-transform of a signal shown in Fig. 5.3.

Figure 5.3

2. Use pair 12a (Table 5.1) to find the z-transform of x[n] = 20.65(√2) n cos ((π/4)n − 1.415)u[n]. Answers 1. 2.

5.1-1 Finding the Inverse Transform As in the Laplace transform, we shall avoid the integration in the complex plane required to find the inverse z-transform [Eq. (5.2)] by using the (unilateral) transform table (Table 5.1). Many of the transforms X[z] of practical interest are rational functions (ratio of polynomials in z), which can be expressed as a sum of partial fractions, whose inverse transforms can be readily found in a table of transform. The partial fraction method works because for every transformable x[n] defined for n ≥ 0, there is a corresponding unique X[z] defined for |z| > r 0 (where r 0 is some constant), and vice versa. EXAMPLE 5.3 Find the inverse z-transform of

a.

b.

c. a. Expanding X[z] into partial fractions yields

From Table 5.1, pair 7, we obtain

If we expand rational X[z] into partial fractions directly, we shall always obtain an answer that is multiplied by u[n − 1] because of the nature of pair 7 in Table 5.1. This form is rather awkward as well as inconvenient. We prefer the form that contains u[n] rather than u[n − 1]. A glance at Table 5.1 shows that the z-transform of every signal that is multiplied by u[n] has a factor z in the numerator. This observation suggests that we expand X[z] into modified partial fractions, where each term has a factor z in the numerator. This goal can be accomplished by expanding X[z]/z into partial fractions and then multiplying both sides by z. We shall demonstrate this procedure by reworking part (a). For this case

Multiplying both sides by z yields

From pairs 1 and 6 in Table 5.1, it follows that

The reader can verify that this answer is equivalent to that in Eq. (5.12a) by computing x[n] in both cases for n = 0, 1, 2, 3, ..., and comparing the results. The form in Eq. (5.12b) is more convenient than that in Eq. (5.12a). For this reason, we shall always expand X[z]/z rather than X[z] into partial fractions and then multiply both sides by z to obtain modified partial fractions of X[z], which have a factor z in the numerator.

b. and

where

Therefore

We can determine a 1 and a 2 by clearing fractions. Or we may use a shortcut. For example, to determine a 2 , we multiply both sides of Eq. (5.13) by z and let z → ∞. This yields This result leaves only one unknown, a 1 , which is readily determined by letting z take any convenient value, say z = 0, on both sides of Eq. (5.13). This step yields

which yields a 1 = −1. Therefore

and

Now the use of Table 5.1, pairs 6 and 10, yields

c. Complex Poles.

Poles of X[z] are 1,3 + j4, and 3 − j4. Whenever there are complex conjugate poles, the problem can be worked out in two ways. In the first method we expand X[z] into (modified) first-order partial fractions. In the second method, rather than obtain one factor corresponding to each complex conjugate pole, we obtain quadratic factors corresponding to each pair of complex conjugate poles. This procedure is explained next. METHOD OF FIRST-ORDER FACTORS

We find the partial fraction of X[z]/z using the Heaviside "cover-up" method:

and

The inverse transform of the first term on the right-hand side is 2u[n]. The inverse transform of the remaining two terms (complex conjugate poles) can be obtained from pair 12b (Table 5.1) by identifying r/2 = 1.6, θ = −2.246 rad, γ = 3 + j4 =

5e j0.927 , so that |γ| = 5, β = 0.927. Therefore METHOD OF QUADRATIC FACTORS

Multiplying both sides by z and letting z → ∞, we find and

To find B, we let z take any convenient value, say z = 0. This step yields

Therefore

and

We now use pair 12c, where we identify A = −2, B = 16, |γ| = 5, and a = −3. Therefore

and so that EXERCISE E5.2 Find the inverse z-transform of the following functions: 1. 2. 3. 4. [Hint: √0.8 = 2/√5.] Answers 1. 2. 3. 18δ[n] − [0.72(−2) n + 17.28(0.5) n − 14.4n(0.5)n ]u[n] 4.

INVERSE TRANSFORM BY EXPANSION OF X[z] IN POWER SERIES OF z −1 By definition

This result is a power series in z −1 . Therefore, if we can expand X[z] into the power series in z −1 , the coefficients of this power series

can be identified as x[0], x[1], x[2], x[3],.... A rational X[z] can be expanded into a power series of z −1 by dividing its numerator by the denominator. Consider, for example,

To obtain a series expansion in powers of z −1 , we divide the numerator by the denominator as follows:

Thus

Therefore Although this procedure yields x[n] directly, it does not provide a closed-form solution. For this reason, it is not very useful unless we want to know only the first few terms of the sequence x[n]. EXERCISE E5.3 Using long division to find the power series in z −1 , show that the inverse z-transform of z/(z − 0.5) is (0.5)n u[n] or (2)−n u[n].

RELATIONSHIP BETWEEN h[n] AND H[z] For an LTID system, if h[n] is its unit impulse response, then from Eq. (3.71b), where we defined H[z], the system transfer function, we write

For causal systems, the limits on the sum are from n = 0 to ∞. This equation shows that the transfer function H[z] is the z-transform of the impulse response h[n] of an LTID system; that is,

This important result relates the time-domain specification h[n] of a system to H[z], the frequency-domain specification of a system. The result is parallel to that for LTIC systems. EXERCISE E5.4

Redo Exercise E3.14 by taking the inverse z-transform of H[z], as given by Eq. (3.73). [†] Indeed, the path need not even be circular. It can have any odd shape, as long as it encloses the pole(s) of X[z] and the path of integration is counterclockwise.

5.2 SOME PROPERTIES OF THE z-TRANSFORM The z-transform properties are useful in the derivation of z-transforms of many functions and also in the solution of linear difference equations with constant coefficients. Here we consider a few important properties of the z-transform. In our discussion, the variable n appearing in signals, such as x[n] and y[n], may or may not stand for time. However, in most applications of our interest, n is proportional to time. For this reason, we shall loosely refer to the variable n as time. In the following discussion of the shift property, we deal with shifted signals x[n]u[n], x[n − k]u[n − k], x[n − k]u[n], and x[n + k]u[n]. Unless we physically understand the meaning of such shifts, our understanding of the shift property remains mechanical rather than intuitive or heuristic. For this reason using a hypothetical signal x[n], we have illustrated various shifted signals for k = 1 in Fig. 5.4.

Figure 5.4: A signal x[n] and its shifted versions. RIGHT SHIFT (DELAY) If then

In general,

Moreover,

Repeated application of this property yields

In general, for integer value of m

A look at Eqs. (5.15a) and (5.16a) shows that they are identical except for the extra term x[−1] in Eq. (5.16a). We see from Fig. 5.4c and 5.4d that x[n − 1]u[n] is the same as x[n − 1]u[n − 1] plus x[−1]δ[n]. Hence, the difference between their transforms is x[−1]. Proof. For integer value of m

Recall that x[n − m]u[n − m] = 0 for n < m, so that the limits on the summation on the right-hand side can be taken from n = m to ∞. Therefore

To prove Eq. (5.16c), we have

LEFT SHIFT (ADVANCE) If then

Repeated application of this property yields

and for integer value of m

Proof. By definition

EXAMPLE 5.4 Find the z-transform of the signal x[n] depicted in Fig. 5.5.

Figure 5.5 The signal x[n] can be expressed as a product of n and a gate pulse u[n] - u[n − 6]. Therefore

We cannot find the z-transform of nu[n − 6] directly by using the right-shift property [Eq. (5.15b)]. So we rearrange it in terms of (n − 6)u[n − 6] as follows:

We can now find the z-transform of the bracketed term by using the right-shift property [Eq. (5.15b)]. Because u[n]

Also, because nu[n]

Therefore

z/(z − 1) 2

z/(z − 1)

EXERCISE E5.5

Using only the fact that u[n] z/(z − 1) and the right-shift property [Eq. (5.15)], find the z-transforms of the signals in Figs. 5.2 and 5.3.

Answers See Example 5.2d and Exercise E5.1a. CONVOLUTION The time-convolution property states that if [†] then (time convolution)

Proof. This property applies to causal as well as noncausal sequences. We shall prove it for the more general case of noncausal sequences, where the convolution sum ranges from −∞ to ∞. We have

Interchanging the order of summation, we have

LTID SYSTEM RESPONSE It is interesting to apply the time-convolution property to the LTID input-output equation y[n] = x[n] * h[n]. Since from Eq. (5.14b), we H[z], it follows from Eq. (5.18) that know that h[n]

EXERCISE E5.6 Use the time-convolution property and appropriate pairs in Table 5.1 to show that u[n] * u[n − 1] = nu[n]. MULTIPLICATION BY γ n (SCALING IN THE z-DOMAIN) If then

Proof.

EXERCISE E5.7 Use Eq. (5.20) to derive pairs 6 and 8 in Table 5.1 from pairs 2 and 3, respectively. MULTIPLICATION BY n If then

Proof.

EXERCISE E5.8 Use Eq. (5.21) to derive pairs 3 and 4 in Table 5.1 from pair 2. Similarly, derive pairs 8 and 9 from pair 6. TIME REVERSAL If then [†]

Proof.

Changing the sign of the dummy variable n yields

The region of convergence is also inverted, that is, if ROC of x[n] is |z| > |γ|, then, the ROC of x[−n] is |z| < 1/|γ|. EXERCISE E5.9 Use the time-reversal property and pair 2 in Table 5.1 to show that u[−n] INITIAL AND FINAL VALUES For a causal x[n],

−1/(z − 1) with the ROC |z| < 1.

This result follows immediately from Eq. (5.9). We can also show that if (z − 1) X (z) has no poles outside the unit circle, then [†]

All these properties of the z-transform are listed in Table 5.2. Table 5.2: z-Transform Operations Open table as spreadsheet Operation

x[n]

X[z]

Addition

x 1 [n] + x 2 [n]

X1 [z] + X2 [z]

Scalar multiplication

ax[n]

aX[z]

Right-shifting

x[n − m]u[n − m]

x[n − m]u[n]

x[n − 1]u[n]

x[n − 2]u[n]

x[n − 3]u[n]

Left-shifting

x[n + m]u[n]

x[n + 1]u[n]

z m X[z] − zx[0]

x[n + 2]u[n]

z m X[z] − zx[0] − zx[1]

x[n + 2]u[n]

z m X[z] − zx[0] − zx[1] − zx[2]

Multiplication by γ n

γ n x[n]u[n]

Multiplication by n

nx[n]u[n]

Time convolution

x 1 [n]*x 2 [n]

X1 [z] X2 [z]

Time reversal

x[ − n]

X[1/z]

Initial value

x[0]

Final value

[†] There is also the frequency-convolution property, which states that if

[†] For complex signal x[n], the time-reversal property is modified as follows:

[†] This can be shown from the fact that

and

and

5.3 z-TRANSFORM SOLUTION OF LINEAR DIFFERENCE EQUATIONS The time-shifting (left-shift or right-shift) property has set the stage for solving linear difference equations with constant coefficients. As in the case of the Laplace transform with differential equations, the z-transform converts difference equations into algebraic equations that are readily solved to find the solution in the z domain. Taking the inverse z-transform of the z-domain solution yields the desired time-domain-solution. The following examples demonstrate the procedure. EXAMPLE 5.5 Solve

if the initial conditions are y[−1] = 11/6, y[−2] = 37/36, and the input x[n] = (2)−n u[n]. As we shall see, difference equations can be solved by using the right-shift or the left-shift property. Because the difference equation, Eq. (5.24), is in advance operator form, the use of the left-shift property in Eqs. (5.17a) and (5.17b) may seem appropriate for its solution. Unfortunately, as seen from Eqs. (5.17a) and (5.17b), these properties require a knowledge of auxiliary conditions y[0], y[1],..., y[N − 1] rather than of the initial conditions y[-1], y[-2],..., y[−n], which are generally given. This difficulty can be overcome by expressing the difference equation (5.24) in delay operator form (obtained by replacing n with n − 2) and then using the right-shift

property. [†] Equation (5.24) in delay operator form is

We now use the right-shift property to take the z-transform of this equation. But before proceeding, we must be clear about the meaning of a term like y[n − 1] here. Does it mean y[n − 1]u[n − 1] or y[n − 1]u[n]? In any equation, we must have some time reference n = 0, and every term is referenced from this instant. Hence, y[n − k] means y[n − k]u[n]. Remember also that although we are considering the situation for n ≥ 0, y[n] is present even before n = 0 (in the form of initial conditions). Now

Noting that for causal input x[n], We obtain

In general

Taking the z-transform of Eq. (5.25) and substituting the foregoing results, we obtain

or

from which we obtain

so that

and

Therefore

and

This example demonstrates the ease with which linear difference equations with constant coefficients can be solved by z-transform. This method is general; it can be used to solve a single difference equation or a set of simultaneous difference equations of any order as long as the equations are linear with constant coefficients. Comment. Sometimes, instead of initial conditions y[- 1], y[-2],..., y[−n], auxiliary conditions y[0], y[1],..., y[N − 1] are given to solve a difference equation. In this case, the equation can be solved by expressing it in the advance operator form and then using the left-shift property (see later: Exercise E5.11). EXERCISE E5.10 Solve the following equation if the initial conditions y[−1] = 2, y[−2] = 0, and the input x[n] = u[n]:

Answers

EXERCISE E5.11 Solve the following equation if the auxiliary conditions are y[0] = 1, y[1] = 2, and the input x[n] = u[n]: Answers

ZERO-INPUT AND ZERO-STATE COMPONENTS In Example 5.5 we found the total solution of the difference equation. It is relatively easy to separate the solution into zero-input and zero-state components. All we have to do is to separate the response into terms arising from the input and terms arising from initial conditions. We can separate the response in Eq. (5.26b) as follows:

Therefore

Multiplying both sides by z 2 yields

and

We expand both terms on the right-hand side into modified partial fractions to yield

and

which agrees with the result in Eq. (5.28). EXERCISE E5.12

Solve if the initial conditions are y[−1] = 2, y[−2] = 0, and the input x[n] = u[n]. Separate the response into zeroinput and zero-state components.

Answers

5.3-1 Zero-State Response of LTID Systems: The Transfer Function Consider an Nth-order LTID system specified by the difference equation

or

or

We now derive the general expression for the zero-state response: that is, the system response to input x[n] when all the initial conditions y[-1] = y[-2] = ... = y[−N] = 0 (zero state). The input x[n] is assumed to be causal so that x[−1] = x[-2] = ... = x[−N] = 0. Equation (5.31c) can be expressed in the delay operator form as

Because y[−r] = x[−r] = 0 for r = 1, 2, ..., N

Now the z-transform of Eq. (5.31d) is given by

Multiplication of both sides by z N yields

Therefore

We have shown in Eq. (5.19) that Y[z] = X[z]H[z]. Hence, it follows that

As in the case of LTIC systems, this result leads to an alternative definition of the LTID system transfer function as the ratio of Y[z] to X[z] (assuming all initial conditions zero).

ALTERNATE INTERPRETATION OF THE z-TRANSFORM So far we have treated the z-transform as a machine, which converts linear difference equations into algebraic equations. There is no physical understanding of how this is accomplished or what it means. We now discuss more intuitive interpretation and meaning of the z-transform. In Chapter 3, Eq. (3.71a), we showed that LTID system response to an everlasting exponential z n is H[z]z n . If we could express every

discrete-time signal as a linear combination of everlasting exponentials of the form z n , we could readily obtain the system response to any input. For example, if

the response of an LTID system to this input is given by

Unfortunately, a very small class of signals can be expressed in the form of Eq. (5.36a). However, we can express almost all signals of practical utility as a sum of everlasting exponentials over a continuum of values of z. This is precisely what the z-transform in Eq. (5.2) does.

Figure 5.6: The transformed representation of an LTID system. Invoking the linearity property of the z-transform, we can find the system response y[n] to input x[n] in the Eq. (5.37) as[†]

Clearly This viewpoint of finding the response of LTID system is illustrated in Fig. 5.6a. Just as in continuous-time systems, we can model discrete-time systems in the transformed manner by representing all signals by their z-transforms and all system components (or elements) by their transfer functions, as shown in Fig. 5.6b. The result Y[z]=H[z]X[z] greatly facilitates derivation of the system response to a given input. We shall demonstrate this assertion by an example. EXAMPLE 5.6 Find the response y[n] of an LTID system described by the difference equation or for the input x [n]=(−2) −n u[n] and with all the initial conditions zero (system in the zero state). From the difference equation we find

For the input x[n]=(−2) −n u[n]=[(−2) −1 ]n u(n)=(−0.5) n u[n]

and

Therefore

so that

and

EXAMPLE 5.7: (The Transfer Function of a Unit Delay) Show that the transfer function of a unit delay is 1/z. If the input to the unit delay is x[n]u[n], then its output (Fig. 5.7) is given by

Figure 5.7: Ideal unit delay and its transfer function. The z-transform of this equation yields [see Eq. (5.15a)]

It follows that the transfer function of the unit delay is

EXERCISE E5.13 A discrete-time system is described by the following transfer function:

a. Find the system response to input x [n]=3 -(n+1) u[n] if all initial conditions are zero. b. Write the difference equation relating the output y[n] to input x[n] for this system. Answers a. b.

5.3-2 Stability Equation (5.34) shows that the denominator of H[z] is Q[z], which is apparently identical to the characteristic polynomial Q[γ] defined in Chapter 3. Does this mean that the denominator of H[z] is the characteristic polynomial of the system? This may or may not be the case: if P[z] and Q[z] in Eq. (5.34) have any common factors, they cancel out, and the effective denominator of H[z] is not necessarily equal to Q[z]. Recall also that the system transfer function H[z], like h[n], is defined in terms of measurements at the external terminals. Consequently, H[z] and h[n] are both external descriptions of the system. In contrast, the characteristic polynomial Q[z] is an internal description. Clearly, we can determine only external stability, that is, BIBO stability, from H[z]. If all the poles of H[z] are within

the unit circle, all the terms in h[z] are decaying exponentials, and as shown in Section 3.10, h[n] is absolutely summable. Consequently, the system is BIBO stable. Otherwise the system is BIBO unstable. If P[z] and Q[z] do not have common factors, then the denominator of H[z] is identical to Q[z]. [†] The poles of H[z] are the characteristic roots of the system. We can now determine internal stability. The internal stability criterion in Section 3.10-1 can be restated in terms of the poles of H[z], as follows. 1. An LTID system is asymptotically stable if and only if all the poles of its transfer function H[z] are within the unit circle. The poles may be repeated or simple. 2. An LTID system is unstable if and only if either one or both of the following conditions exist: (i) at least one pole of H[z] is outside the unit circle; (ii) there are repeated poles of H[z] on the unit circle. 3. An LTID system is marginally stable if and only if there are no poles of H[z] outside the unit circle, and there are some simple poles on the unit circle. EXERCISE E5.14 Show that an accumulator whose impulse response is h[n]=u[n] is marginally stable but BIBO unstable.

5.3-3 Inverse Systems If H[z] is the transfer function of a system S, then Si , its inverse system has a transfer function H i [z] given by

This follows from the fact the inverse system Si undoes the operation of S. Hence, if H[z] is placed in cascade with H i [z], the transfer function of the composite system (identity system) is unity. For example, an accumulator, whose transfer function is H[z]=z/(z − 1) and a backward difference system whose transfer function is H i [z]=(z − 1)/z are inverse of each other. Similarly if

its inverse system transfer function is

as required by the property H[z]H i [z]=1. Hence, it follows that EXERCISE E5.15 Find the impulse response of an accumulator and the backward difference system. Show that the convolution of the two impulse responses yields δ[n]. [†] Another approach is to find y[0], y[1], y[2],..., y[N − 1] from y[−1], y[-2],..., y[−n] iteratively, as in Section 3.5-1, and then apply the left-shift property to Eq. (5.24). [†] In computing y[n], the contour along which the integration is performed is modified to consider the ROC of X[z] as well as H[z]. We

ignore this consideration in this intuitive discussion.

[†] There is no way of determining whether there were common factors in P[z] and Q[z] that were canceled out because in our

derivation of H[z], we generally get the final result after the cancellations are already effected. When we use internal description of the system to derive Q[z], however, we find pure Q[z] unaffected by any common factor in P[z].

5.4 SYSTEM REALIZATION Because of the similarity between LTIC and LTID systems, conventions for block diagrams and rules of interconnection for LTID are identical to those for continuous-time (LTIC) systems. It is not necessary to rederive these relationships. We shall merely restate them to refresh the reader's memory. The block diagram representation of the basic operations such as an adder a scalar multiplier, unit delay, and pick off points were shown in Fig. 3.11. In our development, the unit delay, which was represented by a box marked D in Fig. 3.11, will be represented by its transfer function 1/z. All the signals will also be represented in terms of their z-transforms. Thus, the input and the output will be labeled X[z] and Y[z], respectively.

When two systems with transfer functions H 1 [z] and H 2 [z] are connected in cascade (as in Fig. 4.18b), the transfer function of the composite system is H 1 [z]H 2 [z]. If the same two systems are connected in parallel (as in Fig. 4.18c), the transfer function of the composite system is H 1 [z]H 2 [z]. For a feedback system (as in Fig. 4.18d), the transfer function is G[z]/(1 + G[z]H[z]). We now consider a systematic method for realization (or simulation) of an arbitrary Nth-order LTID transfer function. Since realization is basically a synthesis problem, there is no unique way of realizing a system. A given transfer function can be realized in many different ways. We present here the two forms of direct realization. Each of these forms can be executed in several other ways, such as cascade and parallel. Furthermore, a system can be realized by the transposed version of any known realization of that system. This artifice doubles the number of system realizations. A transfer function H[z] can be realized by using time delays along with adders and multipliers. We shall consider a realization of a general Nth-order causal LTID system, whose transfer function is given by

This equation is identical to the transfer function of a general Nth-order proper LTIC system given in Eq. (4.60). The only difference is that the variable z in the former is replaced by the variable s in the latter. Hence, the procedure for realizing an LTID transfer function is identical to that for the LTIC transfer function with the basic element 1/s (integrator) replaced by the element 1/z (unit delay). The reader is encouraged to follow the steps in Section 4.6 and rederive the results for the LTID transfer function in Eq. (5.41). Here we shall merely reproduce the realizations from Section 4.6 with integrators (1/s) replaced by unit delays (1/z). The direct form I (DFI) is shown in Fig. 5.8a, the canonic direct form (DFII) is shown in Fig. 5.8b and the transpose of canonic direct is shown in Fig. 5.8c. The DFII and its transpose are canonic because they require N delays, which is the minimum number needed to implement an Nth-order LTID transfer function in Eq. (5.41). In contrast, the form DFI is a noncanonic because it generally requires 2N delays. The DFII realization in Fig. 5.8b is also called a canonic direct form.

Figure 5.8: Realization of an Nth-order causal LTID system transfer function by using (a) DFI, (b) canonic direct (DFII), and (c) the transpose form of DFII. EXAMPLE 5.8 Find the canonic direct and the transposed canonic direct realizations of the following transfer functions.

i.

ii.

iii.

iv. All four of these transfer functions are special cases of H[z] in Eq. (5.41).

i. For this case, the transfer function is of the first order (N=1); therefore, we need only one delay for its realization. The feedback and feedforward coefficients are We use Fig. 5.8 as our model and reduce it to the case of N=1. Figure 5.9a shows the canonic direct (DFII) form, and Fig. 5.9b its transpose. The two realizations are almost the same. The minor difference is that in the DFII form, the gain 2 is provided at the output, and in the transpose, the same gain is provided at the input.

Figure 5.9: Realization of transfer function 2/(z + 5): (a) canonic direct form and (b) its transpose. In a similar way, we realize the remaining transfer functions.

ii. In this case also, the transfer function is of the first order (N=1); therefore, we need only one delay for its realization. The feedback and feedforward coefficients are Figure 5.10 illustrates the canonic direct and its transpose for this case. [†]

Figure 5.10: Realization of (4z + 28)/(z + 1): (a) canonic direct form and (b) its transpose. iii. Here N=1 and b 0 =1, b 1 =0 and a 1 =7. Figure 5.11 shows the direct and the transposed realizations. Observe that the realizations are almost alike.

Figure 5.11: Realization of z/(z + 7): (a) canonic direct form and (b) its transpose.

iv. This is a second-order system (N = 2) with b 0 = 0, b 1 = 4, b 2 = 28, a 1 = 6, a 2 = 5. Figure 5.12 shows the canonic direct and transposed canonic direct realizations.

Figure 5.12: Realization of (4z + 28)/(z 2 + 6z + 5): (a) canonic direct form and (b) its transpose. EXERCISE E5.16 Realize the transfer function

CASCADE AND PARALLEL REALIZATIONS, COMPLEX AND REPEATED POLES The considerations and observations for cascade and parallel realizations as well as complex and multiple poles are identical to those discussed for LTIC systems in Section 4.6-3. EXERCISE E5.17 Find canonic direct realizations of the following transfer function by using the cascade and parallel forms. The specific cascade decomposition is as follows:

REALIZATION OF FINITE IMPULSE RESPONSE (FIR) FILTERS So far we have been quite general in our development of realization techniques. They can be applied to infinite impulse response (IIR) or FIR filters. For FIR filters, the coefficients a i = 0 for all i ≠ 0.[†] Hence, FIR filters can be readily implemented by means of the schemes developed so far by eliminating all branches with a i coefficients. The condition a i = 0 implies that all the poles of a FIR filter are at z = 0. EXAMPLE 5.9 Realize H [z] = (z 3 + 4z 2 + 5z + 2)/z 3 using canonic direct and transposed forms. We can express H[z] as

For H[z], b 0 = 1, b 1 = 4, b 2 = 5, and b 3 = 2. Hence, we obtain the canonic direct realization, shown in Fig. 5.13a. We have shown the horizontal orientation because it is easier to see that this filter is basically a tapped delay line. That is why this structure is also known as a tapped delay line or transversal filter. Figure 5.13b shows the corresponding transposed implementation.

Figure 5.13: Realization of (z 3 + 4z 2 + 5z + 2)/z 3 . DO ALL REALIZATIONS LEAD TO THE SAME PEREORMANCE? For a given transfer function, we have presented here several possible different realizations (DFI, canonic form DFII, and its transpose). There are also cascade and parallel versions, and there are many possible grouping of the factors in the numerator and the denominator of H[z], leading to different realizations. We can also use various combinations of these forms in implementing different subsections of a system. Moreover, the transpose of each version doubles the number. However, this discussion by no means exhausts all the possibilities. Transforming variables affords limitless potential realizations of the same transfer function. Theoretically, all these realizations are equivalent; that is, they lead to the same transfer function. This, however, is true only when we implement them with infinite precision. In practice, finite wordlength restriction causes each realization to behave differently in terms of sensitivity to parameter variation, stability, frequency response distortion error, and so on. These effects are serious for higher-order transfer functions, which require correspondingly higher numbers of delay elements. The finite wordlength errors that plague these implementations are coefficient quantization, overflow errors, and round-off errors. From a practical viewpoint, parallel and cascade forms using low-order filters minimize the effects of finite wordlength. Parallel and certain cascade forms are numerically less sensitive than the canonic direct form to small parameter variations in the system. In the canonic direct form structure with large N, a small change in a filter coefficient due to parameter quantization results in a large change in the location of the poles and the zeros of the system. Qualitatively, this difference can be explained by the fact that in a direct form (or its transpose), all the coefficients interact with each other, and a change in any coefficient will be magnified through its repeated influence from feedback and feedforward connections. In a parallel realization, in contrast, a change in a coefficient will affect only a localized segment; the case of a cascade realization is similar. For this reason, the most popular technique for minimizing finite wordlength effects is to design filters by using cascade or parallel forms employing low-order filters. In practice, high-order filters are realized by using multiple second-order sections in cascade, because second-order filters are not only easier to design but are less susceptible to coefficient quantization and round-off errors and their implementations allow easier data word scaling to reduce the potential overflow effects of data word size growth. A cascaded system using second-order building blocks usually requires fewer multiplications for a given filter frequency response. [1]

There are several ways to pair the poles and zeros of an Nth-order H[z] into a cascade of second-order sections, and several ways to order the resulting sections. Quantizing error will be different for each combination. Although several papers published provide guidelines in predicting and minimizing finite wordlength errors, it is advisable to resort to computer simulation of the filter design. This way, one can vary filter hardware characteristic, such as coefficient wordlengths, accumulator register sizes, sequencing of cascaded sections, and input signal sets. Such an approach is both reliable and economical. [1]

[†] Transfer functions with N=M may also be expressed as a sum of a constant and a strictly proper transfer function. For example,

Hence, this transfer function can also be realized as two transfer functions in parallel. [†] This statement is true for all i ≠ 0 because a is assumed to be unity. 0 [1] Lyons, R. G. Understanding Digital Signal Processing. Addison-Wesley, Reading, MA, 1997.

5.5 FREQUENCY RESPONSE OF DISCRETE-TIME SYSTEMS For (asymptotically or BIBO-stable) continuous-time systems, we showed that the system response to an input e jωt is H(jω)e jωt and

that the response to an input cos ωt is |H(jω)| cos [ωt + ∠H(jω)]. Similar results hold for discrete-time systems. We now show that for an (asymptotically or BIBO-stable) LTID system, the system response to an input e jΩn is H[e jΩ]e jΩn and the response to an input cos Ωn is |H[e jΩ]| cos (Ωn + ∠H[e jΩ]).

The proof is similar to the one used for continuous-time systems. In Section 3.8-3, we showed that an LTID system response to an

(everlasting) exponential z n is also an (everlasting) exponential H[z]z n. This result is valid only for values of z for which H[z], as defined in Eq. (5.14a), exists (converges). As usual, we represent this input-output relationship by a directed arrow notation as

Setting z = e jΩ in this relationship yields

Noting that cos Ωn is the real part of e jΩn , use of Eq. (3.66b) yields

Expressing H[e jΩ] in the polar form

Eq. (5.44) can be expressed as In other words, the system response y[n] to a sinusoidal input cos Ωn is given by

Following the same argument, the system response to a sinusoid cos (Ωn + θ) is

This result is valid only for BIBO-stable or asymptotically stable systems. The frequency response is meaningless for BIBO-unstable systems (which include marginally stable and asymptotically unstable systems). This follows from the fact that the frequency response in Eq. (5.43) is obtained by setting z = e jΩ in Eq. (5.42). But, as shown in Section 3.8-3 [Eqs. (3.71)], the relationship (5.42) applies only

for values of z for which H[z] exists. For BIBO unstable systems, the ROC for H[z] does not include the unit circle where z = e jΩ. This means, for BIBO-unstable systems, that H[z] is meaningless when z = e jΩ[†]

This important result shows that the response of an asymptotically or BIBO-stable LTID system to a discrete-time sinusoidal input of frequency Ω is also a discrete-time sinusoid of the same frequency. The amplitude of the output sinusoid is |H[e jΩ]| times the input

amplitude, and the phase of the output sinusoid is shifted by ∠H[e jΩ] with respect to the input phase. Clearly |H[e jΩ]| is the amplitude

gain, and a plot of |H[e jΩ]| versus Ω is the amplitude response of the discrete-time system. Similarly, ∠H[e jΩ] is the phase response of

the system, and a plot of ∠H[e jΩ] versus Ω shows how the system modifies or shifts the phase of the input sinusoid. Note that H[e jΩ] incorporates the information of both amplitude and phase responses and therefore is called the frequency responses of the system. STEADY-STATE RESPONSE TO CAUSAL SINUSOIDAL INPUT

As in the case of continuous-time systems, we can show that the response of an LTID system to a causal sinusoidal input cos Ωn u[n] is y[n] in Eq. (5.46a), plus a natural component consisting of the characteristic modes (see Prob. 5.5-6). For a stable system, all the modes decay exponentially, and only the sinusoidal component in Eq. (5.46a) persists. For this reason, this component is called the sinusoidal steady-state response of the system. Thus, y ss[n], the steady-state response of a system to a causal sinusoidal input cos Ωn u[n], is SYSTEM RESPONSE TO SAMPLED CONTINUOUS-TIME SINUSOIDS So far we have considered the response of a discrete-time system to a discrete-time sinusoid cos Ωn (or exponential e jΩn ). In practice,

the input may be a sampled continuous-time sinusoid cos ωt (or an exponential e jωt ). When a sinusoid cos ωt is sampled with sampling interval T, the resulting signal is a discrete-time sinusoid cos ωnT, obtained by setting t = nT in cos ωt. Therefore, all the results developed in this section apply if we substitute ωT for Ω:

EXAMPLE 5.10

For a system specified by the equation find the system response to the input a. 1 n = 1 b. c. a sampled sinusoid cos 1500t with sampling interval T = 0.001 The system equation can be expressed as Therefore, the transfer function of the system is

The frequency response is

Therefore

and

The amplitude response |H[e jΩ]| can also be obtained by observing that |H| 2 =HH*. Therefore

From Eq. (5.48) it follows that

which yields the result found earlier in Eq. (5.49a) Figure 5.14 shows plots of amplitude and phase response as functions of Ω. We now compute the amplitude and the phase response for the various inputs. a. x[n] = 1 n = 1 Since 1 n =(e jΩ) n with Ω = 0, the amplitude response is H[e j0 ]. From Eq. (5.49a) we obtain

Therefore

These values also can be read directly from Fig. 5.14a and 5.14b, respectively, corresponding to Ω = 0. Therefore, the system response to input 1 is

b. x[n] = cos[(π/6)n −0.2] Here Ω = π/6. According to Eqs. (5.49)

These values also can be read directly from Fig. 5.14a and 5.14b, respectively, corresponding to Ω=π/6. Therefore

Figure 5.15 shows the input x[n] and the corresponding system response.

Figure 5.15: Sinusoidal input and the corresponding output of the LTID system. c. A sinusoid cos 1500t sampled every T seconds (t = nT) results in a discrete-time sinusoid

For T = 0.001, the input is In this case, Ω =1.5. According to Eqs. (5.49a) and (5.49b),

These values also could be read directly from Fig. 5.14 corresponding to Ω =1.5. Therefore

Figure 5.14: Frequency response of the LTID system. COMPUTER EXAMPLE C5.1 Using MATLAB, find the frequency response of the system in Example 5.10. >> Omega = linspace(-pi,pi,400); >> H = tf ( [1 0], [1 -0.8],-1); >> H_Omega = squeeze (freqresp (H,Omega)); >> subplot (2,1,1); plot (Omega, abs(H_Omega), 'k'); axis tight; >> xlabel ('\Omega'); ylabel('|H[e^{j \Omega}]|'); >> subplot (2,1,2); plot (Omega, angle (H_Omega) * 180/pi, 'k'); axis tight; >> xlabel ('\Omega'); ylabel ('\angle H[e^{j \Omega}] [deg]');

Figure C5.1 Comment. Figure 5.14 shows plots of amplitude and phase response as functions of Ω. These plots as well as Eqs. (5.49) indicate that the frequency response of a discrete-time system is a continuous (rather than discrete) function of frequency Ω. There is no contradiction here. This behavior is merely an indication of the fact that the frequency variable Ω is continuous (takes on all possible values) and therefore the system response exists at every value of Ω. EXERCISE E5.18

For a system specified by the equation find the amplitude and the phase response. Find the system response to sinusoidal input cos (100t − (π/3)) sampled every T = 0.5 ms.

Answers

EXERCISE E5.19 Show that for an ideal delay (H[z]=1/z), the amplitude response |H[e jπ ]|=1, and the phase response ∠H[e jΩ]= −Ω. Thus, a pure time delay does not affect the amplitude gain of sinusoidal input, but it causes a phase shift (delay) of Ω radians in a discrete sinusoid of frequency Ω. Thus, for an ideal delay, the phase shift of the output sinusoid is proportional to the frequency of the input sinusoid (linear phase shift).

5.5-1 The Periodic Nature of the Frequency Response In Example 5.10 and Fig. 5.14, we saw that the frequency response H[e jΩ] is a periodic function of Ω. This is not a coincidence. Unlike continuous-time systems, all LTID systems have periodic frequency response. This is seen clearly from the nature of the expression of the frequency response of an LTID system. Because e ±j2πm =1 for all integer values of m [see Eq. (B.12)],

Therefore the frequency response H[e jΩ] is a periodic function of Ω with a period 2π. This is the mathematical explanation of the periodic behavior. The physical explanation that follows provides a much better insight into the periodic behavior. NONUNIQUENESS OF DISCRETE-TIME SINUSOID WAVEFORMS A continuous-time sinusoid cos ωt has a unique waveform for every real value of ω in the range 0 to ∞. Increasing ω results in a sinusoid of ever increasing frequency. Such is not the case for the discrete-time sinusoid cos Ωn because

and

This shows that the discrete-time sinusoids cos Ωn (and exponentials e jΩn ) separated by values of Ω in integral multiples of 2π are identical. The reason for the periodic nature of the frequency response of an LTID system is now clear. Since the sinusoids (or exponentials) with frequencies separated by interval 2π are identical, the system response to such sinusoids is also identical and, hence, is periodic with period 2π. This discussion shows that the discrete-time sinusoid cos Ωn has a unique waveform only for the values of Ω in the range −π to π. This band is called the fundamental band. Every frequency Ω, no matter how large, is identical to some frequency, Ω a , in the fundamental band (− π ≤ Ω a < π), where

The integer m can be positive or negative. We use Eq. (5.58) to plot the fundamental band frequency Ω a versus the frequency Ω of a sinusoid (Fig. 5.16a). The frequency Ω a is modulo 2π value of Ω. All these conclusions are also valid for exponential e jΩn . ALL DISCRETE-TIME SIGNALS ARE INHERENTLY BANDLIMITED This discussion leads to the surprising conclusion that all discrete-time signals are inherently bandlimited, with frequencies lying in the where is in cycles per sample, all frequencies separated range −π to π radians per sample. In terms of frequency by an integer number are identical. For instance, all discrete-time sinusoids of frequencies 0.3, 1.3, 2.3, ...cycles per sample are identical. The fundamental range of frequencies is −0.5 to 0.5 cycles per sample. Any discrete-time sinusoid of frequency beyond the fundamental band, when plotted, appears and behaves, in every way, like a sinusoid having its frequency in the fundamental band. It is impossible to distinguish between the two signals. Thus, in a basic sense, do not exist. Yet, in a "mathematical" sense, we must admit the existence of discrete-time frequencies beyond |Ω| = π or sinusoids of frequencies beyond Ω = π. What does this mean?

A MAN NAMED ROBERT To give an analogy, consider a fictitious person Mr. Robert Thompson. His mother calls him Robby; his acquaintances call him Bob, his close friends call him by his nickname, Shorty. Yet, Robert, Robby, Bob, and Shorty are one and the same person. However, we cannot say that only Mr. Robert Thompson exists, or only Robby exists, or only Shorty exists, or only Bob exists. All these four persons exist, although they are one and the same individual. In a same way, we cannot say that the frequency π/2 exists and frequency 5π/2 does not exist; they are both the same entity, called by different names. It is in this sense that we have to admit the existence of frequencies beyond the fundamental band. Indeed, mathematical expressions in frequency-domain automatically cater to this need by their built-in periodicity. As seen earlier, the very structure of the frequency response is 2π periodic. We shall also see later, in Chapter 9, that discrete-time signal spectra are also 2π periodic. Admitting the existence of frequencies beyond π also serves mathematical and computational convenience in digital signal processing applications. Values of frequencies beyond π may also originate naturally in the process of sampling continuous-time sinusoids. Because there is no upper limit on the value of ω, there is no upper limit on the value of the resulting discrete-time frequency Ω = ωT

either. [†]

The highest possible frequency is π and the lowest frequency is 0 (dc or constant). Clearly, the high frequencies are those in the vicinity of Ω = (2m + 1)π and the low frequencies are those in the vicinity of Ω = 2πm for all positive or negative integer values of m. FURTHER REDUCTION IN THE FREQUENCY RANGE Because cos (−Ωn + θ) = cos (Ωn − θ), a frequency in the range −π to 0 is identical to the frequency (of the same magnitude) in the range 0 to π (but with a change in phase sign). Consequently the apparent frequency for a discrete-time sinusoid of any frequency is equal to some value in the range 0 to π. Thus, cos (8.7πn + θ) = cos (0.7πn + θ), and the apparent frequency is 0.7π. Similarly, Hence, the frequency 9.6π is identical (in every respect) to frequency −0.4π, which, in turn, is equal (within the sign of its phase) to frequency 0.4π. In this case, the apparent frequency reduces to |Πa |=0.4π. We can generalize the result to say that the apparent frequency of a discrete-time sinusoid Ω is |Ω a |, as found from Eq. (5.58), and if Ω a < 0, there is a phase reversal. Figure 5.16b plots Ω versus the apparent frequency |Ω a |. The shaded bands represent the ranges of Ω for which there is a phase reversal, when represented in terms of |Ω a |. For example, the apparent frequency for both the sinusoids cos (2.4π + θ) and cos (3.6π + θ) is |Ω a | = 0.4π, as seen from Fig. 5.16b. But 2.4π is in a clear band and 3.6π is in a shaded band. Hence, these sinusoids appear as cos (0.4π + θ) and cos (0.4π − θ), respectively.

Figure 5.16: (a) Actual frequency versus (b) apparent frequency. Although every discrete-time sinusoid can be expressed as having frequency in the range from 0 to π, we generally use the frequency range from −π to π instead of 0 to π for two reasons. First, exponential representation of sinusoids with frequencies in the range 0 to π requires a frequency range −π to π. Second, even when we are using trigonometric representation, we generally need the frequency range −π to π to have exact identity (without phase reversal) of a higher-frequency sinusoid. For certain practical advantages, in place of the range −π to π, we often use other contiguous ranges of width 2π. The range 0 to 2π, for instance, is used in many applications. It is left as an exercise for the reader to show that the frequencies in the range from π to 2π are identical to those in the range from −π to 0. EXAMPLE 5.11 Express the following signals in terms of their apparent frequencies. a. cos (0.5πn + θ) b. cos (1.6πn + θ) c. sin (1.6πn + θ)

d. cos (2.3πn + θ) e. cos (34.699n + θ) a. Ω = 0.5π is in the reduced range already. This is also apparent from Fig. 5.16a or 5.16b. Because Ω a = 0.5π, and there is no phase reversal, and the apparent sinusoid is cos (0.5πn + θ). b. We express 1.6π = −0.4π + 2π so that Ω a = −0.4 and |Ω a | = 0.4. Also, Ω a is negative, implying sign change for the phase. Hence, the apparent sinusoid is cos (0.4πn − ΰ). This fact is also apparent from Fig. 5.16b. c. We first convert the sine form to cosine form as sin (1.6πn + θ) = cos (1.6πn − (π/2) θ). In part (b) we found Ω a = −0.4π. Hence, the apparent sinusoid is cos (0.4πn + (π/2) + θ) = −sin (0.4πn − θ). In this case, both the phase and the amplitude change signs. d. 2.3π = 0.3π + 2π so that Ω a = 0.3π. Hence, the apparent sinusoid is cos (0.3π n + θ). e. We have 34.699 = -3 + 6(2π). Hence, Ω a = −3, and the apparent frequency |Ω a | = 3 rad/sample. Because Ω a is negative, there is a sign change of the phase. Hence, the apparent sinusoid is cos (3n − θ). EXERCISE E5.20 Show that the sinusoids having frequencies Ω of a. 2π b. 3π c. 5π d. 3.2π e. 22.1327 f. π + 2 can be expressed, respectively, as sinusoids of frequencies a. 0 b. π c. π d. 0.8π e. 3 f. π - 2 Show that in cases (d), (e), and (f), phase changes sign.

5.5-2 Aliasing and Sampling Rate The nonuniqueness of discrete-time sinusoids and the periodic repetition of the same waveforms at intervals of 2π may seem innocuous, but in reality it leads to a serious problem for processing continuous-time signals by digital filters. A continuous-time sinusoid cos ωt sampled every T seconds (t=nT) results in a discrete-time sinusoid cos ωnT, which is cos Ωn with Ω=ωT. The discrete-time sinusoids cos Ωn have unique waveforms only for the values of frequencies in the range ω < π or ωT < π. Therefore samples of continuous-time sinusoids of two (or more) different frequencies can generate the same discrete-time signal, as shown in Fig. 5.17. This phenomenon is known as aliasing because through sampling, two entirely different analog sinusoids take on the same "discrete-time" identity.[†]

Figure 5.17: Demonstration of aliasing effect.

Aliasing causes ambiguity in digital signal processing, which makes it impossible to determine the true frequency of the sampled signal. Consider, for instance, digitally processing a continuous-time signal that contains two distinct components of frequencies ω1 and ω2 . The samples of these components appear as discrete-time sinusoids of frequencies Ω 1 = ω1 T and Ω 2 = π 2 T. If Ω 1 and ω2 happen to differ by an integer multiple of 2π (if ω2 − ω1 =2kπT), the two frequencies will be read as the same (lower of the two) frequency by the digital processor.[†] As a result, the higher-frequency component ω2 not only is lost for good (by losing its identity to ω1 ), but it reincarnates as a component of frequency ω1 , thus distorting the true amplitude of the original component of frequency ω1 . Hence, the resulting processed signal will be distorted. Clearly, aliasing is highly undesirable and should be avoided. To avoid aliasing, the frequencies of the continuous-time sinusoids to be processed should be kept within the fundamental band ωT ≤ π or ω ≤ π/T. Under this condition the question of ambiguity or aliasing does not arise because any continuous-time sinusoid of frequency in this range has a unique waveform when it is sampled. Therefore if ωh is the highest frequency to be processed, then, to avoid aliasing,

If fh is the highest frequency in hertz, fh = ωh /2π, and, according to Eq. (5.59),

or

This shows that discrete-time signal processing places the limit on the highest frequency fh that can be processed for a given value of the sampling interval T according to Eq. (5.60a). But we can process a signal of any frequency (without aliasing) by choosing a suitable value of T according to Eq. (5.60b). The sampling rate or sampling frequency fs is the reciprocal of the sampling interval T, and, according to Eq. (5.60b),

so that

This result is a special case of the well-known sampling theorem (to be proved in Chapter 8). It states that to process a continuoustime sinusoid by a discrete-time system, the sampling rate must be greater than twice the frequency (in hertz) of the sinusoid. In short,

a sampled sinusoid must have a minimum of two samples per cycle. [†] For sampling rate below this minimum value, the output signal will be aliased, which means it will be mistaken for a sinusoid of lower frequency.

ANTIALIASING FILTER If the sampling rate fails to satisfy condition (5.61), aliasing occurs, causing the frequencies beyond fs /2 Hz to masquerade as lower frequencies to corrupt the spectrum at frequencies below fs /2. To avoid such a corruption, a signal to be sampled is passed through an antialiasing filter of bandwidth fs /2 prior to sampling. This operation ensures the condition (5.61). The drawback of such a filter is that we lose the spectral components of the signal beyond frequency fs /2, which is a preferable alternative to the aliasing corruption of the signal at frequencies below fs /2. Chapter 8 presents a detailed analysis of the aliasing problem. EXAMPLE 5.12 Determine the maximum sampling interval T that can be used in a discrete-time oscillator which generates a sinusoid of 50 kHz. Here the highest significant frequency fh =50 kHz. Therefore from Eq. (5.60b)

The sampling interval must be less than 10μs. The sampling frequency is fs =1/T > 100 kHz. EXAMPLE 5.13 A discrete-time amplifier uses a sampling interval T=25 μs. What is the highest frequency of a signal that can be processed with this amplifier without aliasing?

From Eq. (5.60a)

[†] This may also be argued as follows. For BIBO-unstable systems, the zero-input response contains nondecaying natural mode terms of the form cos Ωn or γ n cos Ωn (γ > 1). Hence, the response of such a system to a sinusoid cos Ωn will contain not just the sinusoid

of frequency Ω but also nondecaying natural modes, rendering the concept of frequency response meaningless. Alternately, we can argue that when z = e jΩ, a BIBO-unstable system violates the dominance condition |γ i | < |e jΩ| for all i, where γi represents ith characteristic root of the system (see Section 4.3). [†] However, if Ω goes beyond π, the resulting aliasing reduces the apparent frequency to Ω < π. a [†] Figure 5.17 shows samples of two sinusoids cos 12πt and cos 2πt taken every 0.2 second. The corresponding discrete-time

frequencies (Ω=ωT=0.2ω) are cos 2.4π and cos 0.4π. The apparent frequency of 2.4π is 0.4π, identical to the discrete-time frequency corresponding to the lower sinusoid. This shows that the samples of both these continuous-time sinusoids at 0.2-second intervals are identical, as verified from Fig. 5.17. [†] In the case shown in Fig. 5.17, ω =12π, ω =2π, and T=0.2. Hence, ω − ω =10πT=2π, and the two frequencies are read as the 1 2 2 1

same frequency Ω=0.4π by the digital processor.

[†] Strictly speaking, we must have more than two samples per cycle.

5.6 FREQUENCY RESPONSE FROM POLE-ZERO LOCATION The frequency responses (amplitude and phase responses) of a system are determined by pole-zero locations of the transfer function H[z]. Just as in continuous-time systems, it is possible to determine quickly the amplitude and the phase response and to obtain physical insight into the filter characteristics of a discrete-time system by using a graphical technique. The general Nth-order transfer function H[z] in Eq. (5.34) can be expressed in factored form as

We can compute H[z] graphically by using the concepts discussed in Section 4.10. The directed line segment from z i to z in the complex plane (Fig. 5.18a) represents the complex number z − z i . The length of this segment is |z − z i | and its angle with the horizontal axis is ∠(z − z i ).

Figure 5.18: Vector representations of (a) complex numbers and (b) factors of H[z]. To compute the frequency response H[e jΩ] we evaluate H[z] at z = e jΩ. But for z = e jΩ, |z| = 1 and ∠z = Ω so that z = e jΩ represents a point on the unit circle at an angle Ω with the horizontal. We now connect all zeros (z 1 , z 2 , ..., z N) and all poles (y 1 , y 2 , ..., y N) to

the point e jΩ, as indicated in Fig. 5.18b. Let r 1 ,r 2 ,...,r N be the lengths and f1 f2 , ..., φ N be the angles, respectively, of the straight lines

connecting z 1 , z 2 , ..., z N to the point e jΩ. Similarly, let d 1 , d 2 ,..., d N be the lengths and ? 1 , ? 2 ,..., θN be the angles, respectively, of the

lines connecting y 1 , y 2 ,...,y N to e jΩ. Then

Therefore (assuming b 0 < 0)

and

In this manner, we can compute the frequency response H[e jΩ] for any value of Ω by selecting the point on the unit circle at an angle

Ω. This point is e jΩ. To compute the frequency response H[e jΩ], we connect all poles and zeros to this point and use the foregoing

equations to determine |H[e jΩ]| and ∠H[e jΩ]. We repeat this procedure for all values of Ω from 0 to π to obtain the frequency response.

CONTROLLING GAIN BY PLACEMENT OF POLES AND ZEROS The nature of the influence of pole and zero locations on the frequency response is similar to that observed in continuous-time systems, with minor differences. In place of the imaginary axis of the continuous-time systems, we have the unit circle in the discrete-time case. The nearer the pole (or zero) is to a point e jΩ (on the unit circle) representing some frequency Ω, the more influence that pole (or zero) wields on the amplitude response at that frequency because the length of the vector joining that pole (or zero) to the point e jΩ is small. The proximity of a pole (or a zero) has similar effect on the phase response. From Eq. (5.65a), it is clear that to enhance the amplitude response at a frequency Ω, we should place a pole as close as possible to the point e jΩ (which is on the unit circle). [†] Similarly, to suppress the amplitude response at a frequency Ω, we should place a zero as close as possible to the point e jΩ on the unit circle Placing repeated poles or zeros will further enhance their influence.

Total suppression of signal transmission at any frequency can be achieved by placing a zero on the unit circle at a point corresponding to that frequency. This observation is used in the notch (bandstop) filter design. Placing a pole or a zero at the origin does not influence the amplitude response because the length of the vector connecting the origin

to any point on the unit circle is unity. However, a pole (or a zero) at the origin adds angle −Ω (or Ω) to ∠H[e jΩ]. Hence, the phase spectrum −Ω (or Ω) is a linear function of frequency and therefore represents a pure time delay (or time advance) of T seconds (see Exercise E5.19). Therefore, a pole (a zero) at the origin causes a time delay (or a time advance) of T seconds in the response. There is no change in the amplitude response. For a stable system, all the poles must be located inside the unit circle. The zeros may lie anywhere. Also, for a physically realizable system, H[z] must be a proper fraction, that is, N ≥ M. If, to achieve a certain amplitude response, we require M > N, we can still make the system realizable by placing a sufficient number of poles at the origin to make N = M. This will not change the amplitude response, but it will increase the time delay of the response. In general, a pole at a point has the opposite effect of a zero at that point. Placing a zero closer to a pole tends to cancel the effect of that pole on the frequency response. LOWPASS FILTERS

A lowpass filter generally has a maximum gain at or near Ω = 0, which corresponds to point e j0 = 1 on the unit circle. Clearly, placing a

pole inside the unit circle near the point z = 1 (Fig. 5.19a) would result in a lowpass response. [†] The corresponding amplitude and

phase response appear in Fig. 5.19a. For smaller values of Ω, the point e jΩ (a point on the unit circle at an angle Ω) is closer to the

pole, and consequently the gain is higher. As Ω increases, the distance of the point e jω from the pole increases. Consequently the gain decreases, resulting in a lowpass characteristic. Placing a zero at the origin does not change the amplitude response but it does modify the phase response, as illustrated in Fig. 5.19b. Placing a zero at z = −1, however, changes both the amplitude and the phase

response (Fig. 5.19c). The point z = −1 corresponds to frequency Ω = π(z = e jΩ = e jπ = 1). Consequently, the amplitude response now becomes more attenuated at higher frequencies, with a zero gain at Ω = π. We can approach ideal lowpass characteristics by using more poles staggered near z = 1 (but within the unit circle). Figure 5.19d shows a third-order lowpass filter with three poles near z = 1 and a third-order zero at z = −1, with corresponding amplitude and phase response. For an ideal lowpass filter we need an enhanced gain at every frequency in the band (0, Ωc). This can be achieved by placing a continuous wall of poles (requiring an infinite number of poles) opposite this band.

Figure 5.19: Various pole-zero configurations and the corresponding frequency responses. HIGHPASS FILTERS A highpass filter has a small gain at lower frequencies and a high gain at higher frequencies. Such a characteristic can be realized by placing a pole or poles near z = −1 because we want the gain at Ω = π to be the highest. Placing a zero at z = 1 further enhances suppression of gain at lower frequencies. Figure 5.19e shows a possible pole-zero configuration of the third-order highpass filter with corresponding amplitude and phase responses. In the following two examples, we shall realize analog filters by using digital processors and suitable interface devices (C/D and D/C), as shown in Fig. 3.2. At this point we shall examine the design of a digital processor with the transfer function H[z] for the purpose of realizing bandpass and bandstop filters in the following examples. As Fig. 3.2 showed, the C/D device samples the continuous-time input x(t) to yield a discrete-time signal x[n], which serves as the input to H[z]. The output y[n] of H[z] is converted to a continuous-time signal y(t) by a D/C device. We also saw in Eq. (5.47) that a continuous-time sinusoid of frequency Ω, when sampled, results in a discrete-time sinusoid Ω = ωT. EXAMPLE 5.14: (Bandpass Filter) By trial and error, design a tuned (bandpass) analog filter with zero transmission at 0 Hz and also at the highest frequency fh = 500 Hz. The resonant frequency is required to be 125 Hz. Because fh = 500, we require T < 1/1000 [see Eq. (5.60b)]. Let us select T = 10 −3 .[†] Recall that the analog frequencies ω corresponds to digital frequencies Ω = ωt. Hence, analog frequencies ω = 0 and 1000π correspond to Ω = 0 and π, respectively. The

gain is required to be zero at these frequencies. Hence, we need to place zeros at e jΩ corresponding to Ω = 0 and Ω = π. For Ω = 0, z

= e jΩ = 1; for Ω = π, e jΩ = −1. Hence, there must be zeros at z = ± 1. Moreover, we need enhanced response at the resonant frequency ω = 250π, which corresponds to Ω = π /4, which, in turn, corresponds to z = e jΩ = e jπ/4 . Therefore, to enhance the

frequency response at ω = 250π, we place a pole in the vicinity of e jπ/4 . Because this is a complex pole, we also need its conjugate near e −jπ/4 , as indicated in Fig. 5.20a. Let us choose these poles γ 1 and γ 2 as

where |γ| < 1 for stability. The closer the γ is to the unit circle, the more sharply peaked is the response around ω = 250π. We also have zeros at ± 1. Hence

For convenience we shall choose K = 1. The amplitude response is given by

Now, by using Eq. (5.50), we obtain

Figure 5.20b shows the amplitude response as a function of ω, as well as Ω = ωT = 10 −3 ω for values of |γ| = 0.83, 0.96, and 1. As expected, the gain is zero at ω = 0 and at 500 Hz (ω =1000π). The gain peaks at about 125 Hz (ω =250π). The resonance (peaking) becomes pronounced as |γ| approaches 1. Figure 5.20c shows a canonical realization of this filter [see Eq. (5.66)].

Figure 5.20: Designing a bandpass filter. COMPUTER EXAMPLE C5.2 Use MATLAB to compute and plot the frequency response of the bandpass filter in Example 5.14 for the following cases: a. |γ| = 0.83 b. |γ| = 0.96 >> >> >> >> >> >> >> >> >> >> >> >> >>

c. |γ| = 0.99 Omega = linspace(-pi,pi,4097); g_mag = [0.83 0.96 0.99]; H = zeros(length(g_mag),length(Omega)); for m = 1:length(g_mag), H(m,:) = freqz ( [1 0 -1], [1 -sqrt (2) *g_mag (m) g_mag (m) ^2], Omega); end subplot(2,1,1); plot(Omega,abs(H(1,:)),'k-',... Omega,abs(H(2,:)),'k--',Omega,abs(H(3,:)),'k-.'); axis tight; xlabel('\Omega'); ylabel('|H[e^(j \Omega)]|'); legend('(a) | \gammal| = 0.83','(b) | \gammal| = 0.96','(c) |\gammal| = 0.99',0) subplot(2,1,2); plot(Omega,angle(H(1,:)),'k-',... Omega,angle(H(2,:)),'k--',Omega,angle(H(3,:)),'k-.'); axis tight; xlabel('\Omega'); ylabel('\angle H[e^(j \Omega)] [rad]'); legend('(a) |\gamma| = 0.83','(b) |\gamma| = 0.96','(c) |\gamma | = 0.99',0)

Figure C5.2 EXAMPLE 5.15: [Notch (Bandstop) Filter] Design a second-order notch filter to have zero transmission at 250 Hz and a sharp recovery of gain to unity on both sides of 250 Hz. The highest significant frequency to be processed is fh = 400 Hz. In this case, T < 1/2fh = 1.25 × 10 −3 . Let us choose T = 10 −3 . For the frequency 250 Hz, Ω = 2π(250)T = π/2. Thus, the frequency 250 Hz is represented by a point e jΩ = e jπ/2 = j on the unit circle, as depicted in Fig. 5.21a. Since we need zero transmission at this

frequency, we must place a zero at z = e jπ/2 = j and its conjugate at z = e −jπ/2 = −j. We also require a sharp recovery of gain on both sides of frequency 250 Hz. To accomplish this goal, we place two poles close to the two zeros, to cancel out the effect of the two zeros as we move away from the point j (corresponding to frequency 250 Hz). For this reason, let us use poles at ±ja with a < 1 for stability. The closer the poles are to zeros (the closer the a to 1), the faster is the gain recovery on either side of 250 Hz. The resulting transfer function is

The dc gain (gain at Ω = 0, or z = 1) of this filter is

Because we require a dc gain of unity, we must select K = (1 + a 2 )/2. The transfer function is therefore

and according to Eq. (5.50)

Figure 5.21b shows |H[e jΩ]| for values of a = 0.3, 0.6, and 0.95. Figure 5.21c shows a realization of this filter.

Figure 5.21: Designing a notch (bandstop) filter. EXERCISE E5.21 Use the graphical argument to show that a filter with transfer function

acts like a highpass filter. Make a rough sketch of the amplitude response. [†] The closest we can place a pole is on the unit circle at the point representing Ω. This choice would lead to infinite gain, but should

be avoided because it will render the system marginally stable (BIBO unstable). The closer the point to the unit circle, the more sensitive the system gain to parameter variations.

[†] Placing the pole at z = 1 results in maximum (infinite) gain, but renders the system BIBO unstable and hence should be avoided. [†] Strictly speaking, we need T < 0.001. However, we shall show in Chapter 8 that if the input does not contain a finite amplitude

component of 500 Hz, T = 0.001 is adequate. Generally practical signals satisfy this condition.

5.7 DIGITAL PROCESSING OF ANALOG SIGNALS An analog (meaning continuous-time) signal can be processed digitally by sampling the analog signal and processing the samples by a digital (meaning discrete-time) processor. The output of the processor is then converted back to analog signal, as shown in Fig. 5.22a. We saw some simple cases of such processing in Examples 3.6, 3.7, 5.14, and 5.15. In this section, we shall derive a criterion for designing such a digital processor for a general LTIC system. Suppose that we wish to realize an equivalent of an analog system with transfer function H a (s), shown in Fig. 5.22b. Let the digital processor transfer function in Fig. 5.22a that realizes this desired H a (s) be H[z]. In other words, we wish to make the two systems in Fig. 5.22 equivalent (at least approximately). By "equivalence" we mean that for a given input x(t), the systems in Fig. 5.22 yield the same output y(t). Therefore y(nT), the samples

of the output in Fig. 5.22b, are identical to y[n], the output of H[z] in Fig. 5.22a.

Figure 5.22: Analog filter realization with a digital filter. For the sake of generality, we are assuming a noncausal system. The argument and the results are also valid for causal systems. The output y(t) of the system in Fig. 5.22b is

For our purpose, it is convenient to use the notation T for δ τ in Eq. (5.69a). Assuming T (the sampling interval) to be small enough, such a change of notation yields

The response at the nth sampling instant is y(nT) obtained by setting t = nT in the equation is

In Fig. 5.22a, the input to H[z] is x(nT) = x[n]. If h[n] is the unit impulse response of H[z], then y[n], the output of H[z], is given by

If the two systems are to be equivalent, y(nT) in Eq. (5.69c) must be equal to y[n] in Eq. (5.70). Therefore

This is the time-domain criterion for equivalence of the two systems. [†] According to this criterion, h[n], the unit impulse response of H[z] in Fig. 5.22a, should be T times the samples of h a (t), the unit impulse response of the system in Fig. 5.22b. This is known as the impulse invariance criterion of filter design. Strictly speaking, this realization guarantees the output equivalence only at the sampling instants, that is, y(nT) = y[n], and that also requires the assumption that T → 0. Clearly, this criterion leads to an approximate realization of H a (s). However, it can be shown that

when the frequency response of |H a (jω)| is bandlimited, the realization is exact,[2] provided the sampling rate is high enough to avoid any aliasing (T < 1/2f h ). REALIZATION OF RATIONAL H(S) If we wish to realize an analog filter with transfer function

The impulse response h(t), given by the inverse Laplace transform of H a (s), is

The corresponding digital filter unit impulse response h[n], per Eq. (5.71), is

Figure 5.23 shows h a (t) and h[n] The corresponding H[z], the z-transform of h[n], as found from Table 5.1, is

Figure 5.23: Impulse response for analog and digital systems in the impulse invariance method of filter design. The procedure of finding H[z] can be systematized for any Nth-order system. First we express an Nth-order analog transfer function H a (s) as a sum of partial fractions as[†]

Then the corresponding H[z] is given by

This transfer function can be readily realized as explained in Section 5.4. Table 5.3 lists several pairs of H a (s) and their corresponding H[z]. For instance, to realize a digital integrator, we examine its H a (s) = 1/s. From Table 5.3, corresponding to H a (s) = 1/s (pair 2), we find H[z] = Tz/(z − 1). This is exactly the result we obtained in Example 3.7 using another approach. Note that H a (jω) in Eq. (5.72a) [or (5.74)] is not bandlimited. Consequently, all these realizations are approximate. CHOOSING THE SAMPLING INTERVAL T The impulse invariance criterion (5.71) was derived under the assumption that T → 0. Such an assumption is neither practical nor necessary for satisfactory design. Avoiding of aliasing is the most important consideration for the choice of T. In Eq. (5.60a), we showed that for a sampling interval T seconds, the highest frequency that can be sampled without aliasing is 1/2T Hz or π/T radians per second. This implies that H a (jω), the frequency response of the analog filter in Fig. 5.22b should not have spectral components beyond frequency π/T radians per second. In other words, to avoid aliasing, the frequency response of the system H a (s) must be bandlimited to π/T radians per second. We shall see later in Chapter 7 that frequency response of a realizable LTIC system cannot be bandlimited; that is, the response generally exists for all frequencies up to ∞. Therefore, it is impossible to digitally realize an LTIC system exactly without aliasing. The saving grace is that the frequency response of every realizable LTIC system decays with frequency. This allows for a compromise in digitally realizing an LTIC system with an acceptable level of aliasing. The smaller the value of T, the smaller the aliasing, and the better the approximation. Since it is impossible to make |H a (jω)| zero, we are satisfied with making it negligible beyond

the frequency π/T. As a rule of thumb,[3] we choose T such that |H a (jω)| at the frequency ω = π/T is less than a certain fraction (often taken as 1%) of the peak value of |H a (jω)|. This ensures that aliasing is negligible. The peak |H a (jω)| usually occurs at ω = 0 for lowpass filters and at the band center frequency ωc for bandpass filters. Table 5.3: (Unilateral) z-Transform Pairs Open table as spreadsheet No.

ha (t)

h[n]

H[z]

H a (s)

1

K

Kδ(t)

TKδ[n]

TK

2

u(t)

Tu[n]

3

t

nT 2

4

5

λt

λnT

e

Te

6

teλt

e nT 2 λ nT

7

Tre −at cos(bt + θ)

Tre −anT cos(bnT + θ)

EXAMPLE 5.16 Design a digital filter to realize a first-order lowpass Butterworth filter with the transfer function

For this filter, we find the corresponding H[z] according to Eq. (5.73)(or pair 5 in Table 5.3) as

Next, we select the value of T by means of the criterion according to which the gain at ω =/T drops to 1% of the maximum filter gain. However, this choice results in such a good design that aliasing is imperceptible. The resulting amplitude response is so close to the desired response that we can hardly notice the aliasing effect in our plot. For the sake of demonstrating the aliasing effect, we shall deliberately select a 10% criterion (instead of 1%). We have

In this case |H a (jω)|max = 1, which occurs at ω = 0. Use of 10% criterion leads to |H a (π/T)| = 0.1. Observe that

Hence,

Thus, the 10% criterion yields T = 10 −6 π. The 1% criterion would have given T = 10 −7 π. Substitution of T = 10 −6 π in Eq. (5.76) yields

A canonical realization of this filter is shown in Fig. 5.24a. To find the frequency response of this digital filter, we rewrite H[z] as

Therefore

Consequently

Figure 5.24: An example of filter design by the impulse invariance method: (a) filter realization, (b) amplitude response, and (c) phase response. This frequency response differs from the desired response H a (jω) because aliasing causes frequencies above π/T to appear as frequencies below π/T. This generally results in increased gain for frequencies below π/T. For instance, the realized filter gain at ω=0 is H[e j0 ]=H[1]. This value, as obtained from Eq. (5.77), is 1.1654 instead of the desired value 1. We can partly compensate for this

distortion by multiplying H[z] or H[e jωt ] by a normalizing constant K=H a (0)/H[1] = 1/1.1654 = 0.858. This forces the resulting gain of H[e jωt ] to be equal to 1 at ω = 0. The normalized H n [z] = 0.858H[z] = 0.858(0.1πz/(z − 0.7304)). The amplitude response in Eq.

(5.78a) is multiplied by K = 0.858 and plotted in Fig. 5.24b over the frequency range 0 ≤ ω ≤ π/T = 10 6 . The multiplying constant K has no effect on the phase response in Eq. (5.78b), which is shown in Fig. 5.24c. Also, the desired frequency response, according to Eq. (5.75) with ωc = 10 5 , is

Therefore

This desired amplitude and phase response are plotted (dotted) in Fig. 5.24b and 5.24c for comparison with realized digital filter

response. Observe that the amplitude response behavior of the analog and the digital filter is very close over the range ω ≤ ωc = 10 5 . However, for higher frequencies, there is considerable aliasing, especially in the phase spectrum. Had we used the 1% rule, the realized frequency response would have been closer over another decade of the frequency range. COMPUTER EXAMPLE C5.3 Using the MATLAB impinvar command, find the impulse invariance digital filter to realize the first-order analog Butterworth filter presented in Example 5.16. The analog filter transfer function is 10 5 /(s + 10 5 ) and the sampling interval is T = 10 −6 π. >> num=[0 10^5]; den=[1 10^5];

>> T = pi/10^6; Fs = 1/T; >> [b,a] = impinvar(num,den,Fs); >> tf(b,a,T) Transfer function: 0.3142 z --------z - 0.7304 Sampling time: 3.1416e-006 EXERCISE E5.22 Design a digital filter to realize an analog transfer function

Answers

[†] Because T is a constant, some authors ignore the factor T, which yields a simplified criterion h[n]=h (nT). Ignoring T merely scales a

the amplitude response of the resulting filter.

[2] Oppenheim, A. V., and R. W. Schafer. Discrete-Time Signal Processing, 2nd ed. Prentice-Hall, Upper Saddle River, NJ, 1999. [†] Assuming H (s) has simple poles. For repeated poles, the form changes accordingly. Entry 6 in Table 5.3 is suitable for repeated a

poles.

[3] Mitra, S. K. Digital Signal Processing, 2nd ed. McGraw-Hill, New York, 2001.

5.8 CONNECTION BETWEEN THE LAPLACE TRANSFORM AND THE z-TRANSFORM We now show that discrete-time systems also can be analyzed by means of the Laplace transform. In fact, we shall see that the ztransform is the Laplace transform in disguise and that discretetime systems can be analyzed as if they were continuous-time systems. So far we have considered the discrete-time signal as a sequence of numbers and not as an electrical signal (voltage or current). Similarly, we considered a discrete-time system as a mechanism that processes a sequence of numbers (input) to yield another sequence of numbers (output). The system was built by using delays (along with adders and multipliers) that delay sequences of numbers. A digital computer is a perfect example: every signal is a sequence of numbers, and the processing involves delaying sequences of numbers (along with addition and multiplication). Now suppose we have a discrete-time system with transfer function H[z] and input x[n]. Consider a continuous-time signal x(t) such

that its nth sample value is x[n], as shown in Fig. 5.25. [†] Let the sampled signal be x (t), consisting of impulses spaced T seconds apart with the nth impulse of strength x[n]. Thus

Figure 5.25 shows x[n] and the corresponding x (t). The signal x[n] is applied to the input of a discrete-time system with transfer function H[z], which is generally made up of delays, adders, and scalar multipliers. Hence, processing x[n] through H[z] amounts to operating on the sequence x[n] by means of delays, adders, and scalar multipliers. Suppose for x (t) samples, we perform operations identical to those performed on the samples of x[n] by H[z]. For this purpose, we need a continuous-time system with transfer function H(s) that is identical in structure to the discrete-time system H[z] except that the delays in H[z] are replaced by elements that delay continuous-time signals (such as voltages or currents). There is no other difference between realizations of H[z] and H(s). If a continuous-time impulse δ(t) is applied to such a delay of T seconds, the output will be δ(t − T). The continuous-time transfer function of such a delay is e −sT [see Eq. (4.46)]. Hence the delay elements with transfer function 1/z in the realization of H[z] will be replaced

by the delay elements with transfer function e sT in the realization of the corresponding H(s). This is same as z being replaced by e sT . Therefore H(s)=H[e sT ]. Let us now apply x[n] to the input of H[z] and apply x (t) at the input of H[e sT ]. Whatever operations are

performed by the discrete-time system H[z] on x[n] (Fig. 5.25a) are also performed by the corresponding continuous-time system

H[e sT ] on the impulse sequence x (t) (Fig. 5.25b). The delaying of a sequence in H[z] would amount to delaying of an impulse train in H[e sT ]. Adding and multiplying operations are the same in both cases. In other words, one-to-one correspondence of the two systems is preserved in every aspect. Therefore if y[n] is the output of the discrete-time system in Fig. 5.25a, then y (t), the output of the continuous-time system in Fig. 5.25b, would be a sequence of impulse whose nth impulse strength is y[n]. Thus

Figure 5.25: Connection between the Laplace transform and the z-transform. The system in Fig. 5.25b, being a continuous-time system, can be analyzed via the Laplace transform. If then

Also

Now because the Laplace transform of δ(t − nT) is e −snT

and

Substitution of Eqs. (5.82) and (5.83) in Eq. (5.81) yields

By introducing a new variable z=e sT , this equation can be expressed as

or

where

It is clear from this discussion that the z-transform can be considered to be the Laplace transform with a change of variable z=e sT or s=(1/T) In z. Note that the transformation z=e sT transforms the imaginary axis in the s plane (s=jω) into a unit circle in the z plane

(z=e sT =e jωT, or |z|=1) The LHP and RHP in the s plane map into the inside and the outside, respectively, of the unit circle in the z plane. [†] We can construct such x(t) from the sample values, as explained in Chapter 8.

5.9 THE BILATERAL z-TRANSFORM Situations involving noncausal signals or systems cannot be handled by the (unilateral) z-transform discussed so far. Such cases can be analyzed by the bilateral (or two-sided) z-transform defined in Eq. (5.1), as

As in Eq. (5.2), the inverse z-transform is given by

These equations define the bilateral z-transform. Earlier, we showed that

In contrast, the z-transform of the signal − γ n u[−(n + 1)], illustrated in Fig. 5.26a, is

Figure 5.26: (a) −γ n u[ −(n + 1)] and (b) the region of convergence (ROC) of its z-transform. Therefore

A comparison of Eqs. (5.84) and (5.85) shows that the z-transform of γ n u[n] is identical to that of −γ n u[−(n + 1)]. The regions of convergence, however, are different. In the former case, X[z] converges for |z| > |γ|;in the latter, X[z] converges for |z| < |γ|(see Fig. 5.26b). Clearly, the inverse transform of X[z] is not unique unless the region of convergence is specified. If we add the restriction that

all our signals be causal, however, this ambiguity does not arise. The inverse transform of z/(z − γ) is γ n u[n] even without specifying the ROC. Thus, in the unilateral transform, we can ignore the ROC in determining the inverse z-transform of X[z]. As in the case the bilateral Laplace transform, if x[n]=Σk i=1 x i [n], then the ROC for X[z] is the intersection of the ROCs (region common to all ROCs) for the transforms X1 [z], X2 [z],...,Xk [z]. The preceding results lead to the conclusion (similar to that for the Laplace transform) that if z=β is the largest magnitude pole for a causal sequence, its ROC is |z| > |β|. If z=α is the smallest magnitude nonzero pole for an anticausal sequence, its ROC is |z| < |α|. REGION OF CONVERGENCE FOR LEFT-SIDED AND RIGHT-SIDED SEQUENCES Let us first consider a finite duration sequence x f [n], defined as a sequence that is nonzero for N 1 ≤ n ≤ N 2 , where both N 1 and N 2 are finite numbers and N 2 > N 1 . Also

For example, if N 1 =−2 and N 2 =1, then

Assuming all the elements in x f [n] are finite, we observe that Xf [z] has two poles at z=∞ because of terms x f [−2]z 2 + x f [−1]z and one pole at z=0 because of term x f [1]/z. Thus, a finite duration sequence could have poles at z=0 and z=∞. Observe that Xf [z] converges for all values of z except possibly z=0 and z = ∞. This means that the ROC of a general signal x[n] + x f [n] is the same as the ROC of x[n] with the possible exception of z=0 and z=∞. A right-sided sequence is zero for n < N 2 < ∞ and a left-sided sequence is zero for n > N 1 > − ∞. A causal sequence is always a right-sided sequence, but the converse is not necessarily true. An anticausal sequence is always a left-sided sequence, but the converse is not necessarily true. A two-sided sequence is of infinite duration and is neither right sided nor left sided. A right-sided sequence x r[n] can be expressed as x r[n]=x c [n] + x f [n], where x c [n] is a causal signal and x f [n] is a finite duration signal. Therefore, the ROC for x r[n] is the same as the ROC for x c [n] except possibly z=∞. If z=β is the largest magnitude pole for a rightsided sequence x r[n], its ROC is |β| < |z| ≤ ∞. Similarly, a left-sided sequence can be expressed as x 1 [n]=x a [n] + x f [n], where x a [n] is an anticausal sequence and x f [n] is a finite duration signal. Therefore, the ROC for x 1 [n] is the same as the ROC for x a [n] except possibly z=0. Thus, if z=α is the smallest magnitude nonzero pole for a left-sided sequence, its ROC is 0 ≤ |z| 2 b. |z| < 0.8 c. 0.8 < |z| < 2 (a)

and

Since the ROC is |z| > 2, both terms correspond to causal sequences and This sequence appears in Fig. 5.28a.

Figure 5.28: Three possible inverse transforms of X[z]. (b) In this case, |z| < 0.8, which is less than the magnitudes of both poles. Hence, both terms correspond to anticausal sequences, and This sequence appears in Fig. 5.28b. (c) In this case, 0.8 < |z| < 2; the part of X[z] corresponding to the pole at 0.8 is a causal sequence, and the part corresponding to the pole at 2 is an anticausal sequence: This sequence appears in Fig. 5.28c. EXERCISE E5.23 Find the inverse z-transform of

Answers INVERSE TRANSFORM BY EXPANSION OF X[Z] IN POWER SERIES OF Z We have

For an anticausal sequence, which exists only for n ≤ −1, this equation becomes We can find the inverse z-transform of X[z] by dividing the numerator polynomial by the denominator polynomial, both in ascending powers of z, to obtain a polynomial in ascending powers of z. Thus, to find the inverse transform of z/(z − 0.5) (when the ROC is |z| < 0.5), we divide z by −0.5 + z to obtain −2z - 4z 2 - 8z 3 - ... Hence, x[−1]=−2, x[−2]=−4, x[−3]=−8, and so on.

5.9-1 Properties of the Bilateral z-Transform Properties of the bilateral z-transform are similar to those of the unilateral transform. We shall merely state the properties here, without Xi [z] proofs, for x i [n] LINEARITY The ROC for a 1 X1 [z] + a 2 X2 [z] is the region common to (intersection of) the ROCs for X1 [z] and X2 [z]

SHIFT

The ROC for X[z]/z m is the ROC for X[z] (except for the addition or deletion of z=0 or z=∞ caused by the factor 1/z m . CONVOLUTION The ROC for X1 [z]X2 [z] is the region common to (intersection of) the ROCs for X1 [z] and X2 [z]. MULTIPLICATION BY γ n

If the ROC for X[z] is |γ 1 | < |z| < |γ 2 |, then the ROC for X[z/γ] is |γγ 1 | < |z| < |γγ 2 |, indicating that the ROC is scaled by the factor |γ|. MULTIPLICATION BY n

The ROC for −z(dX/dz) is the same as the ROC for X[z]. TIME REVERSAL[†] If the ROC for X[z]is |γ| < |z| < |γ| 2 | then the ROC for X[1/z] is 1/γ 1 > |z| > |1/γ 2 |

5.9-2 Using the Bilateral z-Transform for Analysis of LTID Systems Because the bilateral z-transform can handle noncausal signals, we can use this transform to analyze noncausal linear systems. The zero-state response y[n] is given by provided X[z]H[z] exists. The ROC of X[z]H[z] is the region in which both X[z] and H[z] exist, which means that the region is the common part of the ROC of both X[z] and H[z]. EXAMPLE 5.19 For a causal system specified by the transfer function

find the zero-state response to input

The ROC corresponding to the causal term is |z| > 0.8, and that corresponding to the anticausal term is |z| < 2. Hence, the ROC for X[z] is the common region, given by 0.8 < |z| < 2. Hence

Therefore

Since the system is causal, the ROC of H[z] is |z| > 0.5. The ROC of X[z] is 0.8 < |z| < 2. The common region of convergence for X[z] and H[z] is 0.8 < |z| < 2. Therefore

Expanding Y[z] into modified partial fractions yields

Since the ROC extends outward from the pole at 0.8, both poles at 0.5 and 0.8 correspond to causal sequence. The ROC extends in ward from the pole at 2. Hence, the pole at 2 corresponds to anticausal sequence. Therefore

EXAMPLE 5.20 For the system in Example 5.19, find the zero-state response to input

The z-transforms of the causal and anticausal components x 1 [n] and x 2 [n] of the output are

Observe that a common ROC for X1 [z] and X2 [z] does not exist. Therefore X[z] does not exist. In such a case we take advantage of the superposition principle and find y 1 [n] and y 2 [n], the system responses to x 1 [n] and x 2 [n], separately. The desired response y[n] is the sum of y 1 [n] and y 2 [n]. Now

Expanding Y1 [z] and Y2 [z] into modified partial fractions yields

Therefore

and

EXERCISE E5.24 For a causal system in Example 5.19, find the zero-state response to input

Answers

[†] For complex signal x[n], the property is modified, as follows:

5.10 SUMMARY In this chapter we discussed the analysis of linear, time-invariant, discrete-time (LTID) systems by means of the z-transform. The ztransform changes the difference equations of LTID systems into algebraic equations. Therefore, solving these difference equations reduces to solving algebraic equations. The transfer function H[z] of an LTID system is equal to the ratio of the z-transform of the output to the z-transform of the input when all initial conditions are zero. Therefore, if X[z] is the z-transform of the input x[n] and Y[z] is the z-transform of the corresponding output y[n] (when all initial conditions are zero), then Y[z]=H[z]X[z]. For an LTID system specified by the difference equation Q[E]y[n]=P[E]x[n], the transfer function H[z]=P[z]/Q[z]. Moreover, H[z] is the z-transform of the system impulse response h[n]. We

showed in Chapter 3 that the system response to an everlasting exponential z n is H[z]z n .

We may also view the z-transform as a tool that expresses a signal x[n] as a sum of exponentials of the form z n over a continuum of the values of z. Using the fact that an LTID system response to z n is H[z]z n , we find the system response to x[n] as a sum of the

system's responses to all the components of the form z n over the continuum of values of z.

LTID systems can be realized by scalar multipliers, adders, and time delays. A given transfer function can be synthesized in many different ways. We discussed canonical, transposed canonical, cascade, and parallel forms of realization. The realization procedure is identical to that for continuous-time systems with 1/s (integrator) replaced by 1/z (unit delay). In Section 5.8, we showed that discrete-time systems can be analyzed by the Laplace transform as if they were continuous-time systems. In fact, we showed that the z-transform is the Laplace transform with a change in variable. The majority of the input signals and practical systems are causal. Consequently, we are required to deal with causal signals most of the time. Restricting all signals to the causal type greatly simplifies z-transform analysis; the ROC of a signal becomes irrelevant to the analysis process. This special case of z-transform (which is restricted to causal signals) is called the unilateral z-transform. Much of the chapter deals with this transform. Section 5.9 discusses the general variety of the z-transform (bilateral z-transform), which can handle causal and noncausal signals and systems. In the bilateral transform, the inverse transform of X[z] is not unique, but depends on the ROC of X[z]. Thus, the ROC plays a crucial role in the bilateral z-transform.

REFERENCES 1. Lyons, R. G. Understanding Digital Signal Processing. Addison-Wesley, Reading, MA, 1997. 2. Oppenheim, A. V., and R. W. Schafer. Discrete-Time Signal Processing, 2nd ed. Prentice-Hall, Upper Saddle River, NJ, 1999. 3. Mitra, S. K. Digital Signal Processing, 2nd ed. McGraw-Hill, New York, 2001.

MATLAB SESSION 5: DISCRETE-TIME IIR FILTERS Recent technological advancements have dramatically increased the popularity of discrete-time filters. Unlike their continuous-time counterparts, the performance of discrete-time filters is not affected by component variations, temperature, humidity, or age. Furthermore, digital hardware is easily reprogrammed, which allows convenient change of device function. For example, certain digital hearing aids are individually programmed to match the required response of a user. Typically, discrete-time filters are categorized as infinite-impulse response (IIR) or finiteimpulse response (FIR). A popular method to obtain a discrete-time IIR filter is by transformation of a corresponding continuous-time filter design. MATLAB greatly assists this process. Although discrete-time IIR filter design is the emphasis of this session, methods for discrete-time FIR filter design are considered in MATLAB Session 9.

M5.1 Frequency Response and Pole-Zero Plots Frequency response and pole-zero plots help characterize filter behavior. Similar to continuoustime systems, rational transfer functions for realizable LTID systems are represented in the z-domain as

When only the first (N 1 + 1) numerator coefficients are nonzero and only the first (N 2 + 1) denominator coefficients are nonzero, Eq. (M5.1) simplifies to

The form of Eq. (M5.2) has many advantages. It can be more efficient than Eq. (M5.1); it still works when N 1 =N 2 =N; and it more closely conforms to the notation of built-in MATLAB discrete-time signal processing functions. The right-hand side of Eq. (M5.2) is a form that is convenient for MATLAB computations. The frequency response H(e jΩ) is obtained by

letting z=e jΩ, where Ω. has units of radians. Often, Ω=ωT, where ω is the continuous-time frequency in radians per second and T is the sampling period in seconds. Defining length-(N 2 + 1) coefficient vector A=[a 0 , a 1 ,...,a N2 ] and length-(N 1 + 1) coefficient vector B=[b 0 , b 1 ,..., b N1 ], program MS 5P1 computes H(e jΩ) by using Eq. (M5.2) for each frequency in the input vector Ω. function [H]=MS5P1 (B,A,Omega); % MS5P1.m : MATLAB Session 5, Program 1 % Function M-file computes frequency response for LTID systems % INPUTS: B=vector of feedforward coefficients % A=vector of feedback coefficients % Omega=vector of frequencies [rad], typically - pi=pi % OUTPUTS: H=frequency response N_1=length(B)-1; N_2=length(A)-1; H=polyval(B,exp(j*Omega))./polyval(A,exp(j*Omega)).*exp(j*Omega*(N 2-N 1)); Note that owing to MATLAB's indexing scheme, A(k) corresponds to coefficient a k−1 and B(k) corresponds to coefficient b k−1 . It is also possible to use the signal processing toolbox function freqz to evaluate the frequency response of a system described by Eq. (M5.2). Under special circumstances, the control system toolbox function bode can also be used. Program MS5P2 computes and plots the poles and zeros of an LTID system described by Eq. (M5.2) again using vectors B and A. function [p,z]=MS5P2(B,A); % MS5P2.m : MATLAB Session 5, Program 2 % Function M-file computes and plots poles and zeros for LTID systems % INPUTS: B=vector of feedforward coefficients % A=vector of feedback coefficients N_1=length(B)-1; N_2=length(A)-1; p=roots ([A, zeros (1,N_1-N_2)]); z=roots([B, zeros(1,N_2-N_1)]); ucirc=exp(j*linspace(0,2*pi,200)); % Compute unit circle for pole-zero plot plot(real(p),imag(p), 'xk',real (z),imag(z), 'ok',real(ucirc), imag(ucirc),'k:'); xlabel('Real'); ylabel('Imaginary'); ax=axis; dx=0.05*(ax(2)-ax(1)); dy=0.05 * (ax(4)-ax (3)); axis(ax+[-dx,dx,-dy,dy]);

The right-hand side of Eq. (M5.2) helps explain how the roots are computed. When N 1 ≠ N 2 , the term z N2 −N1 implies additional roots at the origin. If N 1 > N 2 , the roots are poles, which are added by concatenating A with zeros (N_1-N_2, 1); since N 2 − N 2 N 1 ≤ 0, zeros (N_2-N_1,1) produces the empty set and B is unchanged. If N 2 > N 1 , the roots are zeros, which are added by concatenating B with zeros (N_2-N_1,1); since N 1 − N 2 ≤ 0, zeros (N_1-N_2,1) produces the empty set and A is unchanged. Poles and zeros are indicated with black x's and o's, respectively. For visual reference, the unit circle is also plotted. The last line in MS5P2 expands the plot axis box so that root locations are not obscured.

M5.2 Transformation Basics Transformation of a continuous-time filter to a discrete-time filter begins with the desired continuous-time transfer function

As a matter of convenience, H(s) is represented in factored form as

where z k and p k are the system poles and zeros, respectively. A mapping rule converts the rational function H(s) to a rational function H[z]. Requiring that the result be rational ensures that the system realization can proceed with only delay, sum, and multiplier blocks. There are many possible mapping rules. For obvious reasons, good transformations tend to map the ω axis to the unit circle, ω=0 to z=1, ω=∞ to z=−1, and the left half-plane to the interior of the unit circle. Put another way, sinusoids map to sinusoids, zero frequency maps to zero frequency, high frequency maps to high frequency, and stable systems map to stable systems. Section 5.8 suggests that the z-transform can be considered to be a Laplace transform with a change of variable z=e sT or s=(1/T) In z, where T is the sampling interval. It is tempting, therefore, to convert a continuous-time filter to a discrete-time filter by substituting

s=(1/T) In z into H(s), or H[z]=H(s)| s=1/T)ln z . Unfortunately, this approach is impractical since the resulting H[z] is not rational and therefore cannot be implemented by using standard blocks. Although not considered here, the so-called matched-z transformation relies on the relationship z=e sT to transform system poles and zeros, so the connection is not completely without merit.

M5.3 Transformation by First-Order Backward Difference Consider the transfer function H(s)=Y(s)/X(s)=s, which corresponds to the first-order continuous-time differentiator

An approximation that resembles the fundamental theorem of calculus is the first-order backward difference

For sampling interval T and t=nT, the corresponding discrete-time approximation is

which has transfer function

This implies a transformation rule that uses the change of variable s=(1 − z −1 )/T or z=1/(1 − sT). This transformation rule is appealing since the resulting H[z] is rational and has the same number of poles and zeros as H(s). Section 3.4 discusses this transformation strategy in a different way in describing the kinship of difference equations to differential equations. After some algebra, substituting s=(1 − z −1 )/T into Eq. (M5.3) yields

The discrete-time system has M zeros at 1/(1 − Tz k ) and N poles at 1/(1 − Tp k ). This transformation rule preserves system stability but does not map the ω axis to the unit circle (see Prob. 5.7-9). MATLAB program MS5P3 uses the first-order backward difference method of Eq. (M5.4) to convert a continuous-time filter described by coefficient vectors A=[a 0 , a 1 ,...,a N] and B=[b N-M , b N-M+ 1 ,...,b N] into a discrete-time filter. The form of the discrete-time filter follows Eq. (M5.2). function [Bd,Ad]=MS5P3(B,A,T); % MS5P3.m : MATLAB Session 5, Program 3 % Function M-file first-order backward difference transformation % of a continuous-time filter described by B and A into a discrete-time filter. % INPUTS: B=vector of continuous-time filter feedforward coefficients % A=vector of continuous-time filter feedback coefficients % T=sampling interval % OUTPUTS: Bd=vector of discrete-time filter feedforward coefficients % Ad=vector of discrete-time filter feedback coefficients z=roots(B); p=roots(A); % s-domain roots gain=B(1)/A(1)*prod(1/T-z)/prod(1/T-p); zd=1./(1-T*z); pd=1./(1-T*p); % z-domain roots Bd=gain * poly(zd); Ad=poly(pd);

M5.4 Bilinear Transformation The Bilinear transformation is based on a better approximation than first-order backward differences. Again, consider the continuoustime integrator

Represent signal x(t) as

Letting t=nT and replacing the integral with a trapezoidal approximation yields

Substituting y(t) for (d/dt)x(t), the equivalent discrete-time system is

From z-transforms, the transfer function is

The implied change of variable s=2(1 − z −1 )/T(1 + z −1 ) or z=(1 + sT/2)/(1 − sT/2) is called the bilinear transformation. Not only does the bilinear transformation result in a rational function H[z], the ω-axis is correctly mapped to the unit circle (see Prob. 5.6-11a). After some algebra, substituting s=2(1 − z −1 )/T(1 + z −1 ) into Eq. (M5.3) yields

In addition to the M zeros at (1 + z k T/2)/(1 − z k T/2) and N poles at (1 + p k T/2)/(1 − p k T/2), there are N − M zeros at minus one. Since practical continuous-time filters require M ≤ N for stability, the number of added zeros is thankfully always nonnegative. MATLAB program MS5P4 converts a continuous-time filter described by coefficient vectors A=[a 0 , a 1 ,...,a N] and B=[b N-M b N-M+1,...,b N] into a discrete-time filter by using the bilinear transformation of Eq. (M5.5). The form of the discrete-time filter follows Eq. (M5.2). If available, it is also possible use the signal processing toolbox function bilinear to perform the bilinear transformation. function [Bd,Ad]=MS5P4(B,A,T); % MS5P4.m : MATLAB Session 5, Program 4 % Function M-file bilinear transformation of a continuous-time filter % described by vectors B and A into a discrete-time filter. % Length of B must not exceed A. % INPUTS: B=vector of continuous-time filter feedforward coefficients % A=vector of continuous-time filter feedback coefficients % T=sampling interval % OUTPUTS: Bd=vector of discrete-time filter feedforward coefficients % Ad=vector of discrete-time filter feedback coefficients if (length(B) > length(A)), disp ('Numerator order must not exceed denominator order.); return end z=roots(B); p=roots(A); % s-domain roots gain=real (B(1)/A(1)*prod(2/T-z)/prod(2/T-p)); zd=(1+z*T/2)./(1-z*T/2); pd=(1+p*T/2)./(1-p*T/2); % z-domain roots Bd=gain*poly([zd;-ones(length(A)-length(B),1)]); Ad=poly(pd); As with most high-level languages, MATLAB supports general if-structures: if expression, statements; elseif expression, statements; else, statements; end In this program, the if statement tests M > N. When true, an error message is displayed and the return command terminates program execution to prevent errors.

M5.5 Bilinear Transformation with Prewarping The bilinear transformation maps the entire infinite-length ω axis onto the finite-length unit circle (z=e iΩ) according to ω=(2/T) tan (Ω/2) (see Prob. 5.6-11b). Equivalently, Ω=2 arctan (ωT/2). The nonlinearity of the tangent function causes a frequency compression, commonly called frequency warping, that distorts the transformation. To illustrate the warping effect, consider the bilinear transformation of a continuous-time lowpass filter with cutoff frequency ωc =2π3000 rad/s. If the target digital system uses a sampling rate of 10kHz, then T=1/(10,000) and ωc maps to Ω c =2 arctan (ωc T/2)=1.5116. Thus, the transformed cutoff frequency is short of the desired Ω c =ωc T=0.6π=1.8850. Cutoff frequencies are important and need to be as accurate as possible. By adjusting the parameter T used in the bilinear transform, one continuous-time frequency can be exactly mapped to one discrete-time frequency; the process is called prewarping. Continuing the

last example, adjusting T=(2/ωc ) tan (Ω c /2) ≈ 1/6848 achieves the appropriate prewarping to ensure ωc =2π3000 maps to Ω c =0.6π.

M5.6 Example: Butterworth Filter Transformation To illustrate the transformation techniques, consider a continuous-time 10th-order Butterworth lowpass filter with cutoff frequency ωc =2π3000, as designed in MATLAB Session 4. First, we determine continuous-time coefficient vectors A and B. >> >> >> >>

omega.c=2*pi*3000; N=10; poles=roots([(j*omega.c)^(-2*N), zeros(1,2*N-1),1]); poles=poles(find(poles> Omega=linspace(0,pi,200); T=1/10000; Omega.c=omega=c*T; >> [B1,A1]=MS5P3(B,A,T); % First-order backward difference transformation >> [B2,A2]=MS5P4(B,A,T); % Bilinear transformation >> [B3,A3]=MS5P4 (B,A,2/omega=c*tan (Omega=c/2)) ; % Bilinear with prewarping Magnitude responses are computed by using MS5P1 and then plotted. >> Hlmag=abs(MS5P1(B1,A1,Omega)); >> H2mag=abs(MS5P1(B2,A2,Omega)); >> H3mag=abs(MS5P1(B3,A3,Omega)); >> plot(Omega,(Omega> axis([0 pi -.05 1.5]); >> xlabel('/Omega [rad]'); ylabel('Magnitude Response'); >> legend('Ideal','First-Order Backward Difference',... 'Bilinear','Bilinear with Prewarping'); The result of each transformation method is shown in Fig. M5.1.

Figure M5.1: Comparison of various transformation techniques. Although the first-order backward difference results in a lowpass filter, the method causes significant distortion that makes the resulting filter unacceptable with regard to cutoff frequency. The bilinear transformation is better, but, as predicted, the cutoff frequency falls short of the desired value. Bilinear transformation with prewarping properly locates the cutoff frequency and produces a very acceptable filter response.

M5.7 Problems Finding Polynomial Roots Numerically, it is difficult to accurately determine the roots of a polynomial. Consider, for example, a simple polynomial that has a root at minus one repeated four times, (s + 1) 4 =s 4 + 4s 3 + 6s 2 + 4s + 1. The MATLAB roots command returns a surprising result: >> roots ([1 4 6 4 1]) ans= -1.0002 -1.0000 -0.0002i -1.0000 + 0.0002i -0.9998 Even for this low-degree polynomial, MATLAB does not return the true roots. The problem worsens as polynomial degree increases. The bilinear transformation of the 10th-order Butterworth filter, for example, should have 10 zeros at minus one. Figure M5.2 shows that the zeros, computed by MS5P2 with the roots command, are not correctly located.

Figure M5.2: Pole-zero plot computed by using roots. When possible, programs should avoid root computations that may limit accuracy. For example, results from the transformation programs MS5P3 and MS5P4 are more accurate if the true transfer function poles and zeros are passed directly as inputs rather than the polynomial coefficient vectors. When roots must be computed, result accuracy should always be verified.

M5.8 Using Cascaded Second-Order Sections to Improve Design The dynamic range of high-degree polynomial coefficients is often large. Adding the difficulties associated with factoring a high-degree polynomial, it is little surprise that high-order designs are difficult. As with continuous-time filters, performance is improved by using a cascade of second-order sections to design and realize a discretetime filter. Cascades of second-order sections are also more robust to the coefficient quantization that occurs when discrete-time filters are implemented on fixed-point digital hardware. To illustrate the performance possible with a cascade of second-order sections, consider a 180th-order transformed Butterworth discrete-time filter with cutoff frequency Ω c =0.6 π ≈ 1.8850. Program MS5P5 completes this design, taking care to initially locate poles and zeros without root computations. % MS5P5.m : MATLAB Session 5, Program 5 % Script M-file designs a 180th-order Butterworth lowpass discrete-time filter % with cutoff Omega.c=0.6*pi using 90 cascaded second-order filter sections. omega_0=1; % Use normalized cutoff frequency for analog prototype psi=[0.5:1:90]*pi/180; % Butterworth pole angles Omega.c=0.6*pi; % Discrete-time cutoff frequency Omega=linspace(0,pi,1000); % Frequency range for magnitude response Hmag=zeros(90,1000); p=zeros(1,180); z=zeros(1,180); % Pre-allocation for stage=1:90, Q=1/(2*cos (psi (stage))); % Compute Q for stage B = omega_0^2; A=[1 omega_0/Q omega_0^2]; % Compute stage coefficients [B1,A1]=MS5P4 (B,A, 2/omega_0*tan(0.6*pi/2)); % Transform stage to DT p(stage*2-1:stage*2)=roots(A1); % Compute z-domain poles for stage z(stage*2-1:stage*2)=roots(B1); % Compute z-domain zeros for stage Hmag(stage,:)=abs(MS5P1(B1,A1,Omega)); % Compute stage mag response end ucirc=exp(j*linspace(0,2*pi,200)); % Compute unit circle for pole-zero plot figure; plot(real(p),imag(p),'kx',real(z),imag(z),'ok',real(ucirc),imag(ucirc), 'k:'); axis equal; xlabel('Real'); ylabel('Imaginary'); figure; plot(Omega,Hmag,'k'); axis tight xlabel('\Omega [rad]'); ylabel('Magnitude Response'); figure; plot(Omega,prod(Hmag),'k'); axis([0 pi -0.05 1.05]); xlabel('\Omega [rad]'); ylabel('Magnitude Response'); The figure command preceding each plot command opens a separate window for each plot. The filter's pole-zero plot is shown in Fig. M5.3, along with the unit circle, for reference. All 180 zeros of the cascaded design are properly located at minus one. The wall of poles provides an amazing approximation to the desired brick-wall response, as shown by the magnitude response in Fig. M5.4. It is virtually impossible to realize such high-order designs with continuous-time filters, which adds another reason for the popularity of discrete-time filters. Still, the design is not trivial; even functions from the MATLAB signal processing toolbox fail to properly design such a high-order discrete-time Butterworth filter!

Figure M5.3: Pole-zero plot for 180th-order discrete-time Butterworth filter.

Figure M5.4: Magnitude response for a 180th-order discrete-time Butterworth filter.

PROBLEMS 5.1.1

5.1.2

Using the definition, compute the z-transform of x[n] = (−1) n (u[n] − u[n − 8]). Sketch the poles and zeros of X(z) in the z plane. No calculator is needed to do this problem! Using the definition of the z-transform, find the z-transform and the ROC for each of the following signals. a. u[n − m] b. γ n sin π nu[n] c. γ n cos π nu[n] d. e.

f. g. γ n−1 u[n−1] h. nγ n u[n]

i. nu[n] j. k. [2n−1 − (−2) n−1 ]u[n] l.

5.1.3

5.1.4

Showing all work, evaluate Σ∞n=0 n(3/2)−n Using only the z-transforms of Table 5.1, determine the z-transform of each of the following signals. a. u[n] − u[n − 2] b. γ n−2 u[n−2] c. 2 n+1 u[n − 1] + e n−1 u[n] d. e. nγ n u[n − 1] f. n(n − 1)(n − 2) 2 n −3 u[n − m] for m = 0,1,2,3 g. (− 1) n nu[n]

5.1.5

h. Find the inverse z-transform of the following: a.

b.

c.

d.

e.

f.

g.

h.

i.

j.

k.

l.

5.1.6

a. Expanding X[z] as a power series in z −1 , find the first three terms of x[n] if

b. Extend the procedure used in part (a) to find the first four terms of x[n] if

5.1.7

5.1.8

Find x[n] by expanding

as a power series in z −1 . a. In Table 5.1, if the numerator and the denominator powers of X[z] are M and N, respectively, explain why in some cases N − M = 0, while in others N − M − 1 or N − M = m (m any positive integer). b. Without actually finding the z-transform, state what is N − M for X[z] corresponding to x[n] = y n u[n − 4]

5.2.1

For a discrete-time signal shown in Fig. P5.2-1 show that

Figure P5.2-1

5.2.2

Find your answer by using the definition in Eq. (5.1) and by using Table 5.1 and an appropriate property of the ztransform. Find the z-transform of the signal illustrated in Fig. P5.2-2. Solve this problem in two ways, as in Examples 5.2d and 5.4. Verify that the two answers are equivalent.

Figure P5.2-2

5.2.3

Using only the fact that y n u[n] following:

z/(z − y) and properties of the z-transform, find the z-transform of each of the

a. n 2 u[n] b. n 2 y n u[n] c. n 3 u[n] d. a n [u[n] − u[n − m]] e. ne −2n u[n − m]

5.2.4

5.2.5

5.2.6

5.2.7

f. (n − 2) (0.5)n−3 u[n − 4] Using only pair 1 in Table 5.1 and appropriate properties of the z-transform, derive iteratively pairs 2 through 9. In other words, first derive pair 2. Then use pair 2 (and pair 1, if needed) to derive pair 3, and so on. Find the z-transform of cos (πn/4) u[n] using only pairs 1 and 1 lb in Table 5.1 and a suitable property of the ztransform. Apply the time-reversal property to pair 6 of Table 5.1 to show that y n u[/(n + 1)] |z| < |y|. a. If x[n]

X[z], then show that (−1) n x[n]

b. Use this result to show that (−y) n u[n]

−z/(z-y) and the ROC is given by

X[ − z]. z/(z + y).

c. Use these results to find the z-transform of i. [2n−1 − (−2) n−1 ]u[n] ii. y n cos πnu[n]

5.2.8

5.2.9

a. If x[n]

X[z], then show that

b. Use this result to derive pair 2 from pair 1 in Table 5.1. A number of causal time-domain functions are shown in Fig. P5.2-9.

Figure P5.2-9: Various causal time-domain functions. List the function of time that corresponds to each of the following functions of z. Few or no calculations are necessary! Be careful, the graphs may be scaled differently.

a.

b.

c.

d.

e.

f.

g.

h. i.

j. 5.3.1

5.3.2

Solve Prob. 3.8-16 by the z-transform method. a. Solve when y[0] = 1 and x[n] = e −(n−1)u[n]

5.3.3

b. Find the zero-input and the zero-state components of the response. a. Find the output y[n] of an LTID system specified by the equation

if the initial conditions are y[−1] = 0, y[−2] = 1, and the input x[n] = (4)−n =u[n]. b. Find the zero-input and the zero-state components of the response.

5.3.4

5.3.5

c. Find the transient and the steady-state components of the response. Solve Prob. 5.3-3 if instead of initial conditions y[−1], y[−2] you are given the auxiliary conditions y[0] = 3/2 and y[1] = 35/4. a. Solve with y[−1] = 0, y[−2] = 1, and x[n] = u[n]. b. Find the zero-input and the zero-state components of the response.

5.3.6

5.3.7

5.3.8

5.3.9

5.3.10

5.3.11

c. Find the transient and the steady-state components of the response. Solve if y[−1] = 2y[−2] = 3, and x[n] = (3)n u[n]. Solve with y[−1] = 1, y[−2] = 0, and x[n] = u[n]. Solve

with y[0] = 0, y[1] = 1, and x[n] = e n u[n]. A system with impulse response h[n] = 2(⅓) n u[n − 1] produces an output y[n] = (−2) n u[n − 1]. Determine the corresponding input x[n]. Sally deposits $100 into her savings account on the first day of every month except for each December, when she uses her money to buy holiday gifts. Define b[m] as the balance in Sally's account on the first day of month m. Assume Sally opens her account in January (m = 0), continues making monthly payments forever (except each December!), and that her monthly interest rate is 1%. Sally's account balance satisfies a simple difference equation b[m] = (1.01)b[m − 1] + p[m], where p[m] designates Sally's monthly deposits. Determine a closed-form expression for b[m] that is only a function of the month m. For each impulse response, determine the number of system poles, whether the poles are real or complex, and whether the system is BIBO stable. a. h 1 [n] = (−1 + (0.5)n )u[n]

5.3.12

5.3.13

5.3.14

b. h 2 [n] = (j) n (u[n] − u[n−10]) Find the following sums:

[Hint: Consider a system whose output y[n] is the desired sum. Examine the relationship between y[n] and y[n - 1]. Note also that y[0] = 0.] Find the following sum:

[Hint: See the hint for Prob. 5.3-12.] Find the following sum:

[Hint: See the hint for Prob. 5.3-12.]

5.3.15

Redo Prob. 5.3-12 using the result in Prob. 5.2-8a.

5.3.16

Redo Prob. 5.3-13 using the result in Prob. 5.2-8a.

5.3.17

Redo Prob. 5.3-14 using the result in Prob. 5.2-8a.

5.3.18

a. Find the zero-state response of an LTID system with transfer function

and the input x[n] = e (n+1)u[n].

5.3.19

5.3.20

b. Write the difference equation relating the output y[n] to input x[n]. Repeat Prob. 5.3-18 for x[n] = u[n] and

Repeat Prob. 5.3-18 for

and the input x[n] is a. (4)−n [n] b. (4)−(n−2)u[n−2] c. (4)−(n−2)u[n]

5.3.21

5.3.22

5.3.23

d. (4)−n u[n−2] Repeat Prob. 5.3-18 for x[n] = u[n] and

Find the transfer functions corresponding to each of the systems specified by difference equations in Probs. 5.3-2, 5.33, 5.3-5, and 5.3-8. Find h[n], the unit impulse response of the systems described by the following equations: a. y[n] + 3y[n − 1] + 2y[n − 2] = x[n] + 3x[n − 1] + 3x[n − 2] b. y[n + 2] + 2y[n + 1] + y[n] = 2x[n + 2] − x[n + 1]

c. y[n] − y[n − 1] + 0.5y[n − 2] = x[n] + 2x[n − 1]

5.3.24

Find h[n], the unit impulse response of the systems in Probs. 5.3-18, 5.3-19, and 5.3-21.

5.3.25

A system has impulse response h[n] = u[n − 3].

a. Determine the impulse response of the inverse system h −1 [n]. b. Is the inverse stable? Is the inverse causal? c. Your boss asks you to implement h −1 [n] to the best of your ability. Describe your realizable design, taking care to identify any deficiencies. 5.4.1

A system has impulse response given by

This system can be implemented according to Fig. P5.4-1. a. Determine the coefficients A1 and A2 to implement h[n] using the structure shown in Fig. P5.4-1. b. What is the zero-state response y 0 [n] of this system, given a shifted unit step input x[n] = u[n + 3]?

5.4.2

5.4.3

5.4.4

5.4.5

5.4.6

5.4.7

5.4.8

5.4.9

5.5.1

Figure P5.4-1: Structure to implement h[n]. a. Show the canonic direct form, a cascade and, a parallel realization of

b. Find the transpose of the realizations obtained in part (a). Repeat Prob. 5.4-2 for

Repeat Prob. 5.4-2 for

Repeat Prob. 5.4-2 for

Repeat Prob. 5.4-2 for

Realize a system whose transfer function is

Realize a system whose transfer function is given by

This problem demonstrates the enormous number of ways of implementing even a relatively low-order transfer function. A second-order transfer function has two real zeros and two real poles. Discuss various ways of realizing such a transfer function. Consider canonic direct, cascade, parallel, and the corresponding transposed forms. Note also that interchange of cascaded sections yields a different realization. Find the amplitude and phase response of the digital filters depicted in Fig. P5.5-1.

5.5.2

Figure P5.5-1 Find the amplitude and the phase response of the filters shown in Fig. P5.5-2. [Hint: Express H[e jΩ] as e −j2.5Ω

H a [e jΩ].]

5.5.3

Figure P5.5-2 Find the frequency response for the moving-average system in Prob. 3.4-3. The input-output equation of this system is given by

5.5.4

a. Input-output relationships of two filters are described by i. y[n] = −0.9y[n − 1] + x[n] ii. y[n] = 0.9y[n − 1] + x[n] For each case, find the transfer function, the amplitude response, and the phase response. Sketch the amplitude response, and state the type (highpass, lowpass, etc.) of each filter.

5.5.5

b. Find the response of each of these filters to a sinusoid x[n] = cosΩn for Ω = 0.01π and 0.99π. In general show that the gain (amplitude response) of the filter (i) at frequency Ω 0 is the same as the gain of the filter (ii) at frequency π − Ω 0 For an LTID system specified by the equation a. Find the amplitude and the phase response.

5.5.6

b. Find the system response y[n] for the input x[n] = cos (0.5k − (π/3)). For an asymptotically stable LTID system, show that the steady-state response to input e jΩn u[n] is H[e j Ω]e jΩnu[n]. The steady-state response is that part of the response which does not decay with time and persists forever.

5.5.7

Express the following signals in terms of apparent frequencies. a. cos(0.8πn + θ) b. sin(1.2πn + θ) c. cos(6.9n + θ) d. cos(2.8πn + θ) + 2 sin (3.7πn + θ) e. sinc(πn/2) f. sinc(3πn/2)

5.5.8

5.5.9

5.5.10

g. sinc(2πn) Show that cos (0.6πn + (π/6)) + √3 cos (1.4πn + (π/3)) = 2 cos (0.6πn − (π/6)). a. A digital filter has the sampling interval T = 50 μs. Determine the highest frequency that can be processed by this filter without aliasing. b. If the highest frequency to be processed is 50 kHz, determine the minimum value of the sampling and the maximum value of the sampling interval T that can be used. frequency Consider the discrete-time system represented by

a. Determine and plot the magnitude response |H(e j Ω)| of the system. b. Determine and plot the phase response ∠H(e j Ω) of the system. c. Find an efficient block representation that implements this system. 5.6.1

Pole-zero configurations of certain filters are shown in Fig. P5.6-1. Sketch roughly the amplitude response of these filters.

Figure P5.6-1

5.6.2

5.6.3

The system y[n] − y[n − 1] = x[n] − x[n − 1] is an all-pass system that has zero phase response. Is there any difference between this system and the system y[n] = x[n]? Justify your answer. The magnitude and phase responses of a real, stable, LTI system are shown in Fig. P5.6-3. a. What type of system is this: lowpass, high-pass, bandpass, or bandstop? b. What is the output of this system in response to

c. What is the output of this system in response to

Figure P5.6-3: Frequency response of a real, stable, LTI system.

5.6.4

Do Prob. 5.M-1 by graphical procedure. Do the sketches approximately, without using MATLAB.

5.6.5

Do Prob. 5.M-4 by graphical procedure. Do the sketches approximately, without using MATLAB.

5.6.6

a. Realize a digital filter whose transfer function is given by

b. Sketch the amplitude response of this filter, assuming |a| < 1.

5.6.7

c. The amplitude response of this lowpass filter is maximum at Ω = 0. The 3 dB bandwidth is the frequency at which the amplitude response drops to 0.707 (or 1 /√2) times its maximum value. Determine the 3 dB bandwidth of this filter when a = 0.2. Design a digital notch filter to reject frequency 5000 Hz completely and to have a sharp recovery on either side of 5000 Hz to a gain of unity. The highest frequency to be processed is 20 kHz

. [Hint: See Example 5.15.

The zeros should be at e ±j ωT for ω corresponding to 5000 Hz, and the poles are at ae ±j ωT with a < 1. Leave your

5.6.8

answer in terms of a. Realize this filter using the canonical form. Find the amplitude response of the filter.]

Show that a first-order LTID system with a pole at z = r and a zero at z = 1/r (r ≤ 1) is an allpass filter. In other words,

show that the amplitude response |H[e j Ω]| of a system with the transfer function

is constant with frequency. This is a first-order allpass filter. [Hint: Show that the ratio of the distances of any point on the unit circle from the zero (at z = 1/r) and the pole (at z = r) is a constant 1/r.] Generalize this result to show that an LTID system with two poles at z = re ±jθ and two zeros at z = (1/r)e ±jθ (r ≤ 1) is an allpass filter. In other words, show that the amplitude response of a system with the transfer function

5.6.9

is constant with frequency. a. If h 1 [n] and h 2 [n], the impulse responses of two LTID systems are related by h 2 [n] = (−1) n h 1 ,[n], then show that

How are the frequency response spectrum H 2 [e jΩ] related to the H 1 [e jΩ]. b. If H 1 [z] represents an ideal lowpass filter with cutoff frequency Ω c , sketch H 2 [e jΩ]. What type of filter is

5.6.10

H 2 [e jΩ]?

Mappings such as the bilinear transformation are useful in the conversion of continuous-time filters to discrete-time filters. Another useful type of transformation is one that converts a discrete-time filter into a different type of discretetime filter. Consider a transformation that replaces z with −z. a. Show that this transformation converts lowpass filters into highpass filters and highpass filters into lowpass filters.

5.6.11

b. If the original filter is an FIR filter with impulse response h[n], what is the impulse response of the transformed filter? The bilinear transformation is defined by the rules s = 2(1 -z − )T(1+z -1 ). a. Show that this transformation maps the ω axis in the s plane to the unit circle z = e jΩ in the z plane. b. Show that this transformation maps Ω to 2 arctan(ωT/2).

5.7.1

5.7.2

5.7.3

5.7.4

5.7.5

In Chapter 3, we used another approximation to find a digital system to realize an analog system. We showed that an analog system specified by Eq. (3.15a) can be realized by using the digital system specified by Eq. (3.15c). Compare that solution with the one resulting from the impulse invariance method. Show that one result is a close approximation of the other and that the approximation improves as T → 0. a. Using the impulse invariance criterion, design a digital filter to realize an analog filter with transfer function

b. Show a canonical and a parallel realization of the filter. Use the 1% criterion for the choice of T. Use the impulse invariance criterion to design a digital filter to realize the second-order analog Butterworth filter with transfer function

Use the 1% criterion for the choice of T. Design a digital integrator using the impulse invariance method. Find and give a rough sketch of the amplitude response, and compare it with that of the ideal integrator. If this integrator is used primarily for integrating audio signals (whose bandwidth is 20 kHz), determine a suitable value for T. An oscillator by definition is a source (no input) that generates a sinusoid of a certain frequency ω0 . Therefore an oscillator is a system whose zero-input response is a sinusoid of the desired frequency. Find the transfer function of a digital oscillator to oscillate at 10 kHz by the methods described in parts a and b. In both methods select T so that there are 10 samples in each cycle of the sinusoid. a. Choose H [z] directly so that its zero-input response is a discrete-time sinusoid of frequency Ω = ωT corresponding to 10 kHz. b. Choose H a (s) whose zero-input response is an analog sinusoid of 10 kHz. Now use the impulse invariance method to determine H[z].

5.7.6

c. Show a canonical realization of the oscillator. A variant of the impulse invariance method is the step invariance method of digital filter synthesis. In this method, for a given H a (s), we design H[z] in Fig. 5.22a such that y(nT) in Fig. 5.22b is identical to y[n] in Fig. 5.22a when x(t) = u(t). a. Show that in general

b. Use this method to design H[z] for

c. Use the step invariant method to synthesize a discrete-time integrator and compare its amplitude response with that of the ideal integrator.

5.7.7

Use the ramp-invariance method to synthesize a discrete-time differentiator and integrator. In this method, for a given H a (s), we design H[z] such that y(nT) in Fig. 5.22b is identical to y[n] in Fig. 5.22a when x(t) = tu(t).

5.7.8

In an impulse invariance design, show that if H a (s) is a transfer function of a stable system, the corresponding H[z] is also a transfer function of a stable system.

5.7.9

First-order backward differences provide the transformation rule s = (1− z −1 )/T a. Show that this transformation maps the ω axis in the s plane to a circle of radius 1/2 centered at (1/2, 0) in the z plane. b. Show that this transformation maps the left-half s plane to the interior of the unit circle in the z plane, which ensures that stability is preserved.

5.9.1

Find the z-transform (if it exists) and the corresponding ROC for each of the following signals: a. (0.8)n u[n] + 2 n u[− (n + 1)] b. 2 n u[n]−3 n u[−(n + 1)] c. (0.8)n u[n] + (0.9)n u[− (n + 1)] d. [(0.8) n + 3(0.4)n u[− (n + 1)] e. [(0.8) n + 3(0.4)n ]u[n] f. (0.8)n u[n] + 3(0.4)n u[− n + 1)] g. (0.5)|n|

5.9.2

h. n u[-(n + 1)] Find the inverse z-transform of

when the ROC is a. |z > 2 b. e −2 < |z| < 2

5.9.3

5.9.4

c. |z| < e -2 Use partial fraction expansions, z-transform tables, and a region of convergence (|z| < 1/2) to determine the inverse ztransform of

Consider the system

a. Draw the pole-zero diagram for H(z) and identify all possible regions of convergence.

5.9.5

b. Draw the pole-zero diagram for H −1 (z) and identify all possible regions of convergence. A discrete-time signal x[n] has a rational z-transform that contains a pole at z = 0.5. Given x 1 [n] = (⅓) n x[n] is absolutely

summable and x 2 [n] = (1/4)n x[n] is NOT absolutely summable, determine whether x[n] is left sided, right sided, or two sided. Justify your answer!

5.9.6

Let x[n] be an absolutely summable signal with rational z-transform X(z). X(z) is known to have a pole at z = (0.75 + 0.75j), and other poles may be present. Recall that an absolutely summable signal satisfies Σ∞−∞ |x[n]| < ∞. a. Can x[n] be left sided? Explain. b. Can x[n] be right sided? Explain. c. Can x[n] be two sided? Explain.

5.9.7

d. Can x[n] be of finite duration? Explain. Consider a causal system that has transfer function

When appropriate, assume initial conditions of zero. a. Determine the output y 1 [n] of this system in response to x 1 [n]=(3/4)n u[n].

5.9.8

5.9.9

b. Determine the output y 2 [n] of this system in response to x 2 =(3/4) n . Letx[n]=(−1) n u[n−n 0 ]+α n u[−n]. Determine the constraints on the complex number α and the integer n 0 so that the ztransform X(z) exists with region of convergence 1 < |z| < 2. Using the definition, compute the bilateral z-transform, including the region of convergence (ROC), of the following complex-valued functions: a. x 1 [n] = (− j) − n u[−n] + δ[−n] b. x 2 [n] = (j) n cos (n + 1)u[n] c. x 3 [n] = j sinh[n] u[−n+1]

5.9.10

d. x 4 [n] = Σ0 k=−∞ (2j)n δ[n −2k] Use partial fraction expansions, z-transform tables, and a region of convergence (0.5 < |z| < 2) to determine the inverse z-transform of

a.

b.

5.9.11

Use partial fraction expansions, z-transform tables, and the fact that the systems are stable to determine the inverse ztransform of

a.

b.

5.9.12

5.9.13

By inserting N zeros between every sample of a unit step, we obtain a signal

Determine H(z), the bilateral z-transform of h[n]. Identify the number and location(s) of the poles of H(z). Determine the zero-state response of a system having a transfer function

and an input x[n] given by a. xn[n]= e n u[n] b. xn[n]= 2 n u[− (n+1)]

5.9.14

c. xn[n]=e n u[n]+2 n [− (n+1)]] For the system in Prob. 5.9-13, determine the zero-state response for the input

5.9.15

For the system in Prob. 5.9-13, determine the zero-state response for the input

5.m.1

Consider an LTID system described by the difference equation 4y[n + 2] − y[n] = x[n + 2]+x[n]. a. Plot the pole-zero diagram for this system. b. Plot the system's magnitude response |H(e jΩ)|over-π≤Ω≤π. c. What type of system is this: lowpass, high-pass, bandpass, or bandstop? d. Is this system stable? Justify your answer. e. Is this system real? Justify your answer. f. If the system input is of the form x[n]=cos (Ωn), what is the greatest possible amplitude of the output? Justify your answer.

5.m.2

g. Draw an efficient, causal implementation of this system using only add, scale, and delay blocks. One interesting and useful application of discrete systems is the implementation of complex (rather than real) systems. A complex system is one in which a real-valued input can produce a complex-valued output. Complex systems that are described by constant coefficient difference equations require at least one complex-valued coefficient, and they are capable of operating on complex-valued inputs. Consider the complex discrete time system

a. Determine and plot the system zeros and poles.

5.m.3

b. Sketch the magnitude response |H(e jω )| of this system over −2π ≤ ω ≤ 2π. Comment on the system's behavior. Consider the complex system

Refer to Prob. 5.M-2 for an introduction to complex systems. a. Plot the pole-zero diagram for H(z). b. Plot the system's magnitude response |H(e jΩ)|over-π≤Ω≤π. c. Explain why H(z) is a noncausal system. Do not give a general definition of causality; specifically identify what makes this system noncausal. d. One way to make this system causal is to add two poles to H(z). That is,

Find poles a and b such that |H casual(e jΩ)|=|H(e jΩ)|. e. Draw an efficient block implementation of H causal(z).

5.m.4

A discrete-time LTI system is shown in Fig. P5.M-4. a. Determine the difference equation that describes this system. b. Determine the magnitude response |H(e jΩ)| for this system and simplify your answer. Plot the magnitude response over − π ≤ Ω ≤ π. What type of standard filter (lowpass, highpass, bandpass, or bandstop) best describes this system? c. Determine the impulse response h[n] of this system.

5.m.5

5.m.6

5.m.7

Figure P5.M-4: Second-order discrete-time system. Determine the impulse response h[n] for the system shown in Fig. P5.M-5. Is the system stable? Is the system causal?

Figure P5.M-5: Third-order discrete-time system. An LTID filter has an impulse response function given by h[n]=δ[n − 1] + δ[n + 1]. Determine and carefully sketch the magnitude response |H(e jΩ)| over the range −π ≤ Ω ≤ π. For this range of frequencies, is this filter lowpass, highpass, bandpass, or bandstop? A causal, stable discrete system has the rather strange transfer function H(z)=cos(z −1 ). a. Write MATLAB code that will compute and plot the magnitude response of this system over an appropriate range of digital frequencies Ω. Comment on the system. b. Determine the impulse response h[n]. Plot h[n] over (0 ≤ n ≤ 10). c. Determine a difference equation description for an FIR filter that closely approximates the system

5.m.8

H(z)=cos(z -1 ). To verify proper behavior, plot the FIR filter's magnitude response and compare it with the magnitude response computed in Prob. 5.M-7a.

The MATLAB signal processing toolbox function butter helps design digital Butterworth filters. Use MATLAB help to learn how butter works. For each of the following cases, design the filter, plot the filter's poles and zeros in the complex z plane, and plot the decibel magnitude response 20 log 10 |H(e Ω )|. a. Design an eighth-order digital lowpass filter with Ω c = π/3. b. Design an eighth-order digital highpass filter with Ω c = π/3. c. Design an eighth-order digital bandpass filter with passband between 5π/24 and 11π/24.

5.m.9

5.m.10

5.m.11

d. Design an eighth-order digital bandstop filter with stopband between 5π/24 and 11π/24. The MATLAB signal processing toolbox function cheby1 helps design digital Chebyshev type I filters. A Chebyshev type I filter has passband ripple and smooth stopband. Setting the passband ripple to R p =3 dB, repeat Prob. 5.M-8 using the cheby1 command. With all other parameters held constant, what is the general effect of reducing R p , the allowable passband ripple? The MATLAB signal processing toolbox function cheby2 helps design digital Chebyshev type II filters. A Chebyshev type II filter has smooth passband and ripple in the stopband. Setting the stopband ripple R s =20 dB down, repeat Prob. 5.M-8 using the cheby2 command. With all other parameters held constant, what is the general effect of increasing R s , the minimum stopband attenuation? The MATLAB signal processing toolbox function ellip helps design digital elliptic filters. An elliptic filter has ripple in

both the passband and the stopband. Setting the passband ripple to R p =3 dB and the stopband ripple R s =20 dB down, repeat Prob. 5.M-8 using the ellip command.

Chapter 6: Continuous-Time Signal Analysis-The Fourier Series OVERVIEW Electrical engineers instinctively think of signals in terms of their frequency spectra and think of systems in terms of their frequency response. Even teenagers know about audible portion of audio signals having a bandwidth of about 20 kHz and the need for goodquality speakers to respond up to 20 kHz. This is basically thinking in frequency domain. In Chapters 4 and 5 we discussed extensively the frequency-domain representation of systems and their spectral response (system response to signals of various frequencies). In Chapters 6, 7, 8, and 9 we discuss spectral representation of signals, where signals are expressed as a sum of sinusoids or exponentials. Actually, we touched on this topic in Chapters 4 and 5. Recall that the Laplace transform of a continuous-time signal is its spectral representation in terms of exponentials (or sinusoids) of complex frequencies. Similarly the z-transform of a discrete-time signal is its spectral representation in terms of discrete-time exponentials. However, in the earlier chapters we were concerned mainly with system representation, and the spectral representation of signals was incidental to the system analysis. Spectral analysis of signals is an important topic in its own right, and now we turn to this subject. In this chapter we show that a periodic signal can be represented as a sum of sinusoids (or exponentials) of various frequencies. These results are extended to aperiodic signals in Chapter 7 and to discrete-time signals in Chapter 9. The fascinating subject of sampling of continuous-time signals is discussed in Chapter 8, leading to A/D (analog-to-digital) and D/A conversion. Chapter 8 forms the bridge between the continuous-time and the discrete-time worlds.

6.1 PERIODIC SIGNAL REPRESENTATION BY TRIGONOMETRIC FOURIER SERIES As seen in Section 1.3-3 [Eq. (1.17)], a periodic signal x(t) with period T0 (Fig. 6.1) has the property

Figure 6.1: A periodic signal of period T0 . The smallest value of T0 that satisfies the periodicity condition (6.1) is the fundamental period of x(t). As argued in Section 1.3-3, this equation implies that x(t) starts at −∞ and continues to ∞. Moreover, the area under a periodic signal x(t) over any interval of duration T0 is the same; that is, for any real numbers a and b

This result follows from the fact that a periodic signal takes the same values at the intervals of T0 . Hence, the values over any segment of duration T0 are repeated in any other interval of the same duration. For convenience, the area under x(t) over any interval of duration T0 will be denoted by

The frequency of a sinusoid cos 2πf0 t or sin 2πf0 t is f0 and the period is T0 = 1/f0 . These sinusoids can also be expressed as cos ω0 t or sin ω0 t where ω0 = 2πf 0 is the radian frequency, although for brevity, it is often referred to as frequency (see Section B.2). A sinusoid of frequency nf0 is said to be the nth harmonic of the sinusoid of frequency f0 . Let us consider a signal x(t) made up of a sines and cosines of frequency ω0 and all of its harmonics (including the zeroth harmonic; i.e., dc) with arbitrary amplitudes: [†]

The frequency ω0 is called the fundamental frequency. We now prove an extremely important property: x(t) in Eq. (6.3) is a periodic signal with the same period as that of the fundamental, regardless of the values of the amplitudes a n and b n . Note that the period T0 of the fundamental is

and

To prove the periodicity of x(t), all we need is to show that x(t) = x(t + T0 ). From Eq. (6.3)

From Eq. (6.5), we have n ω0 T0 = 2π n, and

We could also infer this result intuitively. In one fundamental period T0 , the nth harmonic executes n complete cycles. Hence, every sinusoid on the right-hand side of Eq. (6.3) executes a complete number of cycles in one fundamental period T0 . Therefore, at t = T0 , every sinusoid starts as if it were the origin and repeats the same drama over the next T0 seconds, and so on ad infinitum. Hence, the sum of such harmonics results in a periodic signal of period T0 . This result shows that any combination of sinusoids of frequencies 0, f0 , 2f0 ,..., kf 0 is a periodic signal of period T0 = 1/f0 regardless of the values of amplitudes a k and b k of these sinusoids. By changing the values of a k and b k in Eq. (6.3), we can construct a variety of periodic signals, all of the same period T0 (T0 = 1/f0 or 2π/ω0 ). The converse of this result is also true. We shall show in Section 6.5-4 that a periodic signal x(t) with a period T0 can be expressed as a sum of a sinusoid of frequency f0 (f0 = 1/T0 ) and all its harmonics, as shown in Eq. (6.3). [†] The infinite series on the right-hand side of Eq. (6.3) is known as the trigonometric Fourier series of a periodic signal x(t). COMPUTING THE COEFFICIENTS OF A FOURIER SERIES To determine the coefficients of a Fourier series, consider an integral I defined by

where ∫ T0 stands for integration over any contiguous interval of T0 seconds. By using a trigonometric identity (see Section B.7-6), Eq. (6.6a) can be expressed as

Because cos ω0 t executes one complete cycle during any interval of duration T0 , cos(n + m)ω0 t executes (n + m) complete cycles during any interval of duration T0 . Therefore the first integral in Eq. (6.6b), which represents the area under n + m complete cycles of a sinusoid, equals zero. The same argument shows that the second integral in Eq. (6.6b) is also zero, except when n = m. Hence I in Eq. (6.6) is zero for all n ≠ m. When n = m, the first integral in Eq. (6.6b) is still zero, but the second integral yields

Thus

Using similar arguments, we can show that

and

To determine a 0 in Eq. (6.3) we integrate both sides of Eq. (6.3) over one period T0 to yield

Recall that T0 is the period of a sinusoid of frequency ω0 . Therefore functions cos n ω0 t and sin n ω0 t execute n complete cycles over any interval of T0 seconds, so that the area under these functions over an interval T0 is zero, and the last two integrals on the righthand side of the foregoing equation are zero. This yields

and

Next we multiply both sides of Eq. (6.3) by cos mω0 t and integrate the resulting equation over an interval T0 :

The first integral on the right-hand side is zero because it is an area under m integral number of cycles of a sinusoid. Also, the last integral on the right-hand side vanishes because of Eq. (6.7c). This leaves only the middle integral, which is also zero for all n ≠ m, because of Eq. (6.7a). But n takes on all values from 1 to ∞, including m. When n = m, this integral is T0 /2, according to Eq. (6.7a). Therefore, from the infinite number of terms on the right-hand side, only one term survives to yield a n T0 /2 = a m T0 /2 (recall that n = m). Therefore

and

Similarly, by multiplying both sides of Eq. (6.3) by sin n ω0 t and then integrating over an interval T0 , we obtain

To sum up our discussion, which applies to real or complex x(t), we have shown that a periodic signal x(t) with period T0 can be expressed as a sum of a sinusoid of period T0 and its harmonics:

where

COMPACT FORM OF FOURIER SERIES The results derived so far are general and apply whether x(t) is a real or a complex function of t. However, when x(t) is real, coefficients a n and b n are real for all n, and the trigonometric Fourier series can be expressed in a compact form, using the results in Eqs. (B.23)

where C n and θn are related to a n and b n , as [see Eqs. (B.23b) and (B.23c)]

These results are summarized in Table 6.1. Table 6.1: Fourier Series Representation of a Periodic Signal of Period T0 (ω0 = 2π /T0 ) Open table as spreadsheet Series Form

Coefficient Computation

Trigonometric

Conversion Formulas a 0 = c0 = D0 a n − jb n = C n e jθ n = 2D n

Compact trigonometric

a n + jb n = C n e −jθn = 2D −n C0 = a0

C0 = D0 C n = 2|D n | n≥1 θn = ∠D n

Exponential

The compact form in Eq. (6.12) uses the cosine form. We could just as well have used the sine form, with terms sin (n ω0 t + θn ) instead of cos (n ω0 t + θn ). The literature overwhelmingly favors the cosine form, for no apparent reason except possibly that the cosine phasor is represented by the horizontal axis, which happens to be the reference axis in phasor representation. Equation (6.11a) shows that a 0 (or C 0 ) is the average value of x(t) (averaged over one period). This value can often be determined by inspection of x(t). Because a n and b n are real, C n and θn are also real. In the following discussion of trigonometric Fourier series, we shall assume real x(t), unless mentioned otherwise.

6.1-1 The Fourier Spectrum

The compact trigonometric Fourier series in Eq. (6.12) indicates that a periodic signal x(t) can be expressed as a sum of sinusoids of frequencies 0 (dc), ? 0 , 2? 0 , ..., n? 0 , ..., whose amplitudes are C 0 , C 1 , C 2 , ..., C n , ..., and whose phases are 0, θ1 , ? 2 , ..., ? n , ...,

respectively. We can readily plot amplitude C n versus n (the amplitude spectrum) and θn versus n (the phase spectrum).[†] Because n is proportional to the frequency n ω0 , these plots are scaled plots of C n versus ω and θn versus ω. The two plots together are the frequency spectra of x(t). These spectra show at a glance the frequency contents of the signal x(t) with their amplitudes and phases. Knowing these spectra, we can reconstruct or synthesize the signal x(t) according to Eq. (6.12). Therefore frequency spectra, which are an alternative way of describing a periodic signal x(t), are in every way equivalent to the plot of x(t) as a function of t. The frequency spectra of a signal constitute the frequency-domain description of x(t), in contrast to the time-domain description, where x(t) is specified as a function of time. In computing θn , the phase of the nth harmonic from Eq. (6.13c), the quadrant in which θn lies should be determined from the signs of a n and b n . For example, if a n = −1 and b n = 1, θn lies in the third quadrant, and Observe that Although C n , the amplitude of the nth harmonic as defined in Eq. (6.13b), is positive, we shall find it convenient to allow C n to take on negative values when b n = 0. This will become clear in later examples. EXAMPLE 6.1 Find the compact trigonometric Fourier series for the periodic signal x(t) shown in Fig. 6.2a. Sketch the amplitude and phase spectra for x(t).

Figure 6.2: A periodic signal and (b,c) its Fourier spectra. In this case the period T0 = π and the fundamental frequency f0 = 1/T0 = 1/π Hz, and

Therefore

where

In this example the obvious choice for the interval of integration is from 0 to χ. Hence

and

Table 6.2 Open table as spreadsheet n

Cn

θn

0

0.504

0

1

0.244

−75.96

2

0.125

−82.87

3

0.084

−85.24

4

0.063

−86.42

5

0.0504

−87.14

6

0.042

−87.61

7

0.036

−87.95

Therefore

Also from Eqs. (6.13)

Amplitude and phases of the dc and the first seven harmonics are computed from the above equations and displayed in Table 6.2. We can use these numerical values to express x(t) as

COMPUTER EXAMPLE C6.1 Following Example 6.1, compute and plot the Fourier coefficients for the periodic signal in Fig. 6.2a. In this example, T0 = π and ω0 = 2. The expressions for a 0 , a n , b n , C n , and θn are derived in Example 6.1. >> >> >> >> >> >> >> >> >>

n = 1:10; a_n(1) = 0.504; a_n(n+1) = 0.504*2./(1+16*n.^2); b_n(1) = 0; b_n(n+1) = 0.504*8*n./(1+16*n.^2); c_n(1) = a_n(1); c_n(n+1) = sqrt (a_n(n+1).^2+b_n(n+1),^2); theta_n(1) = 0; theta_n(n+1) = atan2(-b_n(n+1),a_n(n+1)); n = [0,n]; clf; subplot(2,2,1); stem(n,a_n,'k'); ylabel('a_n'); xlabel('n'); subplot(2,2,2); stem(n,b_n,'k'); ylabel('b_n'); xlabel('n'); subplot(2,2,3); stem(c_n,'k'); ylabel('c_n'); xlabel('n'); subplot(2,2,4); stem(n,theta n,'k'); ylabel('\theta n [rad]'); xlabel('n');

Figure C6.1 The amplitude and phase spectra for x(t), in Fig. 6.2b and 6.2c, tell us at a glance the frequency composition of x(t), that is, the amplitudes and phases of various sinusoidal components of x(t). Knowing the frequency spectra, we can reconstruct x(t), as shown on the right-hand side of Eq. (6.15b). Therefore the frequency spectra (Fig. 6.2b, 6.2c) provide an alternative description-the frequencydomain description of x(t). The time-domain description of x(t) is shown in Fig. 6.2a. A signal, therefore, has a dual identity: the timedomain identity x(t) and the frequency-domain identity (Fourier spectra). The two identities complement each other; taken together, they provide a better understanding of a signal. An interesting aspect of Fourier series is that whenever there is a jump discontinuity in x(t), the series at the point of discontinuity converges to an average of the left-hand and right-hand limits of x(t) at the instant of discontinuity. [†] In the present example, for

instance, x(t) is discontinuous at t = 0 with x(0 + ) = 1 and x(0 − ) = x(π) = e −π/2 = 0.208. The corresponding Fourier series converges to a value (1 + 0.208)/2 = 0.604 at t = 0. This is easily verified from Eq. (6.15b) by setting t = 0. EXAMPLE 6.2 Find the compact trigonometric Fourier series for the triangular periodic signal x(t) shown in Fig. 6.3a, and sketch the amplitude and phase spectra for x(t).

Figure 6.3: (a) A triangular periodic signal and (b, c) its Fourier spectra. In this case the period T0 = 2. Hence

and

where

Here it will be advantageous to choose the interval of integration from −1/2 to 3/2 rather than 0 to 2. A glance at Fig. 6.3a shows that the average value (dc) of x(t) is zero, so that a 0 = 0. Also

Detailed evaluation of these integrals shows that both have a value of zero. Therefore

Detailed evaluation of these integrals yields, in turn,

Therefore

To plot Fourier spectra, the series must be converted into compact trigonometric form as in Eq. (6.12). In this case this is readily done by converting sine terms into cosine terms with a suitable phase shift. For example,

By using these identities, Eq. (6.16) can be expressed as

In this series all the even harmonics are missing. The phases of the odd harmonics alternate from −90° to 90°. Figure 6.3 shows amplitude and phase spectra for x(t). EXAMPLE 6.3 A periodic signal x(t) is represented by a trigonometric Fourier series Express this series as a compact trigonometric Fourier series and sketch amplitude and phase spectra for x(t). In compact trigonometric Fourier series, the sine and cosine terms of the same frequency are combined into a single term and all terms are expressed as cosine terms with positive amplitudes. Using Eqs. (6.12), (6.13b), and (6.13c), we have Also and

Therefore In this case only four components (including dc) are present. The amplitude of dc is 2. The remaining three components are of frequencies ω = 2, 3, and 7 with amplitudes 5, 2, and 1 and phases −53.13°, −60°, and −30°, respectively. The amplitude and phase spectra for this signal are shown in Fig. 6.4a and 6.4b, respectively.

Figure 6.4: Fourier spectra of the signal. EXAMPLE 6.4 Find the compact trigonometric Fourier series for the square-pulse periodic signal shown in Fig. 6.5a and sketch its amplitude and phase spectra.

Figure 6.5: (a) A square pulse periodic signal and (b) its Fourier spectra. Here the period is T0 = 2π and ω0 = 2π/T0 = 1. Therefore

where

From Fig. 6.5a, it is clear that a proper choice of region of integration is from −π to π. But since x(t) = 1 only over (−π/2, π/2) and x(t) = 0 over the remaining segment,

We could have found a 0 , the average value of x(t), to be 1/2 merely by inspection of x(t) in Fig. 6.5a. Also,

Therefore

Observe that b n = 0 and all the sine terms are zero. Only the cosine terms appear in the trigonometric series. The series is therefore already in the compact form except that the amplitudes of alternating harmonics are negative. Now by definition, amplitudes C n are positive [see Eq. (6.13b)]. The negative sign can be accommodated by associating a proper phase, as seen from the trigonometric identity [†]

Using this fact, we can express the series in (6.17) as

This is the desired form of the compact trigonometric Fourier series. The amplitudes are

We might use these values to plot amplitude and phase spectra. However, we can simplify our task in this special case if we allow amplitude C n to take on negative values. If this is allowed, we do not need a phase of −π to account for the sign as seen from Eq. (6.17). This means that phases of all components are zero, and we can discard the phase spectrum and manage with only the amplitude spectrum, as shown in Fig. 6.5b. Observe that there is no loss of information in doing so and that the amplitude spectrum in Fig. 6.5b has the complete information about the Fourier series in Eq. (6.17). Therefore, whenever all sine terms vanish (b n = 0), it is convenient to allow C n to take on negative values. This permits the spectral information to be conveyed by a single spectrum. [†]

Let us investigate the behavior of the series at the points of discontinuities. For the discontinuity at t = π/2, the values of x(t) on either

sides of the discontinuity are x((π/2) − ) = 1 and x((π/2) + ) = 0. We can verify by setting t = π/2 in Eq. (6.17) that x(π/2) = 0.5, which is a value midway between the values of x(t) on the either sides of the discontinuity at t = π/2.

6.1-2 The Effect of Symmetry The Fourier series for the signal x(t) in Fig. 6.2a (Example 6.1) consists of sine and cosine terms, but the series for the signal x(t) in Fig 6.3a (Example 6.2) consists of sine terms only and the series for the signal x(t) in Fig. 6.5a (Example 6.4) consists of cosine terms only. This is no accident. We can show that the Fourier series of any even periodic function x(t) consists of cosine terms only and the

series for any odd periodic function x(t) consists of sine terms only. Moreover, because of symmetry (even or odd), the information of one period of x(t) is implicit in only half the period, as seen in Figs. 6.3a and 6.5a. In these cases, knowing the signal over a half-period and knowing the kind of symmetry (even or odd), we can determine the signal waveform over a complete period. For this reason, the Fourier coefficients in these cases can be computed by integrating over only half the period rather than a complete period. To prove this result, recall that

Recall also that cos n ω0 t is an even function and sin n ω0 t is an odd function of t. If x(t) is an even function of t, then x(t) cos n ω0 t is also an even function and x(t) sin n ω0 t is an odd function of t (see Section 1.5-1). Therefore, following from Eqs. (1.33a) and (1.33b),

Similarly, if x(t) is an odd function of t, then x(t) cos n ω0 t is an odd function of t and x(t) sin n ω0 t is an even function of t. Therefore

Observe that because of symmetry, the integration required to compute the coefficients need be performed over only half the period. If a periodic signal x(t) shifted by half the period remains unchanged except for a sign-that is, if

the signal is said to have a half-wave symmetry. It can be shown that for a signal with a half-wave symmetry, all the even-numbered harmonics vanish (see Prob. 6.1-5). The signal in Fig. 6.3a is an example of such a symmetry. The signal in Fig. 6.5a also has this symmetry, although it is not obvious owing to a dc component. If we subtract the dc component of 0.5 from this signal, the remaining signal has a half-wave symmetry. For this reason this signal has a dc component 0.5 and only the odd harmonics. EXERCISE E6.1

Find the compact trigonometric Fourier series for periodic signals shown in Fig. 6.6. Sketch their amplitude and phase spectra. Allow C n to take on negative values if b n = 0 so that the phase spectrum can be eliminated. [Hint: Use Eqs. (6.18) and (6.19) for appropriate symmetry conditions.]

Figure 6.6: Periodic signals. Answers

a.

b.

6.1-3 Determining the Fundamental Frequency and Period We have seen that every periodic signal can be expressed as a sum of sinusoids of a fundamental frequency ω0 and its harmonics. One may ask whether a sum of sinusoids of any frequencies represents a periodic signal. If so, how does one determine the period? Consider the following three functions:

Recall that every frequency in a periodic signal is an integer multiple of the fundamental frequency ω0 . Therefore the ratio of any two frequencies is of the form m/n, where m and n are integers. This means that the ratio of any two frequencies is a rational number. When the ratio of two frequencies is a rational number, the frequencies are said to be harmonically related. The largest number of which all the frequencies are integer multiples is the fundamental frequency. In other words, the fundamental frequency is the greatest common factor (GCF) of all the frequencies in the series. The frequencies in the spectrum of x 1 (t) are 1/2, 2/3, and 7/6 (we do not consider dc). The ratios of the successive frequencies are 3:4 and 4:7, respectively. Because both these numbers are rational, all the three frequencies in the spectrum are harmonically related, and the signal x 1 (t) is periodic. The GCF, that is, the greatest number of which 1/2, 2/3, and 7/6 are integer multiples, is 1/6.[†] Moreover, 3(1/6) = 1/2, 4(1/6) = 2/3, and 7(1/6) = 7/6. Therefore the fundamental frequency is 1/6, and the three frequencies in the spectrum are the third, fourth, and seventh harmonics. Observe that the fundamental frequency component is absent in this Fourier series.

The signal x 2 (t) is not periodic because the ratio of two frequencies in the spectrum is 2/π, which is not a rational number. The signal x 3 (t) is periodic because the ratio of frequencies 3√2 and 6√2 is 1/2, a rational number. The greatest common factor of 3√2 and 6√2 is 3√2. Therefore the fundamental frequency ω0 = 3√2, and the period

EXERCISE E6.2

Determine whether the signal is periodic. If it is periodic, find the fundamental frequency and the period. What harmonics are present in x(t)?

Answers Periodic with ω0 = 2/15 and period T0 = 15π. The fifth and sixth harmonics. A HISTORICAL NOTE: BARON JEAN-BAPTISTE-JOSEPH FOURIER (1768-1830) The Fourier series and integral comprise a most beautiful and fruitful development, which serves as an indispensable instrument in the

treatment of many problems in mathematics, science, and engineering. Maxwell was so taken by the beauty of the Fourier series that he called it a great mathematical poem. In electrical engineering, it is central to the areas of communication, signal processing, and several other fields, including antennas, but its initial reception by the scientific world was not enthusiastic. In fact, Fourier could not get his results published as a paper. Fourier, a tailor's son, was orphaned at age 8 and educated at a local military college (run by Benedictine monks), where he excelled in mathematics. The Benedictines prevailed upon the young genius to choose the priesthood as his vocation, but revolution broke out before he could take his vows. Fourier joined the people's party. But in its early days, the French Revolution, like most such upheavals, liquidated a large segment of the intelligentsia, including prominent scientists such as Lavoisier. Observing this trend, many intellectuals decided to leave France to save themselves from a rapidly rising tide of barbarism. Fourier, despite his early enthusiasm for the Revolution, narrowly escaped the guillotine twice. It was to the everlasting credit of Napoleon that he stopped the persecution of the intelligentsia and founded new schools to replenish their ranks. The 26-year-old Fourier was appointed chair of mathematics at the newly created École Normale in 1794. [1]

Napoleon was the first modern ruler with a scientific education, and he was one of the rare persons who are equally comfortable with soldiers and scientists. The age of Napoleon was one of the most fruitful in the history of science. Napoleon liked to sign himself as "member of Institut de France" (a fraternity of scientists), and he once expressed to Laplace his regret that "force of circumstances has

led me so far from the career of a scientist." [2] Many great figures in science and mathematics, including Fourier and Laplace, were honored and promoted by Napoleon. In 1798 he took a group of scientists, artists, and scholars-Fourier among them-on his Egyptian expedition, with the promise of an exciting and historic union of adventure and research. Fourier proved to be a capable administrator of the newly formed Institut d'Égypte, which, incidentally, was responsible for the discovery of the Rosetta stone. The inscription on this stone in two languages and three scripts (hieroglyphic, demotic, and Greek) enabled Thomas Young and Jean-François Champollion, a protégé of Fourier, to invent a method of translating hieroglyphic writings of ancient Egypt-the only significant result of Napoleon's Egyptian expedition. Back in France in 1801, Fourier briefly served in his former position as professor of mathematics at the École Polytechnique in Paris. In 1802 Napoleon appointed him the prefect of Isère (with its headquarters in Grenoble), a position in which Fourier served with distinction. Fourier was created Baron of the Empire by Napoleon in 1809. Later, when Napoleon was exiled to Elba, his route was to take him through Grenoble. Fourier had the route changed to avoid meeting Napoleon, which would have displeased Fourier's new master, King Louis XVIII. Within a year, Napoleon escaped from Elba and returned to France. At Grenoble, Fourier was brought before him in chains. Napoleon scolded Fourier for his ungrateful behavior but reappointed him the prefect of Rhône at Lyons. Within four months Napoleon was defeated at Waterloo and was exiled to St. Helena, where he died in 1821. Fourier once again was in disgrace as a Bonapartist and had to pawn his effects to keep himself alive. But through the intercession of a former student, who was now a prefect of Paris, he was appointed director of the statistical bureau of the Seine, a position that allowed him ample time for scholarly pursuits. Later, in 1827, he was elected to the powerful position of perpetual secretary of the Paris Academy of Science, a section of the Institut de France. [3] .

While serving as the prefect of Grenoble, had Fourier carried on his elaborate investigation of the propagation of heat in solid bodies, which led him to the Fourier series and the Fourier integral. On December 21, 1807, he announced these results in a prize paper on the theory of heat. Fourier claimed that an arbitrary function (continuous or with discontinuities) defined in a finite interval by an arbitrarily capricious graph can always be expressed as a sum of sinusoids (Fourier series). The judges, who included the great French mathematicians Laplace, Lagrange, Legendre, Monge, and LaCroix, admitted the novelty and importance of Fourier's work but criticized it for lack of mathematical rigor and generality. Lagrange thought it incredible that a sum of sines and cosines could add up to anything but an infinitely differentiable function. Moreover, one of the properties of an infinitely differentiable function is that if we know its behavior over an arbitrarily small interval, we can determine its behavior over the entire range (the Taylor-Maclaurin series). Such a function is far from an arbitrary or a capriciously drawn graph.[4] Laplace had additional reason to criticize Fourier's work. Laplace and his students had already approached the problem of heat conduction by a different angle, and Laplace was reluctant to accept the

superiority of Fourier's method.[5] Fourier thought the criticism unjustified but was unable to prove his claim because the tools required for operations with infinite series were not available at the time. However, posterity has proved Fourier to be closer to the truth than his critics. This is the classic conflict between pure mathematicians and physicists or engineers, as we saw earlier (Chapter 4) in the life of Oliver Heaviside. In 1829 Dirichlet proved Fourier's claim concerning capriciously drawn functions with a few restrictions (Dirichlet conditions). Although three of the four judges were in favor of publication, Fourier's paper was rejected because of vehement opposition by Lagrange. Fifteen years later, after several attempts and disappointments, Fourier published the results in expanded form as a text, Théorie analytique de la chaleur, which is now a classic. [†] In Eq. (6.3), the constant term a corresponds to the cosine term for n = 0 because cos (0 x ω )t = 1. However, sin (0 x ω )t = 0. 0 0 0

Hence, the sine term for n = 0 is nonexistent.

[†] Strictly speaking, this statement applies only if a periodic signal x(t) is a continuous function of t. However, Section 6.5-4 shows that

it can be applied even for discontinuous signals, if we interpret the equality in Eq. (6.3), not in the ordinary sense, but in the meansquare sense. This means that the power of the difference between the periodic signal x(t) and its Fourier series on the right-hand side of Eq. (6.3) approaches zero as the number of terms in the series approach infinity.

[†] The amplitude C , by definition here, is nonnegative. Some authors define amplitude A that can take positive or negative values and n n

magnitude C n = |An | that can only be nonnegative. Thus, what we call amplitude spectrum becomes magnitude spectrum. The distinction between amplitude and magnitude, although useful, is avoided in this book in the interest of keeping definitions of essentially similar entities to a minimum. [†] This behavior of the Fourier series is dictated by its convergence in the mean, discussed later in Sections 6.2 and 6.5. [†] Because cos (x ± π) = − cos x, we could have chosen the phase π or −π. In fact, cos (x ± Nπ) = − cos x for any odd integral

value of N. Therefore the phase can be chosen as ± Nπ, where N is any convenient odd integer.

[†] Here, the distinction between amplitude A and magnitude C = |A | would have been useful. But, for the reason mentioned in the n n n

footnote on page 600, we refrain from this distinction formally.

[†] The greatest common factor of a /b , a /b , ..., a /b is the ratio of the GCF of the numerators set (a , a ,..., a ) to the LCM 1 1 2 2 m m 1 2 m

(least common multiple) of the denominator set (b 1 , b 2 , ..., b m ). For instance, for the set (2/3, 6/7, 2), the GCF of the numerator set (2, 6, 2) is 2; the LCM of the denominator set (3, 7, 1) is 21. Therefore 2/21 is the largest number of which 2/3, 6/7, and 2 are integer multiples. [1] Bell, E. T. Men of Mathematics. Simon & Schuster, New York, 1937. [2] Durant, Will, and Ariel Durant. The Age of Napoleon, Part XI in The Story of Civilization Series. Simon & Schuster, New York, 1975. [3] Calinger, R. Classics of Mathematics, 4th ed. Moore Publishing, Oak Park, IL, 1982. [4] Lanczos, C. Discourse on Fourier Series. Oliver Boyd, London, 1966. [5] Körner, T. W. Fourier Analysis. Cambridge University Press, Cambridge, UK, 1989.

6.2 EXISTENCE AND CONVERGENCE OF THE FOURIER SERIES For the existence of the Fourier series, coefficients a 0 , a n , and b n in Eqs. (6.11) must be finite. It follows from Eqs. (6.11a), (6.11b), and (6.11c) that the existence of these coefficients is guaranteed if x(t) is absolutely integrable over one period; that is,

However, existence, by itself, does not inform us about the nature and the manner in which the series converges. We shall first discuss the notion of convergence.

6.2-1 Convergence of a Series The key to many puzzles lies in the nature of the convergence of the Fourier series. Convergence of infinite series is a complex problem. It took mathematicians several decades to understand the convergence aspect of the Fourier series. We shall barely scratch the surface here. Nothing annoys a student more than the discussion of convergence. Have we not proved, they ask, that a periodic signal x(t) can be expressed as a Fourier series? Then why spoil the fun by this annoying discussion? All we have shown so far is that a signal represented by a Fourier series in Eq. (6.3) is periodic. We have not proved the converse, that every periodic signal can be expressed as a Fourier series. This issue will be tackled later, in Section 6.5-4, where it will be shown that a periodic signal can be represented by a Fourier series, as in Eq. (6.3), where the equality of the two sides of the equation is not in the ordinary sense, but in the meansquare sense (explained later in this discussion). But the astute reader should have been skeptical of the claims of the Fourier series to represent discontinuous functions in Figs. 6.2a and 6.5a. If x(t) has a jump discontinuity, say at t = 0, then x(0 + ), x(0), and x(0 − ) are generally different. How could a series consisting of the sum of continuous functions of the smoothest type (sinusoids) add to one value

at t = 0 − and a different value at t = 0 and yet another value at t = 0 + ? The demand is impossible to satisfy unless the math involved executes some spectacular acrobatics. How does a Fourier series act under such conditions? Precisely for this reason, the great mathematicians Lagrange and Laplace, two of the judges examining Fourier's paper, were skeptical of Fourier's claims and voted against publication of the paper that later became a classic.

There are also other issues. In any practical application, we can use only a finite number of terms in a series. If, using a fixed number of terms, the series guarantees convergence within an arbitrarily small error at every value of t, such a series is highly desirable, and is

called an uniformly convergent series. If a series converges at every value of t, but to guarantee convergence within a given error requires different number of terms at different t, then the series is still convergent, but is less desirable. It goes under the name pointwise convergent series. Finally, we have the case of a series that refuses to converge at some t, no matter how many terms are added. But the series may converge in the mean, that is, the energy of the difference between x(t) and the corresponding finite term series approaches zero as

the number of terms approaches infinity. [†] . To explain this concept, let us consider representation of a function x(t) by an infinite series

Let the partial sum of the first N terms of the series on the right-hand side be denoted by x N (t), that is,

If we approximate x(t) by x N (t) (the partial sum of the first N terms of the series), the error in the approximation is the difference x(t) − x N(t). The series converges in the mean to x(t) in the interval (0, T0 ) if

Hence, the energy of the error x(t) − x N(t) approaches zero as N → ∞. This form of convergence does not require for the series to be equal to x(t) for all t. It just requires the energy of the difference (area under |x(t) − x N (t)|2 ) to vanish as N → ∞. Superficially it may appear that if the energy of a signal over an interval is zero, the signal (the error) must be zero everywhere. This is not true. The signal energy can be zero even if there are nonzero values at finite number of isolated points. This is because although the signal is nonzero at a point (and zero everywhere else), the area under its square is still zero. Thus, a series that converges in the mean to x(t) need not converge to x(t) at a finite number of points. This is precisely what happens to the Fourier series when x(t) has jump discontinuities. This is also what makes Fourier series convergence compatible with the Gibbs phenomenon, to be discussed later in this section. There is a simple criterion for ensuring that a periodic signal x(t) has a Fourier series that converges in the mean. The Fourier series for x(t) converges to x(t) in the mean if x(t) has a finite energy over one period, that is,

Thus, the periodic signal x(t), having a finite energy over one period, guarantees the convergence in the mean of its Fourier series. In all the examples discussed so far, condition (6.26) is satisfied, and hence the corresponding Fourier series converges in the mean. Condition (6.26), like condition (6.22), guarantees that the Fourier coefficients are finite. We shall now discuss an alternate set of criteria, due to Dirichlet, for convergence of the Fourier series. DIRICHLET CONDITIONS Dirichlet showed that if x(t) satisfies certain conditions (Dirichlet conditions), its Fourier series is guaranteed to converge pointwise at all points where x(t) is continuous. Moreover, at the points of discontinuities, x(t) converges to the value midway between the two values of x(t) on either sides of the discontinuity. These conditions are: 1. The function x(t) must be absolutely integrable; that is, it must satisfy Eq. (6.22). 2. The function x(t) must have only a finite number of finite discontinuities in one period. 3. The function x(t) must contain only a finite number of maxima and minima in one period. All practical signals, including those in Examples 6.1-6.4, satisfy these conditions.

6.2-2 The Role of Amplitude and Phase Spectra in Waveshaping The trigonometric Fourier series of a signal x(t) shows explicitly the sinusoidal components of x(t). We can synthesize x(t) by adding the sinusoids in the spectrum of x(t). Let us synthesize the square-pulse periodic signal x(t) of Fig. 6.5a by adding successive harmonics in its spectrum step by step and observing the similarity of the resulting signal to x(t). The Fourier series for this function as found in Eq. (6.17) is

We start the synthesis with only the first term in the series (n = 0), a constant 1/2 (dc); this is a gross approximation of the square wave, as shown in Fig. 6.7a. In the next step we add the dc (n = 0) and the first harmonic (fundamental), which results in a signal shown in Fig. 6.7b. Observe that the synthesized signal somewhat resembles x(t). It is a smoothed-out version of x(t). The sharp corners in x(t) are not reproduced in this signal because sharp corners mean rapid changes, and their reproduction requires rapidly varying (i.e., higher-frequency) components, which are excluded. Figure 6.7c shows the sum of dc, first, and third harmonics (even harmonics are absent). As we increase the number of harmonics progressively, as shown in Fig. 6.7d (sum up to the fifth harmonic) and 6.7e (sum up to the nineteenth harmonic), the edges of the pulses become sharper and the signal resembles x(t) more closely. ASYMPTOTIC RATE OF AMPLITUDE SPECTRUM DECAY Figure 6.7 brings out one interesting aspect of the Fourier series. Lower frequencies in the Fourier series affect the large-scale behavior of x(t), whereas the higher frequencies determine the fine structure such as rapid wiggling. Hence, sharp changes in x(t), being a part of fine structure, necessitate higher frequencies in the Fourier series. The sharper the change [the higher the time derivative x(t)], the higher are the frequencies needed in the series.

Figure 6.7: Synthesis of a square-pulse periodic signal by successive addition of its harmonics. The amplitude spectrum indicates the amounts (amplitudes) of various frequency components of x(t). If x(t) is a smooth function, its variations are less rapid. Synthesis of such a function requires predominantly lower-frequency sinusoids and relatively small amounts of rapidly varying (higher-frequency) sinusoids. The amplitude spectrum of such a function would decay swiftly with frequency. To synthesize such a function we require fewer terms in the Fourier series for a good approximation. On the other hand, a signal with sharp changes, such as jump discontinuities, contains rapid variations, and its synthesis requires relatively large amount of highfrequency components. The amplitude spectrum of such a signal would decay slowly with frequency, and to synthesize such a function, we require many terms in its Fourier series for a good approximation. The square wave x(t) is a discontinuous function with jump discontinuities, and therefore its amplitude spectrum decays rather slowly, as 1/n [see Eq. (6.17)]. On the other hand, the triangular pulse periodic signal in Fig. 6.3a is smoother because it is a continuous function (no jump discontinuities). Its spectrum decays rapidly with frequency as 1/n 2 [see Eq. (6.16)].

We can show that[6] that if the first k − 1 derivatives of a periodic signal x(t) are continuous and the kth derivative is discontinuous,

then its amplitude spectrum c n decays with frequency at least as rapidly as 1/n k+1 . This result provides a simple and useful means for predicting the asymptotic rate of convergence of the Fourier series. In the case of the square-wave signal (Fig. 6.5a), the zeroth derivative of the signal (the signal itself) is discontinuous, so that k = 0. For the triangular periodic signal in Fig. 6.3a, the first derivative is discontinuous; that is, k = 1. For this reason the spectra of these signals decay as 1/n and 1/n 2 , respectively.

PHASE SPECTRUM: THE WOMAN BEHIND A SUCCESSFUL MAN[†] The role of the amplitude spectrum in shaping the waveform x(t) is quite clear. However, the role of the phase spectrum in shaping this waveform is less obvious. Yet, the phase spectrum, like the woman behind a successful man, plays an equally important role in waveshaping. We can explain this role by considering a signal x(t) that has rapid changes such as jump discontinuities. To synthesize an instantaneous change at a jump discontinuity, the phases of the various sinusoidal components in its spectrum must be such that all (or most) of the harmonic components will have one sign before the discontinuity and the opposite sign after the discontinuity. This will result in a sharp change in x(t) at the point of discontinuity. We can verify this fact in any waveform with jump discontinuity. Consider, for example, the sawtooth waveform in Fig. 6.6b. This waveform has a discontinuity at t = 1. The Fourier series for this waveform, as given in Exercise E6.1b, is

Figure 6.8 shows the first three components of this series. The phases of all the (infinite) components are such that all the components are positive just before t = 1 and turn negative just after t = 1, the point of discontinuity. The same behavior is also observed at t = −1, where a similar discontinuity occurs. This sign change in all the harmonics adds up to produce very nearly a jump discontinuity. The role of the phase spectrum is crucial in achieving a sharp change in the waveform. If we ignore the phase spectrum when trying to reconstruct this signal, the result will be a smeared and spread-out waveform. In general, the phase spectrum is just as crucial as the amplitude spectrum in determining the waveform. The synthesis of any signal x(t) is achieved by using a proper combination of amplitudes and phases of various sinusoids. This unique combination is the Fourier spectrum of x(t).

Figure 6.8: Role of the phase spectrum in shaping a periodic signal. FOURIER SYNTHESIS OF DISCONTINUOUS FUNCTIONS: THE GIBBS PHENOMENON Figure 6.7 showed the square function x(t) and its approximation by a truncated trigonometric Fourier series that includes only the first N harmonics for N = 1, 3, 5, and 19. The plot of the truncated series approximates closely the function x(t) as N increases, and we expect that the series will converge exactly to x(t) as N→ ∞. Yet the curious fact, as seen from Fig. 6.7, is that even for large N, the truncated series exhibits an oscillatory behavior and an overshoot approaching a value of about 9% in the vicinity of the discontinuity at the nearest peak of oscillation.[†] Regardless of the value of N, the overshoot remains at about 9%. Such strange behavior certainly would undermine anyone's faith in the Fourier series. In fact, this behavior puzzled many scholars at the turn of the century. Josiah Willard Gibbs, an eminent mathematical physicist who was the inventor of vector analysis, gave a mathematical explanation of this behavior (now called the Gibbs phenomenon).

We can reconcile the apparent aberration in the behavior of the Fourier series by observing from Fig. 6.7 that the frequency of oscillation of the synthesized signal is N f0 , so the width of the spike with 9% overshoot is approximately 1/2Nf0 . As we increase N, the frequency of oscillation increases and the spike width 1/2Nf0 diminishes. As N → ∞, the error power → 0 because the error consists mostly of the spikes, whose widths → 0. Therefore, as N → ∞, the corresponding Fourier series differs from x(t) by about 9% at the immediate left and right of the points of discontinuity, and yet the error power → 0. The reason for all this confusion is that in this case, the Fourier series converges in the mean. When this happens, all we promise is that the error energy (over one period) → 0 as N → ∞. Thus, the series may differ from x(t) at some points and yet have the error signal power zero, as verified earlier. Note that the series, in this case also converges pointwise at all points except the points of discontinuity. It is precisely at the discontinuities that the series differs from x(t) by 9%. [†]

When we use only the first N terms in the Fourier series to synthesize a signal, we are abruptly terminating the series, giving a unit weight to the first N harmonics and zero weight to all the remaining harmonics beyond N. This abrupt termination of the series causes the Gibbs phenomenon in synthesis of discontinuous functions. Section 7.8 offers more discussion on the Gibbs phenomenon, its

ramifications, and cure. The Gibbs phenomenon is present only when there is a jump discontinuity in x(t). When a continuous function x(t) is synthesized by using the first N terms of the Fourier series, the synthesized function approaches x(t) for all t as N → ∞. No Gibbs phenomenon appears. This can be seen in Fig. 6.9, which shows one cycle of a continuous periodic signal being synthesized from the first 19 harmonics. Compare the similar situation for a discontinuous signal in Fig. 6.7.

Figure 6.9: Fourier synthesis of a continuous signal using first 19 harmonics. EXERCISE E6.3

By inspection of signals in Figs. 6.2a, 6.6a, and 6.6b, determine the asymptotic rate of decay of their amplitude spectra.

Answers 1/n, 1/n 2 , and 1/n, respectively. COMPUTER EXAMPLE C6.2 Analogous to Fig. 6.7, demonstrate the synthesis of the square wave of Fig. 6.5a by successively adding its Fourier components. >>x = inline ('mod(t+pi/2,2*pi)< =pi'); t = linspace (-2*pi, 2*pi,1000); >>sumterms = zeros(16, length(t)); sumterms(1,:) = 1/2; >>for n = 1:size(sumterms,1)-1; >>sumterms(n+1,:) = (2/(pi*n)*sin(pi*n/2))*cos(n*t); >>end >>x_N = cumsum (sumterms); figure(1); clf; ind = 0; >>for N = [0,1:2:size(sumterms, 1)-1], >>ind = ind+1; subplot (3,3,ind); >>plot (t,x_N(N+1),:), 'k',t,x(t), 'k--'); axis ([-2*pi 2*pi -0.2 1.2]); >>xlabel ('t'); ylabel (['x_{',num2str (N),'} (t)']); >>end

Figure C6.2 A HISTORICAL NOTE ON THE GIBBS PHENOMENON Normally speaking, troublesome functions with strange behavior are invented by mathematicians; we rarely see such oddities in practice. In the case of the Gibbs phenomenon, however, the tables were turned. A rather puzzling behavior was observed in a mundane object, a mechanical wave synthesizer, and then well-known mathematicians of the day were dispatched on the scent of it to discover its hideout. Albert Michelson (of Michelson-Morley fame) was an intense, practical man who developed ingenious physical instruments of

extraordinary precision, mostly in the field of optics. His harmonic analyzer, developed in 1898, could compute the first 80 coefficients of the Fourier series of a signal x(t) specified by any graphical description. The instrument could also be used as a harmonic synthesizer, which could plot a function x(t) generated by summing the first 80 harmonics (Fourier components) of arbitrary amplitudes and phases. This analyzer, therefore, had the ability of self-checking its operation by analyzing a signal x(t) and then adding the resulting 80 components to see whether the sum yielded a close approximation of x(t). Michelson found that the instrument checked very well with most of signals analyzed. However, when he tried a discontinuous function,

such as a square wave,[†] a curious behavior was observed. The sum of 80 components showed oscillatory behavior (ringing), with an overshoot of 9% in the vicinity of the points of discontinuity. Moreover, this behavior was a constant feature regardless of the number of terms added. A larger number of terms made the oscillations proportionately faster, but regardless of the number of terms added, the overshoot remained 9%. This puzzling behavior caused Michelson to suspect some mechanical defect in his synthesizer. He wrote about his observation in a letter to Nature (December 1898). Josiah Willard Gibbs, who was a professor at Yale, investigated and

clarified this behavior for a sawtooth periodic signal in a letter to Nature.[7] Later, in 1906, Bôcher generalized the result for any function

with discontinuity. [8] It was Bôcher who gave the name Gibbs phenomenon to this behavior. Gibbs showed that the peculiar behavior in the synthesis of a square wave was inherent in the behavior of the Fourier series because of nonuniform convergence at the points of discontinuity. This, however, is not the end of the story. Both Bôcher and Gibbs were under the impression that this property had remained undiscovered until Gibbs's work published in 1899. It is now known that what is called the Gibbs phenomenon had been observed in 1848 by Wilbraham of Trinity College, Cambridge, who clearly saw the behavior of the sum of the Fourier series components in the periodic sawtooth signal later investigated by Gibbs. [9] Apparently, this work was not known to most people, including Gibbs and Bôcher. [†] The reason for calling this behavior "convergence in the mean" is that minimizing the error energy over a certain interval is

equivalent to minimizing the mean-squared value of the error over the same interval. [6] Guillemin, E. A. Theory of Linear Physical Systems. Wiley, New York, 1963. [†] Or, to keep up with times, "the man behind a successful woman".

[†] There is also an undershoot of 9% at the other side [at t = (π/2) + ] of the discontinuity. [†] Actually, at discontinuities, the series converges to a value midway between the values on either side of the discontinuity. The 9% overshoot occurs at t = (π/2) − and 9% undershoot occurs at t = (π/2) + . [†] Actually it was a periodic sawtooth signal. [7] Gibbs, W. J. Nature, vol. 59, p. 606, April 1899. [8] Bôcher, M. Annals of Mathematics, vol. 7, no. 2, 1906. [9] Carslaw, H. S. Bulletin of the American Mathematical Society, vol. 31, pp. 420-424, October 1925.

6.3 EXPONENTIAL FOURIER SERIES 0

0

By using Euler's equality, we can express cos nω0 t and sin nω0 t in terms of exponentials e jnω t and e −jnω t . Clearly, we should be able to express the trigonometric Fourier series in Eq. (6.9) in terms of exponentials of the form e jnω0 t with the index n taking on all integer values from −∞ to ∞, including zero. Derivation of the exponential Fourier series from the results already derived for the trigonometric Fourier series is straightforward, involving conversion of sinusoids to exponentials. We shall, however, derive them here independently, without using the prior results of the trigonometric series. This discussion shows that the exponential Fourier series for a periodic signal x(t) can be expressed as

To derive the coefficients D n , we multiply both sides of this equation by e −jm ω0 t (m integer) and integrate over one period. This yields

Here we use the orthogonality property of exponentials (proved in the footnote below) [†]

Using this result in Eq. (6.27), we obtain

from which we obtain

To summarize, the exponential Fourier series can be expressed as

where

Observe the compactness of expressions (6.29a) and (6.29b) and compare them with expressions corresponding to the trigonometric Fourier series. These two equations demonstrate very clearly the principal virtue of the exponential Fourier series. First, the form of the series is most compact. Second, the mathematical expression for deriving the coefficients of the series is also compact. It is much more convenient to handle the exponential series than the trigonometric one. For this reason we shall use exponential (rather than trigonometric) representation of signals in the rest of the book. We can now relate D n to trigonometric series coefficients a n and b n . Setting n = 0 in Eq. (6.29b), we obtain

Moreover, for n ≠ 0

and

These results are valid for general x(t), real or complex. When x(t) is real, a n and b n are real, and Eqs. (6.30b) and (6.30c) show that D n and D −n are conjugates.

Moreover, from Eqs. (6.13), we observe that

Hence

and

Therefore

Note that |D n | are the amplitudes and ∠D n are the angles of various exponential components. From Eqs. (6.33) it follows that when x(t)

is real, the amplitude spectrum (|D n | versus ω) is an even function of ω and the angle spectrum (∠D n versus ω) is an odd function of ω. For complex x(t), D n and D −n are generally not conjugates. EXAMPLE 6.5 Find the exponential Fourier series for the signal in Fig. 6.2a (Example 6.1). In this case T0 = π, ω0 = 2π/T0 = 2, and

where

and

Observe that the coefficients D n are complex. Moreover, D n and D −n are conjugates, as expected. COMPUTER EXAMPLE C6.3 Following Example 6.5, compute and plot the exponential Fourier spectra for the periodic signal x(t) shown in Fig. 6.2a. The expression for D n is derived in Example 6.5. >> >> >> >> >>

n = (-10:10); D_n = 0.504./(1+j*4*n); clf; subplot (2,1,1); stem(n,abs(D_n),'k'); xlabel('n'); ylabel ('|D_n|'); subplot (2,1,2); stem(n,angle(D_n),'k'); xlabel ('n'); ylabel('\angle D n [rad]');

Figure C6.3

6.3-1 Exponential Fourier Spectra In exponential spectra, we plot coefficients D n as a function of ω. But since D n is complex in general, we need both parts of one of two sets of plots: the real and the imaginary parts of D n , or the magnitude and the angle of D n . We prefer the latter because of its close connection to the amplitudes and phases of corresponding components of the trigonometric Fourier series. We therefore plot |D n |

versus ω and ∠D n versus ω. This requires that the coefficients D n be expressed in polar form as |D n |e ∠Dn , where |D n | are the amplitudes and ∠D n are the angles of various exponential components. Equations (6.33) show that for real x(t), the amplitude spectrum (|D n | versus ω) is an even function of ω and the angle spectrum (ωD n versus ω) is an odd function of ω. For the series in Example 6.5 [Eq. (6.35b)], for instance,

and

and so on. Note that D n and D −n are conjugates, as expected [see Eqs. (6.33)]. Figure 6.10 shows the frequency spectra (amplitude and angle) of the exponential Fourier series for the periodic signal x(t) in Fig. 6.2a.

Figure 6.10: Exponential Fourier spectra for the signal in Fig. 6.2a. We notice some interesting features of these spectra. First, the spectra exist for positive as well as negative values of ω (the frequency). Second, the amplitude spectrum is an even function of ω and the angle spectrum is an odd function of ω. At times it may appear that the phase spectrum of a real periodic signal fails to satisfy the odd symmetry: for example, when D k = D −k = −10. In this case, D k = 10e j π , and therefore, D −k = 10e −j π . Recall that e ±j π = −1. Here, although D k = D −k , their phases should be taken as π and −π. WHAT IS A NEGATIVE FREQUENCY? The existence of the spectrum at negative frequencies is somewhat disturbing because, by definition, the frequency (number of repetitions per second) is a positive quantity. How do we interpret a negative frequency? We can use a trigonometric identity to express a sinusoid of a negative frequency −ω0 as This equation clearly shows that the frequency of a sinusoid cos(ω0 t + θ) is |ω0 |, which is a positive quantity. The same conclusion is reached by observing that Thus, the frequency of exponentials e ±jω0 t is indeed |ω0 |. How do we then interpret the spectral plots for negative values of ω? A more satisfying way of looking at the situation is to say that exponential spectra are a graphical representation of coefficients D n as a function of ω. Existence of the spectrum at ω = − n ω0 is merely an indication that an exponential component e −jn ω0 t exists in the series. We know that a sinusoid of frequency n ω0 can be expressed in terms of a pair of exponentials e jnω 0 t and e −jnω 0 t .

We see a close connection between the exponential spectra in Fig. 6.10 and the spectra of the corresponding trigonometric Fourier series for x(t) (Fig. 6.2b, 6.2c). Equations (6.33) explain the reason for close connection, for real x(t), between the trigonometric spectra (C n and ∠ n ) with exponential spectra (|D n | and ∠D n ). The dc components D 0 and C 0 are identical in both spectra. Moreover, the exponential amplitude spectrum |D n | is half the trigonometric amplitude spectrum C n for n ≥ 1. The exponential angle spectrum ∠D n is identical to the trigonometric phase spectrum θn for n ≥ 0. We can therefore produce the exponential spectra merely by inspection of trigonometric spectra, and vice versa. The following example demonstrates this feature. EXAMPLE 6.6 The trigonometric Fourier spectra of a certain periodic signal x(t) are shown in Fig. 6.11a. By inspecting these spectra, sketch the corresponding exponential Fourier spectra and verify your results analytically.

Figure 6.11 The trigonometric spectral components exist at frequencies 0, 3, 6, and 9. The exponential spectral components exist at 0, 3, 6, 9, and −3, −6, −9. Consider first the amplitude spectrum. The dc component remains unchanged: that is, D 0 = C 0 = 16. Now |D n | is an even function of ω and |D n | = |D −n | = C n /2. Thus, all the remaining spectrum |D n | for positive n is half the trigonometric amplitude spectrum C n , and the spectrum |D n | for negative n is a reflection about the vertical axis of the spectrum for positive n, as shown in Fig. 6.11b. The angle spectrum ∠D n = θn for positive n and is −θn for negative n, as depicted in Fig. 6.11b. We shall now verify that both sets of spectra represent the same signal. Signal x(t), whose trigonometric spectra are shown in Fig. 6.11a, has four spectral components of frequencies 0, 3, 6, and 9. The dc component is 16. The amplitude and the phase of the component of frequency 3 are 12 and −π/4, respectively. Therefore, this component can be expressed as 12 cos (3t − π/4). Proceeding in this manner, we can write the Fourier series for x(t) as

Consider now the exponential spectra in Fig. 6.11b. They contain components of frequencies 0 (dc), ±3, ±6, and ±9. The dc component

is D 0 = 16. The component e j3t (frequency 3) has magnitude 6 and angle −π/4. Therefore, this component strength is 6e j π /4 and it can

be expressed as (6e −j π /4 )e j3t. Similarly, the component of frequency −3 is (6e j π /4 )e −j3t. Proceeding in this manner, corresponding to the spectra in Fig. 6.11b, is

the signal

Clearly both sets of spectra represent the same periodic signal. BANDWIDTH OF A SIGNAL The difference between the highest and the lowest frequencies of the spectral components of a signal is the bandwidth of the signal. The bandwidth of the signal whose exponential spectra are shown in Fig. 6.11b is 9 (in radians). The highest and lowest frequencies are 9 and 0, respectively. Note that the component of frequency 12 has zero amplitude and is nonexistent. Moreover, the lowest frequency is 0, not −9. Recall that the frequencies (in the conventional sense) of the spectral components at ˉ = −3, −6, and −9 in

reality are 3, 6, and 9.[†] The bandwidth can be more readily seen from the trigonometric spectra in Fig. 6.11a.

EXAMPLE 6.7 Find the exponential Fourier series and sketch the corresponding spectra for the impulse train δT0(t) depicted in Fig. 6.12a. From this result sketch the trigonometric spectrum and write the trigonometric Fourier series for δT0(t).

Figure 6.12: (a) Impulse train and (b, c) its Fourier spectra. The unit impulse train shown in Fig. 6.12a can be expressed as

Following Papoulis, we shall denote this function as δT0(t) for the sake of notational brevity. The exponential Fourier series is given by

where

Choosing the interval of integration (−T0 /2, T0 /2) and recognizing that over this interval δT0(t) = δ(t),

In this integral the impulse is located at t = 0. From the sampling property (1.24a), the integral on the right-hand side is the value of e −jnω0 t at t = 0 (where the impulse is located). Therefore

Substitution of this value in Eq. (6.36) yields the desired exponential Fourier series

Equation (6.37) shows that the exponential spectrum is uniform (D n =1/T0 ) for all the frequencies, as shown in Fig. 6.12b. The spectrum, being real, requires only the amplitude plot. All phases are zero. To sketch the trigonometric spectrum, we use Eq. (6.33) to obtain

Figure 6.12c shows the trigonometric Fourier spectrum. From this spectrum we can express δT0 (t) as

EFFECT OF SYMMETRY IN EXPONENTIAL FOURIER SERIES When x(t) has an even symmetry, b n =0, and from Eq. (6.30b), D n =a n /2, which is real (positive or negative). Hence, ∠D n can only be 0 or ±π. Moreover, we may compute D n =a n /2 by using Eq. (6.18b), which requires integration over a half-period only. Similarly, when x(t) has an odd symmetry, a n =0, and D n =−jb n /2 is imaginary (positive or negative). Hence, ∠D n can only be 0 or ±π/2. Moreover, we may compute D n =/jb n /2 by using Eq. (6.19b), which requires integration over a half-period only. Note, however, that in the exponential case, we are using the symmetry property indirectly by finding the trigonometric coefficients. We cannot apply it directly to Eq. (6.29b). EXERCISE E6.4

The exponential Fourier spectra of a certain periodic signal x(t) are shown in Fig. 6.13. Determine and sketch the trigonometric Fourier spectra of x(t) by inspection of Fig. 6.13. Now write the (compact) trigonometric Fourier series for x(t).

Figure 6.13 Answers

EXERCISE E6.5

Find the exponential Fourier series and sketch the corresponding Fourier spectrum D n versus ω for the fullwave rectified sine wave depicted in Fig. 6.14.

Figure 6.14 Answers

EXERCISE E6.6

Find the exponential Fourier series and sketch the corresponding Fourier spectra for the periodic signals shown in Fig. 6.6.

Answers a.

b.

6.3-2 Parseval's Theorem The trigonometric Fourier series of a periodic signal x(t) is given by

Every term on the right-hand side of this equation is a power signal. As shown in Example 1.2, Eq. (1.4d), the power of x(t) is equal to the sum of the powers of all the sinusoidal components on the right-hand side.

The result is one form of the Parseval's theorem, as applied to power signals. It states that the power of a periodic signal is equal to the sum of the powers of its Fourier components. We can apply the same argument to the exponential Fourier series (see Prob. 1.1-8). The power of a periodic signal x(t) can be

expressed as a sum of the powers of its exponential components. In Eq. (1.4e), we showed that the power of an exponential Dejω0 t is |D 2 |. We can use this result to express the power of a periodic signal x t) in terms; of its exponential Fourier series coefficients as

For a real (t), |D −n |=|D n |. Therefore

EXAMPLE 6.8 The input signal to an audio amplifier of gain 100 is given by x (t)=0.1 cos ω0 t. Hence, the output is a sinusoid 10 cos ω0 t. However, the amplifier, being nonlinear at higher amplitude levels, clips all amplitudes beyond ±8 volts as shown in Fig. 6.15a. We shall determine the harmonic distortion incurred in this operation.

Figure 6.15: (a) A clipped sinusoid cos. ω0 t (b) The distortion component x d (t) of the signal in (a). The output y(t) is the clipped signal in Fig. 6.15a. The distortion signal y d (t), shown in Fig. 6.15b, is the difference between the undistorted sinusoid 10 cos ω0 t and the output signal y(t). The signal y d (t), whose period is T0 [the same as that of y(t) can be described over the first cycle as

Observe that y d (t) is an even function of t and its mean value is zero. Hence, a 0 =C 0 =0, and b n =0. Thus, C n =a n and the Fourier series for y d (t) can be expressed as

As usual, we can compute the coefficients C n (which is equal to a n ) by integrating y d (t) cos n ω0 t over one cycle (and then dividing by 2/T0 ). Because y d (t) has even symmetry, we can find a n by integrating the expression over a half-cycle only using Eq. (6.18b). The straightforward evaluation of the appropriate integral yields [†]

Computing the coefficients C 1 C 2 C 3 ,... from this expression, we can write COMPUTING HARMONIC DISTORTION We can compute the amount of harmonic distortion in the output signal by computing the power of the distortion component y d (t). Because y d (t) is an even function of t and because the energy in the first half-cycle is identical to the energy in the second half-cycle, we can compute the power by averaging the energy over a quarter-cycle. Thus

The power of the desired signal 10 cos ω0 t is (10) 2 /2=50. Hence, the total harmonic distortion is

The power of the third harmonic components of y y (t) is (0.733) 2 /2=0.2686. The third harmonic distortion is [‡]

[†] We can readily prove this property as follows. For the case of m = n, the integrand in Eq. (6.28) is unity and the integral is T . When 0

m ≠ n, the integral on the left-hand side of Eq. (6.28) can be expressed as

Both the integrals on the right-hand side represent area under n − m number of cycles. Because n − m is an integer, both the areas are zero. Hence follows Eq. (6.28). [†] Some authors do define bandwidth as the difference between the highest and the lowest (negative) frequency in the exponential spectrum. The bandwidth according to this definition is twice that defined here. In reality, this phrasing defines not the signal bandwidth but the spectral width (width of the exponential spectrum of the signal). [†] In addition, y (t) exhibits half-wave symmetry (see Prob. 6.1-5), where the second half-cycle is the negative of the first. Because of d

this property, all the even harmonics vanish, and the odd harmonics can be computed by integrating the appropriate expressions over the first half-cycle only (from − T0 /4 to T0 /4) and doubling the resulting values. Moreover, because of even symmetry, we can integrate the appropriate expressions over 0 to T0 /4 (instead of from /T0 /4 to T0 /4) and double the resulting values. In essence, this allows us to compute C n integrating the expression over the quarter-cycle only and then quadrupling the resulting values. Thus

[‡] In the literature, the harmonic distortion often refers to the rms distortion rather than the power distortion. The rms values are the

. square-root values of the corresponding powers. Thus, the third harmonic distortion in this sense is Alternately, we may also compute this value directly from the amplitudes of the third harmonic 0.733 and that of the fundamental as 10. The ratio of the rms values is (0.733/√2). (10/√2) = 0.0733 and the percentage distortion is 7.33%.

6.4 LTIC SYSTEM RESPONSE TO PERIODIC INPUTS A periodic signal can be expressed as a sum of everlasting exponentials (or sinusoids). We also know how to find the response of an

LTIC system to an everlasting exponential. From this information we can readily determine the response of an LTIC system to periodic inputs. A periodic signal x(t) with period T0 can be expressed as an exponential Fourier series

In Section 4.8, we showed that the response of an LTIC system with transfer function H(s) to an everlasting exponential input e jωt is an everlasting exponential H(jω)e jωt . This input-output pair can be displayed as[†]

Therefore, from the linearity property

The response y (t) is obtained in the form of an exponential Fourier series and is therefore a periodic signal of the same period as that of the input. We shall demonstrate the utility of these results by the following example. EXAMPLE 6.9 A full-wave rectifier (Fig. 6.16a) is used to obtain a dc signal from a sinusoid sin t. The rectified signal x(t), depicted in Fig. 6.14, is applied to the input of a lowpass RC filter, which suppresses the time-varying component and yields a dc component with some residual ripple. Find the filter output y(t). Find also the dc output and the rms value of the ripple voltage.

Figure 6.16: (a) Full-wave rectifier with a lowpass filter and (b) its output. First, we shall find the Fourier series for the rectified signal x(t), whose period is T0 =π Consequently, ω=2, and

where

Therefore

Next, we find the transfer function of the RC filter in Fig. 6.16a. This filter is identical to the RC circuit in Example 1.11 (Fig. 1.35) for which the differential equation relating the output(capacitor voltage) to the input x(t) was found to be [Eq. (1.60)] The transfer function H(s) for this system is found from Eq. (2.50) as

and

From Eq. (6.42), the filter output y(t) can be expressed as (with ω 0=2)

Substituting D n and H(j2n) from Eqs. (6.43) and (6.44) in the foregoing equation, we obtain

Note that the output y(t) is also a periodic signal given by the exponential Fourier series on the right-hand side. The output is numerically computed from Eq. (6.45) and plotted in Fig. 6.16b. The output Fourier series coefficient corresponding to n=0 is the dc component of the output, given by 2/π. The remaining terms in the Fourier series constitute the unwanted component called the ripple. We can determine the rms value of the ripple voltage by using Eq. (6.41) to find the power of the ripple component. The power of the ripple is the power of all the components except the dc (n=0). Note that

, the exponential Fourier coefficient for the output y(t) is

Therefore, from Eq. (6.41b), we have

Numerical computation of the right-hand side yields Pripple=0.0025, and the ripple rms value ripple voltage is 5% of the amplitude of the input sinusoid.

. This shows that the rms

WHY USE EXPONENTIALS? The exponential Fourier series is just another way of representing trigonometric Fourier series (or vice versa). The two forms carry identical information-no more no less. The reasons for preferring the exponential form have already been mentioned: this form is more compact, and the expression for deriving the exponential coefficients is also more compact, than those in the trigonometric series. Furthermore, the LTIC system response to exponential signals is also simpler (more compact) than the system response to sinusoids. In addition, the exponential form proves to be much easier than the trigonometric form to manipulate mathematically and otherwise handle in the area of signals as well as systems. Moreover, exponential representation proves much more convenient for analysis of complex x(t). For these reasons, in our future discussion we shall use the exponential form exclusively. A minor disadvantage of the exponential form is that it cannot be visualized as easily as sinusoids. For intuitive and qualitative understanding, the sinusoids have the edge over exponentials. Fortunately, this difficulty can be overcome readily because of the close connection between exponential and Fourier spectra. For the purpose of mathematical analysis, we shall continue to use exponential signals and spectra; but to understand the physical situation intuitively or qualitatively, we shall speak in terms of sinusoids and trigonometric spectra. Thus, although all mathematical manipulation will be in terms of exponential spectra, we shall now speak of exponential and sinusoids interchangeably when we discuss intuitive and qualitative insights in attempting to arrive at an understanding of physical situations. This is an important point; readers should make an extra effort to familiarize themselves with the two forms of spectra, their relationships, and their convertibility. DUAL PERSONALITY OF A SIGNAL The discussion so far shows that a periodic signal has a dual personality-the time domain and the frequency domain. It can be described by its waveform or by its Fourier spectra. The time and frequency-domain descriptions provide complementary insights into a signal. For in-depth perspective, we need to understand both these identities. It is important to learn to think of a signal from both perspectives. In the next chapter, we shall see that aperiodic signals also have this dual personality. Moreover, we shall show that even LTI systems have this dual personality, which offers complementary insights into the system behavior. LIMITATIONS OF THE FOURIER SERIES METHOD OF ANALYSIS We have developed here a method of representing a periodic signal as a weighted sum of everlasting exponentials whose frequencies lie along the jω axis in the s plane. This representation (Fourier series) is valuable in many applications. However, as a tool for analyzing linear systems, it has serious limitations and consequently has limited utility for the following reasons: 1. The Fourier series can be used only for periodic inputs. All practical inputs are aperiodic (remember that a periodic signal

starts at t=−∞). 2. The Fourier methods can be applied readily to BIBO-stable (or asymptotically stable) systems. It cannot handle unstable or even marginally stable systems. The first limitation can be overcome by representing a periodic signals in terms of everlasting exponentials. This representation can be achieved through the Fourier integral, which may be considered to be an extension of the Fourier series. We shall therefore use the Fourier series as a stepping stone to the Fourier integral developed in the next chapter. The second limitation can be overcome by

using exponentials e st , where s is not restricted to the imaginary axis but is free to take on complex values. This generalization leads to the Laplace integral, discussed in Chapter 4 (the Laplace transform). [†] This result applies only to the asymptotically stable systems. This is because when s=jω , the integral on the right-hand side of Eq.

(2.48) does not converge for unstable systems. Moreover, for marginally stable systems also, that integral does not converge in the ordinary sense, and H(jω) cannot be obtained from H(s) by replacing s with jω.

6.5 GENERALIZED FOURIER SERIES: SIGNALS AS VECTORS [†] We now consider a very general approach to signal representation with far-reaching consequences. There is a perfect analogy between signals and vectors; the analogy is so strong that the term analogy understates the reality. Signals are not just like vectors. Signals are vectors! A vector can be represented as a sum of its components in a variety of ways, depending on the choice of coordinate system. A signal can also be represented as a sum of its components in a variety of ways. Let us begin with some basic vector concepts and then apply these concepts to signals.

6.5-1 Component of a Vector A vector is specified by its magnitude and its direction. We shall denote all vectors by boldface. For example, x is a certain vector with magnitude or length |x|. For the two vector x and y shown in Fig. 6.17, we define their dot (inner or scalar) product as

Figure 6.17: Component (projection) of a vector along another vector. where θ is the angle between these vectors. Using this definition we can express |x|, the length of a vector x, as

Let the component of x along y be c y as depicted in Fig. 6.17. Geometrically, the component of x along y is the projection of x on y and is obtained by drawing a perpendicular from the tip of x on the vector y, as illustrated in Fig. 6.17. What is the mathematical significance of a component of a vector along another vector? As seen from Fig. 6.17, the vector x can be expressed in terms of vector y as

However, this is not the only way to express x in terms of y. From Fig. 6.18, which shows two of the infinite other possibilities, we have

Figure 6.18: Approximation of a vector in terms of another vector. In each of these three representations, x is represented in terms of y plus another vector called the error vector, If we approximate x by cy

the error in the approximation is the vector e=x − c y. Similarly, the errors in approximations in these drawing are e 1 (Fig. 6.18a) and e 2 (Fig. 6.18b). What is unique about the approximation in Fig. 6.17 is that the error vector is the smallest. We can now define mathematically the component of a vector x along vector y to be c y where c is chosen to minimize the length of the error vector e=x−c y. Now, the length of the component of x along y is |x| cos θ. But its is also c|y| as seen from Fig. 6.17. Therefore Multiplying both sides by |y| yields Therefore

From Fig. 6.17, it is apparent that when x and y and are perpendicular, or orthogonal, then x has a zero component along y; consequently, c=0. Keeping an eye on Eq. (6.51), we therefore define x and y to be orthogonal if the inner (scalar or dot) product of the two vector is zero, that is, if

6.5-2 Signal Comparison and Component of a Signal The concept of a vector component and orthogonality can be extended to signals. Consider the problem of approximating a real signal x(t) in terms of another real signal y(t) over an interval (t1 , t 2 ):

The error e(t) in this approximation is

We now select a criterion for the "best approximation." We know that the signal energy is one possible measure of a signal size. For best approximation, we shall use the criterion that minimizes the size or energy of the error signal e(t) over the interval (t1 , t 2 ). This energy Ee is given by

Note that the right-hand side is a definite integral with t as the dummy variable. Hence, Ee is a function of the parameter c (not t) and Ee is minimum for some choice of c. To minimize Ee , a necessary condition is

or

Expanding the squared term inside the integral, we obtain

From which we obtain

and

We observe a remarkable similarity between the behavior of vectors and signals, as indicated by Eqs. (6.51) and (6.56). It is evident from these two parallel expressions that the area under the product of two signals corresponds to the inner (scalar or dot) product of two vectors. In fact, the area under the product of x(t) and y(t) is called the inner product of x(t) and y(t), and is denoted by (x, y). The energy of a signal is the inner product of a signal with itself, and corresponds to the vector length square (which is the inner product of the vector with itself). To summarize our discussion, if a signal x(t) is approximated by another signal y(t) as then the optimum value of c that minimizes the energy of the error signal in this approximation is given by Eq. (6.56). Taking our clue from vectors, we say that a signal x(t) contains a component cy(t), where c is given by Eq. (6.56). Note that in vector terminology, cy(t) is the projection of x(t) on y(t). Continuing with the analogy, we say that if the component of a signal x(t) of the form y(t) is zero (i.e., c=0), the signals x(t) and y(t) are orthogonal over the interval (t1 , t 2 ). Therefore, we define the real signals x(t) and y(t) to be orthogonal over the interval (t1 , t 2 ) if [†]

EXAMPLE 6.10 For the square signal x(t) shown in Fig. 6.19 find the component in x(t) of the form sin t. In other words, approximate x(t) in terms of sin t

Figure 6.19: Approximation of a square signal in terms of a single sinusoid. so that the energy of the error signal is minimum. In this case

From Eq. (6.56), we find

Thus

represents the best approximation of x(t) by the function sin t, which will minimize the error energy. This sinusoidal component of x(t) is shown shaded in Fig. 6.19. By analogy with vectors, we say that the square function x(t) depicted in Fig. 6.19 has a component of signal sin t and that the magnitude of this component is 4/π. EXERCISE E6.7 Show that over an interval (−π < t < π), the "best" approximation of the signal x(t)=t in terms of the function sin t is 2 sin t. Verify that the error signal e(t)=t − 2 sin t is orthogonal to the signal sin t over the interval −π < t < π. Sketch the signals t and 2 sin t over the interval −π < t < π.

6.5-3 Extension to Complex Signals So far we have restricted ourselves to real functions of t. To generalize the results to complex functions of t, consider again the problem of approximating a signal x(t) by a signal y(t) over an interval (t1 < t < t2 ):

where x(t) and y(t) now can be complex functions of t. Recall that the energy Ey of the complex signal y(t) over an interval (t1 , t 2 ) is

In this case, both the coefficient c and the error

are complex (in general). For the "best" approximation, we choose c so that Ee , the energy of the error signal e(t) is minimum. Now,

Recall also that

After some manipulation, we can use this result to rearrange Eq. (6.62) as

Since the first two terms on the right-hand side are independent of c, it is clear that Ee is minimized by choosing c so that the third term on the right-hand side is zero. This yields

In light of this result, we need to redefine orthogonality for the complex case as follows: two complex functions x 1 (t) and x 2 (t) are orthogonal over an interval (t1 < t < t2 ) if

Either equality suffices. This is a general definition of orthogonality, which reduces to Eq. (6.57) when the functions are real. EXERCISE E6.8 Show that over an interval (0 < t < 2π), the "best" approximation of the square signal x(t) in Fig. 6.19 in terms of the signal e jt is given

by (2/jπ)e jt . Verify that the error signal e(t)=x(t) − (2/jπ)e jt is orthogonal to the signal e jt . ENERGY OF THE SUM OF ORTHOGONAL SIGNALS

We know that the square of the length of a sum of two orthogonal vectors is equal to the sum of the squares of the lengths of the two vectors. Thus, if vectors x and y are orthogonal, and if z=x + y, then We have a similar result for signals. The energy of the sum of two orthogonal signals is equal to the sum of the energies of the two

signals. Thus, if signals x(t) and y(t) are orthogonal over an interval (t1 , t 2 ), and if z(t)=x(t) + y(t), then

We now prove this result for complex signals of which real signals are a special case. From Eq. (6.63) it follows that

The last result follows from the fact that because of orthogonality, the two integrals of the products x(t)y*(t) and x*(t)y(t) are zero [see Eq. (6.65)]. This result can be extended to the sum of any number of mutually orthogonal signals.

6.5-4 Signal Representation by an Orthogonal Signal Set In this section we show a way of representing a signal as a sum of orthogonal signals. Here again we can benefit from the insight gained from a similar problem in vectors. We know that a vector can be represented as a sum of orthogonal vectors, which form the coordinate system of a vector space. The problem in signals is analogous, and the results for signals are parallel to those for vectors. So, let us review the case of vector representation. ORTHOGONAL VECTOR SPACE Let us investigate a three-dimensional Cartesian vector space described by three mutually orthogonal vectors x 1 , x 2 , and x 3 , as illustrated in Fig. 6.20. First, we shall seek to approximate a three-dimensional vector x in terms of two mutually orthogonal vectors x 1 and x 2 :

Figure 6.20: Representation of a vector in three-dimensional space. The error e in this approximation is or As in the earlier geometrical argument, we see from Fig 6.20 that the length of e is minimum when e is perpendicular to the x 1 -x 2 plane, and c 1 x 1 and c 2 x 2 are the projections (components) of x on x 1 and x 2 , respectively. Therefore, the constants c 1 and c 2 are given by Eq. (6.51). Observe that the error vector is orthogonal to both the vectors x 1 and x 2 . Now, let us determine the "best" approximation to x in terms of all three mutually orthogonal vectors x 1 , x 2 , and x 3 :

Figure 6.20 shows that a unique choice of c 1 , c 2 , and c 3 exists, for which Eq. (6.68) is no longer an approximation but an equality

In this case, c 1 x 1 , c 2 x 2 , and c 3 x 3 are the projections (components) of x on x 1 , x 2 , and x 3 , respectively; that is,

Note that the error in the approximation is zero when x is approximated in terms of three mutually orthogonal vectors: x 1 , x 2 , and x 3 . The reason is that x is a three-dimensional vector, and the vectors x 1 , x 2 , and x 3 represent a complete set of orthogonal vectors in three-dimensional space. Completeness here means that it is impossible to find another vector x 4 in this space, which is orthogonal to all three vectors, x 1 , x 2 , and x 3 . Any vector in this space can then be represented (with zero error) in terms of these three vectors. Such vectors are known as basis vectors. If a set of vectors {x i } is not complete, the error in the approximation will generally not be zero. Thus, in the three-dimensional case discussed earlier, it is generally not possible to represent a vector x in terms of only two basis vectors without an error. The choice of basis vectors is not unique. In fact, a set of basis vectors corresponds to a particular choice of coordinate system. Thus, a three-dimensional vector x may be represented in many different ways, depending on the coordinate system used. ORTHOGONAL SIGNAL SPACE We start with real signals first and then extend the discussion to complex signals. We proceed with our signal approximation problem, using clues and insights developed for vector approximation. As before, we define orthogonality of a real signal set x 1 (t), x 2 (t), ..., x N(t) over interval (t1 , t 2 ) as

If the energies En =1 for all n, then the set is normalized and is called an orthonormal set. An orthogonal set can always be normalized by dividing x n (t) by √En for all n. Now, consider approximating a signal x(t) over the interval (t1 , t 2 ) by a set of N real, mutually orthogonal signals x 1 (t), x 2 (t), ..., x N(t) as

In the approximation of Eqs. (6.72) the error e(t) is

and Ee , the error signal energy is

According to our criterion for best approximation, we select the values of c i that minimize Ee . Hence, the necessary condition is ∂Ee /dci =0 for i=1, 2, ..., N, that is,

When we expand the integrand, we find that all the cross-multiplication terms arising from the orthogonal signals are zero by virtue of orthogonality: that is, all terms of the form ∮x m (t)x n (t) dt with m ≠ n vanish. Similarly, the derivative with respect to c i of all terms that do not contain c i is zero. For each i, this leaves only two nonzero terms in Eq. (6.75):

or

Therefore

A comparison of Eqs. (6.76) with Eqs. (6.70) forcefully brings out the analogy of signals with vectors. Finality Property. Equation (6.76) shows one interesting property of the coefficients of c 1 , c 2 , ..., c N: the optimum value of any coefficient in approximation (6.72a) is independent of the number of terms used in the approximation. For example, if we used only one term (N=1) or two terms (N=2) or any number of terms, the optimum value of the coefficient c 1 would be the same [as given by Eq. (6.76)]. The advantage of this approximation of a signal x(t) by a set of mutually orthogonal signals is that we can continue to add terms to the approximation without disturbing the previous terms. This property of finality of the values of the coefficients is very important from a practical point of view.[†]

ENERGY OF THE ERROR SIGNAL When the coefficients c i in the approximation (6.72) are chosen according to Eqs. (6.76), the error signal energy in the approximation (6.72) is minimized. This minimum value of Ee is given by Eq. (6.74):

Substitution of Eqs. (6.71) and (6.76) in this equation yields

Observe that because the term c k 2 Ek is nonnegative, the error energy Ee generally decreases as N, the number of terms, is increased. Hence, it is possible that the error energy → 0 as N →∞. When this happens, the orthogonal signal set is said to be complete. In this case, Eq. (6.72b) is no more an approximation but an equality

where the coefficients c n are given by Eq. (6.76b). Because the error signal energy approaches zero, it follows that the energy of x(t) is now equal to the sum of the energies of its orthogonal components c 1 x 1 (t), c 2 x 2 (t), c 3 x 3 (t), ... The series on the right-hand side of Eq. (6.78) is called the generalized Fourier series of x(t) with respect to the set {x n (t)}. When the set {x n (t)} is such that the error energy Ee → 0 as N → ∞ for every member of some particular class, we say that the set {x n (t)} is complete on (t1 , t 2 ) for that class of x(t), and the set {x n (t)} is called a set of basis functions or basis signals. Unless otherwise mentioned, in future we shall consider only the class of energy signals. Thus, when the set {x n (t)} is complete, we have the equality (6.78). One subtle point that must be understood clearly is the meaning of equality in Eq. (6.78). The equality here is not an equality in the ordinary sense, but in the sense that the error energy, that is, the energy of the difference between the two sides of Eq. (6.78), approaches zero. If the equality exists in the ordinary sense, the error energy is always zero, but the converse is not necessarily true. The error energy can approach zero even though e(t), the difference between the two sides, is nonzero at some isolated instants. The reason is that even if e(t) is nonzero at such instants, the area under

e 2 (t) is still zero; thus the Fourier series on the right-hand side of Eq. (6.78) may differ from x(t) at a finite number of points. In Eq. (6.78), the energy of the left-hand side is Ex , and the energy of the right-hand side is the sum of the energies of all the

orthogonal components. [†] Thus

This is the Parseval's theorem applicable to energy signals. In Eqs. (6.40) and (6.41), we have already encountered the form of the Parseval theorem suitable for power signals. Recall that the signal energy (area under the squared value of a signal) is analogous to the square of the length of a vector in the vector-signal analogy. In vector space, we know that the square of the length of a vector is equal to the sum of the squares of the lengths of its orthogonal components. The Parseval theorem in Eq. (6.79) is the statement of this fact as it applies to signals. GENERALIZATION TO COMPLEX SIGNALS The foregoing results can be generalized to complex signals as follows: a set of functions x 1 (t), x 2 (t), ..., x N(t) is mutually orthogonal over the interval (t1 , t 2 ) if

If this set is complete for a certain class of functions, then a function x(t) in this class can be expressed as

where

EXAMPLE 6.11 As an example, we shall consider again the square signal x(t) in Fig. 6.19. In Example 6.10 this signal was approximated by a single sinusoid sin t. Actually the set sin t, sin 2t, ..., sin nt, ... is orthogonal over the interval over any interval of duration 2π. [†] The reader can verify this fact by showing that for any real number a

Let us approximate the square signal in Fig. 6.19, using this set, and see how the approximation improves with number of terms where

Therefore

Note that coefficients of terms sin kt are zero for even values of k. Figure 6.21 shows how the approximation improves as we increase the number of terms in the series. Let us investigate the error signal energy as N → ∞. Form Eq. (6.77)

Figure 6.21: Approximation of a square signal by a sum of sinusoids. Note that

and from Eq. (6.83) Therefore

For a single-term approximation (N=1),

For a two-term approximation (N=3)

Table 6.3 shows the error energy Ee for various values of N. Table 6.3 Open table as spreadsheet N

Ee

1

1.1938

3

0.6243

5

0.4206

7

0.3166

99

0.02545

∞

0

Clearly, x(t) can be represented by the infinite series

The equality exists in the sense that the error signal energy → 0 as N → ∞. In this case, the error energy decreases rather slowly with N, indicating that the series converges slowly. This is to be expected because x(t) has jump discontinuities and consequently, according to discussion in Section 6.2-2, the series converges asymptotically as 1/n. EXERCISE E6.9

Approximate the signal x(t)=t − π (Fig. 6.22) over the interval (0, 2p) in terms of the set of sinusoids {sin nt}, n=0, 1, 2, ..., used in Example 6.11. Find Ee , the error energy. Show that Ee → 0 as N → ∞.

Figure 6.22 Answers

SOME EXAMPLES OF GENERALIZED FOURIER SERIES Signals are vectors in every sense. Like a vector, a signal can be represented as a sum of its components in a variety of ways. Just as vector coordinate systems are formed by mutually orthogonal vectors (rectangular, cylindrical, spherical), we also have signal coordinate systems (basis signals) formed by a variety of sets of mutually orthogonal signals. There exist a large number of orthogonal signal sets that can be used as basis signals for generalized Fourier series. Some well-known signal sets are trigonometric (sinusoid) functions, exponential functions, Walsh functions, Bessel functions, Legendre polynomials, Laguerre functions, Jacobi polynomials, Hermite polynomials, and Chebyshev polynomials. The functions that concern us most in this book are the trigonometric and the exponential sets discussed earlier in this chapter.

LEGENDRE FOURIER SERIES A set of Legendre polynomials Pn (t) (n=0, 1, 2, 3, ...) forms a complete set of mutually orthogonal functions over an interval (−1 < t < 1). These polynomials can be defined by the Rodrigues formula:

It follows from this equation that

and so on. We may verify the orthogonality of these polynomials by showing that

We can express a function x(t) in terms of Legendre polynomials over an interval (−1 < t < 1) as

where

Note that although the series representation is valid over the interval (−1, 1), it can be extended to any interval by the appropriate time scaling (see Prob. 6.5-8). EXAMPLE 6.12 Let us consider the square signal shown in Fig. 6.23. This function can be represented by Legendre Fourier series:

Figure 6.23 The coefficients c 0 , c 1 , c 2 , ..., c r may be found from Eq. (6.89). We have

and

This result follows immediately from the fact that the integrand is an odd function of t. In fact, this is true of all c r for even values of r, that is, Also,

In a similar way, coefficients c 5 , c 7 , ... can be evaluated. We now have

TRIGONOMETRIC FOURIER SERIES We have already proved [see Eqs. (6.7)] that the trigonometric signal set

is orthogonal over any interval of duration T0 , where T0 =1/ƒ 0 is the period of the sinusoid of frequency ƒ 0 . This is a complete set for a class of signals with finite energies. [11] , [12] Therefore we can express a signal x(t) by a trigonometric Fourier series over any interval of duration T0 seconds as

or

where

We can use Eq. (6.76) to determine the Fourier coefficients a 0 , a n , and b n . Thus

The integral in the denominator of Eq. (6.93) has already been found to be T0 /2 when n ≠ 0 [Eq. (6.7a) with m=n]. For n=0, the denominator is T0 . Hence

and

Similarly, we find that

Note that the Fourier series in Eq. (6.85) of Example 6.11 is indeed the trigonometric Fourier series with T0 =2π and ω0 =2π/T0 . In this particular example, it is easy to verify from Eqs. (6.94a) and (6.94b) that a n =0 for all n, including n=0. Hence the Fourier series in that example consisted only of sine terms. EXPONENTIAL FOURIER SERIES As shown in the footnote on page 624, the set of exponentials e j?0 t (n=0, ±1, ±2, ...) is a set of functions orthogonal over any interval of duration T0 =2π/ω0 . An arbitrary signal x(t) can now be expressed over an interval (t1 , t 1 + T0 ) as

where [see Eq. (6.82)]

WHY USE THE EXPONENTIAL SET? If x(t) can be represented in terms of hundreds of different orthogonal sets, why do we exclusively use the exponential (or trigonometric) set for the representation of signals or LTI systems? It so happens that the exponential signal is an eigenfunction of LTI systems. In other words, for an LTI system, only an exponential input e st yields the response that is also an exponential of the same form, given by

H(s)e st . The same is true of the trigonometric set. This fact makes the use of exponential signals natural for LTI systems in the sense that the system analysis using exponentials as the basis signals is greatly simplified.

[†] This section closely follows the material from the author's earlier book [10] . Omission of this section will not cause any discontinuity in

understanding the rest of the book. Derivation of Fourier series through the signal-vector analogy provides an interesting insight into signal representation and other topics such as signal correlation, data truncation, and signal detection. [†] Lathi, B. P. Signals, Systems, and Communication. Wiley, New York, 1965. [†] For complex signals the definition is modified as in Eq. (6.65), in Section 6.5-3. [†] Contrast this situation with polynomial approximation of x(t). Suppose we wish to find a two-point approximation of x(t) by a

polynomial in t; that is, the polynomial is to be equal to x(t) at two points t1 and t2 . This can be done by choosing a first-order polynomial a 0 + a 1 t with

Solution of these equations yields the desired values of a 0 and a 1 . For a three-point approximation, we must choose the polynomial a 0 + a 1 t + a 2 t2 with The approximation improves with larger number of points (higher-order polynomial), but the coefficients a 0 , a 1 , a 2 , ..., do not have the finality property. Every time we increase the number of terms in the polynomial, we need to recalculate the coefficients. [†] Note that the energy of a signal cx(t) is c 2 E . x [†] This sine set, along with the cosine set cos 0 t, cos 2t, ..., cos nt, ..., forms a complete set. In this case, however, the coefficients c i

corresponding to the cosine terms are zero. For this reason, we have omitted cosine terms in this example. This composite sine and cosine set is the basis set for the trigonometric Fourier series. [11] Walker P. L. The Theory of Fourier Series and Integrals. Wiley, New York, 1986. [12] Churchill, R. V., and J. W. Brown. Fourier Series and Boundary Value Problems, 3rd ed. McGraw-Hill, New York, 1978.

6.6 NUMERICAL COMPUTATION OF Dn We can compute D n numerically by using the DFT (the discrete Fourier transform discussed in Section 8.5), which uses the samples of a periodic signal x(t) over one period. The sampling interval is T seconds. Hence, there are N 0 =T0 /T number of samples in one period T0 . To find the relationship between D n and the samples of x(t), consider Eq. (6.29b)

where x(kT) is the kth sample of x(t) and

In practice, it is impossible to make T → 0 in computing the right-hand side of Eq. (6.96). We can make T small, but not zero, which will cause the data to increase without limit. Thus, we shall ignore the limit on T in Eq. (6.96) with the implicit understanding that T is reasonably small. Nonzero T will result in some computational error, which is inevitable in any numerical evaluation of an integral. The error resulting from nonzero T is called the aliasing error, which is discussed in more detail in Chapter 8. Thus, we can express Eq. (6.96) as

Now, from Eq. (6.97), Ω 0 N 0 =2π. Hence, e j Ω0 (k+N 0)=e j Ω0 k and from Eq. (6.98a), it follows that

The periodicity property D n+N0 =D n means that beyond n=N 0 /2, the coefficients represent the values for negative n. For instance, when

N 0 =32, D 17 =D −15, D 18 =D -14 , ..., D 31 =D −1 . The cycle repeats again from n=32 on.

We can use the efficient FFT (the fast Fourier transform discussed in Section 8.6) to compute the right-hand side of Eq. (6.98b). We shall use MATLAB to implement the FFT algorithm. For this purpose, we need samples of x(t) over one period starting at t = 0. In this algorithm, it is also preferable (although not necessary) that N 0 be a power of 2, that is N 0 =2m , where m is an integer.

COMPUTER EXAMPLE C6.4 Numerically compute and then plot the trigonometric and exponential Fourier spectra for the periodic signal in Fig. 6.2a (Example 6.1). The samples of x(t) start at t =0 and the last (N 0 th) sample is at t=T0 − T. At the points of discontinuity, the sample value is taken as the average of the values of the function on two sides of the discontinuity. Thus, the sample at t =0 is not 1 but (e −π/2 + 1)/2 =0.604. To determine N 0 , we require that D n for n ≥ N 0 /2 to be negligible. Because x(t) has a jump discontinuity, D n decays rather slowly as 1/n. Hence, a choice of N 0 =200 is acceptable because the (N 0 /2)nd (100th) harmonic is about 1% of the fundamental. However, we also require N 0 to be power of 2. Hence, we shall take N 0 =256=2.[8]

First, the basic parameters are established. >> T_0 = pi; N_0 = 256; T = T_0/N_0; t = (0:T:T*(N_0-1))'; M = 10; >> x = exp(-t/2); x(1) = (exp(-pi/2) + 1)/2; Next, the DFT, computed by means of the fft function, is used to approximate the exponential Fourier spectra over −M ≤ n ≤ M. >> D_n = fft (x)/N_0; n = [-N_0/2:N_0/2-1]'; >> clf; subplot (2, 2, 1); stem(n, abs(fftshift (D_n)),'k'); >> axis ([-M M -.1 .6]); xlabel('n'); ylabel('|D_n|'); >> subplot (2, 2, 2); stem(n, angle(fftshift(D_n)),'k'); >> axis([-M M -pi pi]); xlabel ('n'); ylabel('\angle D n [rad]'); The approximate trigonometric Fourier spectra over 0 ≤ n ≤ M immediately follow. >> n = [0:M]; C_n(1) = abs(D_n(1)); C_n(2:M+1) = 2*abs (D_n(2:M+1)); >> theta_n(1) = angle(D_n(1)); theta_n(2:M+1) = angle(D_n(2:M+1)); >> subplot (2, 2, 3); stem(n,C_n,'k');

>> xlabel ('n'); ylabel('C_n'); >> subplot (2, 2, 4); stem(n,theta_n,'k'); >> xlabel ('n'); ylabel('\theta n [rad]');

Figure C6.4 [8] Bôcher, M. Annals of Mathematics, vol. 7, no. 2, 1906.

6.7 SUMMARY In this chapter we showed how a periodic signal can be represented as a sum of sinusoids or exponentials. If the frequency of a periodic signal is ƒ 0 , then it can be expressed as a weighted sum of a sinusoid of frequency ƒ 0 and its harmonics (the trigonometric Fourier series). We can reconstruct the periodic signal from a knowledge of the amplitudes and phases of these sinusoidal components (amplitude and phase spectra). If a periodic signal x(t) has an even symmetry, its Fourier series contains only cosine terms (including dc). In contrast, if x(t) has an odd symmetry, its Fourier series contains only sine terms. If x(t) has neither type of symmetry, its Fourier series contains both sine and cosine terms. At points of discontinuity, the Fourier series for x(t) converges to the mean of the values of x(t) on either sides of the discontinuity. For signals with discontinuities, the Fourier series converges in the mean and exhibits Gibbs phenomenon at the points of discontinuity. The amplitude spectrum of the Fourier series for a periodic signal x(t) with jump discontinuities decays slowly (as 1/n) with frequency. We need a large number of terms in the Fourier series to approximate x(t) within a given error. In contrast, smoother periodic signal amplitude spectrum decays faster with frequency and we require a fewer number of terms in the series to approximate x(t) within a given error. A sinusoid can be expressed in terms of exponentials. Therefore the Fourier series of a periodic signal can also be expressed as a sum of exponentials (the exponential Fourier series). The exponential form of the Fourier series and the expressions for the series coefficients are more compact than those of the trigonometric Fourier series. Also, the response of LTIC systems to an exponential input is much simpler than that for a sinusoidal input. Moreover, the exponential form of representation lends itself better to mathematical manipulations than does the trigonometric form. For these reasons, the exponential form of the series is preferred in modern practice in the areas of signals and systems. The plots of amplitudes and angles of various exponential components of the Fourier series as functions of the frequency are the exponential Fourier spectra (amplitude and angle spectra) of the signal. Because a sinusoid cos ω0 t can be represented as a sum of

two exponentials, e j ω0 t and e j ω0 t , the frequencies in the exponential spectra range from π =−∞ to ∞. By definition, frequency of a signal is always a positive quantity. Presence of a spectral component of a negative frequency −nω0 merely indicates that the Fourier series contains terms of the form e jn ω0 t . The spectra of the trigonometric and exponential Fourier series are closely related, and one can be found by the inspection of the other.

In Section 6.5 we discuss a method of representing signals by the generalized Fourier series, of which the trigonometric and exponential Fourier series are special cases. Signals are vectors in every sense. Just as a vector can be represented as a sum of its components in a variety of ways, depending on the choice of the coordinate system, a signal can be represented as a sum of its components in a variety of ways, of which the trigonometric and exponential Fourier series are only two examples. Just as we have vector coordinate systems formed by mutually orthogonal vectors, we also have signal coordinate systems (basis signals) formed by mutually orthogonal signals. Any signal in this signal space can be represented as a sum of the basis signals. Each set of basis signals yields a particular Fourier series representation of the signal. The signal is equal to its Fourier series, not in the ordinary sense, but in

the special sense that the energy of the difference between the signal and its Fourier series approaches zero. This allows for the signal to differ from its Fourier series at some isolated points.

REFERENCES 1. Bell, E. T. Men of Mathematics. Simon & Schuster, New York, 1937. 2. Durant, Will, and Ariel Durant. The Age of Napoleon, Part XI in The Story of Civilization Series. Simon & Schuster, New York, 1975. 3. Calinger, R. Classics of Mathematics, 4th ed. Moore Publishing, Oak Park, IL, 1982. 4. Lanczos, C. Discourse on Fourier Series. Oliver Boyd, London, 1966. 5. Körner, T. W. Fourier Analysis. Cambridge University Press, Cambridge, UK, 1989. 6. Guillemin, E. A. Theory of Linear Physical Systems. Wiley, New York, 1963. 7. Gibbs, W. J. Nature, vol. 59, p. 606, April 1899. 8. Bôcher, M. Annals of Mathematics, vol. 7, no. 2, 1906. 9. Carslaw, H. S. Bulletin of the American Mathematical Society, vol. 31, pp. 420-424, October 1925. 10. Lathi, B. P. Signals, Systems, and Communication. Wiley, New York, 1965. 11. Walker P. L. The Theory of Fourier Series and Integrals. Wiley, New York, 1986. 12. Churchill, R. V., and J. W. Brown. Fourier Series and Boundary Value Problems, 3rd ed. McGraw-Hill, New York, 1978.

MATLAB SESSION 6: FOURIER SERIES APPLICATIONS Computational packages such as MATLAB simplify the Fourier-based analysis, design, and synthesis of periodic signals. MATLAB permits rapid and sophisticated calculations, which promote practical application and intuitive understanding of the Fourier series.

M6.1 Periodic Functions and the Gibbs Phenomenon It is sufficient to define any T0 -periodic function over the interval (0 ≤ t < T0 ). For example, consider the 2π-periodic function given by

Although similar to a square wave, x(t) has a linearly rising edge of width A, where (0 < A < π). As A → 0,x(t) approaches a square wave; as A → π, x(t) approaches a type of sawtooth wave. In MATLAB, the mod command helps represent periodic functions such as x(t). >> x = inline (['mod(t,2*pi)/A.*(mod(t,2*pi) =A) & (mod(t,2*pi) < pi))'], 't', 'A'); Sometimes referred to as the signed remainder after division, mod (t,2*pi) returns the value t modulo 2π. Thought of another way, the mod operator appropriately shifts t into [0, T0 ), where x(t) is conveniently defined. When an inline object is a function of multiple variables, the variables are simply listed in the desired order following the function expression. The exponential Fourier series coefficients for x(t) (see Prob. 6.3-2) are given by

Since x(t) is real, D -n =D n *. Truncating the Fourier series at |n|=N yields the approximation

Program MS 6 P1 uses Eq. (M6.2) to compute x N(t) for (0 ≤ N ≤ 100), each over (− π/4 ≤ t < 2π + π/4). function [x_N,t]=MS6P1(A); % MS6P1. m : MATLAB Session 6, Program 1 % Function M-file approximates x(t) using Fourier series % truncated at |n| = N for (0 < = N < = 100). % INPUTS: A = width of rising edge % OUTPUTS: x_N = output matrix, where x_N(N+1,:) is the |n| = N truncation % t=time vector for x_N t=linspace (-pi/4,2*pi+pi/4, 1000); % Time vector exceeds one period. sumterms = zeros (101, length (t)); % Pre-allocate memory sumterms (1,:) = (2*pi-A)/(4*pi); % Compute DC term for n = 1:100, % Compute N remaining terms D_n=1/(2*pi*n)*((exp(-j*n*A)-1)/(n*A) + j*exp(-j*n*pi)); sumterms (1+n,:)=real (D_n*exp(j*n*t) + conj(D_n)*exp(-j*n*t)); end x N = cumsum (sumterms); Although theoretically not required, the real command ensures that small computer round-off errors do not cause a complex-valued result. For a matrix input, the cumsum command cumulatively sums along rows: the first output row is identical to the first input row, the second output row is the sum of the first two input rows, the third output row is the sum of the first three input rows, and so forth. Thus, row (N + 1) of x_N corresponds to the truncation of the exponential Fourier series at |n|=N. Setting A=π/2, Fig. M6.1 compares x(t) and x 20 (t). >> A = pi/2; [x_N,t] = MS6P1(A); >> plot (t,x_N(21,:),'k',t,x(t,A),'k:'); axis([-pi/4,2*pi+pi/4,-0.1,1.1]); >> xlabel ('t'); ylabel ('Amplitude'); legend ('x 20(t)','x(t)',0);

Figure M6.1: Comparison of x 20 (t) and x(t) using A=π/2. As expected, the falling edge is accompanied by the overshoot that is characteristic of the Gibbs phenomenon. Increasing N to 100, as shown in Fig. M6.2, improves the approximation but does not reduce the overshoot. >> plot(t,x_N(101,:),'k',t,x(t,A),'k:'); axis([-pi/4,2*pi+pi/4,-0.1,1.1]); >> xlabel('t'); ylabel('Amplitude'); legend('x_100(t)','x(t)',0);

Figure M6.2: Comparison of x 100 (t) and x(t) using A=π/2. Reducing A to π/64 produces a curious result. For N=20, both the rising and falling edges are accompanied by roughly 9% of

overshoot, as shown in Fig. M6.3. As the number of terms is increased, overshoot persists only in the vicinity of jump discontinuities. For x N(t), increasing N decreases the overshoot near the rising edge but not near the falling edge. Remember that it is a true jump discontinuity that causes the Gibbs phenomenon. A continuous signal, no matter how sharply it rises, can always be represented by a Fourier series at every point within any small error by increasing N. This is not the case when a true jump discontinuity is present. Figure M6.4 illustrates this behavior using N=100.

Figure M6.3: Comparison of x 20 (t) and x(t) using A=π/64.

Figure M6.4: Comparison of x 100 (t) and x(t) using A=π/64.

M6.2 Optimization and Phase Spectra Although magnitude spectra typically receive the most attention, phase spectra are critically important in some applications. Consider the problem of characterizing the frequency response of an unknown system. By applying sinusoids one at a time, the frequency response is empirically measured one point at a time. This process is tedious at best. Applying a superposition of many sinusoids, however, allows simultaneous measurement of many points of the frequency response. Such measurements can be taken by a spectrum analyzer equipped with a transfer function mode or by applying Fourier analysis techniques, which are discussed in later chapters. A multitone test signal m(t) is constructed using a superposition of N real sinusoids

where Mn and θn establish the relative magnitude and phase of each sinusoidal component. It is sensible to constrain all gains to be equal, Mn =M for all n. This ensures equal treatment at each point of the measured frequency response. Although the value M is normally chosen to set the desired signal power, we set M=1 for convenience. While not required, it is also sensible to space the sinusoidal components uniformly in frequency,

Another sensible alternative, which spaces components logarithmically in frequency, is treated in Prob. 6.M-1. Equation (M6.4) is now a truncated compact-form Fourier series with a flat magnitude spectrum. Frequency resolution and range are set by w 0 and N, respectively. For example, a 2 kHz range with a resolution of 100 Hz requires w 0 =2π 100 and N=20. The only remaining unknowns are the θn . While it is tempting to set θn =0 for all n, the results are quite unsatisfactory. MATLAB helps demonstrate the problem by using Ω 0 =2π 100 and N=20 sinusoids, each with a peak-to-peak voltage of one volt.

>> >> >> >>

m = inline('sum(cos(omega*t+theta*ones(size(t))))','theta','t','omega'); N = 20; omega = 2*pi*100*[1:N]'; theta = zeros(size(omega)); t = linspace(-0.01,0.01,1000); plot(t,m(theta,t,omega),'k'); xlabel('t [sec]'); ylabel('m(t) [volts]');

As shown in Fig. M6.5, θn =0 causes each sinusoid to constructively add. The resulting 20-volt peak can saturate system components, such as operational amplifiers operating with ±12-volt rails. To improve signal performance, the maximum amplitude of m(t) over t needs to be reduced.

Figure M6.5: Test signal m(t) with θn =0. One way to reduce max t (|m(t)|) is to reduce M, the strength of each component. Unfortunately, this approach reduces the system's signal-to-noise ratio and ultimately degrades measurement quality. Therefore, reducing M is not a smart decision. The phases θn , however, can be adjusted to reduce max t (|m(t)|) while preserving signal power. In fact, since ΰn =0 maximizes max t (|m(t)|), just about any other choice of θn will improve the situation. Even a random choice should improve performance. As with any computer, MATLAB cannot generate truly random numbers. Rather, it generates pseudo-random numbers. Pseudo-random numbers are deterministic sequences that appear to be random. The particular sequence of numbers that is realized depends entirely on the initial state of the pseudo-random-number generator. Setting the generator's initial state to a known value allows a "random" experiment with reproducible results. The command rand ('state', 0) initializes the state of the pseudorandom number generator to a known condition of zero, and the MATLAB command rand (a, b) generates an a-by-b matrix of pseudo-random numbers that are uniformly distributed over the interval (0, 1). Radian phases occupy the wider interval (0, 2π), so the results from rand need to be appropriately scaled. >> rand ('statr' 0); theta_rand0 =2*pi*rand(N, 1); By using the randomly chosen θn , m(t) is computed, the maximum magnitude is identified, and the results are plotted as shown in Fig. M6.6. >> m_rand0 = m (theta_rand0,t,omega); >> [max_mag,max_ind] = max(abs(m_rand0(1:end/2))); >> plot (t,m_rand0,'k'); axis([-0.01,0.01,-10,10]); >> xlabel('t [sec]'); ylabel ('m(t) [volts]'); >> text (t(max_ind),m_rand0(max_ind,... ['\leftarrow max = ',num2str(m rand0(max ind))]);

Figure M6.6: Test signal m(t) with random θn found by using rand ('state', 0). For a vector input, the max command returns the maximum value and the index corresponding to the first occurrence of the maximum. Similarly, although not used here, the MATLAB command min determines and locates minima. The text (a, b, c) command annotates the current figure with the string c at the location (a, b). MATLAB's help facilities describe the many properties availabel to adjust the appearance and format delivered by the text command. The /leftarrow command produces the symbol ←. Similarly, /rightarrow, /uparrow, and /downarrow produce the symbols →↑, and ↓, respectively. Randomly chosen phases suffer a fatal fault: there is little guarantee of optimal performance. For example, repeating the experiment with rand ('state', 1) produces a maximum magnitude of 9.1 volts, as shown in Fig. M6.7. This value is significantly higher than the previous maximum of 7.2 volts. Clearly, it is better to replace a random solution with an optimal solution.

Figure M6.7: Test signal m(t) with random θn found by using rand ('state', 1). What constitutes "optimal"? Many choices exist, but desired signal criteria naturally suggest that optimal phases minimize the maximum magnitude of m(t) over all t. To find these optimal phases, MATLAB's fminsearch command is useful. First, the function to be minimized, called the objective function, is defined. >> maxmagm = inline('max (abs(sum(cos(omega*t+theta*ones(size(t))))))',... 'theta','t','omega'); The inline argument order is important; fminsearch uses the first input argument as the variable of minimization. To minimize over θ, as desired, θ must be the first argument of the objective function maxmagm. Next, the time vector is shortened to include only one period of m(t). >> t = linespace(0, 0.01, 201) ; A full period ensures that all values of m(t) are considered; the short length of t helps ensure that functions execute quickly. An initial value of t is randomly chosen to begin the search.

>> rand('state', 0); theta_init = 2*pi*rand(N,1); >> theta_opt = fminsearch(maxmagm,theta_int, [], t, omega); Notice that fminsearch finds the minimizer to maxmagm over θ by using an initial value theta_init. Most numerical minimization techniques are capable of finding only local minima, and fminsearch is no exception. As a result, fminsearch does not always produce a unique solution. The empty square brackets indicate no special options are requested, and the remaining ordered arguments are secondary inputs for the objective function. Full format details for fminsearch are available from MATLAB's help facilities. Figure M6.8 shows the phase-optimized test signal. The maximum magnitude is reduced to a value of 5.4 volts, which is a significant improvement over the original peak of 20 volts.

Figure M6.8: Test signal m(t) with optimized phases. Although the signals shown in Figs. M6.5 through M6.8 look different, they all possess the same magnitude spectra. They differ only in phase spectra. It is interesting to investigate the similarities and differences of these signals in ways other than graphs and mathematics. For example, is there an audible difference between the signals? For computers equipped with sound capability, the MATLAB sound command can be used to find out. >> Fs = 8000; t = [0:1/Fs:2]; % Two second records at a sampling rate of 8kHz >> m_0 = m(theta,t,omega); % m(t) using zero phases >> sound(m 0/20,Fs); Since the sound command clips magnitudes that exceed one, the input vector is scaled by 1/20. The remaining signals are created and played in a similar fashion. How well does the human ear discern the differences in phase spectra?

PROBLEMS 6.1.1

For each of the periodic signals shown in Fig. P6.1-1, find the compact trigonometric Fourier series and sketch the amplitude and phase spectra. If either the sine or cosine terms are absent in the Fourier series, explain why.

6.1.2

Figure P6.1-1 a. Find the trigonometric Fourier series for y(t) shown in Fig. P6.1-2.

Figure P6.1-2 b. The signal y(t) can be obtained by time reversal of x(t) shown in Fig. 6.2a. Use this fact to obtain the Fourier series for y(t) from the results in Example 6.1. Verify that the Fourier series thus obtained is identical to that found in part (a).

6.1.3

c. Show that, in general, time reversal of a periodic signal does not affect the amplitude spectrum, and the phase spectrum is also unchanged except for the change of sign. a. Find the trigonometric Fourier series for the periodic signal y(t) depicted in Fig. P6.1-3.

Figure P6.1-3 b. The signal y(t) can be obtained by time compression of x(t) shown in Fig. 6.2a by a factor 2. Use this fact to obtain the Fourier series for y(t) from the results in Example 6.1. Verify that the Fourier series thus obtained is identical to that found in part (a).

6.1.4

c. Show that, in general, time-compression of a periodic signal by a factor a expands the Fourier spectra along the Ω axis by the same factor a. In other words C 0 , C n , and θn remain unchanged, but the fundamental frequency is increased by the factor a, thus expanding the spectrum. Similarly time expansion of a periodic signal by a factor a compresses its Fourier spectra along the Ω axis by the factor a. a. Find the trigonometric Fourier series for the periodic signal g(t) in Fig. P6.1-4. Take advantage of the symmetry.

Figure P6.1-4 b. Observe that g(t) is identical to x(t) in Fig. 6.3a left-shifted by 0.5 second. Use this fact to obtain the Fourier series for g(t) from the results in Example 6.2. Verify that the Fourier series thus obtained is identical to that found in part (a).

6.1.5

c. Show that, in general, a time shift of T seconds of a periodic signal does not affect the amplitude spectrum. However, the phase of the nth harmonic is increased or decreased nw0 T depending on whether the signal is advanced or delayed by T seconds. If the two halves of one period of a periodic signal are identical in shape except that one is the negative of the other, the periodic signal is said to have a half-wave symmetry. If a periodic signal x(t) with a period T0 satisfies the half-wave symmetry condition, then

In this case, show that all the even-numbered harmonics vanish and that the odd-numbered harmonic coefficients are given by

and

Using these results, find the Fourier series for the periodic signals in Fig. P6.1-5.

6.1.6

Figure P6.1-5 Over a finite interval, a signal can be represented by more than one trigonometric (or exponential) Fourier series. For instance, if we wish to represent x(t)=t over an interval 0 < t < 1 by a Fourier series with fundamental frequency w 0 =2, we can draw a pulse x(t)=t over the interval 0 < t < 1 and repeat the pulse every π seconds so that T0 =π and Ω 0 =2 (Fig. P6.1-6a). If we want the fundamental frequency Ω 0 to be 4, we repeat the pulse every π/2 seconds. If we want the series to contain only cosine terms with w 0 =2, we construct a pulse x(t)=|t| over − 1 < t < 1, and repeat it every π seconds (Fig. P6.1-6b). The resulting signal is an even function with period π. Hence, its Fourier series will have only cosine terms with w 0 =2. The resulting Fourier series represents x(t)=t over 0 < t < 1, as desired. We do not care what it represents outside this interval.

Figure P6.1-6 Sketch the periodic signal x(t) such that x(t)=t for 0 < t < 1 and the Fourier series for x(t) satisfies the following conditions. a. ω0 =π/2 and contains all harmonics, but cosine terms only b. ω0 =2 and contains all harmonics, but sine terms only

c. ω0 =π/2 and contains all harmonics, which are neither exclusively sine nor cosine d. ω0 =1 and contains only odd harmonics and cosine terms e. ω0 =π/2 and contains only odd harmonics and sine terms f. ω0 =1 and contains only odd harmonics, which are neither exclusively sine nor cosine.

6.1.7

[Hint: For parts (d), (e), and (f), you need to use half-wave symmetry discussed in Prob. 6.1-5. Cosine terms imply possible dc component.] You are asked only to sketch the periodic signal x(t) satisfying the given conditions. Do not find the values of the Fourier coefficients. State with reasons whether the following signals are periodic or aperiodic. For periodic signals, find the period and state which of the harmonics are present in the series. a. 3 sin t + 2 sin 3t b. 2 + 5 sin 4t + 4 cos 7t c. 2 sin 3t + 7 cos πt d. 7 cos πt + 5 sin 2πt e. 3 cos √2t + 5 cos 2t

f. g. h. (3 sin 2t + sin 5t) 2 i. (5 sin 2t) 3 6.3.1

For each of the periodic signals in Fig. P6.1-1, find exponential Fourier series and sketch the corresponding spectra.

6.3.2

A 2π-periodic signal x(t) is specified over one period as

Sketch x(t) over two periods from t=0 to 4π. Show that the exponential Fourier series coefficients D n for this series are given by

6.3.3

A periodic signal x(t) is expressed by the following Fourier series:

a. Sketch the amplitude and phase spectra for the trigonometric series. b. By inspection of spectra in part (a), sketch the exponential Fourier series spectra. c. By inspection of spectra in part (b), write the exponential Fourier series for x(t).

6.3.4

d. Show that the series found in part (c) is equivalent to the trigonometric series for x(t). The trigonometric Fourier series of a certain periodic signal is given by

a. Sketch the trigonometric Fourier spectra. b. By inspection of spectra in part (a), sketch the exponential Fourier series spectra. c. By inspection of spectra in part (b), write the exponential Fourier series for x(t).

6.3.5

d. Show that the series found in part (c) is equivalent to the trigonometric series for x(t). The exponential Fourier series of a certain function is given as

a. Sketch the exponential Fourier spectra. b. By inspection of the spectra in part (a), sketch the trigonometric Fourier spectra for x(t). Find the compact trigonometric Fourier series from these spectra. c. Show that the trigonometric series found in part (b) is equivalent to the exponential series for x(t).

6.3.6

d. Find the signal bandwidth. Figure P6.3-6 shows the trigonometric Fourier spectra of a periodic signal x(t). a. By inspection of Fig. P6.3-6, find the trigonometric Fourier series representing x(t). b. By inspection of Fig. P6.3-6, sketch the exponential Fourier spectra of x(t). c. By inspection of the exponential Fourier spectra obtained in part (b), find the exponential Fourier series for x(t). d. Show that the series found in parts (a) and (c) are equivalent.

6.3.7

Figure P6.3-6 Figure P6.3-7 shows the exponential Fourier spectra of a periodic signal x(t). a. By inspection of Fig. P6.3-7, find the exponential Fourier series representing x(t). b. By inspection of Fig. P6.3-7, sketch the trigonometric Fourier spectra for x(t). c. By inspection of the trigonometric Fourier spectra found in part (b), find the trigonometric Fourier series for x(t). d. Show that the series found in parts (a) and (c) are equivalent.

Figure P6.3-7

6.3.8

a. Find the exponential Fourier series for the signal in Fig. P6.3-8a.

Figure P6.3-8

6.3.9

b. Using the results in part (a), find the Fourier series for the signal shifted version of the signal ○(t).

in Fig. P6.3-8b, which is a time-

c. Using the results in part (a), find the Fourier series for the signal scaled version of the signal x(t).

in Fig. P6.3-8c, which is a time-

If a periodic signal x(t) is expressed as an exponential Fourier series

a. Show that the exponential Fourier series for

is given by

in which This result shows that time-shifting of a periodic signal by T seconds merely changes the phase spectrum by nw0 T. The amplitude spectrum is unchanged. b. Show that the exponential Fourier series for

6.3.10

6.3.11

is given by

This result shows that time compression of a periodic signal by a factor a expands its Fourier spectra along the w axis by the same factor a. Similarly, time expansion of a periodic signal by a factor a compresses its Fourier spectra along the w axis by the factor a. Can you explain this result intuitively? a. The Fourier series for the periodic signal in Fig. 6.6a is given in Exercise E6.1. Verify Parseval's theorem for this series, given that

b. If x(t) is approximated by the first N terms in this series, find N so that the power of the error signal is less than 1% of Px . a. The Fourier series for the periodic signal in Fig. 6.6b is given in Exercise E6.1. Verify Parseval's theorem for this series, given that

b. If x(t) is approximated by the first N terms in this series, find N so that the power of the error signal is less than 10% of Px .

6.3.12

6.4.1

6.4.2

The signal x(t) in Fig. 6.14 is approximated by the first 2N + 1 terms (from n=-N to N) in its exponential Fourier series given in Exercise E6.5. Determine the value of N if this (2N + 1)-term Fourier series power is to be no less than 99.75% of the power of x(t). Find the response of an LTIC system with transfer function

to the periodic input shown in Fig. 6.2a. a. Find the exponential Fourier series for a signal x(t)=cos 5t sin 3t. You can do this without evaluating any integrals. b. Sketch the Fourier spectra. c. The signal x(t) is applied at the input of an LTIC system with frequency response, as shown in Fig. P6.4-2. Find the output y(t).

6.4.3

Figure P6.4-2 a. Find the exponential Fourier series for a periodic signal x(t) shown in Fig. P6.4-3a.

Figure P6.4-3 b. The signal x(t) is applied at the input of an LTIC system shown in Fig. P6.4-3b. Find the expression for the output y(t). 6.5.1

6.5.2

Derive Eq. (6.51) in an alternate way by observing that e=(x − c y) and |e| 2 =(x − c y) · (x − c y)=|x| 2 + c 2 |y| 2 − 2c x · y. A signal x(t) is approximated in terms of a signal y(t) over an interval (t1 , t 2 ): where c is chosen to minimize the error energy. a. Show that y(t) and the error e(t)=x(t) − cy(t) are orthogonal over the interval (t1 , t 2 ). b. Can you explain the result in terms of the signal-vector analogy?

6.5.3

c. Verify this result for the square signal x(t) in Fig. 6.19 and its approximation in terms of signal sin t. If x(t) and y(t) are orthogonal, then show that the energy of the signal x(t) + y(t) is identical to the energy of the signal x(t) − y(t) and is given by E + E . Explain this result by using the vector analogy. In general, show that for orthogonal

x

y

signals x(t) and y(t) and for any pair of arbitrary real constants c 1 and c 2 , the energies of c 1 x(t) + c 2 y(t) and c 1 x(t) −

6.5.4

c 2 y(t) are identical, given by c 1 2 Ex + c 2 2 Ey .

a. For the signals x(t) and y(t) depicted in Fig. P6.5-4, find the component of the form y(t) contained in x(t). In other words find the optimum value of c in the approximation x(t) ≈ cy(t) so that the error signal energy is minimum. b. Find the error signal e(t) and its energy Ee . Show that the error signal is orthogonal to y(t), and that

6.5.5

6.5.6

6.5.7

Ex =c 2 Ey + Ee . Can you explain this result in terms of vectors.

For the signals x(t) and y(t) shown in Fig. P6.5-4, find the component of the form x(t) contained in y(t). In other words, find the optimum value of c in the approximation y(t) ≈ cx(t) so that the error signal energy is minimum. What is the error signal energy? Represent the signal x(t) shown in Fig. P6.5-4a over the interval from 0 to 1 by a trigonometric Fourier series of fundamental frequency Ω 0 =2π. Compute the error energy in the representation of x(t) by only the first N terms of this series for N=1, 2, 3, and 4. Represent x(t)=t over the interval (0, 1) by a trigonometric Fourier series that has a. ω0 =2π and only sine terms b. ω0 =π and only sine terms c. ω0 =π and only cosine terms

6.5.8

You may use a dc term in these series if necessary. In Example 6.12, we represented the function in Fig. 6.23 by Legendre polynomials. a. Use the results in Example 6.12 to represent the signal g(t) in Fig. P6.5-8 by Legendre polynomials.

Figure P6.5-8

6.5.9

b. Compute the error energy for the approximations having one and two-(nonzero) terms. Walsh functions, which can take on only two amplitude values, form a complete set of orthonormal functions and are of great practical importance in digital applications because they can be easily generated by logic circuitry and because multiplication with these functions can be implemented by simply using a polarity-reversing switch. Figure P6.5-9 shows the first eight functions in this set. Represent x(t) in Fig. P6.5-4a over the interval (0, 1) by using a Walsh Fourier series with these eight basis functions. Compute the energy of e(t), the error in the approximation, using the first N nonzero terms in the series for N=1, 2, 3, and 4. We found the trigonometric Fourier series for x(t) in Prob. 6.5-6. How does the Walsh series compare with the trigonometric series in Prob. 6.5-6 from the viewpoint of the error energy for a given N?

Figure P6.5-9 6.m.1

MATLAB Session 6 discusses the construction of a phase-optimized multitone test signal with linearly spaced frequency components. This problem investigates a similar signal with logarithmically spaced frequency components. A multitone test signal m(t) is constructed by using a superposition of N real sinusoids

where θn establishes the relative phase of each sinusoidal component. a. Determine a suitable set of N=10 frequencies π n that logarithmically spans [(2π) ≤ π ≤ 100(2π)] yet still results in a periodic test signal m(t). Determine the period T0 of your signal. Using θn =0. plot the resulting (T0 )-periodic signal over-T0 /2 ≤ t ≤ T0 /2. b. Determine a suitable set of phases θn that minimize the maximum magnitude of m(t). Plot the resulting signal and identify the maximum magnitude that results. c. Many systems suffer from what is called one-over-f noise. The power of this undesirable noise is proportional to 1/f. Thus, low-frequency noise is stronger than high-frequency noise. What modifications to m(t) are appropriate for use in environments with 1/f noise? Justify your answer.

Chapter 7: Continuous-Time Signal Analysis-The Fourier Transform OVERVIEW We can analyze linear systems in many different ways by taking advantage of the property of linearity, where by the input is expressed as a sum of simpler components. The system response to any complex input can be found by summing the system's response to these simpler components of the input. In time-domain analysis, we separated the input into impulse components. In the frequency-domain

analysis in Chapter 4, we separated the input into exponentials of the form e st (the Laplace transform), where the complex frequency s= σ + jω. The Laplace transform, although very valuable for system analysis, proves somewhat awkward for signal analysis, where we

prefer to represent signals in terms of exponentials e jωt instead of e st . This is accomplished by the Fourier transform. In a sense, the Fourier transform may be considered to be a special case of the Laplace transform with s=jω. Although this view is true most of the time, it does not always hold because of the nature of convergence of the Laplace and Fourier integrals.

In Chapter 6, we succeeded in representing periodic signals as a sum of (everlasting) sinusoids or exponentials of the form e jωt . The Fourier integral developed in this chapter extends this spectral representation to aperiodic signals.

7.1 APERIODIC SIGNAL REPRESENTATION BY FOURIER INTEGRAL Applying a limiting process, we now show that an aperiodic signal can be expressed as a continuous sum (integral) of everlasting exponentials. To represent an aperiodic signal x(t) such as the one depicted in Fig. 7.1a by everlasting exponentials, let us construct a new periodic signal x T0 (t) formed by repeating the signal x(t) at intervals of T0 seconds, as illustrated in Fig. 7.1b. The period T0 is made long enough to avoid overlap between the repeating pulses. The periodic signal x T0 (t) can be represented by an exponential Fourier series. If we let T0 → ∞, the pulses in the periodic signal repeat after an infinite interval and, therefore

Figure 7.1: Construction of a periodic signal by periodic extension of x(t). Thus, the Fourier series representing x T0 (t) will also represent x(t) in the limit T0 → ∞. The exponential Fourier series for x T0 (t) is given by

where

and

Observe that integrating x T0 (t) over (−T0 /2, T0 /2) is the same as integrating x(t) over (−∞, ∞). Therefore, Eq. (7.2a) can be expressed as

It is interesting to see how the nature of the spectrum changes as T0 increases. To understand this fascinating behavior, let us define

X(ω), a continuous function of ω, as

A glance at Eqs. (7.2c) and (7.3) shows that

Figure 7.2: Change in the Fourier spectrum when the period T0 in Fig. 7.1 is doubled. This means that the Fourier coefficients D n are 1/T0 times the samples of X(ω) uniformly spaced at intervals of ω0 , as depicted in Fig. 7.2a.[†] Therefore, (1/T0 )X(ω) is the envelope for the coefficients D n . We now let T0 → ∞ by doubling T0 repeatedly. Doubling T0 halves the fundamental frequency ω0 [Eq. (7.2b)], so that there are now twice as many components (samples) in the spectrum. However, by doubling T0 , the envelope (1/T0 )X(ω) is halved, as shown in Fig. 7.2b. If we continue this process of doubling T0 repeatedly, the spectrum progressively becomes denser while its magnitude becomes smaller. Note, however, that the relative shape of the envelope remains the same [proportional to X(ω) in Eq. (7.3)]. In the limit as T0 → ∞, ω0 → 0 and D n → 0. This result makes for a spectrum so dense that the spectral components are spaced at zero (infinitesimal) intervals. At the same time, the amplitude of each component is zero (infinitesimal). We have nothing of everything, yet we have something! This paradox sounds like Alice in Wonderland, but as we shall see, these are the classic characteristics of a very familiar phenomenon. [‡]

Substitution of Eq. (7.4) in Eq. (7.1) yields

As T0 → ∞, ω0 becomes infinitesimal (ω0 → 0). Hence, we shall replace ω0 by a more appropriate notation, Δω. In terms of this new notation, Eq. (7.2b) becomes

and Eq. (7.5) becomes

Equation (7.6a) shows that x T0 (t) can be expressed as a sum of everlasting exponentials of frequencies 0, ±Δω, ±2Δω, ±3Δω,... (the Fourier series). The amount of the component of frequency nΔω is [X(nΔω)Δω]/2π. In the limit as T0 → ∞, Δω → 0 and xT 0 (t) → x(t). Therefore

The sum on the right-hand side of Eq. (7.6b) can be viewed as the area under the function X(ω),e jωt , as illustrated in Fig. 7.3. Therefore

Figure 7.3: The Fourier series becomes the Fourier integral in the limit as T0 → ∞. The integral on the righteqnhand side is called the Fourier integral. We have now succeeded in representing an aperiodic signal x(t) by

a Fourier integral (rather than a Fourier series).[†] This integral is basically a Fourier series (in the limit) with fundamental frequency Δω

→ 0, as seen from Eq. (7.6). The amount of the exponential e jnΔωt is X (nΔω)Δω/2π. Thus, the function X(ω) given by Eq. (7.3) acts as a spectral function. We call X (ω) the direct Fourier transform of x(t), and x(t) the inverse Fourier transform of X(ω). The same information is conveyed by the statement that x(t) and X(ω) are a Fourier transform pair. Symbolically, this statement is expressed as or To recapitulate,

and

It is helpful to keep in mind that the Fourier integral in Eq. (7.8b) is of the nature of a Fourier series with fundamental frequency Δω approaching zero [Eq. (7.6b)]. Therefore, most of the discussion and properties of Fourier series apply to the Fourier transform as well. The transform X (ω) is the frequency-domain specification of x(t). We can plot the spectrum X(ω) as a function of ω. Since X(ω)is complex, we have both amplitude and angle (or phase) spectra

in which |X(ω)| is the amplitude and ∠X(ω) is the angle (or phase) of X(ω). According to Eq. (7.8a),

Taking the conjugates of both sides yields

This property is known as the conjugation property. Now, if x(t) is a real function of t, then x(t)=x*(t), and from the conjugation property, we find that

This is the conjugate symmetry property of the Fourier transform, applicable to real x(t). Therefore, for real x(t)

Thus, for real x(t), the amplitude spectrum |X(ω)| is an even function, and the phase spectrum ∠X(ω) is an odd function of ω. These results were derived earlier for the Fourier spectrum of a periodic signal (Eq. (6.33)] and should come as no surprise. EXAMPLE 7.1 Find the Fourier transform of e −at u(t). By definition [Eq. (7.8a)],

But |e −jωt | = 1. Therefore, as t → ∞,e −(a+jω)t = e −at e −jωt = ∞ if a < 0, but it is equal to 0 if a > 0. Therefore

Expressing a + jω in the polar form as

, we obtain

Therefore

The amplitude spectrum |X(ω)| and the phase spectrum ∠X(ω) are depicted in Fig. 7.4b. Observe that |X(ω)| is an even function of ω, and ∠X(ω) is an odd function of ω, as expected.

Figure 7.4: e −at (t) and its Fourier spectra. EXISTENCE OF THE FOURIER TRANSFORM

In Example 7.1 we observed that when a < 0, the Fourier integral for e −at u(t) does not converge. Hence, the Fourier transform for

e −at u(t) does not exist if a < 0 (growing exponential). Clearly, not all signals are Fourier transformable.

Because the Fourier transform is derived here as a limiting case of the Fourier series, it follows that the basic qualifications of the Fourier series, such as equality in the mean, and convergence conditions in suitably modified form apply to the Fourier transform as well. It can be shown that if x(t) has a finite energy, that is if

then the Fourier transform X(ω) is finite and converges to x(t) in the mean. This means, if we let

then Eq. (7.8b) implies

In other words, x(t) and its Fourier integral [the right-hand side of Eq. (7.8b)] can differ at some values of t without contradicting Eq.

(7.14). We shall now discuss an alternate set of criteria due to Dirichlet for convergence of the Fourier transform. As with the Fourier series, if x(t) satisfies certain conditions (Dirichlet conditions), its Fourier transform is guaranteed to converge pointwise at all points where x(t) is continuous. Moreover, at the points of discontinuity, x(t) converges to the value midway between the two values of x(t) on either side of the discontinuity. The Dirichlet conditions are as follows: 1. x(t) should be absolutely integrable, that is,

If this condition is satisfied, we see that the integral on the right-hand side of Eq. (7.8a) is guaranteed to have a finite value. 2. x(t) must have only finite number of finite discontinuities within any finite interval. 3. x(t) must contain only finite number of maxima and minima within any finite interval. We stress here that although the Dirichlet conditions are sufficient for the existence and pointwise convergence of the Fourier transform, they are not necessary. For example, we saw in Example 7.1 that a growing exponential, which violates Dirichlet's first condition in (7.15) does not have a Fourier transform. But the signal of the form (sin at)/t, which does violate this condition, does have a Fourier transform. Any signal that can be generated in practice satisfies the Dirichlet conditions and therefore has a Fourier transform. Thus, the physical existence of a signal is a sufficient condition for the existence of its transform.

LINEARITY OF THE FOURIER TRANSFORM The Fourier transform is linear; that is, if then

The proof is trivial and follows directly from Eq. (7.8a). This result can be extended to any finite number of terms. It can be extended to an infinite number of terms only if the conditions required for interchangeability of the operations of summation and integration are satisfied.

7.1-1 Physical Appreciation of the Fourier Transform In understanding any aspect of the Fourier transform, we should remember that Fourier representation is a way of expressing a signal in terms of everlasting sinusoids (or exponentials). The Fourier spectrum of a signal indicates the relative amplitudes and phases of sinusoids that are required to synthesize that signal. A periodic signal Fourier spectrum has finite amplitudes and exists at discrete frequencies (ω0 and its multiples). Such a spectrum is easy to visualize, but the spectrum of an aperiodic signal is not easy to visualize because it has a continuous spectrum. The continuous spectrum concept can be appreciated by considering an analogous, more tangible phenomenon. One familiar example of a continuous distribution is the loading of a beam. Consider a beam loaded with weights D 1 , D 2 , D 3 , ..., D n units at the uniformly spaced points y 1 , y 2 , ..., y n , as shown in Fig. 7.5a. The total load W T on the beam is given by the sum of these loads at each of the n points:

Consider now the case of a continuously loaded beam, as depicted in Fig. 7.5b. In this case, although there appears to be a load at every point, the load at any one point is zero. This does not mean that there is no load on the beam. A meaningful measure of load in this situation is not the load at a point, but rather the loading density per unit length at that point. Let X(y) be the loading density per unit length of beam. It then follows that the load over a beam length Δy(Δy → 0), at some point y, is X(y)Δy.To find the total load on the beam, we divide the beam into segment of interval Δy(Δy → 0). The load over the nth such segment of length Δy is X(nΔy)Δy. The total load W T is given by

Figure 7.5: Weight-loading analogy for the Fourier transform. The load now exists at every point, and y is now a continuous variable. In the case of discrete loading (Fig. 7.5a), the load exists only at the n discrete points. At other points there is no load. On the other hand, in the continuously loaded case, the load exists at every point, but at any specific point y, the load is zero. The load over a small interval Δy however, is [X(nΔy)] Δy (Fig. 7.5b). Thus, even though the load a point y is zero, the relative load at that point is X(y). An exactly analogous situation exists in the case of a signal spectrum. When x(t) is periodic, the spectrum is discrete, and x(t) can be expressed as a sum of discrete exponentials with finite amplitudes:

For an aperiodic signal, the spectrum becomes continuous; that is, the spectrum exists for every value of ω, but the amplitude of each component in the spectrum is zero. The meaningful measure here is not the amplitude of component of some frequency but the spectral density per unit bandwidth. From Eq. (7.6b) it is clear that x(t) is synthesized by adding exponentials of the form e jnΔωt , in which the contribution by any one exponential component is zero. But the contribution by exponentials in an infinitesimal band Δω located at ω = nΔω is (1/2π) X(nΔω)Δω, and the addition of all these components yields x(t) in the integral form:

Thus, nΔω approaches a continuous variable ω. The spectrum now exists at every ω. The contribution by components within a band dω is (1/2π)X(ω) dω = X(ω)df, where df is the bandwidth in hertz. Clearly, X(ω) is the spectral density per unit bandwidth (in hertz).[†] It also follows that even if the amplitude of any one component is infinitesimal, the relative amount of a component of frequency ω is X(ω). Although X(ω) is spectral density, in practice it is customarily called spectrum of x(t) rather than the spectral density of x(t). Deferring to this convention, we shall call X(ω) the Fourier spectrum (or Fourier transform) of x(t).

A MARVELOUS BALANCING ACT An important point to remember here is that x(t) is represented (or synthesized) by exponentials or sinusoids that are everlasting (not causal). Such conceptualization leads to rather fascinating picture when we try to visualize the synthesis of time limited pulse signal x(t) [Fig. 7.6] by the sinusoidal components in its Fourier spectrum. The signal x(t) exists only over an interval (a, b) and is zero outside this interval. The spectrum x(t) contains an infinite number of exponentials (or sinusoids), which start at t= −∞ and continue forever. The amplitudes and phases of these components add up exactly to x(t) over the finite interval (a, b) and the zero everywhere outside this interval. Juggling the amplitudes and phases of an infinite number of components to achieve such a perfect and delicate balance boggles the human imagination. Yet the Fourier transform accomplishes it routinely, without much thinking on our part. Indeed, we become so involved in mathematical manipulations that we fail to notice this marvel.

Figure 7.6: The marvel of the Fourier transform. [†] For the sake of simplicity, we assume D , and therefore X(ω), in Fig. 7.2, to be real. The argument, however, is also valid for n

complex D n [or X(ω)].

[‡] If nothing else, the reader now has irrefutable proof of the proposition that 0% ownership of everything is better than 100% ownership of nothing. [†] This derivation should not be considered to be a rigorous proof of Eq. (7.7). The situation is not as simple as we have made it appear. [1] [†] Churchill, R. V., and J. W. Brown, Fourier Series and Boundary Value Problems, 3rd ed. McGraw-Hill, New York, 1978. [†] To stress that the signal spectrum is a density function we shall shade the plot of |X(ω)| (as in Fig. 7.4b). The representation of

∠X(ω). however, will be a by a line plot, primarily to avoid confusion.

7.2 TRANSFORMS OF SOME USEFUL FUNCTIONS For convenience, we now introduce a compact notation for the useful gate, triangle, and interpolation functions. UNIT GATE FUNCTION

We define a unit gate function rect (x) as a gate pulse of unit height and unit width, centered at the origin, as illustrated in Fig. 7.7a:[†] :

The gate pulse in Fig. 7.7b is unit gate pulse rect (x) expended by a factor τ along the horizontal axis and therefore can be expressed as rect (x/τ) (see section 1.2-2). Observe that τ, the denominator of the argument of rect (x/τ), indicates the width of the pulse.

Figure 7.7: A gate pulse. UNIT TRIANGLE FUNCTION We define a unit triangle function Δ(x) as triangular pulse of unit height and unit width, centered at the origin, as shown in Fig. 7.8a

The pulse in Fig. 7.8b is Δ(x/τ). Observe that here, as for the gate pulse, the denominator τ of the argument of Δ(x/τ) indicates the pulse width.

Figure 7.8: A triangle pulse. INTERPOLATION FUNCTION sinc (x) The function sin x/x is the "sine over argument" function denoted by sinc (x) [†] . This function plays an important role in signal processing. It is also known as the filtering or interpolating function. We define

Inspection of Eq. (7.20) shows the following: 1. sinc (x) is an even function of x. 2. sinc (x) = 0 when sin x = 0 except at x = 0, where it appears to be indeterminate. This means that sinc x = 0 for x = ±p, ±2p,±3p,.... 3. Using L'Hôpital's rule, we find sinc (0) = 1. 4. sinc (x) is the product of an oscillating signal sin x (of period 2π) and a monotonically decreasing function 1/x. Therefore, sinc (x) exhibits damped oscillations of period 2π, with amplitude decreasing continuously as 1/x. Figure 7.9a shows sinc (x). Observe that sinc (x) = 0 for values of x that are positive and negative integer multiples of π. Figure 7.9a shows sinc (3ω/7). The argument 3ω/7 = π when ω = 7π/3. Therefore, the first zero of this function occurs at ω = 7π/3.

Figure 7.9: A sinc pulse. EXERCISE E7.1 Sketch: a. rect (x/8) b. Δ(ω/10) c. sinc (3πω/2) d. sinc (t) rect (t/4π) EXAMPLE 7.2 Find the Fourier transform of x(t) = rect (t/τ) (fig. 7.10a).

Figure 7.10: (a) A gate pulse x(t), (b) its Fourier spectrum X(ω), (c) its amplitude spectrum |X(ω)|, and (d) its phase spectrum ∠X(ω). Sinc rect (t/τ) = 1 for |t| < τ/2, and since it is zero for |t| > τ/2,

Therefore

Recall that sinc(x) = 0 when x = ±nπ. Hence, sinc (ωτ/2) = 0 when ωτ/2 = ±nπ; that is, when ω = ±2nπ/τ, (n = 1, 2, 3, ...) as depicted in Fig. 7.10b. The Fourier transforms X(ω) shown in Fig. 7.10b exhibits positive and negative values. A negative amplitude can be considered to be a positive amplitude with a phase of −π or π. We use this observation to plot the amplitude spectrum |X(ω)| = |sinc (ωτ/2)| (Fig. 7.10c) and the phase spectrum ∠X(ω) (Fig. 7.10d). The phase spectrum, which is required to be an odd function of ω, may be draen is several other ways because a negative sign can be accounted for by a phase of ±nπ, where n is any odd integer. All such representations are equivalent. BANDWIDTH OF rect (t/τ) The spectrum X(ω) in fig. 7.10 peaks at ω = 0 and decays at higher frequencies. Therefore, rect (t/τ) is a lowpass signal with most of the signal energy in lower-frequency components. Strictly speaking, because the spectrum extends from 0 to ∞. The bandwidth is ∞. However, must of the spectrum is concentrated within first lobe (from ω = 0 to ω = 2π/τ). Therefore, a rough estimate of the bandwidth of a rectangular pulse of width τ seconds is 2π/τ rad/s, or 1/tau Hz[†] . Note the reciprocal relationship of the pulse width with its bandwidth. We shall observe later that this result is true in general. EXAMPLE 7.3 Find the Fourier transform of the unit impulse δ(t). Using the sampling property of the impulse [Eq. (1.24)], we obtain

or

Figure 7.11 shows δ(t) and its spectrum.

Figure 7.11: (a) Unit impulse and (b) its Fourier spectrum. EXAMPLE 7.4 Find the inverse Fourier transform of δ(ω). On the basis of Eq. (7.8b) and the sampling property of the function,

Therefore

or

Figure 7.12: (a) A constant (dc) signal and (b) its Fourier spectrum. This result shows that the spectrum of a constant signal x(t) = 1 is an impulse 2πδ(ω), as illustrated in Fig. 7.12. The result [Eq. (7.23b)] could have been anticipated on qualitative grounds. Recall that the Fourier transform of x(t) is a spectral

representation of x(t) in term of everlasting exponential components of the form e jωt . Now, to represent a constant signal x(t) = 1 we

need a single everlasting exponential e jωt with ω = 0.[†] . This result in spectrum at a single frequency ω = 0. Another way of looking at the situation is that x(t) = 1 is a dc signal which has a single frequency ω = 0 (dc). If an impulse at ω = 0 is a spectrum of a dc signal, what does an impulse at ω = ω0 represent? We shall answer this question in the next example. EXAMPLE 7.5 Find the inverse Fourier transform of δ(ω − ω0 ). Using the sampling property of the impulse function, we obtain

Therefore

or

This result shows that the spectrum of an everlasting exponential e jωt is signal impulse at ω = ω0 . We reach the same conclusion by

qualitative reasoning. To represent the everlasting exponential e jω0 t, we need a single everlasting exponentials e jωt with ω = ω0 . Therefore, the spectrum consists of a single component at frequency ω = ω0 . From Eq. (7.24a) it follows that

EXAMPLE 7.6 Find the Fourier transforms of the everlasting sinusoid cos ω0 t (Fig. 7.13a).

Figure 7.13: (a) A cosine signal and (b) its Fourier spectrum. Recall the Euler formula Adding Eqs. (7.24a) and (7.24b), and using the foregoing result, we obtain

The spectrum of cos ω0 t consists of two impulses at ω0 and −ω0 , as shown in Fig. 7.13b. The result also follows from qualitative reasoning. An everlasting sinusoid cos ω0 t can be synthesized by two everlasting exponentials, e jω0 t and e −jω0 t . Therefore the Fourier spectrum consists of only two components of frequencies ω0 and −ω0 . EXAMPLE 7.7: (Fourier Transform of a Periodic Signal) We can use a Fourier series to express a periodic signal as a sum of a sum of exponentials of the form e jnω0 t , whose Fourier transform is found in Eq. (7.24a). Hence, we can readily find the Fourier transform of a periodic signal by using the linearity property in Eq. (7.16). The Fourier series of a periodic signal x(t) with period T0 is given by

Taking the Fourier transform of both sides, we obtain [†]

EXAMPLE 7.8: (Fourier Transform of a Unit Impulse Train) The Fourier series for the unit impulse train δT0 (t), shown in Fig. 7.14a, was found in Example 6.7. The Fourier coefficient D n for this signal, as seen from Eq. (6.37), is a constant D n = 1/T0 .

Figure 7.14: (a) The uniform impulse train and (b) its Fourier transform. From Eq. (7.26), the Fourier transform for the unit impulse train is

The corresponding spectrum is shown in Fig. 7.14b. EXAMPLE 7.9 Find the Fourier transform of the unit step function u(t). Trying to find the Fourier transform of u(t) by direct integration leads to an indeterminate result because

The upper limit of e −jωt as t → ∞ yields an indeterminate answer. So we approach this problem by considering u(t) to be a decaying exponential e −at u(t) in the limit as a → 0 (Fig. 7.15a). Thus

and

Figure 7.15: Derivation of the Fourier transform of the step function. Expressing the right-hand side in terms of its real and imaginary parts yields

The function a/(a 2 + ω2 ) has interesting properties. First, the area under this function (Fig. 7.15b) is π regardless of the value of a:

Second, when a → 0, this function approaches zero for all ω ≠ 0, and all its area (π) is concentrated at a single point ω = 0. Clearly, as a → 0, this function approaches an impulse of strength π [†] . Thus

Note that u(t) is not a "true" dc signal because it is not constant over the interval − ∞ to ∞. To synthesize a "true" dc, we require only one everlasting exponential with ω = 0 (impulse at ω = 0). The signal u(t) has a jump discontinuity at t = 0. It is impossible to synthesize such a signal with a single everlasting exponential e jωt . To synthesize this signal from everlasting exponentials, we need, in addition to an impulse at ω = 0, all the frequency components, as indicated by the term 1/jω in Eq. (7.29). EXAMPLE 7.10 Find the Fourier transform of the sign function sgn (t) [pronounced signum (t)], depicted in Fig. 7.16.

Figure 7.16 Observe that Using the results in Eqs. (7.23b), (7.29), and the linearity property, we obtain

EXERCISE E7.2 Show that the inverse Fourier transform of X(ω) illustrated in Fig. 7.17 is x(t) = (ω0 /π) sinc (ω0 t). Sketch x(t).

Figure 7.17 EXERCISE E7.3 Show that cos (ω0 t + θ)

π[δ(ω + ω0 )e −jθ + δ(ω − ω0 )e jθ].

7.2-1 Connection Between the Fourier and Laplace Transforms The general (bilateral) Laplace transform of a signal x(t), according to Eq. (4.1) is

Setting s = jω in this equation yields

where X(jω) = X(s)|s = jω. But, the right-hand-side integral defines X(ω), the Fourier transform of x(t). Does this mean that the Fourier transform can be obtained from the corresponding Laplace transform by setting s = jω? In other words, is it true that X(jω) = X(ω)?

Yes and no. Yes, it is true in most cases. For example, when x(t) = e −at u(t), its Laplace transform is 1/(s + a), and X(jω) = 1/(jω + a), which is equal to X(ω) (assuming a < 0). However, for the unit step function u(t), the Laplace transform is

The Fourier transform is given by

Clearly, X(jω) ≠ X(ω) in this case. To understand this puzzle, consider the fact that we obtain X(jω) by setting s = jω in Eq. (7.31a). This implies that the integral on the right-hand side of Eq. (7.31a) converges for s = jω, meaning that s = jω (the imaginary axis) lies in the ROC for X(s). The general rule is that only when the ROC for X(s) includes the jω axis, does setting s = jω in X(s) yield the Fourier transform X(ω), that is, X(jω) = X(ω). This is the case of absolutely integrable x(t). If the ROC of X(s) excludes the jω axis, X(jω) ≠ X(ω). This is the case for exponentially growing x(t) and also x(t) that is constant or is oscillating with constant amplitude. The reason for this peculiar behavior has something to do with the nature of convergence of the Laplace and the Fourier integrals when x(t) is not absolutely integrable.[†]

This discussion shows that although the Fourier transform may be considered as a special case of the Laplace transform, we need to circumscribe such a view. This fact can also be seen from the fact that a periodic signal has the Fourier transform, but the Laplace transform does not exist. [†] At |x| = 0.5, we require rect (x) = 0.5 because the inverse Fourier transform of a discontinuous signal converges to the mean of its

two values at the discontinuity.

[†] sinc(x) is also denoted by Sa (x) in the literature. Some authors define sinc (x) as

[†] To compute bandwidth, we must consider the spectrum only for positive values of ω. See discussion in Section 6.3. [†] The constant multiple 2π in the spectrum [X(ω) = 2πδ(ω))] may be a bit puzzling. Since 1 = e jωt with ω = 0, it appears that the

Fourier transform of x(t) = 1 should be an impulse of strength unity rather than 2π. Recall, however, that in the Fourier transform x(t) is synthesized by exponentials not of amplitude X(nΔω)Δω but of amplitude 1/2π times X(nΔω)Δω, as seen from Eq. (7.66b). Had we used variable f (hertz) instead of ω, the spectrum would have been the unit impulse. [†] We assume here that the linearity property can be extended to an infinite sum. [†] The second term on the right-hand side of Eq. (7.28b), being an odd function of ω, has zero area regardless of the value of a. As a

→ 0, the second term approaches 1/ω.

[†] To explain this point, consider the unit step function and its transforms. Both the Laplace and the Fourier transform synthesize x(t), using everlasting exponentials of the form e st . The frequency s can be anywhere in the complex plane for the Laplace transform, but it

must be restricted to the jω axis in the case of the Fourier transform. The unit step function is readily synthesized in the Laplace transform by a relatively simple spectrum X(s) = 1 /s, in which the frequencies s are chosen in the RHP [the region of convergence for u(t) is Re s > 0]. In the Fourier transform, however, we are restricted to values of s only on the jω axis. The function u(t) can still be synthesized by frequencies along the jω axis, but the spectrum is more complicated than it is when we are free to choose the frequencies in the RHP. In contrast, when x(t) is absolutely integrable, the region of convergence for the Laplace transform includes the jω axis, and we can synthesize x(t) by using frequencies along the jω axis in both transforms. This leads to X(jω) = X(ω). We may explain this concept by an example of two countries, X and Y. Suppose these countries want to construct similar dams in their respective territories. Country X has financial resources but not much manpower. In contrast, Y has considerable manpower but few financial resources. The dams will still be constructed in both countries, although the methods used will be different. Country X will use expensive but efficient equipment to compensate for its lack of manpower, whereas Y will use the cheapest possible equipment in a labor-intensive approach to the project. Similarly, both Fourier and Laplace integrals converge for u(t), but the make-up of the components used to synthesize u(t) will be very different for two cases because of the constraints of the Fourier transform, which are not present for the Laplace transform.

7.3 SOME PROPERTIES OF THE FOURIER TRANSFORM We now study some of the important properties of the Fourier transform and their implications as well as applications. We have already encountered two important properties, linearity [Eq. (7.16)] and the conjugation property [Eq. (7.10)]. Before embarking on this study, we shall explain an important and pervasive aspect of the Fourier transform: the time-frequency duality.

Figure 7.18: A near symmetry between the direct and the inverse Fourier transforms. TIME-FREQUENCY DUALITY IN THE TRANSFORM OPERATIONS Equations (7.8) show an interesting fact: the direct and the inverse transform operations are remarkably similar. These operations, required to go from x(t) to X(ω) and then from X(ω) to x(t), are depicted graphically in Fig. 7.18. The inverse transform equation can be obtained from the direct transform equation by replacing x(t) with X(ω), t with ω, and ω with t. In a similar way, we can obtain the direct from the inverse. There are only two minor differences in these operations: the factor 2π appears only in the inverse operator,

and the exponential indices in the two operations have opposite signs. Otherwise the two equations are duals of each other. [†] This observation has far-reaching consequences in the study of the Fourier transform. It is the basis of the so-called duality of time and frequency. The duality principle may be compared with a photograph and its negative. A photograph can be obtained from its negative, and by using an identical procedure, a negative can be obtained from the photograph. For any result or relationship between x(t) and X(ω), there exists a dual result or relationship, obtained by interchanging the roles of x(t) and X(ω) in the original result (along with some minor modifications arising because of the factor 2π and a sign change). For example, the time-shifting property, to be proved X(ω), then later, states that if x(t) The dual of this property (the frequency-shifting property) states that

Observe the role-reversal of time and frequency in these two equations (with the minor difference of the sign change in the exponential index). The value of this principle lies in the fact that whenever we derive any result, we can be sure that it has a dual. This possibility can give valuable insights about many unsuspected properties or results in signal processing. The properties of the Fourier transform are useful not only in deriving the direct and inverse transforms of many functions, but also in obtaining several valuable results in signal processing. The reader should not fail to observe the ever-present duality in this discussion. LINEARITY The linearity property [Eq. (7.16)] has already been introduced. CONJUGATION AND CONJUGATE SYMMETRY The conjugation property, which has already been introduced, states that if x(t)

X(ω), then

From this property follows the conjugate symmetry property, also introduced earlier, which states that if x(t) is real, then DUALITY The duality property states that if then

Proof. From Eq. (7.8b) we can write

Hence

Changing t to ω yields Eq. (7.32). EXAMPLE 7.11 In this example we apply the duality property [Eq. (7.32)] to the pair in Fig. 7.19a.

Figure 7.19: The duality property of the Fourier transform. From Eq. (7.21) we have

Also, X(t) is the same as X(ω) with ω replaced by t, and x(−ω) is the same as x(t) with t replaced by −ω. Therefore, the duality property (7.32) yields

In Eq. (7.33) we used the fact that rect (−x) = rect (x) because rect is an even function. Figure 7.19b shows this pair graphically. Observe the interchange of the roles of t and ω (with the minor adjustment of the factor 2π). This result appears as pair 18 in Table 7.1 (with τ/2 = W). As an interesting exercise, the reader should generate the dual of every pair in Table 7.1 by applying the duality property. Table 7.1: Fourier Transforms Open table as spreadsheet X(ω)

No.

x(t)

1

e −at u(t)

a>0

2

e at u(−t)

a>0

3

e −a|t|

a>0

4

te−at u(t)

a>0

5

tn e −at u(t)

a>0

6

δ(t)

1

7

1

2πδ(ω)

8

e jω0 t

2πδ(ω−ω0 )

9

cos ω0 t

π[δ(ω − ω0 ) + δ(ω + ω0 )]

10

sin ω0 t

jπ[δ(ω + ω0 ) − δ (ω − ω0 )]

11

u(t)

12

sgn t

13

cos ω0 t u(t)

14

sin ω0 t u(t)

15

e −at sin ω0 t u(t)

a>0

16

e −at cos ω0 t u(t)

a>0

17

18

19

20

21

22

2

e −t /2σ2

EXERCISE E7.4 Apply the duality property to pairs 1, 3, and 9 (Table 7.1) to show that a. 1/(jt + a)

2πe aω u(−ω)

b. 2a/(t 2 + a 2 )

2π e −a|ω|

c. δ(t + t0 ) + δ(t − t0 )

2 cos t0 ω

THE SCALING PROPERTY If then, for any real constant a,

Proof. For a positive real constant a,

Similarly, we can demonstrate that if a < 0,

Hence follows Eq. (7.34). SIGNIFICANCE OF THE SCALING PROPERTY The function x(at) represents the function x(t) compressed in time by a factor a (see Section 1.2-2). Similarly, a function X(ω/a) represents the function X(ω) expanded in frequency by the same factor a. The scaling property states that time compression of a signal results in its spectral expansion, and time expansion of the signal results in its spectral compression. Intuitively, compression in time by

factor a means that the signal is varying faster by factor a.[†] To synthesize such a signal, the frequencies of its sinusoidal components must be increased by the factor a, implying that its frequency spectrum is expanded by the factor a. Similarly, a signal expanded in time varies more slowly; hence the frequencies of its components are lowered, implying that its frequency spectrum is compressed. For instance, the signal cos 2 ω0 t is the same as the signal cos ω0 t time-compressed by a factor of 2. Clearly, the spectrum of the former (impulse at ±2ω0 ) is an expanded version of the spectrum of the latter (impulse at ±ω0 ). The effect of this scaling is demonstrated in Fig. 7.20.

Figure 7.20: The scaling property of the Fourier transform. RECIPROCITY OF SIGNAL DURATION AND ITS BANDWIDTH The scaling property implies that if x(t) is wider, its spectrum is narrower, and vice versa. Doubling the signal duration halves its bandwidth, and vice versa. This suggests that the bandwidth of a signal is inversely proportional to the signal duration or width (in seconds). [†] We have already verified this fact for the gate pulse, where we found that the bandwidth of a gate pulse of width τ

seconds is 1/τ Hz. More discussion of this interesting topic can be found in the literature. [2] By letting a = −1 in Eq. (7.34), we obtain the inversion property of time and frequency:

EXAMPLE 7.12 Find the Fourier transforms of e at u(−t) and e −a|t|. Application of Eq. (7.35) to pair 1 (Table 7.1) yields

Also Therefore

The signal e −a|t| and its spectrum are illustrated in Fig. 7.21.

Figure 7.21 (a) e −a|t| and (b) its Fourier spectrum. THE TIME-SHIFTING PROPERTY If then

Proof. By definition,

Letting t − t0 = u, we have

This result shows that delaying a signal by t0 seconds does not change its amplitude spectrum. The phase spectrum, however, is changed by − ωt0 . PHYSICAL EXPLANATION OF THE LINEAR PHASE Time delay in a signal causes a linear phase shift in its spectrum. This result can also be derived by heuristic reasoning. Imagine x(t) being synthesized by its Fourier components, which are sinusoids of certain amplitudes and phases. The delayed signal x(t − t0 ) can be synthesized by the same sinusoidal components, each delayed by t0 seconds. The amplitudes of the components remain unchanged. Therefore, the amplitude spectrum of x(t − t0 ) is identical to that of x(t). The time delay of t0 in each sinusoid, however, does change the phase of each component. Now, a sinusoid cos ωt delayed by t0 is given by

Figure 7.22: Physical explanation of the time-shifting property. Therefore a time delay t0 in a sinusoid of frequency ω manifests as a phase delay of ωt0 . This is a linear function of ω, meaning that higher-frequency components must undergo proportionately higher phase shifts to achieve the same time delay. This effect is depicted in Fig. 7.22 with two sinusoids, the frequency of the lower sinusoid being twice that of the upper. The same time delay t0 amounts to a phase shift of π/2 in the upper sinusoid and a phase shift of π in the lower sinusoid. This verifies the fact that to achieve the same time delay, higher-frequency sinusoids must undergo proportionately higher phase shifts. The principle of linear phase shift is very important, and we shall encounter it again in distortionless signal transmission and filtering applications. EXAMPLE 7.13 Find the Fourier transform of e −a|t−t 0 |. This function, shown in Fig. 7.23a, is a time-shifted version of e −a|t| (depicted in Fig. 7.21a). From Eqs. (7.36) and (7.37) we have

The spectrum of e −a|t−t 0 | (Fig. 7.23b) is the same as that of e −a|t| (Fig. 7.21b), except for an added phase shift of −ωt0 . Observe that the time delay t0 causes a linear phase spectrum −ωt0 . This example clearly demonstrates the effect of time shift.

Figure 7.23: Effect of time-shifting on the Fourier spectrum of a signal. EXAMPLE 7.14 Find the Fourier transform of the gate pulse x(t) illustrated in Fig. 7.24a.

The pulse x(t) is the gate pulse rect (t/τ) in Fig. 7.10a delayed by 3τ/4 second. Hence, according to Eq. (7.37a), its Fourier transform is the Fourier transform of rect (t/τ) multiplied by e −jω(3τ/4). Therefore

The amplitude spectrum |X(ω)| (depicted in Fig. 7.24b) of this pulse is the same as that indicated in Fig. 7.10c. But the phase spectrum has an added linear term −3ωτ/4. Hence, the phase spectrum of x(t) (Fig. 7.24a) is identical to that in Fig. 7.10d plus a linear term −3ωτ/4, as shown in Fig. 7.24c. PHASE SPECTRUM USING PRINCIPAL VALUES There is an alternate way of spectral representation of ∠X(ω). The phase angle computed on a calculator or by using a computer subroutine is generally the principal value (modulo 2π value) of the phase angle, which always lies in the range −π to π. For instance, the principal value of angle 3π/2 is −π/2, and so on. The principal value differs from the actual value by ±2π radians (and its integer multiples) in a way that ensures that the principal value remains within −π to π. Thus, the principal value will show jump discontinuities of ±2π whenever the actual phase crosses +π. The phase plot in Fig. 7.24c is redrawn in Fig. 7.24d using principal value for the phase. This phase pattern, which contains phase discontinuities of magnitudes 2π and π, becomes repetitive at intervals of ω = 8π/τ.

Figure 7.24: Another example of time-shifting and its effect on the Fourier spectrum of a signal. EXERCISE E7.5 Use pair 18 of Table 7.1 and the time-shifting property to show that the Fourier transform of sinc[ω0 (t − T)] is (πω0 ) rect (ω/2ω0 )e −jωT. Sketch the amplitude and phase spectra of the Fourier transform. THE FREQUENCY-SHIFTING PROPERTY If then

Proof. By definition,

According to this property, the multiplication of a signal by a factor e jω0 t shifts the spectrum of that signal by ω = ω0 . Note the duality between the time-shifting and the frequency-shifting properties. Changing ω0 to − ω0 in Eq. (7.39) yields

Because e jω0 t is not a real function that can be generated, frequency shifting in practice is achieved by multiplying x(t) by a sinusoid. Observe that From Eqs. (7.39) and (7.40), it follows that

This result shows that the multiplication of a signal x(t) by a sinusoid of frequency ω0 shifts the spectrum X(ω) by ±ω0 , as depicted in Fig. 7.25.

Figure 7.25: Amplitude modulation of a signal causes spectral shifting. Multiplication of a sinusoid cos ω0 t by x(t) amounts to modulating the sinusoid amplitude. This type of modulation is known as amplitude modulation. The sinusoid cos ω0 t is called the carrier, the signal x(t) is the modulating signal, and the signal x(t) cos ω0 t is the modulated signal. Further discussion of modulation and demodulation appears in Section 7.7. To sketch a signal x(t) cos ω0 t, we observe that

Therefore, x(t) cos ω0 t touches x(t) when the sinusoid cos ω0 t is at its positive peaks and touches −x(t) when cos ω0 t is at its negative peaks. This means that x(t) and −x(t) act as envelopes for the signal x(t) cos ω0 t (see Fig. 7.25). The signal −x(t) is a mirror image of x(t) about the horizontal axis. Figure 7.25 shows the signals x(t) and x(t) cos ω0 t and their spectra. EXAMPLE 7.15 Find and sketch the Fourier transform of the modulated signal x(t) cos 10t in which x(t) is a gate pulse rect (t/4) as illustrated in Figure 7.26a.

Figure 7.26: An example of spectral shifting by amplitude modulation. From pair 17 (Table 7.1) we find rect (t/4)

4 sinc (2ω), which is depicted in Fig. 7.26b. From Eq. (7.41) it follows that

In this case, X(ω) = 4 sinc (2ω). Therefore The spectrum of x(t) cos 10t is obtained by shifting X(ω) in Fig. 7.26b to the left by 10 and also to the right by 10, and then multiplying

it by 0.5, as depicted in Fig. 7.26d. EXERCISE E7.6 Show that

EXERCISE E7.7 1. Sketch signal e −|t| cos 10t. Find the Fourier transform of this signal and sketch its spectrum. Answers 1. X(ω) =

See Fig. 7.21b for the spectrum of e −a|t|.

APPLICATION OF MODULATION Modulation is used to shift signal spectra. Some of the situations that call for spectrum shifting are presented next. 1. If several signals, all occupying the same frequency band, are transmitted simultaneously over the same transmission medium, they will all interfere; it will be impossible to separate or retrieve them at a receiver. For example, if all radio stations decide to broadcast audio signals simultaneously, a receiver will not be able to separate them. This problem is solved by using modulation, whereby each radio station is assigned a distinct carrier frequency. Each station transmits a modulated signal. This procedure shifts the signal spectrum to its allocated band, which is not occupied by any other station. A radio receiver can pick up any station by tuning to the band of the desired station. The receiver must now demodulate the received signal (undo the effect of modulation). Demodulation therefore consists of another spectral shift required to restore the signal to its original band. Note that both modulation and demodulation implement spectral shifting; consequently, demodulation operation is similar to modulation (see Section 7.7). This method of transmitting several signals simultaneously over a channel by sharing its frequency band is known as frequency-division multiplexing (FDM).

Old is gold, but sometimes it is fool's gold. 2. For effective radiation of power over a radio link, the antenna size must be of the order of the wavelength of the signal to be radiated. Audio signal frequencies are so low (wavelengths are so large) that impracticably large antennas would be required for radiation. Here, shifting the spectrum to a higher frequency (a smaller wavelength) by modulation solves the problem. CONVOLUTION The time-convolution property and its dual, the frequency-convolution property, state that if then

and

Proof. By definition

The inner integral is the Fourier transform of x 2 (t − τ), given by [time-shifting property in Eq. (7.37)] X2 (ω)e −jωτ. Hence

Let H(ω) be the Fourier transform of the unit impulse response h(t), that is

Application of the time-convolution property to y(t) = x(t)*h(t) yields (assuming that both x(t) and h(t) are Fourier transformable)

The frequency-convolution property (7.43) can be proved in exactly the same way by reversing the roles of x(t) and X(ω). EXAMPLE 7.16 Use the time-convolution property to show that if then

Because

it follows that

Now, from the time-convolution property [Eq. (7.42)], it follows that

In deriving the last result, we used Eq. (1.23a). EXERCISE E7.8 Use the time-convolution property to show that x(t)* δ(t) = x(t). EXERCISE E7.9 Use the time-convolution property to show that

TIME DIFFERENTIATION AND TIME INTEGRATION If then

[†]

and

Proof. Differentiation of both sides of Eq. (7.8b) yields

This result shows that

Repeated application of this property yields

Table 7.2: Fourier Transform Operations Open table as spreadsheet Operation

x(t)

X(ω)

Scalar multiplication

kx(t)

kX(ω)

Addition

x 1 (t) + x 2 (t)

X1 (ω) + X2 (ω)

Conjugation

x*(t)

X*(−ω)

Duality

X(t)

2πx(−ω)

Scaling (a real)

x(at)

Time shifting

x(t − t0 )

X(ω)e −jωt 0

Frequency shifting (ω0 real)

x(t)e jω0 t

X(ω − ω0 )

Time convolution

x 1 (t)* x 2 (t)

X1 (ω)X2 (ω)

Frequency convolution

x 1 (t)x 2 (t)

Time differentiation

Time integration

(jω) n X(ω) ∫ t −∞ x(u)du

The time-integration property [Eq. (7.47)] has already been proved in Example 7.16. The Fourier transform properties are summarized in Table 7.2. EXAMPLE 7.17 Use the time-differentiation property to find the Fourier transform of the triangle pulse Δ(t/τ) illustrated in Fig. 7.27a.

Figure 7.27: Finding the Fourier transform of a piecewise-linear signal using the time-differentiation property. To find the Fourier transform of this pulse we differentiate the pulse successively, as illustrated in Fig. 7.27b and 7.27c. Because dx/dt

is constant everywhere, its derivative, d 2 x/dt2 , is zero everywhere. But dx/dt has jump discontinuities with a positive jump of 2/τ at t = τ/2, and a negative jump of 4/τ at t = 0. Recall that the derivative of a signal at a jump discontinuity is an impulse at that point of

strength equal to the amount of jump. Hence, d 2 x/dt2 , the derivative of dx/dt, consists of a sequence of impulses, as depicted in Fig. 7.27c; that is,

From the time-differentiation property [Eq. (7.46)]

Also, from the time-shifting property [Eq. (7.37b)]

Taking the Fourier transform of Eq. (7.49) and using the results in Eqs. (7.50), we obtain

and

The spectrum X(ω) is depicted in Fig. 7.27d. This procedure of finding the Fourier transform can be applied to any function x(t) made up of straight-line segments with x(t) → 0 as |t| → ∞. The second derivative of such a signal yields a sequence of impulses whose Fourier transform can be found by inspection. This example suggests a numerical method of finding the Fourier transform of an arbitrary signal x(t) by approximating the signal by straight-line segments. EXERCISE E7.10 Use the time-differentiation property to find the Fourier transform of rect (t/τ). [†] Of the two differences, the former can be eliminated by change of variable from ω to f (in hertz). In this case ω = 2π f and dω = 2π

df.

Therefore, the direct and the inverse transforms are given by

This leaves only one significant difference, that of sign change in the exponential index.

[†] We are assuming a > 1, although the argument still holds if a < 1. In the latter case, compression becomes expansion by factor 1/a,

and vice versa.

[†] When a signal has infinite duration, we must consider its effective or equivalent duration. There is no unique definition of effective

signal duration. One possible definition is given in Eq. (2.67).

[2] Bracewell, R. N. Fourier Transform and Its Applications, rev. 2nd ed. McGraw-Hill, New York, 1986. [†] Valid only if the transform of dx/dt exists. In other words, dx/dt must satisfy the Dirichlet conditions. The first Dirichlet condition implies

We also require that x(t) → 0 as t → ±∞. Otherwise, x(t) has a dc component, which gets lost in differentiation, and there is no one-toone relationship between x(t) and dx/dt.

7.4 SIGNAL TRANSMISSION THROUGH LTIC SYSTEMS If x(t) and y(t) are the input and output of an LTIC system with impulse response h(t), then, as demonstrated in Eq. (7.44b)

This equation does not apply to (asymptotically) unstable systems because h(t) for such systems is not Fourier transformable. It applies to BIBO stable as well as most of the marginally stable systems. [†] Also the input x(t) itself must be Fourier transformable if we are to use Eq. (7.52).

In Chapter 4, we saw that the Laplace transform is more versatile and capable of analyzing all kinds of LTIC systems whether stable, unstable, or marginally stable. Laplace transform can also handle exponentially growing inputs. In comparison to the Laplace transform, the Fourier transform in system analysis is not just clumsier, but also very restrictive. Hence, the Laplace transform is preferable to the Fourier transform in LTIC system analysis. We shall not belabor the application of the Fourier transform to LTIC system analysis. We consider just one example here. EXAMPLE 7.18 Find the zero-state response of a stable LTIC system with frequency response [‡]

and the input is x(t) = e −t u(t). In this case

Moreover, because the system is stable, the frequency response H(jω) = H(ω). Hence

Therefore

Expanding the right-hand side in partial fractions yields

and EXERCISE E7.11 For the system in Example 7.18, show that the zero-input response to the input e t u(−t) is y(t) = ⅓[e t u(−t) + e −2t u(t)] [Hint: Use pair 2 t

(Table 7.1) to find the Fourier transform of e u(−t).] HEURISTIC UNDERSTANDING OF LINEAR SYSTEM RESPONSE In finding the linear system response to arbitrary input, the time-domain method uses convolution integral and the frequency-domain method uses the Fourier integral. Despite the apparent dissimilarities of the two methods, their philosophies are amazingly si

Preface This book, Linear Systems and Signals, presents a comprehensive treatment of signals and linear systems at an introductory level. Like all my other books, it emphasizes physical appreciation of concepts through heuristic reasoning, and the use of metaphors, analogies, and creative explanations. Such an approach is much different from a purely deductive technique that uses mere mathematical manipulation of symbols. There is a temptation to treat engineering subjects as a branch of applied mathematics. Such an approach is a perfect match to the public image of engineering as a dry and dull discipline. It ignores the physical meaning behind various derivations and deprives a student of intuitive grasp and the enjoyable experience of logical uncovering of the subject matter. Here I have used mathematics not so much to prove axiomatic theory as to support and enhance physical and intuitive understanding. Wherever possible, theoretical results are interpreted heuristically and are enhanced by carefully chosen examples and analogies. This second edition, which closely follows the organization of the first edition, has been refined by incorporating suggestions and changes provided by various reviewers. The added topics include Bode plots, use of digital filters in an impulse-invariance method of designing analog systems, convergence of infinite series, bandpass systems, group and phase delay, and Fourier applications to communication systems. A significant and sizable addition in the area of MATLAB® (a registered trademark of The Math Works, Inc.) has been provided by Dr. Roger Green of North Dakota State University. Dr. Green discusses his contribution at the conclusion of this preface.

ORGANIZATION The book may be conceived as divided into five parts: 1. Introduction (Background and Chapter 1). 2. Time-domain analysis of linear time-invariant (LTI) systems (Chapters 2 and 3). 3. Frequency-domain (transform) analysis of LTI systems (Chapters 4 and 5). 4. Signal analysis (Chapters 6, 7, 8, and 9).

5. State-space analysis of LTI systems (Chapter 10). The organization of the book permits much flexibility in teaching the continuous-time and discrete-time concepts. The natural sequence of chapters is meant to integrate continuous-time and discrete-time analysis. It is also possible to use a sequential approach in which all the continuous-time analysis is covered first (Chapters 1, 2, 4, 6, 7, and 8), followed by discrete-time analysis (Chapters 3, 5, and 9).

SUGGESTIONS FOR USING THIS BOOK The book can be readily tailored for a variety of courses spanning 30 to 45 lecture hours. Most of the material in the first eight chapters can be covered at a brisk pace in about 45 hours. The book can also be used for a 30-lecture-hour course by covering only analog material (Chapters 1, 2, 4, 6, 7, and possibly selected topics in Chapter 8). Alternately, one can also select Chapters 1 to 5 for courses purely devoted to systems analysis or transform techniques. To treat continuous- and discrete-time systems by using an integrated (or parallel) approach, the appropriate sequence of Chapters is 1, 2, 3, 4, 5, 6, 7, and 8. For a sequential approach, where the continuous-time analysis is followed by discrete-time analysis, the proper chapter sequence is 1, 2, 4, 6, 7, 8, 3, 5, and possibly 9 (depending on the time availability). Logically, the Fourier transform should precede the Laplace transform. I have used such an approach in the companion volume, Signal Processing and Linear Systems (Oxford, 1998). However, a sizable number of instructors feel that it is easier for students to learn Fourier after Laplace. Such an approach has an appeal because of the gradual progression of difficulty, in the sense that the relatively more difficult concepts of Fourier are treated after the simpler area of Laplace. This book is written to accommodate that viewpoint. For those who wish to see Fourier before Laplace, there is Signal Processing and Linear Systems.

NOTABLE FEATURES The notable features of this book include the following: 1. Intuitive and heuristic understanding of the concepts and physical meaning of mathematical results are emphasized throughout. Such an approach not only leads to deeper appreciation and easier comprehension of the concepts, but also makes learning enjoyable for students. 2. Many students are handicapped by an inadequate background in basic material such as complex numbers, sinusoids, quick sketching of functions, Cramer's rule, partial fraction expansion, and matrix algebra. I have added a chapter that addresses these basic and pervasive topics in electrical engineering. Response by students has been unanimously enthusiastic. 3. There are more than 200 worked examples in addition to exercises (usually with answers) for students to test their understanding. There is also a large number of selected problems of varying difficulty at the end of each chapter. 4. For instructors who like to get students involved with computers, several examples are worked out by means of MATLAB, which is becoming a standard software package in electrical engineering curricula. There is also a MATLAB session at the end of each chapter. The problem set contains several computer problems. Working computer examples or problems, though not essential for the use of this book, is highly recommended. 5. The discrete-time and continuous-time systems may be treated in sequence, or they may be integrated by using a parallel approach. 6. The summary at the end of each chapter proves helpful to students in summing up essential developments in the chapter. 7. There are several historical notes to enhance student's interest in the subject. This information introduces students to the historical background that influenced the development of electrical engineering.

ACKNOWLEDGMENTS Several individuals have helped me in the preparation of this book. I am grateful for the helpful suggestions of the several reviewers. I am most grateful to Prof. Yannis Tsividis of Columbia University, who provided his comprehensively thorough and insightful feedback for the book. I also appreciate another comprehensive review by Prof. Roger Green. I thank Profs. Joe Anderson of Tennessee Technological University, Kai S. Yeung of the University of Texas at Arlington, and Alexander Poularikis of the University of Alabama at Huntsville for very thoughtful reviews. Thanks for helpful suggestions are also due to Profs. Babajide Familoni of the University of Memphis, Leslie Collins of Duke University, R. Rajgopalan of the University of

Arizona, and William Edward Pierson from the U.S. Air Force Research Laboratory. Only those who write a book understand that writing a book such as this is an obsessively time-consuming activity, which causes much hardship for the family members, where the wife suffers the most. So what can I say except to thank my wife, Rajani, for enormous but invisible sacrifices. B. P. Lathi

MATLAB MATLAB is a sophisticated language that serves as a powerful tool to better understand a myriad of topics, including control theory, filter design, and, of course, linear systems and signals. MATLAB's flexible programming structure promotes rapid development and analysis. Outstanding visualization capabilities provide unique insight into system behavior and signal character. By exploring concepts with MATLAB, you will substantially increase your comfort with and understanding of course topics. As with any language, learning MATLAB is incremental and requires practice. This book provides two levels of exposure to MATLAB. First, short computer examples are interspersed throughout the text to reinforce concepts and perform various computations. These examples utilize standard MATLAB functions as well as functions from the control system, signal processing, and symbolic math toolboxes. MATLAB has many more toolboxes available, but these three are commonly available in many engineering departments. A second and deeper level of exposure to MATLAB is achieved by concluding each chapter with a separate MATLAB session. Taken together, these eleven sessions provide a self-contained introduction to the MATLAB environment that allows even novice users to quickly gain MATLAB proficiency and competence. These sessions provide detailed instruction on how to use MATLAB to solve problems in linear systems and signals. Except for the very last chapter, special care has been taken to avoid the use of toolbox functions in the MATLAB sessions. Rather, readers are shown the process of developing their own code. In this way, those readers without toolbox access are not at a disadvantage. All computer code is available online (http://www.mathworks.com/support/books). Code for the computer examples in a given chapter, say Chapter xx, is named CExx.m. Program yy from MATLAB Session xx is named MSxxPyy.m. Additionally, complete code for each individual MATLAB session is named MSxx.m. Roger Green

Chapter B: Background The topics discussed in this chapter are not entirely new to students taking this course. You have already studied many of these topics in earlier courses or are expected to know them from your previous training. Even so, this background material deserves a review because it is so pervasive in the area of signals and systems. Investing a little time in such a review will pay big dividends later. Furthermore, this material is useful not only for this course but also for several courses that follow. It will also be helpful later, as reference material in your professional career.

B.1 COMPLEX NUMBERS Complex numbers are an extension of ordinary numbers and are an integral part of the modern number system. Complex numbers, particularly imaginary numbers, sometimes seem mysterious and unreal. This feeling of unreality derives from their unfamiliarity and novelty rather than their supposed nonexistence! Mathematicians blundered in calling these numbers "imaginary," for the term immediately prejudices perception. Had these numbers been called by some other name, they would have become demystified long ago, just as irrational numbers or negative numbers were. Many futile attempts have been made to ascribe some physical meaning to imaginary numbers. However, this effort is needless. In mathematics we assign symbols and operations any meaning we wish as long as internal consistency is maintained. The history of mathematics is full of entities that were unfamiliar and held in abhorrence until familiarity made them acceptable. This fact will become clear from the following historical note.

B.1-1 A Historical Note Among early people the number system consisted only of natural numbers (positive integers) needed to express the number of children, cattle, and quivers of arrows. These people had no need for fractions. Whoever heard of two and one-half children or three and one-fourth cows! However, with the advent of agriculture, people needed to measure continuously varying quantities, such as the length of a field and the weight of a quantity of butter. The number system, therefore, was extended to include fractions. The ancient Egyptians and Babylonians knew how to handle fractions, but Pythagoras discovered that some numbers (like the diagonal of a unit square) could not be expressed as a whole number or a fraction. Pythagoras, a number mystic, who regarded numbers as the essence and principle of all things in the universe, was so appalled at his discovery that he swore his followers to secrecy and imposed a death penalty for divulging this secret. [1] These numbers, however, were included in the number system by the time of Descartes, and they are now known as irrational numbers.

Until recently, negative numbers were not a part of the number system. The concept of negative numbers must have appeared absurd to early man. However, the medieval Hindus had a clear understanding of the significance of positive and negative numbers. [2] , [3] They were also the first to

recognize the existence of absolute negative quantities. [4] The works of Bhaskar (1114-1185) on arithmetic (Līlāvatī) and algebra (Bījaganit) not only

use the decimal system but also give rules for dealing with negative quantities. Bhaskar recognized that positive numbers have two square roots. [5] Much later, in Europe, the men who developed the banking system that arose in Florence and Venice during the late Renaissance (fifteenth century) are credited with introducing a crude form of negative numbers. The seemingly absurd subtraction of 7 from 5 seemed reasonable when bankers began to allow their clients to draw seven gold ducats while their deposit stood at five. All that was necessary for this purpose was to write the difference, 2, on the debit side of a ledger.[6]

Thus the number system was once again broadened (generalized) to include negative numbers. The acceptance of negative numbers made it

possible to solve equations such as x + 5 = 0, which had no solution before. Yet for equations such as x 2 + 1 = 0, leading to x 2 = −1, the solution could not be found in the real number system. It was therefore necessary to define a completely new kind of number with its square equal to −1. During the time of Descartes and Newton, imaginary (or complex) numbers came to be accepted as part of the number system, but they were still regarded as algebraic fiction. The Swiss mathematician Leonhard Euler introduced the notation i (for imaginary) around 1777 to represent √−1. Electrical engineers use the notation j instead of i to avoid confusion with the notation i often used for electrical current. Thus and This notation allows us to determine the square root of any negative number. For example, When imaginary numbers are included in the number system, the resulting numbers are called complex numbers. ORIGINS OF COMPLEX NUMBERS

Ironically (and contrary to popular belief), it was not the solution of a quadratic equation, such as x 2 + 1 = 0, but a cubic equation with real roots that made imaginary numbers plausible and acceptable to early mathematicians. They could dismiss √−1 as pure nonsense when it appeared as a solution to x 2 + 1 = 0 because this equation has no real solution. But in 1545, Gerolamo Cardano of Milan published Ars Magna (The Great Art), the most important algebraic work of the Renaissance. In this book he gave a method of solving a general cubic equation in which a root of a negative number appeared in an intermediate step. According to his method, the solution to a third-order equation[†] is given by

Gerolamo Cardano For example, to find a solution of x 3 + 6x − 20 = 0, we substitute a = 6, b = −20 in the foregoing equation to obtain

We can readily verify that 2 is indeed a solution of x 3 + 6x − 20 = 0. But when Cardano tried to solve the equation x 3 − 15x − 4 = 0 by this formula, his solution was

What was Cardano to make of this equation in the year 1545? In those days negative numbers were themselves suspect, and a square root of a negative number was doubly preposterous! Today we know that Therefore, Cardano's formula gives We can readily verify that x = 4 is indeed a solution of x 3 − 15x − 4 = 0. Cardano tried to explain halfheartedly the presence of but ultimately dismissed the whole enterprize as being "as subtle as it is useless." A generation later, however, Raphael Bombelli (1526-1573), after examining Cardano's results, proposed acceptance of imaginary numbers as a necessary vehicle that would transport the mathematician from the real cubic equation to its real solution. In other words, although we begin and end with real numbers, we seem compelled to move into an unfamiliar

world of imaginaries to complete our journey. To mathematicians of the day, this proposal seemed incredibly strange.7 Yet they could not dismiss the idea of imaginary numbers so easily because this concept yielded the real solution of an equation. It took two more centuries for the full importance of complex numbers to become evident in the works of Euler, Gauss, and Cauchy. Still, Bombelli deserves credit for recognizing that such numbers have a role to play in algebra.7

In 1799 the German mathematician Karl Friedrich Gauss, at the ripe age of 22, proved the fundamental theorem of algebra, namely that every algebraic equation in one unknown has a root in the form of a complex number. He showed that every equation of the nth order has exactly n solutions (roots), no more and no less. Gauss was also one of the first to give a coherent account of complex numbers and to interpret them as points in a complex plane. It is he who introduced the term "complex numbers" and paved the way for their general and systematic use. The number system was once again broadened or generalized to include imaginary numbers. Ordinary (or real) numbers became a special case of generalized (or complex) numbers. The utility of complex numbers can be understood readily by an analogy with two neighboring countries X and Y, as illustrated in Fig. B.1. If we want to travel from City a to City b (both in Country X), the shortest route is through Country Y, although the journey begins and ends in Country X. We may, if we desire, perform this journey by an alternate route that lies exclusively in X, but this alternate route is longer. In mathematics we have a similar situation with real numbers (Country X) and complex numbers (Country Y). All real-world problems must start with real numbers, and all the final results must also be in real numbers. But the derivation of results is considerably simplified by using complex numbers as an intermediary. It is also possible to solve any real-world problem by an alternate method, using real numbers exclusively, but such procedures would increase the work needlessly.

Figure B.1: Use of complex numbers can reduce the work.

B.1-2 Algebra of Complex Numbers A complex number (a, b) or a + jb can be represented graphically by a point whose Cartesian coordinates are (a, b) in a complex plane (Fig. B.2). Let us denote this complex number by z so that

The numbers a and b (the abscissa and the ordinate) of z are the real part and the imaginary part, respectively, of z. They are also expressed as

Note that in this plane all real numbers lie on the horizontal axis, and all imaginary numbers lie on the vertical axis. Complex numbers may also be expressed in terms of polar coordinates. If (r, θ) are the polar coordinates of a point z = a + jb (see Fig. B.2), then

and

Figure B.2: Representation of a number in the complex plane. The Euler formula states that To prove the Euler formula, we use a Maclaurin series to expand e jθ, cos θ, and sin θ:

Hence, it follows that[†]

Using Eq. (B.3) in (B.2) yields

Thus, a complex number can be expressed in Cartesian form a + jb or polar form re jθ with

and

Observe that r is the distance of the point z from the origin. For this reason, r is also called the magnitude (or absolute value) of z and is denoted by |z|. Similarly, θ is called the angle of z and is denoted by ∠z. Therefore and

Also

CONJUGATE OF A COMPLEX NUMBER We define z*, the conjugate of z = a + jb, as

The graphical representation of a number z and its conjugate z* is depicted in Fig. B.2. Observe that z* is a mirror image of z about the horizontal axis. To find the conjugate of any number, we need only replace j by −j in that number (which is the same as changing the sign of its angle). The sum of a complex number and its conjugate is a real number equal to twice the real part of the number:

The product of a complex number z and its conjugate is a real number |z| 2 , the square of the magnitude of the number:

UNDERSTANDING SOME USEFUL IDENTITIES

In a complex plane, re jθ represents a point at a distance r from the origin and at an angle θ with the horizontal axis, as shown in Fig. B.3a. For example, the number − 1 is at a unit distance from the origin and has an angle π or − π (in fact, any odd multiple of ± π), as seen from Fig. B.3b. Therefore,

Figure B.3: Understanding some useful identities in terms of re jθ. In fact,

The number 1, on the other hand, is also at a unit distance from the origin, but has an angle 2π (in fact, ±2nπ for any integer value of n). Therefore,

The number j is at unit distance from the origin and its angle is π/2 (see Fig. B.3b). Therefore, Similarly, Thus

In fact,

This discussion shows the usefulness of the graphic picture of re j. This picture is also helpful in several other applications. For example, to determine the limit of e (α+ jw)t as t → ∞, we note that

Now the magnitude of e jwt is unity regardless of the value of ω or t because e jwt = re jθ with r = 1. Therefore, e αt determines the behavior of e (α+ jω)t as t → ∞ and

In future discussions you will find it very useful to remember re jθ as a number at a distance r from the origin and at an angle θ with the horizontal axis of the complex plane. A WARNING ABOUT USING ELECTRONIC CALCULATORS IN COMPUTING ANGLES

From the Cartesian form a + jb we can readily compute the polar form re jθ [see Eq. (B.6)]. Electronic calculators provide ready conversion of rectangular into polar and vice versa. However, if a calculator computes an angle of a complex number by using an inverse trigonometric function θ = tan −1 (b/a), proper attention must be paid to the quadrant in which the number is located. For instance, θ corresponding to the number −2 − j3 is

tan −1 (−3/−2). This result is not the same as tan −1 (3/2). The former is −123.7°, whereas the latter is 56.3°. An electronic calculator cannot make

this distinction and can give a correct answer only for angles in the first and fourth quadrants. It will read tan −1 (−3/−2) as tan −1 (3/2), which is clearly wrong. When you are computing inverse trigonometric functions, if the angle appears in the second or third quadrant, the answer of the calculator is off by 180°. The correct answer is obtained by adding or subtracting 180° to the value found with the calculator (either adding or subtracting yields the correct answer). For this reason it is advisable to draw the point in the complex plane and determine the quadrant in which the point lies. This issue will be clarified by the following examples. EXAMPLE B.1 Express the following numbers in polar form: a. 2 + j3 b. −2 + j3 c. −2 − j3 d. 1 − j3 a. In this case the number is in the first quadrant, and a calculator will give the correct value of 56.3°. Therefore (see Fig. B.4a), we can

write

b.

Figure B.4: From Cartesian to polar form. In this case the angle is in the second quadrant (see Fig. B.4b), and therefore the answer given by the calculator, tan −1 (1/−2) = −26.6°, is off by 180°. The correct answer is (−26.6 ± 180)° = 153.4° or −206.6°. Both values are correct because they represent the same angle. It is a common practice to choose an angle whose numerical value is less than 180°. Such a value is called the principal value of the angle, which in this case is 153.4°. Therefore,

c. In this case the angle appears in the third quadrant (see Fig. B.4c), and therefore the answer obtained by the calculator (tan −1 (−3/−2) = 56.3°) is off by 180°. The correct answer is (56.3° 180)° = 236.3° or −123.7°. We choose the principal value −123.7° so that (see Fig. B.4c).

d. In this case the angle appears in the fourth quadrant (see Fig. B.4d), and therefore the answer given by the calculator, tan −1 (−3/1) = −71.6°, is correct (see Fig. B.4d):

COMPUTER EXAMPLE CB.1 Using the MATLAB function cart2pol, convert the following numbers from Cartesian form to polar form: a. z = 2 + j3 b. z = −2 + j1 >> [z_rad, z_mag] = cart2pol(2, 3); >> z_deg = z_rad* (180/pi); >> disp(['(a) z_mag = ',num2str(z_mag),'; z_rad = ',num2str(z_rad), ... >> '; z_deg = ',num2str(z_deg)]); (a) z mag = 3.6056; z rad = 0.98279; z deg = 56.3099 b. Therefore, z = 2 + j3 = 3.6056e j0.98279 + 3.6056e j56.3099° >> [z_rad, z_mag] = cart2pol(-2, 1); >> z_deg = z_rad* (180/pi); >> disp(['(b) z_mag = ',num2str(z_mag),'; z_rad = ',num2str(z_rad), ... >> '; z_deg = ',num2str(z_deg)]); (b) z mag = 2.2361; z rad = 2.6779; z deg = 153.4349 Therefore, z = −2 + j1 = 2.2361e j2.6779 = 2.2361e j153.4349° .

EXAMPLE B.2 Represent the following numbers in the complex plane and express them in Cartesian form: a. 2e jπ/3 b. 4e −j3π/4 c. 2e jπ/2 d. 3e −j3π e. 2e j4π f. 2e −j4π a. 2e jπ/3 = 2(cos π/3 + j sin π/3) = 1 + j √3 (See Fig. B.5b)

Figure B.5: From polar to Cartesian form. b. 4e −j3π/4 = 4(cos 3π/4 − j sin π/4) = −2√2 − j2 √2 (See Fig. B.5b) c. 2e jπ/2 = 2(cos π/2 + j sin π/2) = 2(0 + j 1) = j2 (See Fig. B.5c) d. 3e −j3π = 2(cos 3π − j sin 3π) = 3(−1 + j0) = −3 (See Fig. B.5d) e. 2e j4π = 2(cos 4π + j sin 4π) = 2(1 − j0) = 2 (See Fig. B.5e) f. 2e −j4π = 2(cos 4π − j sin 4π) = 2(1 − j0) = 2 (See Fig. B.5f) COMPUTER EXAMPLE CB.2 Using the MATLAB function pol2cart, convert the number z = 4e −j(3π/4) from polar form to Cartesian form. >> [z_real, z_imag] = pol2cart(-3*pi/4,4); >> disp (['z_real = ',num2str(z_real),'; z_imag = ',num2str(z_imag)]); z real = -2.8284; z imag = -2.8284 Therefore, z = 4e −j(3π/4) = −2.8284 − j2.8284. ARITHMETICAL OPERATIONS, POWERS, AND ROOTS OF COMPLEX NUMBERS To perform addition and subtraction, complex numbers should be expressed in Cartesian form. Thus, if

and then If z 1 and z 2 are given in polar form, we would need to convert them into Cartesian form for the purpose of adding (or subtracting). Multiplication and division, however, can be carried out in either Cartesian or polar form, although the latter proves to be much more convenient. This is because if z 1 and z 2 are expressed in polar form as then

and

Moreover,

and

This shows that the operations of multiplication, division, powers, and roots can be carried out with remarkable ease when the numbers are in polar form. Strictly speaking, there are n values for z 1/n (the nth root of z). To find all the n roots, we reexamine Eq. (B.15d).

The value of z 1/n given in Eq. (B.15d) is the principal value of z 1/n , obtained by taking the nth root of the principal value of z, which corresponds to the case k = 0 in Eq. (B.15e). EXAMPLE B.3 Determine z 1 z 2 and z 1 /z 2 for the numbers

We shall solve this problem in both polar and Cartesian forms. MULTIPLICATION: CARTESIAN FORM MULITPLICATION: POLAR FORM DIVISION: CARTESIAN FORM

To eliminate the complex number in the denominator, we multiply both the numerator and the denominator of the right-hand side by 2 − j3, the denominator's conjugate. This yields

DIVISION: POLAR FORM

It is clear from this example that multiplication and division are easier to accomplish in polar form than in Cartesian form. EXAMPLE B.4 For z 1 = 2e jπ/4 and z 2 = 8e jπ/3 , find the following: a. 2z 1 − z 2

b. 1/z 1 c. z 1 /z 2 2 d. a. Since subtraction cannot be performed directly in polar form, we convert z 1 and z 2 to Cartesian form:

Therefore,

b.

c. d. There are three cube roots of 8e j(π/3) = 8e jj(π/3+2k), k = 0, 1, 2. The principal value (value corresponding to k = 0) is 2e jπ/9. COMPUTER EXAMPLE CB.3 Determine z 1 z 2 and z 1 /z 2 if z 1 = 3 + j4 and z 2 = 2 + j3 >> z_1 = 3+j*4; z_2 = 2+j*3; >> z_1z_2 = z_1*z_2; >> z_1divz_2 = z_1/z_2; >> disp(['z_1*z_2 = ',num2str(z_1 z_2),'; z_1/z_2 = ',num2str(z_1divz_2)]); z 1*z 2 = -6+17i; z 1/z 2 = 1.3846-0.076923i Therefore, z 1 z 2 = (3 + j4)(2 + j3) = −6 + j17 and z 1 /z 2 = (3 + j4)/(2 + j3) = 1.3486 − j0.076923. EXAMPLE B.5 Consider X(ω), a complex function of a real variable ω:

a. Express X(ω) in Cartesian form, and find its real and imaginary parts. b. Express X(ω) in polar form, and find its magnitude |X(ω)| and angle ∠X(ω). a. To obtain the real and imaginary parts of X (ω), we must eliminate imaginary terms in the denominator of X (ω). This is readily done by multiplying both the numerator and the denominator of X(ω) by 3 − j4ω, the conjugate of the denominator 3 + j4ω so that

This is the Cartesian form of X(ω). Clearly the real and imaginary parts Xr(ω) and Xi (ω) are given by

b. This is the polar representation of X(ω). Observe that

LOGARITHMS OF COMPLEX NUMBERS We have

if then

The value of In z for k = 0 is called the principal value of In z and is denoted by Ln z.

In all these expressions, the case of k = 0 is the principal value of that expression. [1] Calinger, R., ed. Classics of Mathematics. Moore Publishing, Oak Park, IL, 1982. [2] Hogben, Lancelot. Mathematics in the Making. Doubleday, New York, 1960. [3] Cajori, Florian. A History of Mathematics, 4th ed. Chelsea, New York, 1985. [4] Encyclopaedia Britannica. Micropaedia IV, 15th ed., vol. 11, p. 1043. Chicago, 1982. [5] Singh, Jagjit. Great Ideas of Modern Mathematics. Dover, New York, 1959. [6] Dunham, William. Journey Through Genius. Wiley, New York, 1990. [†] This equation is known as the depressed cubic equation. A general cubic equation

can always be reduced to a depressed cubic form by substituting y = x − (p/3). Therefore any general cubic equation can be solved if we know the solution to the depressed cubic. The depressed cubic was independently solved, first by Scipione del Ferro (1465-1526) and then by Niccolo Fontana (1499-1557). The latter is better known in the history of mathematics as Tartaglia ("Stammerer"). Cardano learned the secret of the depressed cubic solution from Tartaglia. He then showed that by using the substitution y = x − (p/3), a general cubic is reduced to a depressed cubic. [†] It can be shown that when we impose the following three desirable properties on an exponential e z where z = x + jy, we come to conclusion that e jy = cos y + j sin y (Euler equation). These properties are

1. e z is a single-valued and analytic function of z. 2. de z /dz = e z 3. e z reduces to e x if y = 0.

B.2 SINUSOIDS Consider the sinusoid

We know that Therefore, cos φ repeats itself for every change of 2π in the angle φ. For the sinusoid in Eq. (B.18), the angle 2πf 0 t + θ changes by 2π when t changes by 1/f 0 . Clearly, this sinusoid repeats every 1/f 0 seconds. As a result, there are f0 repetitions per second. This is the frequency of the sinusoid, and the repetition interval T0 given by

is the period. For the sinusoid in Eq. (B.18), C is the amplitude, f0 is the frequency (in hertz), and θ is the phase. Let us consider two special cases of this sinusoid when θ = 0 and θ = −π/2 as follows: a. x(t) = C cos 2πf 0 t (θ = 0) b. x(t) = C cos (2πf 0 t − π/2) = C sin 2πf0 t (θ = −π/2) The angle or phase can be expressed in units of degrees or radians. Although the radian is the proper unit, in this book we shall often use the degree unit because students generally have a better feel for the relative magnitudes of angles expressed in degrees rather than in radians. For example, we relate better to the angle 24° than to 0.419 radian. Remember, however, when in doubt, use the radian unit and, above all, be consistent. In other words, in a given problem or an expression do not mix the two units. It is convenient to use the variable ω0 (radian frequency) to express 2π/f0 :

With this notation, the sinusoid in Eq. (B.18) can be expressed as in which the period T0 is given by [see Eqs. (B.19) and (B.20)]

and

In future discussions, we shall often refer to ω0 as the frequency of the signal cos (ω0 t + θ), but it should be clearly understood that the frequency of this sinusoid is f0 H z (f0 = ω0 /2π), and ω0 is actually the radian frequency. The signals C cos ω0 t and C sin ω0 t are illustrated in Fig. B.6a and B.6b, respectively. A general sinusoid C cos (ω0 t + θ) can be readily sketched by shifting the signal C cos ω0 t in Fig. B.6a by the appropriate amount. Consider, for example,

Figure B.6: Sketching a sinusoid. This signal can be obtained by shifting (delaying) the signal C cos ω0 t (Fig. B.6a) to the right by a phase (angle) of 60°. We know that a sinusoid undergoes a 360° change of phase (or angle) in one cycle. A quarter-cycle segment corresponds to a 90° change of angle. We therefore shift (delay) the signal in Fig. B.6a by two-thirds of a quarter-cycle segment to obtain C cos (ω0 t − 60°), as shown in Fig. B.6c. Observe that if we delay C cos ω0 t in Fig. B.6a by a quarter-cycle (angle of 90° or π/2 radians), we obtain the signal C sin ω0 t, depicted in Fig. B.6b. This verifies the well-known trigonometric identity

Alternatively, if we advance C sin ω0 t by a quarter-cycle, we obtain C cos ω0 t. Therefore,

This observation means sin ω0 t lags cos ω0 t by 90°(π/2 radians), or cos ω0 t leads sin ω0 t by 90°.

B.2-1 Addition of Sinusoids Two sinusoids having the same frequency but different phases add to form a single sinusoid of the same frequency. This fact is readily seen from the well-known trigonometric identity

in which Therefore,

Equations (B.23b) and (B.23c) show that C and θ are the magnitude and angle, respectively, of a complex number a − jb. In other words, a − jb =

Cejθ. Hence, to find C and θ, we convert a − jb to polar form and the magnitude and the angle of the resulting polar number are C and θ, respectively. To summarize,

in which C and θ are given by Eqs. (B.23b) and (B.23c), respectively. These happen to be the magnitude and angle, respectively, of a − jb. The process of adding two sinusoids with the same frequency can be clarified by using phasors to represent sinusoids. We represent the sinusoid C cos (ω0 t + θ) by a phasor of length C at an angle θ with the horizontal axis. Clearly, the sinusoid a cos ω0 t is represented by a horizontal phasor of length a (θ = 0), while b sin ω0 t = b cos (ω0 t − π/2) is represented by a vertical phasor of length b at an angle − π/2 with the horizontal (Fig. B.7). Adding these two phasors results in a phasor of length C at an angle θ, as depicted in Fig. B.7. From this figure, we verify the values of C and θ found in Eqs. (B.23b) and (B.23c), respectively.

Figure B.7: Phasor addition of sinusoids. Proper care should be exercised in computing θ, as explained on page 8 ("A Warning About Using Electronic Calculators in Computing Angles"). EXAMPLE B.6 In the following cases, express x(t) as a single sinusoid: a. x(t) = cos ω0 t − √3 sin ω0 t b. x(t) = −3 cos ω0 t + 4 sin ω0 t

a. In this case, a = 1, b = −√3, and from Eqs. (B.23)

Therefore, We can verify this result by drawing phasors corresponding to the two sinusoids. The sinusoid cos ω0 t is represented by a phasor of unit length at a zero angle with the horizontal. The phasor sin ω0 t is represented by a unit phasor at an angle of −90° with the horizontal, Therefore, −√3 sin ω0 t is represented by a phasor of length √2 at 90° with the horizontal, as depicted in Fig. B.8a. The two phasors added yield a phasor of length 2 at 60° with the horizontal (also shown in Fig. B.8a).

Figure B.8: Phasor addition of sinusoids. Alternately, we note that a − jb = 1 + j√3 = 2e jπ/3 . Hence, C = 2 and θ = π/3. Observe that a phase shift of ±π amounts to multiplication by −1. Therefore, x(t) can also be expressed alternatively as

In practice, the principal value, that, is, −120°, is preferred. b. In this case, a = −3, b = 4, and from Eqs. (B.23) we have

Observe that Therefore, This result is readily verified in the phasor diagram in Fig. B.8b. Alternately, a − jb = −3 −j4 = 5e −j126.9°. Hence, C = 5 and θ = −126.9°. COMPUTER EXAMPLE CB.4 Express f(t) = −3 cos (ω0 t) + 4 sin (ω0 t) as a single sinusoid. Notice that a cos (ω0 t) + b sin (ω0 t) = C cos [ω0 t + tan −1 (−b/a)]. Hence, the amplitude C and the angle θ of the resulting sinusoid are the magnitude and angle of a complex number a − jb. >> a= -3; b = 4; >> [theta,C] = cart2pol(a,-b); >> theta_deg = (180/pi)*theta; >> disp(['C = ',num2str(C),'; theta = ',num2str(theta),... >> '; theta_deg = ',nu,2str(theta_deg)]); C = 5; theta = -2.2143; theta deg = -126.8699 Therefore, f(t) = −3 cos (ω0 t) + 4 sin (ω0 t) = 5 cos (ω0 t − 2.2143) = 5 cos (ω0 t − 126.8699°). We can also perform the reverse operation, expressing in terms of cos ω0 t and sin ω0 t by means of the trigonometric identity

For example,

B.2-2 Sinusoids in Terms of Exponentials: Euler's Formula Sinusoids can be expressed in terms of exponentials by using Euler's formula [see Eq. (B.3)]

Inversion of these equations yields

B.3 SKETCHING SIGNALS In this section we discuss the sketching of a few useful signals, starting with exponentials.

B.3-1 Monotonic Exponentials The signal e −at decays monotonically, and the signal e at grows monotonically with t (assuming a > 0) as depicted in Fig. B.9. For the sake of

simplicity, we shall consider an exponential e −at starting at t = 0, as shown in Fig. B.10a.

Figure B.9: Monotonic exponentials.

Figure B.10: (a) Sketching e −at . (b) Sketching e −2t . The signal e −at has a unit value at t = 0. At t = 1/a, the value drops to 1/e (about 37% of its initial value), as illustrated in Fig. B.10a. This time interval over which the exponential reduces by a factor e (i.e., drops to about 37% of its value) is known as the time constant of the exponential.

Therefore, the time constant of e −at is 1/a. Observe that the exponential is reduced to 37% of its initial value over any time interval of duration 1/a. This can be shown by considering any set of instants t1 and t2 separated by one time constant so that

Now the ratio of e −at2 to e −at1 is given by

We can use this fact to sketch an exponential quickly. For example, consider The time constant in this case is 0.5. The value of x(t) at t = 0 is 1. At t = 0.5 (one time constant) it is 1/e (about 0.37). The value of x(t) continues

to drop further by the factor 1/e (37%) over the next half-second interval (one time constant). Thus x(t) at t = 1 is (1/e) 2 . Continuing in this manner,

we see that x(t) = (1/e) 3 at t = 1.5, and so on. A knowledge of the values of x(t) at t = 0, 0.5, 1, and 1.5 allows us to sketch the desired signal as shown in Fig. B.10b.[†]

For a monotonically growing exponential e at , the waveform increases by a factor e over each interval of 1/a seconds.

B.3-2 The Exponentially Varying Sinusoid We now discuss sketching an exponentially varying sinusoid

Let us consider a specific example:

We shall sketch 4e −2t and cos (6t − 60°) separately and then multiply them: i. Sketching 4e −2t . This monotonically decaying exponential has a time constant of 0.5 second and an initial value of 4 at t = 0.

Therefore, its values at t = 0.5, 1, 1.5, and 2 are 4/e, 4/e 2 , 4/e 3 , and 4/e 4 , or about 1.47, 0.54, 0.2, and 0.07, respectively. Using these

values as a guide, we sketch 4e −2t , as illustrated in Fig. B.11a.

ii. Sketching cos (6t − 60°). The procedure for sketching cos (6t − 60°) is discussed in Section B.2 (Fig. B.6c). Here the period of the sinusoid is T0 = 2π/6 ≈ 1, and there is a phase delay of 60°, or two-thirds of a quarter-cycle, which is equivalent to a delay of about (60/360)(1) ≈ 1/6 second (see Fig. B.11b).

Figure B.11: Sketching an exponentially varying sinusoid. iii. Sketching 4e −2t cos (6t − 60°). We now multiply the waveforms in steps i and ii. This multiplication amounts to forcing the sinusoid 4 cos (6t − 60°) to decrease exponentially with a time constant of 0.5. The initial amplitude (at t = 0) is 4, decreasing to 4/e (= 1.47) at t = 0.5, to 1.47/e (= 0.54) at t = 1, and so on. This is depicted in Fig. B.11c. Note that when cos (6t − 60°) has a value of unity (peak amplitude),

Therefore, 4e −2t cos (6t − 60°) touches 4e −2t at the instants at which the sinusoid cos (6t − 60°) is at its positive peaks. Clearly 4e −2t is an

envelope for positive amplitudes of4e −2t cos (6t − 60°). Similar argument shows that 4e −2t cos (6t − 60°) touches −4e −2t at its negative peaks.

Therefore, −4e −2t is an envelope for negative amplitudes of 4e −2t cos (6t − 60°). Thus, to sketch 4e −2t cos (6t − 60°), we first draw the envelopes

4e −2t and −4e −2t (the mirror image of 4e −2t about the horizontal axis), and then sketch the sinusoid cos (6t − 60°), with these envelopes acting as constraints on the sinusoid's amplitude (see Fig. B.11c). In general, Ke−at cos (ω0 t + θ) can be sketched in this manner, with Ke−at and −Ke−at constraining the amplitude of cos (ω0 t + θ). [†] If we wish to refine the sketch further, we could consider intervals of half the time constant over which the signal decays by a factor 1/√e. Thus, at t = 0.25, x(t) = 1/√e, and at t = 0.75, x(t) = 1/e√e, and so on.

B.4 CRAMER'S RULE Cramer's rule offers a very convenient way to solve simultaneous linear equations. Consider a set of n linear simultaneous equations in n unknowns x 1 , x 2 ,..., x n :

These equations can be expressed in matrix form as

We denote the matrix on the left-hand side formed by the elements a ij as A. The determinant of A is denoted by |A|. If the determinant |A| is not zero, the set of equations (B.29) has a unique solution given by Cramer's formula

where |D k | is obtained by replacing the kth column of |A| by the column on the right-hand side of Eq. (B.30) (with elements y 1 , y 2 ,..., y n ). We shall demonstrate the use of this rule with an example. EXAMPLE B.7 Use Cramer's rule to solve the following simultaneous linear equations in three unknowns:

In matrix form these equations can be expressed as

Here,

Since |A| = 4 ≠ 0, a unique solution exists for x 1 , x 2 , and x 3 . This solution is provided by Cramer's rule [Eq. (B.31)] as follows:

B.5 PARTIAL FRACTION EXPANSION In the analysis of linear time-invariant systems, we encounter functions that are ratios of two polynomials in a certain variable, say x. Such functions are known as rational functions. A rational function F(x) can be expressed as

The function F(x) is improper if m ≧ n and proper if m < n. An improper function can always be separated into the sum of a polynomial in x and a proper function. Consider, for example, the function

Because this is an improper function, we divide the numerator by the denominator until the remainder has a lower degree than the denominator.

Therefore, F(x) can be expressed as

A proper function can be further expanded into partial fractions. The remaining discussion in this section is concerned with various ways of doing this.

B.5-1 Method of Clearing Fractions A rational function can be written as a sum of appropriate partial fractions with unknown coefficients, which are determined by clearing fractions and equating the coefficients of similar powers on the two sides. This procedure is demonstrated by the following example. EXAMPLE B.8 Expand the following rational function F(x) into partial fractions:

This function can be expressed as a sum of partial fractions with denominators (x + 1), (x + 2), (x + 3), and (x + 3) 2 , as follows:

To determine the unknowns k 1 , k 2 , k 3 , and k 4 we clear fractions by multiplying both sides by (x + 1)(x + 2)(x + 3) 2 to obtain

Equating coefficients of similar powers on both sides yields

Solution of these four simultaneous equations yields Therefore,

Although this method is straightforward and applicable to all situations, it is not necessarily the most efficient. We now discuss other methods that can reduce numerical work considerably.

B.5-2 The Heaviside "Cover-Up" Method

Distinct Factors Of Q(x) We shall first consider the partial fraction expansion of F(x) = P(x)/Q(x), in which all the factors of Q(x) are distinct (not repeated). Consider the proper function

We can show that F(x) in Eq. (B.35a) can be expressed as the sum of partial fractions

To determine the coefficient k 1 , we multiply both sides of Eq. (B.35b) by x − λ1 and then let x = λ1 . This yields

On the right-hand side, all the terms except k 1 vanish. Therefore,

Similarly, we can show that

This procedure also goes under the name method of residues. EXAMPLE B.9 Expand the following rational function F(x) into partial fractions:

To determine k 1 , we let x = −1 in (x + 1) F(x). Note that (x + 1)F(x) is obtained from F(x) by omitting the term (x + 1) from its denominator. Therefore, to compute k 1 corresponding to the factor (x + 1), we cover up the term (x + 1) in the denominator of F(x) and then substitute x = −1 in the remaining expression. [Mentally conceal the term (x + 1) in F(x) with a finger and then let x = −1 in the remaining expression.] The steps in covering up the function

are as follows. Step 1. Cover up (conceal) the factor (x + 1) from F(x):

Step 2. Substitute x = −1 in the remaining expression to obtain k 1 :

Similarly, to compute k 2 , we cover up the factor (x − 2) in F(x) and let x = 2 in the remaining function, as follows:

and

Therefore,

Complex Factors Of Q(x) The procedure just given works regardless of whether the factors of Q(x) are real or complex. Consider, for example,

where

Similarly,

Therefore,

The coefficients k 2 and k 3 corresponding to the complex conjugate factors are also conjugates of each other. This is generally true when the coefficients of a rational function are real. In such a case, we need to compute only one of the coefficients. Quadratic Factors Often we are required to combine the two terms arising from complex conjugate factors into one quadratic factor. For example, F(x) in Eq. (B.38) can be expressed as

The coefficient k 1 is found by the Heaviside method to be 2. Therefore,

The values of c 1 and c 2 are determined by clearing fractions and equating the coefficients of similar powers of x on both sides of the resulting equation. Clearing fractions on both sides of Eq. (B.40) yields

Equating terms of similar powers yields c 1 = 2, c 2 = −8, and

SHORTCUTS The values of c 1 and c 2 in Eq. (B.40) can also be determined by using shortcuts. After computing k 1 = 2 by the Heaviside method as before, we let x = 0 on both sides of Eq. (B.40) to eliminate c 1 . This gives us

Therefore, To determine c 1 , we multiply both sides of Eq. (B.40) by x and then let x → ∞. Remember that when x → ∞, only the terms of the highest power are significant. Therefore, and In the procedure discussed here, we let x = 0 to determine c 2 and then multiply both sides by x and let x → ∞ to determine c 1 . However, nothing is sacred about these values (x = 0 or x = ∞). We use them because they reduce the number of computations involved. We could just as well use

other convenient values for x, such as x = 1. Consider the case

We find k = 1 by the Heaviside method in the usual manner. As a result,

To determine c 1 and c 2 , if we try letting x = 0 in Eq. (B.43), we obtain ∞ on both sides. So let us choose x = 1. This yields

or We can now choose some other value for x, such as x = 2, to obtain one more relationship to use in determining c 1 and c 2 . In this case, however, a simple method is to multiply both sides of Eq. (B.43) by x and then let x → ∞. This yields so that Therefore,

B.5-3 Repeated Factors of Q(x) If a function F(x) has a repeated factor in its denominator, it has the form

Its partial fraction expansion is given by

The coefficients k 1 , k 2 ,..., k j corresponding to the unrepeated factors in this equation are determined by the Heaviside method, as before [Eq. (B.37)]. To find the coefficients a 0 , a 1 , a 2 ,..., a r−1 , we multiply both sides of Eq. (B.45) by (x − λ) r. This gives us

If we let x = λ on both sides of Eq. (B.46), we obtain

Therefore, a 0 is obtained by concealing the factor (x − λ) r in F(x) and letting x = λ in the remaining expression (the Heaviside "cover-up" method). If we take the derivative (with respect to x) of both sides of Eq. (B.46), the right-hand side is a 1 + terms containing a factor (x − λ) in their numerators. Letting x = λ on both sides of this equation, we obtain

Thus, a 1 is obtained by concealing the factor (x − λ) r in F(x), taking the derivative of the remaining expression, and then letting x = λ. Continuing in this manner, we find

Observe that (x − λ) r F(x) is obtained from F(x) by omitting the factor (x − λ) r from its denominator. Therefore, the coefficient a j is obtained by concealing the factor (x − λ) r in F(x), taking the jth derivative of the remaining expression, and then letting x = λ (while dividing by j!).

EXAMPLE B.10 Expand F(x) into partial fractions if

The partial fractions are

The coefficient k is obtained by concealing the factor (x + 2) in F(x) and then substituting x = −2 in the remaining expression:

To find a 0 , we conceal the factor (x + 1) 3 in F(x) and let x = −1 in the remaining expression:

To find a 1 , we conceal the factor (x + 1) 3 in F(x), take the derivative of the remaining expression, and then let x = −1:

Similarly,

Therefore,

B.5-4 Mixture of the Heaviside "Cover-Up" and Clearing Fractions For multiple roots, especially of higher order, the Heaviside expansion method, which requires repeated differentiation, can become cumbersome. For a function that contains several repeated and unrepeated roots, a hybrid of the two procedures proves to be the best. The simpler coefficients are determined by the Heaviside method, and the remaining coefficients are found by clearing fractions or shortcuts, thus incorporating the best of the two methods. We demonstrate this procedure by solving Example B.10 once again by this method. In Example B.10, coefficients k and a 0 are relatively simple to determine by the Heaviside expansion method. These values were found to be k 1 = 1 and a 0 = 2. Therefore,

We now multiply both sides of this equation by (x + 1) 3 (x + 2) to clear the fractions. This yields

Equating coefficients of the third and second powers of x on both sides, we obtain

We may stop here if we wish because the two desired coefficients, a 1 and a 2 , are now determined. However, equating the coefficients of the two

remaining powers of x yields a convenient check on the answer. Equating the coefficients of the x 1 and x 0 terms, we obtain

These equations are satisfied by the values a 1 = 1 and a 2 = 3, found earlier, providing an additional check for our answers. Therefore,

which agrees with the earlier result. A MIXTURE OF THE HEAVISIDE "Cover-Up" AND SHORTCUTS

In Example B.10, after determining the coefficients a 0 = 2 and k = 1 by the Heaviside method as before, we have

There are only two unknown coefficients, a 1 and a 2 . If we multiply both sides of this equation by x and then let x → ∞, we can eliminate a 1 . This yields Therefore,

There is now only one unknown a 1 , which can be readily found by setting x equal to any convenient value, say x = 0. This yields

which agrees with our earlier answer. There are other possible shortcuts. For example, we can compute a 0 (coefficient of the highest power of the repeated root), subtract this term from both sides, and then repeat the procedure.

B.5-5 Improper F (x) with m = n A general method of handling an improper function is indicated in the beginning of this section. However, for a special case of the numerator and denominator polynomials of F(x) being of the same degree (m = n), the procedure is the same as that for a proper function. We can show that for

the coefficients k 1 , k 2 ,..., k n are computed as if F(x) were proper. Thus, For quadratic or repeated factors, the appropriate procedures discussed in Sections B.5-2 or B.5-3 should be used as if F(x) were proper. In other words, when m = n, the only difference between the proper and improper case is the appearance of an extra constant b n in the latter. Otherwise the procedure remains the same. The proof is left as an exercise for the reader. EXAMPLE B.11 Expand F(x) into partial fractions if

Here m = n = 2 with b n = b 2 = 3. Therefore,

in which

and

Therefore,

B.5-6 Modified Partial Fractions In finding the inverse z-transforms (Chapter 5), we require partial fractions of the form kx/(x − λi ) r rather than k/(x − λi ) r. This can be achieved by expanding F(x)/x into partial fractions. Consider, for example,

Dividing both sides by x yields

Expansion of the right-hand side into partial fractions as usual yields

Using the procedure discussed earlier, we find a 1 = 1, a 2 = 1, a 3 = −2, and a 4 = 1. Therefore,

Now multiplying both sides by x yields

This expresses F(x) as the sum of partial fractions having the form kx/(x − λi ) r.

B.6 VECTORS AND MATRICES An entity specified by n numbers in a certain order (ordered n-tuple) is an n-dimensional vector. Thus, an ordered n-tuple (x 1 , x 2 ,..., x n ) represents an n-dimensional vector x. A vector may be represented as a row (row vector): or as a column (column vector):

Simultaneous linear equations can be viewed as the transformation of one vector into another. Consider, for example, the n simultaneous linear equations

If we define two column vectors x and y as

then Eqs. (B.48) may be viewed as the relationship or the function that transforms vector x into vector y. Such a transformation is called the linear transformation of vectors. To perform a linear transformation, we need to define the array of coefficients a ij appearing in Eqs. (B.48). This array is called a matrix and is denoted by A for convenience:

A matrix with m rows and n columns is called a matrix of the order (m, n) or an (m × n) matrix. For the special case of m = n, the matrix is called a square matrix of order n. It should be stressed at this point that a matrix is not a number such as a determinant, but an array of numbers arranged in a particular order. It is convenient to abbreviate the representation of matrix A in Eq. (B.50) with the form (a ij) m x n, implying a matrix of order m x n with a ij as its ijth element. In practice, when the order m x n is understood or need not be specified, the notation can be abbreviated to (a ij). Note that the first index i of a ij indicates the row and the second index j indicates the column of the element a ij in matrix A. The simultaneous equations (B.48) may now be expressed in a symbolic form as

or

Equation (B.51) is the symbolic representation of Eq. (B.48). Yet we have not defined the operation of the multiplication of a matrix by a vector. The quantity Ax is not meaningful until such an operation has been defined.

B.6-1 Some Definitions and Properties A square matrix whose elements are zero everywhere except on the main diagonal is a diagonal matrix. An example of a diagonal matrix is

A diagonal matrix with unity for all its diagonal elements is called an identity matrix or a unit matrix, denoted by I. This is a square matrix:

The order of the unit matrix is sometimes indicated by a subscript. Thus, In represents the n − n unit matrix (or identity matrix). However, we shall omit the subscript. The order of the unit matrix will be understood from the context. A matrix having all its elements zero is a zero matrix. A square matrix A is a symmetric matrix if a ij = a ij (symmetry about the main diagonal). Two matrices of the same order are said to be equal if they are equal element by element. Thus, if then A = B only if a ij = b ij for all i and j. If the rows and columns of an m × n matrix A are interchanged so that the elements in the ith row now become the elements of the ith column (for i = 1, 2,..., m), the resulting matrix is called the transpose of A and is denoted by A T. It is evident that A T is an n x m matrix. For example, if

Thus, if then

Note that

B.6-2 Matrix Algebra We shall now define matrix operations, such as addition, subtraction, multiplication, and division of matrices. The definitions should be formulated so that they are useful in the manipulation of matrices. ADDITION OF MATRICES For two matrices A and B, both of the same order (m × n),

we define the sum A + B as

or Note that two matrices can be added only if they are of the same order. MULTIPLICATION OF A MATRIX BY A SCALAR We multiply a matrix A by a scalar c as follows:

We also observe that the scalar c and the matrix A commute, that is, MATRIX MULTIPLICATION We define the product in which c ij, the element of C in the ith row and jth column, is found by adding the products of the elements of A in the ith row with the corresponding elements of B in the jth column. Thus,

This result is expressed as follows:

Note carefully that if this procedure is to work, the number of columns of A must be equal to the number of rows of B. In other words, AB, the product of matrices A and B, is defined only if the number of columns of A is equal to the number of rows of B. If this condition is not satisfied, the product AB is not defined and is meaningless. When the number of columns of A is equal to the number of rows of B, matrix A is said to be conformable to matrix B for the product AB. Observe that if A is an m × n matrix and B is an n × p matrix, A and B are conformable for the product, and C is an m × p matrix. We demonstrate the use of the rule in Eq. (B.56) with the following examples.

In both cases, the two matrices are conformable. However, if we interchange the order of the matrices as follows,

the matrices are no longer conformable for the product. It is evident that in general,

Indeed, AB may exist and BA may not exist, or vice versa, as in our examples. We shall see later that for some special matrices, AB = BA. When

this is true, matrices A and B are said to commute. We reemphasize that in general, matrices do not commute. In the matrix product AB, matrix A is said to be postmultiplied by B or matrix B is said to be premultiplied by A. We may also verify the following relationships:

We can verify that any matrix A premultiplied or postmultiplied by the identity matrix I remains unchanged:

Of course, we must make sure that the order of I is such that the matrices are conformable for the corresponding product. We give here, without proof, another important property of matrices:

where |A| and |B| represent determinants of matrices A and B. MULTIPLICATION OF A MATRIX BY A VECTOR Consider the matrix Eq. (B.52), which represents Eq. (B.48). The right-hand side of Eq. (B.52) is a product of the m × n matrix A and a vector x. If, for the time being, we treat the vector x as if it were an n × 1 matrix, then the product Ax, according to the matrix multiplication rule, yields the righthand side of Eq. (B.48). Thus, we may multiply a matrix by a vector by treating the vector as if it were an n × 1 matrix. Note that the constraint of conformability still applies. Thus, in this case, xA is not defined and is meaningless. MATRIX INVERSION To define the inverse of a matrix, let us consider the set of equations represented by Eq. (B.52):

We can solve this set of equations for x 1 ,x 2 ,...,x n in terms of y 1 , y 2 ,..., y n , by using Cramer's rule [see Eq. (B.31)]. This yields

in which |A| is the determinant of the matrix A and |D ij| is the cofactor of element a ij in the matrix A. The cofactor of element a ij is given by (−1) i+j times the determinant of the (n − 1) × (n − 1) matrix that is obtained when the ith row and the jth column in matrix A are deleted. We can express Eq. (B.62a) in matrix form as

We now define A −1 , the inverse of a square matrix A, with the property

Then, premultiplying both sides of Eq. (B.63) by A −1 , we obtain or

A comparison of Eq. (B.65) with Eq. (B.62b) shows that

One of the conditions necessary for a unique solution of Eq. (B.62a) is that the number of equations must equal the number of unknowns. This

implies that the matrix A must be a square matrix. In addition, we observe from the solution as given in Eq. (B.62b) that if the solution is to exist, |A|

≠ 0.[†] Therefore, the inverse exists only for a square matrix and only under the condition that the determinant of the matrix be nonzero. A matrix whose determinant is nonzero is a nonsingular matrix. Thus, an inverse exists only for a nonsingular, square matrix. By definition, we have

Postmultiplying this equation by A −1 and then premultiplying by A, we can show that

Clearly, the matrices A and A −1 commute. The operation of matrix division can be accomplished through matrix inversion. EXAMPLE B.12 Let us find A −1 if

Here

and |A| = −4. Therefore,

B.6-3 Derivatives and Integrals of a Matrix Elements of a matrix need not be constants; they may be functions of a variable. For example, if

then the matrix elements are functions of t. Here, it is helpful to denote A by A(t). Also, it would be helpful to define the derivative and integral of A(t). The derivative of a matrix A(t) (with respect to t) is defined as a matrix whose ijth element is the derivative (with respect to t) of the ijth element of the matrix A. Thus, if then

or

Thus, the derivative of the matrix in Eq. (B.68) is given by

Similarly, we define the integral of A(t) (with respect to t) as a matrix whose ijth element is the integral (with respect to t) of the ijth element of the matrix A:

Thus, for the matrix A in Eq. (B.68), we have

We can readily prove the following identities:

The proofs of identities (B.71a) and (B.71b) are trivial. We can prove Eq. (B.71c) as follows. Let A be an m x n matrix and B an n x p matrix. Then, if from Eq. (B.56), we have

and

or Equation (B.72) along with the multiplication rule clearly indicate that d ik is the ikth element of matrix Equation (B.71c) then follows.

and e ik is the ikth element of matrix

If we let B = A −1 in Eq. (B.71c), we obtain

But since

we have

B.6-4 The Characteristic Equation of a Matrix: The Cayley-Hamilton Theorem For an (n − n) square matrix A, any vector x (x ≠ 0) that satisfies the equation

is an eigenvector (or characteristic vector), and λ is the corresponding eigenvalue (or characteristic value) of A. Equation (B.74) can be expressed as

The solution for this set of homogeneous equations exists if and only if

or

Equation (B.76a) [or (B.76b)] is known as the characteristic equation of the matrix A and can be expressed as

Q(λ) is called the characteristic polynomial of the matrix A. The n zeros of the characteristic polynomial are the eigenvalues of A and, corresponding to each eigenvalue, there is an eigenvector that satisfies Eq. (B.74). The Cayley-Hamilton theorem states that every n × n matrix A satisfies its own characteristic equation. In other words, Eq. (B.77) is valid if λ. is replaced by A:

FUNCTIONS OF A MATRIX We now demonstrate the use of the Cayley-Hamilton theorem to evaluate functions of a square matrix A. Consider a function f(λ) in the form of an infinite power series:

Since λ, being an eigenvalue (characteristic root) of A, satisfies the characteristic equation [Eq. (B.77)], we can write

If we multiply both sides by λ, the left-hand side is λn+1 , and the right-hand side contains the terms λn , λn-1 , ..., λ. Using Eq. (B.80), we substitute

λn , in terms of λn−1 , ? n-2 ,..., λ so that the highest power on the right-hand side is reduced to n − 1. Continuing in this way, we see that λn+k can

be expressed in terms of λn-1 , ? n-2 ,...,λ for any k. Hence, the infinite series on the right-hand side of Eq. (B.79) can always be expressed in terms of λn−1 , λn−2 ,λ,λ and a constant as

If we assume that there are n distinct eigenvalues ? 1 , ? 2 ,..., λn , then Eq. (B.81) holds for these n values of λ. The substitution of these values in Eq. (B.81) yields n simultaneous equations

and

Since A also satisfies Eq. (B.80), we may advance a similar argument to show that if f(A) is a function of a square matrix A expressed as an infinite power series in A, then

and, as argued earlier, the right-hand side can be expressed using terms of power less than or equal to n − 1,

in which the coefficients βi s are found from Eq. (B.82b). If some of the eigenvalues are repeated (multiple roots), the results are somewhat modified. We shall demonstrate the utility of this result with the following two examples.

B.6-5 Computation of an Exponential and a Power of a Matrix Let us compute e At defined by

From Eq. (B.83b), we can express

in which the βi s are given by Eq. (B.82b), with f(λi ) = eλit . EXAMPLE B.13 Let us consider

The characteristic equation is

Hence, the eigenvalues are λ1 = −1, λ2 = −2, and in which

and

COMPUTATION OF A k As Eq. (B.83b) indicates, we can express A k as in which the βi s are given by Eq. (B.82b) with f(λi ) = λk i . For a completed example of the computation of A k by this method, see Example 10.12. [†] These two conditions imply that the number of equations is equal to the number of unknowns and that all the equations are independent.

B.7 MISCELLANEOUS B.7-1 L'Hôpital's Rule If lim f(x)/g(x) results in the indeterministic form 0/0 or ∞/∞, then

B.7-2 The Taylor and Maclaurin Series

B.7-3 Power Series

B.7-4 Sums

B.7-5 Complex Numbers

B.7-6 Trigonometric Identities

B.7-7 Indefinite Integrals

B.7-8 Common Derivative Formulas

B.7-9 Some Useful Constants

B.7-10 Solution of Quadratic and Cubic Equations Any quadratic equation can be reduced to the form The solution of this equation is provided by

A general cubic equation may be reduced to the depressed cubic form by substituting

This yields Now let

The solution of the depressed cubic is

and

REFERENCES 1. Asimov, Isaac. Asimov on Numbers. Bell Publishing, New York, 1982. 2. Calinger, R., ed. Classics of Mathematics. Moore Publishing, Oak Park, IL, 1982. 3. Hogben, Lancelot. Mathematics in the Making. Doubleday, New York, 1960. 4. Cajori, Florian. A History of Mathematics, 4th ed. Chelsea, New York, 1985. 5. Encyclopaedia Britannica. Micropaedia IV, 15th ed., vol. 11, p. 1043. Chicago, 1982. 6. Singh, Jagjit. Great Ideas of Modern Mathematics. Dover, New York, 1959. 7. Dunham, William. Journey Through Genius. Wiley, New York, 1990.

MATLAB SESSION B: ELEMENTARY OPERATIONS MB.1 MATLAB OVERVIEW Although MATLAB(r) (a registered trademark of The Math Works, Inc.) is easy to use, it can be intimidating to new users. Over the years, MATLAB has evolved into a sophisticated computational package with thousands of functions and thousands of pages of documentation. This section provides a brief introduction to the software environment. When MATLAB is first launched, its command window appears. When MATLAB is ready to accept an instruction or input, a command prompt (>>) is displayed in the command window. Nearly all MATLAB activity is initiated at the command prompt. Entering instructions at the command prompt generally results in the creation of an object or objects. Many classes of objects are possible, including

functions and strings, but usually objects are just data. Objects are placed in what is called the MATLAB workspace. If not visible, the workspace can be viewed in a separate window by typing workspace at the command prompt. The workspace provides important information about each object, including the object's name, size, and class. Another way to view the workspace is the whos command. When whos is typed at the command prompt, a summary of the workspace is printed in the command window. The who command is a short version of whos that reports only the names of workspace objects. Several functions exist to remove unnecessary data and help free system resources. To remove specific variables from the workspace, the clear command is typed, followed by the names of the variables to be removed. Just typing clear removes all objects from the workspace. Additionally, the clc command clears the command window, and the clf command clears the current figure window. Often, important data and objects created in one session need to be saved for future use. The save command, followed by the desired filename, saves the entire workspace to a file, which has the .mat extension. It is also possible to selectively save objects by typing save followed by the filename and then the names of the objects to be saved. The load command followed by the filename is used to load the data and objects contained in a MATLAB data file (.mat file). Although MATLAB does not automatically save workspace data from one session to the next, lines entered at the command prompt are recorded in the command history. Previous command lines can be viewed, copied, and executed directly from the command history window. From the command window, pressing the up or down arrow key scrolls through previous commands and redisplays them at the command prompt. Typing the first few characters and then pressing the arrow keys scrolls through the previous commands that start with the same characters. The arrow keys allow command sequences to be repeated without retyping. Perhaps the most important and useful command for new users is help. To learn more about a function, simply type help followed by the function name. Helpful text is then displayed in the command window. The obvious shortcoming of help is that the function name must first be known. This is especially limiting for MATLAB beginners. Fortunately, help screens often conclude by referencing related or similar functions. These references are an excellent way to learn new MATLAB commands. Typing help help, for example, displays detailed information on the help command itself and also provides reference to relevant functions such as the lookfor command. The lookfor command helps locate MATLAB functions based on a keyword search. Simply type lookfor followed by a single keyword, and MATLAB searches for functions that contain that keyword. MATLAB also has comprehensive HTML-based help. The HTML help is accessed by using MATLAB's integrated help browser, which also functions as a standard web browser. The HTML help facility includes a function and topic index as well as full text-searching capabilities. Since HTML documents can contain graphics and special characters, HTML help can provide more information than the command-line help. With a little practice, MATLAB makes it very easy to find information. When MATLAB graphics are created, the print command can save figures in a common file format such as postscript, encapsulated postscript, JPEG, or TIFF. The format of displayed data, such as the number of digits displayed, is selected by using the format command. MATLAB help provides the necessary details for both these functions. When a MATLAB session is complete, the exit command terminates MATLAB.

MB.2 Calculator Operations MATLAB can function as a simple calculator, working as easily with complex numbers as with real numbers. Scalar addition, subtraction, multiplication, division, and exponentiation are accomplished using the traditional operator symbols +, −, ×, ÷, and ⁁. Since MATLAB predefines i = j = √−1, a complex constant is readily created using cartesian coordinates. For example, >> z = -3-j*4 z = -3.0000 - 4.0000i assigns the complex constant −3 − j4 to the variable z. The real and imaginary components of z are extracted by using the real and imag operators. In MATLAB, the input to a function is placed parenthetically following the function name. >> z_real = real(z); z_imag = imag(z); When a line is terminated with a semicolon, the statement is evaluated but the results are not displayed to the screen. This feature is useful when one is computing intermediate results, and it allows multiple instructions on a single line. Although not displayed, the results z_real = −3 and z_imag = −4 are calculated and available for additional operations such as computing |z|. There are many ways to compute the modulus, or magnitude, of a complex quantity. Trigonometry confirms that z = −3 − j4, which corresponds to a 3-4-5 triangle, has modulus required square root. >> z_mag = sqrt(z_real^2 + z_imag^2) z_mag = 5

. The MATLAB sqrt command provides one way to compute the

In MATLAB, most commands, include sqrt, accept inputs in a variety of forms including constants, variables, functions, expressions, and combinations thereof. The same result is also obtained by computing >> z_mag = sqrt(z*conj(z)) z_mag = 5

. In this case, complex conjugation is performed by using the conj command.

More simply, MATLAB computes absolute values directly by using the abs command.

>> z_mag = abs(z) z_mag = 5 In addition to magnitude, polar notation requires phase information. The angle command provides the angle of a complex number. >> z_rad = angle(z) z_πad = -2.2143 MATLAB expects and returns angles in a radian measure. Angles expressed in degrees require an appropriate conversion factor. >> z_deg = angle(z)*180/pi z_πad = 126.8699 Notice, MATLAB predefines the variable pi = π. It is also possible to obtain the angle of z using a two-argument arc-tangent function, atan2. >> z_deg = atan(z_imag,z_real) z_rad = -2.2143 Unlike a single-argument arctangent function, the two-argument arctangent function ensures that the angle reflects the proper quadrant. MATLAB supports a full complement of trigonometric functions: standard trigonometric functions cos, sin, tan; reciprocal trigonometric functions sec, csc, cot; inverse trigonometric functions acos, asin, atan, asec, acsc, acot; and hyperbolic variations cosh, sinh, tanh, sech, csch, coth, acosh, asinh, atanh, asech, acsch, and acoth. Of course, MATLAB comfortably supports complex arguments for any trigonometric function. As with the angle command, MATLAB trigonometric functions utilize units of radians. The concept of trigonometric functions with complex-valued arguments is rather intriguing. The results can contradict what is often taught in introductory mathematics courses. For example, a common claim is that |cos(x)| ≤ 1. While this is true for real x, it is not necessarily true for complex x. This is readily verified by example using MATLAB and the cos function. >> cos(j) ans = 1.5431 Problem B.19 investigates these ideas further. Similarly, the claim that it is impossible to take the logarithm of a negative number is false. For example, the principal value of ln(−1) is jπ, a fact easily verified by means of Euler's equation. In MATLAB, base-10 and base-e logarithms are computed by using the log10 and log commands, respectively. >> log(-1) ans = 0 + 3.1416i

MB.3 Vector Operations The power of MATLAB becomes apparent when vector arguments replace scalar arguments. Rather than computing one value at a time, a single expression computes many values. Typically, vectors are classified as row vectors or column vectors. For now, we consider the creation of row vectors with evenly spaced, real elements. To create such a vector, the notation a: b: c is used, where a is the initial value, b designates the step size, and c is the termination value. For example, 0: 2: 11 creates the length-6 vector of even-valued integers ranging from 0 to 10. >> k = 0:2:11 k = 0 2 4 6 8 10 In this case, the termination value does not appear as an element of the vector. Negative and noninteger step sizes are also permissible. >> k = 11:-10/3:00 k = 11.0000 7.6667 4.3333 1.0000 If a step size is not specified, a value of one is assumed. >> k = 0:11 k = 0 1 2 3 4 5 6 7 8 9 10 11 Vector notation provides the basis for solving a wide variety of problems. For example, consider finding the three cube roots of minus one, w 3 = −1 = e j(π + 2πk) for integer k. Taking the cube root of each side yields w =

e j(π/3+2πk/3) To find the three unique solutions, use any three consecutive integer values of k and MATLAB's exp function. >> k = 0:2; >> w = exp(j*(pi/3 + 2*pi*k/3)) w = 0.5000 + 0.8660i -1.0000 + 0.0000i 0.5000 - 0.8660i The solutions, particularly w = − 1, are easy to verify. Finding the 100 unique roots of w 100 = −1 is just as simple. >> k = 0:99; >> w = exp(j*(pi/100 + 2*pi*k/100));

A semicolon concludes the final instruction to suppress the inconvenient display of all 100 solutions. To view a particular solution, the user must

specify an index. In MATLAB, ascending positive integer indices specify particular vector elements. For example, the fifth element of w is extracted using an index of 5. >> w(5) ans = 0.9603 + 0.2790i Notice that this solution corresponds to k = 4. The independent variable of a function, in this case k, rarely serves as the index. Since k is also a vector, it can likewise be indexed. In this way, we can verify that the fifth value of k is indeed 4. >> k(5) ans = 4 It is also possible to use a vector index to access multiple values. For example, index vector 98:100 identifies the last three solutions corresponding to k = [97,98,99]. >> w(98:100) ans = 0.9877 - 0.1564i 0.9956 - 0.0941i 0.9995 - 0.0314i Vector representations provide the foundation to rapidly create and explore various signals. Consider the simple 10 Hz sinusoid described by f(t) = sin(2π 10t + π/6). Two cycles of this sinusoid are included in the interval 0 ≤ t < 0.2. A vector t is used to uniformly represent 500 points over this interval. >> t = 0:0.2/500:0.2-0.2/500; Next, the function f(t) is evaluated at these points. >> f = sin(2*pi*10*t+pi/6); The value of f(t) at t = 0 is the first element of the vector and is thus obtained by using an index of one. >> f(1) ans = 0.5000 Unfortunately, MATLAB's indexing syntax conflicts with standard equation notation.[†] That is, the MATLAB indexing command f(1) is not the same as the standard notation f(1) = f(t)| t = 1 . Care must be taken to avoid confusion; remember that the index parameter rarely reflects the independent variable of a function.

MB.4 Simple Plotting MATLAB's plot command provides a convenient way to visualize data, such as graphing f(t) against the independent variable t. >> plot(t, f); Axis labels are added using the xlabel and ylabel commands, where the desired string must be enclosed by single quotation marks. The result is shown in Fig. MB.1. >> xlabel('t'); ylabel('f(t)')

Figure MB.1: f(t) = sin (2π 10t + π/6). The title command is used to add a title above the current axis. By default, MATLAB connects data points with solid lines. Plotting discrete points, such as the 100 unique roots of w 100 = −1, is accommodated by supplying the plot command with an additional string argument. For example, the string 'o' tells MATLAB to mark each data point with a circle rather than connecting points with lines. A full description of the supported plot options is available from MATLAB's help facilities. >> plot(real(w),imag(w),'o');

>> xlabel('Re(w); ylabel('Im(w)'); >> axis equal The axis equal command ensures that the scale used for the horizontal axis is equal to the scale used for the vertical axis. Without axis

equal, the plot would appear elliptical rather than circular. Figure MB.2 illustrates that the 100 unique roots of w 100 = −1 lie equally spaced on the unit circle, a fact not easily discerned from the raw numerical data.

Figure MB.2: Unique roots of w 100 = −1. MATLAB also includes many specialized plotting functions. For example, MATLAB commands semilogx, semilogy, and loglog operate like the plot command but use base-10 logarithmic scales for the horizontal axis, vertical axis, and the horizontal and vertical axes, respectively. Monochrome and color images can be displayed by using the image command, and contour plots are easily created with the contour command. Furthermore, a variety of three-dimensional plotting routines are available, such as plot3, contour3, mesh, and surf. Information about these instructions, including examples and related functions, is available from MATLAB help.

MB.5 Element-by-Element Operations Suppose a new function h(t) is desired that forces an exponential envelope on the sinusoid f(t), h(t) = f(t)g(t) where g(t) = e −10t . First, row vector g(t) is created. >> g = exp(-10*t); Given MATLAB's vector representation of g(t) and f(t), computing h(t) requires some form of vector multiplication. There are three standard ways to multiply vectors: inner product, outer product, and element-by-element product. As a matrix-oriented language, MATLAB defines the standard multiplication operator * according to the rules of matrix algebra: the multiplicand must be conformable to the multiplier. A 1 × N row vector times an N × 1 column vector results in the scalar-valued inner product. An N × 1 column vector times a 1 × M row vector results in the outer product, which is an N × M matrix. Matrix algebra prohibits multiplication of two row vectors or multiplication of two column vectors. Thus, the * operator is not used to perform element-by-element multiplication.[†]

Element-by-element operations require vectors to have the same dimensions. An error occurs if element-by-element operations are attempted between row and column vectors. In such cases, one vector must first be transposed to ensure both vector operands have the same dimensions. In MATLAB, most element-by-element operations are preceded by a period. For example, element-by-element multiplication, division, and exponentiation are accomplished using. *,. /, and .ˇ, respectively. Vector addition and subtraction are intrinsically element-by-element operations and require no period. Intuitively, we know h(t) should be the same size as both g(t) and f(t). Thus, h(t) is computed using element-by-element multiplication. >> h = f.*g; The plot command accommodates multiple curves and also allows modification of line properties. This facilitates side-by-side comparison of different functions, such as h(t) and f(t). Line characteristics are specified by using options that follow each vector pair and are enclosed in single quotes. >> plot(t, f,'-k',t,h,':k'); >> xlabel('t'); ylabel('Amplitude'); >> legend('f(t)','h(t)'); Here, '-k' instructs MATLAB to plot f(t) using a solid black line, while ':k' instructs MATLAB to use a dotted black line to plot h(t). A legend and axis labels complete the plot, as shown in Fig. MB.3. It is also possible, although more cumbersome, to use pull-down menus to modify line properties and to add labels and legends directly in the figure window.

Figure MB.3: Graphical comparison of f(t) and h(t).

MB.6 Matrix Operations Many applications require more than row vectors with evenly spaced elements; row vectors, column vectors, and matrices with arbitrary elements are typically needed. MATLAB provides several functions to generate common, useful matrices. Given integers m, n, and vector x, the function eye(m) creates the m × m identity matrix; the function ones(m,n) creates the m × n matrix of all ones; the function zeros (m,n) creates the m × n matrix of all zeros; and the function diag(x) uses vector x to create a diagonal matrix. The creation of general matrices and vectors, however, requires each individual element to be specified. Vectors and matrices can be input spreadsheet style by using MATLAB's array editor. This graphical approach is rather cumbersome and is not often used. A more direct method is preferable. Consider a simple row vector r, The MATLAB notation a: b: c cannot create this row vector. Rather, square brackets are used to create r. >> r = [1 0 0] r = 1 0 0 Square brackets enclose elements of the vector, and spaces or commas are used to separate row elements. Next, consider the 3 × 2 matrix A,

Matrix A can be viewed as a three-high stack of two-element row vectors. With a semicolon to separate rows, square brackets are used to create the matrix. >> A = [2 3; 4 5; 0 6] A = 2 3 4 5 0 6 Each row vector needs to have the same length to create a sensible matrix. In addition to enclosing string arguments, a single quote performs the complex conjugate transpose operation. In this way, row vectors become column vectors and vice versa. For example, a column vector c is easily created by transposing row vector r. >> c = r' c = 1 0 0 Since vector r is real, the complex-conjugate transpose is just the transpose. Had r been complex, the simple transpose could have been accomplished by either r. 'or (conj (r))'. More formally, square brackets are referred to as a concatenation operator. A concatenation combines or connects smaller pieces into a larger whole. Concatenations can involve simple numbers, such as the six-element concatenation used to create the 3 × 2 matrix A. It is also possible to concatenate larger objects, such as vectors and matrices. For example, vector c and matrix A can be concatenated to form a 3 × 3 matrix B. >> B = [c A] B = 1 2 3 0 4 5 0 0 6 Errors will occur if the component dimensions do not sensibly match; a 2 × 2 matrix would not be concatenated with a 3 × 3 matrix, for example. Elements of a matrix are indexed much like vectors, except two indices are typically used to specify row and column. [†] Element (1, 2) of matrix B, for example, is 2.

>> B(1, 2) ans = 2 Indices can likewise be vectors. For example, vector indices allow us to extract the elements common to the first two rows and last two columns of matrix B. >> B(1:2,2:3) ans = 2 3 4 5 One indexing technique is particularly useful and deserves special attention. A colon can be used to specify all elements along a specified dimension. For example, B(2,:) selects all column elements along the second row of B. >> B(2,:) ans = 0 4 5 Now that we understand basic vector and matrix creation, we turn our attention to using these tools on real problems. Consider solving a set of three linear simultaneous equations in three unknowns.

This system of equations is represented in matrix form according to Ax = y, where

Although Cramer's rule can be used to solve Ax = y, it is more convenient to solve by multiplying both sides by the matrix inverse of A. That is, x = A −1 Ax = A −1 y. Solving for x by hand or by calculator would be tedious at best, so MATLAB is used. We first create A and y. >> A = [1 -2 3;-sqrt(3) 1 -sqrt(5);3 -sqrt(7) 1]; >> y = [1;pi;exp(1)]; The vector solution is found by using MATLAB's inv function. >> x = inv(A)*y x = -1.9999 -3.8998 -1.5999 It is also possible to use MATLAB's left divide operator x = A\y to find the same solution. The left divide is generally more computationally efficient than matrix inverses. As with matrix multiplication, left division requires that the two arguments be conformable. Of course, Cramer's rule can be used to compute individual solutions, such as x 1 , by using vector indexing, concatenation, and MATLAB's det command to compute determinants. >> x1 = det([y,A(:,2:3)])/det(A) x1 = -1.9999 Another nice application of matrices is the simultaneous creation of a family of curves. Consider h α (t) = e −αt sin(2π10t + π/6) over 0 ≤ t ≤ 0.2. Figure MB.3 shows h α (t) for α = 0 and α = 10. Let's investigate the family of curves h α (t) for a = [0, 1,..., 10]. An inefficient way to solve this problem is create h α (t) for each α of interest. This requires 11 individual cases. Instead, a matrix approach allows all 11 curves to be computed simultaneously. First, a vector is created that contains the desired values of α. >> alpha = (0:10); By using a sampling interval of one millisecond, Δt = 0.001, a time vector is also created. >> t = (0:0.001:0.2)'; The result is a length-201 column vector. By replicating the time vector for each of the 11 curves required, a time matrix T is created. This replication

can be accomplished by using an outer product between t and a 1 × 11 vector of ones.[†] >> T = t*ones(1,11);

The result is a 201 × 11 matrix that has identical columns. Right multiplying T by a diagonal matrix created from α, columns of T can be individually scaled and the final result is computed. >> H = exp(-T*diag(alpha)).*sin(2*pi*10*T+pi/6); Here, H is a 201 × 11 matrix, where each column corresponds to a different value of α. That is, H = [h0 , h1 ,..., h10 ], where hα are column vectors. As shown in Fig. MB.4, the 11 desired curves are simultaneously displayed by using MATLAB's plot command, which allows matrix arguments.

>> plot(t,H); xlabel('t'); ylabel('h(t)');

Figure MB.4: h α (t) for α = [0,1,..., 10]. This example illustrates an important technique called vectorization, which increases execution efficiency for interpretive languages such as

MATLAB.[‡] Algorithm vectorization uses matrix and vector operations to avoid manual repetition and loop structures. It takes practice and effort to become proficient at vectorization, but the worthwhile result is efficient, compact code.

MB.7 Partial Fraction Expansions There are a wide variety of techniques and shortcuts to compute the partial fraction expansion of rational function F(x) = B(x)/A(x), but few are more simple than the MATLAB residue command. The basic form of this command is >> [R,P,K] = residue(B,A) The two input vectors B and A specify the polynomial coefficients of the numerator and denominator, respectively. These vectors are ordered in descending powers of the independent variable. Three vectors are output. The vector R contains the coefficients of each partial fraction, and vector P contains the corresponding roots of each partial fraction. For a root repeated r times, the r partial fractions are ordered in ascending powers. When the rational function is not proper, the vector K contains the direct terms, which are ordered in descending powers of the independent variable. To demonstrate the power of the residue command, consider finding the partial fraction expansion of

By hand, the partial fraction expansion of F(x) is difficult to compute. MATLAB, however, makes short work of the expansion. >> [R,P,K] = residue( [1 0 0 0 0 pi], [1 -sqrt(8) 0 sqrt(32) -4]) R = 7.8888 5.9713 3.1107 0.1112 P = 1.4142 1.4142 1.4142 -1.4142 K = 1.0000 2.8284 Written in standard form, the partial fraction expansion of F(x) is

The signal processing toolbox function residuez is similar to the residue command and offers more convenient expansion of certain rational functions, such as those commonly encountered in the study of discrete-time systems. Additional information about the residue and residuez commands are available from MATLAB's help facilities. [†] Advanced structures such as MATLAB inline objects are an exception. [†] While grossly inefficient, element-by-element multiplication can be accomplished by extracting the main diagonal from the outer product of two N-

length vectors.

[†] Matrix elements can also be accessed by means of a single index, which enumerates along columns. Formally, the element from row m and column n of an M × N matrix may be obtained with a single index (n − 1)M + m. For example, element (1, 2) of matrix B is accessed by using the index (2 − 1)3 + 1 = 4. That is, B (4) yields 2. [†] The repmat command provides a more flexible method to replicate or tile objects. Equivalently, T = repmat(t,1,11). [‡] The benefits of vectorization are less pronounced in recent versions of MATLAB.

PROBLEMS b.1

b.2

Given a complex number w = x + jy, the complex conjugate of w is defined in rectangular coordinates as w* = x − jy. Use this fact to derive complex conjugation in polar form. Express the following numbers in polar form: a. 1 + j b. −4 + j3 c. (1 + j)(−4 + j3) d. e jπ/4 + 2e −jπ/4 e. e j + 1

b.3

f. (1 + j)/(04 + j3) Express the following numbers in Cartesian form: a. 3e jπ/4 b. 1/e j c. (1 + j)(−4 + j3) d. e jπ/4 + 2e −jπ/4 e. e j + 1

b.4

f. 1/2 j For complex constant w, prove: a. Re(w) = (w + w*)/2

b.5

b. Im(w) = (w − w*)/2j Given w = x − jy, determine: a. Re(e w)

b.6

b. Im(e w) For arbitrary complex constants w 1 and w 2 , prove or disprove the following: a. Re(jw 1 ) = −Im(w 1 ) b. Im(jw 1 ) = Re(w 1 ) c. Re(w 1 ) + Re(w 2 ) = Re(w 1 + w 2 ) d. Im(w 1 ) + Im(w 2 ) = Im(w 1 + w 2 ) e. Re(w 1 )Re(w 2 ) = Re(w 1 , w 2 )

b.7

f. Im(w 1 )/Im(w 2 ) = Im(w 1 /w 2 ) Given w 1 = 3 + j4 and w 2 = 2e jπ/4 . a. Express w 1 in standard polar form. b. Express w 2 in standard rectangular form. c. Determine |w 1 | 2 and |w 2 | 2 . d. Express w 1 + w 2 in standard rectangular form. e. Express w 1 − w 2 in standard polar form. f. Express w 1 w 2 in standard rectangular form.

b.8

g. Express w 1 /w 2 in standard polar form. Repeat Prob. B.7 using w = (3 + j4) 2 and w = 2.5 je −j40π .

b.9

b.10

1

2

Repeat Prob. B.7 using w 1 = j + e π/4 and w 2 = cos (j). Use Euler's identity to solve or prove the following: a. Find real, positive constants c and φ for all real t such that 2.5 cos (3t) − 1.5 sin (3t + π/3) = c cos(3t + φ) b. Prove that cos (θ ± φ) = cos (θ) cos (φ) ∓ sin (θ) sin (φ). c. Given real constants a, b, and α, complex constant w, and the fact that

evaluate the integral

b.11

In addition to the traditional sine and cosine functions, there are the hyperbolic sine and cosine functions, which are defined by sinh (w) = (e w − e −w)/2 and cosh (w) = (e w + e −w)/2. In general, the argument is a complex constant w = x + jy. a. Show that cosh (w) = cosh (x) cos (y) + j sinh (x) sin (y).

b.12

b. Determine a similar expression for sinh (w) in rectangular form that only uses functions of real arguments, such as sin (x), cosh (y), and so on. Using the complex plane: a. Evaluate and locate the distinct solutions to (w) 4 = −1. b. Evaluate and locate the distinct solutions to (w − (1 + j2))5 = (32/√2) (1 + j). c. Sketch the solution to |w − 2j| = 3.

b.13

b.14

d. Graph w(t) = (1 + t)e jt for (−10 ≤ t ≤ 10). The distinct solutions to (w − w 1 ) n = w 2 lie on a circle in the complex plane, as shown in Fig. PB.13. One solution is located on the real axis at √3 + 1 = 2.732, and one solution is located on the imaginary axis at √3 − 10.732. Determine w 1 , w 2 , and n.

Figure PB.13: Distinct solutions to (w − w 1 ) n = w 2 . Find the distinct solutions to (j − w) 1.5 = 2 + j2. Use MATLAB to graph the solution set in the complex plane.

b.15

If j = √−1, what is √j?

b.16

Find all the values of ln(−e), expressing your answer in Cartesian form.

b.17

Determine all values of log 10 (−1), expressing your answer in Cartesian form. Notice that the logarithm has base 10, not e.

b.18

Express the following in standard rectangular coordinates: a. ln(1/(1+j))

b. cos(1 + j)

b.19

b.20

b.21

c. (1 − j) j By constraining w to be purely imaginary, show that the equation cos (w) = 2 can be represented as a standard quadratic equation. Solve this equation for w. Determine an expression for an exponentially decaying sinusoid that oscillates three times per second and whose amplitude envelope decreases by 50% every 2 seconds. Use MATLAB to plot the signal over −2 ≤ t ≤ 2. By hand, sketch the following against independent variable t: a. x 1 (t) = Re(2e (−1 +j2π)t) b. x 2 (t) = Im(3 − e (1 − j2π)t)

c. x 3 (t) = 3 − Im(e (1 − j2π)t)

b.22

Use MATLAB to produce the plots requested in Prob. B.21.

b.23

Use MATLAB to plot x(t) = cos (t) sin (20t) over a suitable range of t.

b.24

Use MATLAB to plot x(t) = Σ10 k=1 cos (2πkt) over a suitable range of t. The MATLAB command sum may prove useful.

b.25

b.26

When a bell is struck with a mallet, it produces a ringing sound. Write an equation that approximates the sound produced by a small, light bell. Carefully identify your assumptions. How does your equation change if the bell is large and heavy? You can assess the quality of your models by using the MATLAB sound command to listen to your "bell." Certain integrals, although expressed in relatively simple form, are quite difficult to solve. For example, ∫ e -x2 dx cannot be evaluated in terms of elementary functions; most calculators that perform integration cannot handle this indefinite integral. Fortunately, you are smarter than most calculators. a. Express e −x2 using a Taylor series expansion. b. Using your series expansion for e −x2 , determine ∫ e −x2 dx.

b.27

b.28

b.29

c. Using a suitably truncated series, evaluate the definite integral ∫ 1 0 e −x2 dx. Repeat Prob. B.26 for ∫ e −x3 dx. Repeat Prob. B.26 for ∫ cos x 2 dx. For each function, determine a suitable series expansion. a. f 1 (x) = (2 −x 2 ) −1

b.30

b. f 2 (x) = (0.5)x You are working on a digital quadrature amplitude modulation (QAM) communication receiver. The QAM receiver requires a pair of quadrature signals: cos Ωn and sin Ωn. These can be simultaneously generated by following a simple procedure: (1) choose a point w on the unit circle, (2) multiply w by itself and store the result, (3) multiply w by the last result and store, and (4) repeat step 3. a. Show that this method can generate the desired pair of quadrature sinusoids. b. Determine a suitable value of w so that good-quality, periodic, 2π × 100,000 rad/s signals can be generated. How much time is available for the processing unit to compute each sample? c. Simulate this procedure by using MATLAB and report your results.

b.31

d. Identify as many assumptions and limitations to this technique as possible. For example, can your system operate correctly for an indefinite period of time? Consider the following system of equations.

Use Cramer's rule to determine: a. x 1

b. x 2 c. x 3

b.32

Matrix determinants can be computed by using MATLAB's det command. A system of equations in terms of unknowns x 1 and x 2 and arbitrary constants a, b, c, d, e, and f is given by

a. Represent this system of equations in matrix form. b. Identify specific constants a, b, c, d, e, and f such that x 1 = 3 and x 2 = −2. Are the constants you selected unique? c. Identify nonzero constants a, b, c, d, e, and f such that no solutions x 1 and x 2 exist.

b.33

b.34

b.35

d. Identify nonzero constants a, b, c, d, e, and f such that an infinite number of solutions x 1 and x 2 exist. Solve the following system of equations:

Solve the following system of equations:

Compute by hand the partial fraction expansions of the following rational functions: a. H 1 (s) = (s 2 + 5s + 6)/(s 3 + s 2 + s + 1), which has denominator poles at s = ± j and s = −1 b. H 2 (s) = 1/H 1 (s) = (s 3 + s 2 + s + 1)/(s 2 + 5s + 6) c. H 2 (s) = 1/((s + 1) 2 (s 2 + 1))

b.36

d. H 4 (s) = (s 2 + 5s + 6)/(3s 2 + 2s + 1) Using MATLAB's residue command, a. Verify the results of Prob. B.35a. b. Verify the results of Prob. B.35b. c. Verify the results of Prob. B.35c.

b.37

b.38

b.39

d. Verify the results of Prob. B.35d. Determine the constants a 0 , a 1 , and a 2 of the partial fraction expansion F(s) = s/(s + 1) 3 = a 0 /(s + 1) 3 + a 1 /(s + 1) 2 + a 2 /(s + 1). Let N = [n 7 , n 6 , n 5 ,...,n 2 , n 1 ] represent the seven digits of your phone number. Construct a rational function according to

Use MATLAB's residue command to compute the partial fraction expansion of H N(s). When plotted in the complex plane for −π ≤ ω ≤ π, the function f (ω) = cos(ω) + j0.1 sin(2ω) results in a so-called Lissajous figure that resembles a two-bladed propeller. a. In MATLAB, create two row vectors fr and fi corresponding to the real and imaginary portions of f (ω), respectively, over a suitable number N samples of ω. Plot the real portion against the imaginary portion and verify the figure resembles a propeller.

b. Let complex constant w = x + jy be represented in vector form

Consider the 2 × 2 rotational matrix R:

Show that Rw rotates vector w by θ radians. c. Create a rotational matrix R corresponding to 10° and multiply it by the 2 × N matrix f = [f r; f i];. Plot the result to verify that the "propeller" has indeed rotated counterclockwise. d. Given the matrix R determined in part c, what is the effect of performing RRf? How about RRRf? Generalize the result. e. Investigate the behavior of multiplying f (ω) by the function e jθ .

Chapter 1: Signals and Systems OVERVIEW In this chapter we shall discuss certain basic aspects of signals. We shall also introduce important basic concepts and qualitative explanations of the hows and whys of systems theory, thus building a solid foundation for understanding the quantitative analysis in the remainder of the book. SIGNALS A signal is a set of data or information. Examples include a telephone or a television signal, monthly sales of a corporation, or daily closing prices of a stock market (e.g., the Dow Jones averages). In all these examples, the signals are functions of the independent variable time. This is not always the case, however. When an electrical charge is distributed over a body, for instance, the signal is the charge density, a function of space rather than time. In this book we deal almost exclusively with signals that are functions of time. The discussion, however, applies equally well to other independent variables. SYSTEMS Signals may be processed further by systems, which may modify them or extract additional information from them. For example, an antiaircraft gun operator may want to know the future location of a hostile moving target that is being tracked by his radar. Knowing the radar signal, he knows the past location and velocity of the target. By properly processing the radar signal (the input), he can approximately estimate the future location of the target. Thus, a system is an entity that processes a set of signals (inputs) to yield another set of signals (outputs). A system may be made up of physical components, as in electrical, mechanical, or hydraulic systems (hardware realization), or it may be an algorithm that computes an output from an input signal (software realization).

1.1 SIZE OF A SIGNAL The size of any entity is a number that indicates the largeness or strength of that entity. Generally speaking, the signal amplitude varies with time. How can a signal that exists over a certain time interval with varying amplitude be measured by one number that will indicate the signal size or signal strength? Such a measure must consider not only the signal amplitude, but also its duration. For instance, if we are to devise a single number V as a measure of the size of a human being, we must consider not only his or her width (girth), but also the height. If we make a simplifying assumption that the shape of a person is a cylinder of variable radius r (which varies with the height h) then one possible measure of the size of a person of height H is the person's volume V, given by

1.1-1 Signal Energy Arguing in this manner, we may consider the area under a signal x(t) as a possible measure of its size, because it takes account not only of the amplitude but also of the duration. However, this will be a defective measure because even for a large signal x(t), its positive and negative areas could cancel each other, indicating a signal of small size. This difficulty can be corrected by defining the signal size as the area under x 2 (t), which is always positive. We call this measure the signal energy Ex , defined (for a real signal) as

This definition can be generalized to a complex valued signal x(t) as

There are also other possible measures of signal size, such as the area under |x(t)|. The energy measure, however, is not only more tractable mathematically but is also more meaningful (as shown later) in the sense that it is indicative of the energy that can be extracted from the signal.

1.1-2 Signal Power The signal energy must be finite for it to be a meaningful measure of the signal size. A necessary condition for the energy to be finite is that the signal amplitude → 0 as |t| → ∞ (Fig. 1.1a). Otherwise the integral in Eq. (1.2a) will not converge.

Figure 1.1: Examples of signals: (a) a signal with finite energy and (b) a signal with finite power. When the amplitude of x(t) does not → 0 as |t| → ∞ (Fig. 1.1b), the signal energy is infinite. A more meaningful measure of the signal size in such a case would be the time average of the energy, if it exists. This measure is called the power of the signal. For a signal x(t), we define its power Px as

We can generalize this definition for a complex signal x(t) as

Observe that the signal power Px is the time average (mean) of the signal amplitude squared, that is, the mean-squared value of x(t). Indeed, the square root of Px is the familiar rms (root-mean-square) value of x(t). Generally, the mean of an entity averaged over a large time interval approaching infinity exists if the entity either is periodic or has a statistical regularity. If such a condition is not satisfied, the average may not exist. For instance, a ramp signal x(t) = t increases indefinitely as |t| → ∞, and neither the energy nor the power exists for this signal. However, the unit step function, which is not periodic nor has statistical regularity, does have a finite power. When x(t) is periodic, |x(t)|2 is also periodic. Hence, the power of x(t) can be computed from Eq. (1.3b) by averaging |x(t)|2 over one period. Comments. The signal energy as defined in Eqs. (1.2) does not indicate the actual energy (in the conventional sense) of the signal because the signal energy depends not only on the signal, but also on the load. It can, however, be interpreted as the energy dissipated in a normalized load of a 1-ohm resistor if a voltage x(t) were to be applied across the 1-ohm resistor (or if a current x(t) were to be passed through the 1 -ohm resistor). The measure of "energy" is, therefore indicative of the energy capability of the signal, not the actual energy. For this reason the concepts of conservation of energy should not be applied to this "signal energy." Parallel observation applies to "signal power" defined in Eqs. (1.3). These measures are but convenient indicators of the signal size, which prove useful in many applications. For instance, if we approximate a signal x(t) by another signal g(t), the error in the approximation is e(t) = x(t) − g(t). The energy (or power) of e(t) is a convenient indicator of the goodness of the approximation. It provides us with a quantitative measure of determining the closeness of the approximation. In communication systems, during transmission over a channel, message signals are corrupted by unwanted signals (noise). The quality of the received signal is judged by the relative sizes of the desired signal and the unwanted signal (noise). In this case the ratio of the message signal and noise signal powers (signal to noise power ratio) is a good indication of the received signal quality. Units of Energy and Power. Equations (1.2) are not correct dimensionally. This is because here we are using the term energy not in its conventional sense, but to indicate the signal size. The same observation applies to Eqs. (1.3) for power. The units of energy and power, as defined here, depend on the nature of the signal x(t). If x(t) is a voltage signal, its energy Ex has units of volts squared-

seconds (V2 s), and its power Px has units of volts squared. If x(t) is a current signal, these units will be amperes squared-seconds (A2 s) and amperes squared, respectively. EXAMPLE 1.1 Determine the suitable measures of the signals in Fig. 1.2.

Figure 1.2 In Fig. 1.2a, the signal amplitude → 0 as |t| → ∞. Therefore the suitable measure for this signal is its energy Ex given by

In Fig. 1.2b, the signal amplitude does not → 0 as |t| → ∞. However, it is periodic, and therefore its power exists. We can use Eq. (1.3a) to determine its power. We can simplify the procedure for periodic signals by observing that a periodic signal repeats regularly each period (2 seconds in this case). Therefore, averaging x 2 (t) over an infinitely large interval is identical to averaging this quantity over one period (2 seconds in this case). Thus

Recall that the signal power is the square of its rms value. Therefore, the rms value of this signal is 1/√3. EXAMPLE 1.2 Determine the power and the rms value of a. x(t) = C cos (ω0 t + θ) b. x(t) = C 1 cos (ω1 t + θ1 ) + C 2 cos (ω2 t + θ2 ) ω1 ≠ ω2 c. x(t) = Dejω0 t a. This is a periodic signal with period T0 = 2π/ω0 . The suitable measure of this signal is its power. Because it is a periodic signal, we may compute its power by averaging its energy over one period T0 = 2π/ω0 . However, for the sake of demonstration, we shall solve this problem by averaging over an infinitely large time interval using Eq. (1.3a).

The first term on the right-hand side is equal to C 2 /2. The second term, however, is zero because the integral appearing in this term represents the area under a sinusoid over a very large time interval T with T → ∞. This area is at most equal to the area of half the cycle because of cancellations of the positive and negative areas of a sinusoid. The second term is this area multiplied by C 2 /2T with T → ∞. Clearly this term is zero, and

This shows that a sinusoid of amplitude C has a power C 2 /2 regardless of the value of its frequency ω0 (ω0 ≠ 0) and phase θ. The rms value is C/√2. If the signal frequency is zero (dc or a constant signal of amplitude C), the reader can

show that the power is C 2 .

b. In Chapter 6, we shall show that a sum of two sinusoids may or may not be periodic, depending on whether the ratio ω1 /ω2 is a rational number. Therefore, the period of this signal is not known. Hence, its power will be determined by averaging its energy over T seconds with T → ∞. Thus,

The first and second integrals on the right-hand side are the powers of the two sinusoids, which are C 2 1 /2 and C 2 2 /2 as found in part (a). The third term, the product of two sinusoids, can be expressed as a sum of two sinusoids cos [(ω1 +

ω2 ) t + (θ1 + θ2 )] and cos [(ω1 − ω2 ) t + (θ1 − θ2 )], respectively. Now, arguing as in part (a), we see that the third term

is zero. Hence, we have [†]

and the rms value is

.

We can readily extend this result to a sum of any number of sinusoids with distinct frequencies. Thus, if

assuming that none of the two sinusoids have identical frequencies and ωn ≠ 0, then

If x(t) also has a dc term, as

then

c. In this case the signal is complex, and we use Eq. (1.3b) to compute the power.

Recall that |e jω0 t | = 1 so that |Dejω0 t | 2 = |D| 2 , and

The rms value is |D|. Comment. In part (b) of Example 1.2, we have shown that the power of the sum of two sinusoids is equal to the sum of the powers of the sinusoids. It may appear that the power of x 1 (t) + x 2 (t) is Px1 + Px2. Unfortunately, this conclusion is not true in general. It is true only under a certain condition (orthogonality), discussed later (Section 6.5-3). EXERCISE E1.1 Show that the energies of the signals in Fig. 1.3a, 1.3b, 1.3c, and 1.3d are 4, 1, 4/3, and 4/3, respectively. Observe that doubling a signal quadruples the energy, and time-shifting a signal has no effect on the energy. Show also that the power of the signal in Fig. 1.3e is 0.4323. What is the rms value of signal in Fig. 1.3e?

Figure 1.3 EXERCISE E1.2 Redo Example 1.2a to find the power of a sinusoid C cos (ω0 t + θ) by averaging the signal energy over one period T0 = 2π/ω0 (rather than averaging over the infinitely large interval). Show also that the power of a dc signal x(t) = C 0 is C 2 0 , and its rms value is C 0. EXERCISE E1.3 Show that if ω1 = ω2 , the power of x(t) = C 1 cos (ω1 t + θ1 ) + C 2 cos (ω2 t + θ2 ) is [C 2 1 + C 2 2 + 2C 1 C 2 cos (θ1 − θ2 )]/2, which is not equal to (C 2 1 + C 2 2 )/2. [†] This is true only if ω ≠ ω . If ω = ω , the integrand of the third term contains a constant cos (θ − θ ), and the third term → 1 2 1 2 1 2

2C 1 C 2 cos (θ1 − θ2 ) as T → ∞.

1.2 SOME USEFUL SIGNAL OPERATIONS We discuss here three useful signal operations: shifting, scaling, and inversion. Since the independent variable in our signal description is time, these operations are discussed as time shifting, time scaling, and time reversal (inversion). However, this discussion is valid for functions having independent variables other than time (e.g., frequency or distance).

1.2-1 Time Shifting Consider a signal x(t) (Fig. 1.4a) and the same signal delayed by T seconds (Fig. 1.4b), which we shall denote by φ(t). Whatever happens in x(t) (Fig. 1.4a) at some instant t also happens in φ(t) (Fig. 1.4b) T seconds later at the instant t + T. Therefore

and

Figure 1.4: Time-shifting a signal. Therefore, to time-shift a signal by T, we replace t with t − T. Thus x(t − T) represents x(t) time-shifted by T seconds. If T is positive, the shift is to the right (delay), as in Fig. 1.4b. If T is negative, the shift is to the left (advance), as in Fig. 1.4c. Clearly, x(t − 2) is x(t) delayed (right-shifted) by 2 seconds, and x(t + 2) is x(t) advanced (left-shifted) by 2 seconds. EXAMPLE 1.3 An exponential function x(t) = e −2t shown in Fig. 1.5a is delayed by 1 second. Sketch and mathematically describe the delayed function. Repeat the problem with x(t) advanced by 1 second.

Figure 1.5: (a) Signal x(t). (b) Signal x(t) delayed by 1 second. (c) Signal x(t) advanced by 1 second. The function x(t) can be described mathematically as

Let x d (t) represent the function x(t) delayed (right-shifted) by 1 second as illustrated in Fig. 1.5b. This function is x(t − 1); its mathematical description can be obtained from x(t) by replacing t with t − 1 in Eq. (1.7). Thus

Let x a (t) represent the function x(t) advanced (left-shifted) by 1 second as depicted in Fig. 1.5c. This function is x(t + 1); its mathematical description can be obtained from x(t) by replacing t with t + 1 in Eq. (1.7). Thus

EXERCISE E1.4 Write a mathematical description of the signal x 3 (t) in Fig. 1.3c. This signal is delayed by 2 seconds. Sketch the delayed signal. Show that this delayed signal x d (t) can be described mathematically as x d (t) = 2(t − 2) for 2 ≤ t ≤ 3, and equal to 0 otherwise. Now repeat the procedure with the signal advanced (left-shifted) by 1 second. Show that this advanced signal x a (t) can be described as x a (t) = 2(t + 1) for − 1 ≤ t ≤ 0, and equal to 0 otherwise.

1.2-2 Time Scaling The compression or expansion of a signal in time is known as time scaling. Consider the signal x(t) of Fig. 1.6a. The signal φ(t) in Fig. 1.6b is x(t) compressed in time by a factor of 2. Therefore, whatever happens in x(t) at some instant t also happens to φ(t) at the instant t/2, so that

and

Figure 1.6: Time scaling a signal. Observe that because x(t) = 0 at t = T1 and T2 , we must have φ(t) = 0 at t = T1 /2 and T2 /2, as shown in Fig. 1.6b. If x(t) were recorded on a tape and played back at twice the normal recording speed, we would obtain x(2t). In general, if x(t) is compressed in time by a factor a (a > 1), the resulting signal φ(t) is given by

Using a similar argument, we can show that x(t) expanded (slowed down) in time by a factor a (a > 1) is given by

Figure 1.6c shows x(t/2), which is x(t) expanded in time by a factor of 2. Observe that in a time-scaling operation, the origin t = 0 is the anchor point, which remains unchanged under the scaling operation because at t = 0, x(t) = x(at) = x(0).

In summary, to time-scale a signal by a factor a, we replace t with at. If a > 1, the scaling results in compression, and if a < 1, the scaling results in expansion. EXAMPLE 1.4 Figure 1.7a shows a signal x(t). Sketch and describe mathematically this signal time-compressed by factor 3. Repeat the problem for the same signal time-expanded by factor 2.

Figure 1.7: (a) Signal x(t),(b) signal x(3t), and (c) signal x(t/2). The signal x(t) can be described as

Figure 1.7b shows x c (t), which is x(t) time-compressed by factor 3; consequently, it can be described mathematically as x(3t), which is obtained by replacing t with 3t in the right-hand side of Eq. (1.14). Thus

Observe that the instants t = −1.5 and 3 in x(t) correspond to the instants t = −0.5, and 1 in the compressed signal x(3t). Figure 1.7c shows x e (t), which is x(t) time-expanded by factor 2; consequently, it can be described mathematically as x(t/2), which is obtained by replacing t with t/2 in x(t). Thus

Observe that the instants t = −1.5 and 3 in x(t) correspond to the instants t = −3 and 6 in the expanded signal x(t/2).

EXERCISE E1.5 Show that the time compression by a factor n (n > 1) of a sinusoid results in a sinusoid of the same amplitude and phase, but with the frequency increased n-fold. Similarly, the time expansion by a factor n (n > 1) of a sinusoid results in a sinusoid of the same amplitude and phase, but with the frequency reduced by a factor n. Verify your conclusion by sketching a sinusoid sin 2t and the same sinusoid compressed by a factor 3 and expanded by a factor 2.

1.2-3 Time Reversal Consider the signal x(t) in Fig. 1.8a. We can view x(t) as a rigid wire frame hinged at the vertical axis. To time-reverse x(t), we rotate this frame 180° about the vertical axis. This time reversal [the reflection of x(t) about the vertical axis] gives us the signal φ(t) (Fig. 1.8b). Observe that whatever happens in Fig. 1.8a at some instant t also happens in Fig. 1.8b at the instant −t, and vice versa. Therefore

Figure 1.8: Time reversal of a signal. Thus, to time-reverse a signal we replace t with −t, and the time reversal of signal x(t) results in a signal x(−t). We must remember that the reversal is performed about the vertical axis, which acts as an anchor or a hinge. Recall also that the reversal of x(t) about the horizontal axis results in −x(t). EXAMPLE 1.5 For the signal x(t) illustrated in Fig. 1.9a, sketch x(−t), which is time-reversed x(t).

Figure 1.9: Example of time reversal. The instants −1 and −5 in x(t) are mapped into instants 1 and 5 in x(−t). Because x(t) = e t/2 , we have x(-t) = e 1/2 . The signal x(−t)

is depicted in Fig. 1.9b. We can describe x(t) and x(−t) as

and its time reversed version x(−t) is obtained by replacing t with −t in x(t) as

1.2-4 Combined Operations Certain complex operations require simultaneous use of more than one of the operations just described. The most general operation involving all the three operations is x(at − b), which is realized in two possible sequences of operation: 1. Time-shift x(t) by b to obtain x(t − b). Now time-scale the shifted signal x(t − b) by a (i.e., replace t with at) to obtain x(at − b). 2. Time-scale x(t) by a to obtain x(at). Now time-shift x(at) by b/a (i.e., replace t with t − (b/a)) to obtain x[a(t − b/a)] = x(at − b). In either case, if a is negative, time scaling involves time reversal. For example, the signal x(2t − 6) can be obtained in two ways. We can delay x(t) by 6 to obtain x(t − 6), and then time-compress this signal by factor 2 (replace t with 2t) to obtain x(2t − 6). Alternately, we can first time-compress x(t) by factor 2 to obtain x(2t), then delay this signal by 3 (replace t with t − 3) to obtain x(2t − 6).

1.3 CLASSIFICATION OF SIGNALS There are several classes of signals. Here we shall consider only the following classes, which are suitable for the scope of this book: 1. Continuous-time and discrete-time signals 2. Analog and digital signals 3. Periodic and aperiodic signals 4. Energy and power signals 5. Deterministic and probabilistic signals

1.3-1 Continuous-Time and Discrete-Time Signals A signal that is specified for a continuum of values of time t (Fig. 1.10a) is a continuous-time signal, and a signal that is specified only at discrete values of t (Fig. 1.10b) is a discrete-time signal. Telephone and video camera outputs are continuous-time signals, whereas the quarterly gross national product (GNP), monthly sales of a corporation, and stock market daily averages are discrete-time signals.

Figure 1.10: (a) Continuous-time and (b) discrete-time signals.

1.3-2 Analog and Digital Signals The concept of continuous time is often confused with that of analog. The two are not the same. The same is true of the concepts of discrete time and digital. A signal whose amplitude can take on any value in a continuous range is an analog signal. This means that an analog signal amplitude can take on an infinite number of values. A digital signal, on the other hand, is one whose amplitude can take on only a finite number of values. Signals associated with a digital computer are digital because they take on only two values (binary signals). A digital signal whose amplitudes can take on M values is an M-ary signal of which binary (M = 2) is a special case. The terms continuous time and discrete time qualify the nature of a signal along the time (horizontal) axis. The terms analog and digital, on the other hand, qualify the nature of the signal amplitude (vertical axis). Figure 1.11 shows examples of signals of various types. It is clear that analog is not necessarily continuous-time and digital need not be discrete-time. Figure 1.11c shows an example of an analog discrete-time signal. An analog signal can be converted into a digital signal [analog-to-digital (A/D) conversion] through quantization (rounding off), as explained in Section 8.3.

Figure 1.11: Examples of signals: (a) analog, continuous time, (b) digital, continuous time, (c) analog, discrete time, and (d) digital, discrete time.

1.3-3 Periodic and Aperiodic Signals A signal x(t) is said to be periodic if for some positive constant T0

The smallest value of T0 that satisfies the periodicity condition of Eq. (1.17) is the fundamental period of x(t). The signals in Figs. 1.2b and 1.3e are periodic signals with periods 2 and 1, respectively. A signal is aperiodic if it is not periodic. Signals in Figs. 1.2a, 1.3a, 1.3b, 1.3c, and 1.3d are all aperiodic. By definition, a periodic signal x(t) remains unchanged when time-shifted by one period. For this reason a periodic signal must start at t = − ∞: if it started at some finite instant, say t = 0, the time-shifted signal x(t + T0 ) would start at t = −T0 and x(t + T0 ) would not be the same as x(t). Therefore a periodic signal, by definition, must start at t = − ∞ and continue forever, as illustrated in Fig. 1.12.

Figure 1.12: A periodic signal of period T0. Another important property of a periodic signal x(t) is that x(t) can be generated by periodic extension of any segment of x(t) of duration T0 (the period). As a result we can generate x(t) from any segment of x(t) having a duration of one period by placing this segment and the reproduction thereof end to end ad infinitum on either side. Figure 1.13 shows a periodic signal x(t) of period T0 = 6. The shaded portion of Fig. 1.13a shows a segment of x(t) starting at t = −1 and having a duration of one period (6 seconds). This segment, when repeated forever in either direction, results in the periodic signal x(t). Figure 1.13b shows another shaded segment of x(t) of duration T0 starting at t = 0. Again we see that this segment, when repeated forever on either side, results in x(t). The reader can verify that this construction is possible with any segment of x(t) starting at any instant as long as the segment duration is one period.

Figure 1.13: Generation of a periodic signal by periodic extension of its segment of one-period duration. An additional useful property of a periodic signal x(t) of period T0 is that the area under x(t) over any interval of duration T0 is the same; that is, for any real numbers a and b

This result follows from the fact that a periodic signal takes the same values at the intervals of T0 . Hence, the values over any segment of duration T0 are repeated in any other interval of the same duration. For convenience, the area under x(t) over any interval of duration T0 will be denoted by

It is helpful to label signals that start at t = − ∞ and continue forever as everlasting signals. Thus, an everlasting signal exists over the entire interval − ∞ < t < ∞. The signals in Figs. 1.1b and 1.2b are examples of everlasting signals. Clearly, a periodic signal, by definition, is an everlasting signal. A signal that does not start before t = 0 is a causal signal. In other words, x(t) is a causal signal if

Signals in Fig. 1.3a-1.3c are causal signals. A signal that starts before t = 0 is a noncausal signal. All the signals in Fig. 1.1 and 1.2 are noncausal. Observe that an everlasting signal is always noncausal but a noncausal signal is not necessarily everlasting. The everlasting signal in Fig. 1.2b is noncausal; however, the noncausal signal in Fig. 1.2a is not everlasting. A signal that is zero for all t ≥ 0 is called an anticausal signal. Comment. A true everlasting signal cannot be generated in practice for obvious reasons. Why should we bother to postulate such a signal? In later chapters we shall see that certain signals (e.g., an impulse and an everlasting sinusoid) that cannot be generated in practice do serve a very useful purpose in the study of signals and systems.

1.3-4 Energy and Power Signals A signal with finite energy is an energy signal, and a signal with finite and nonzero power is a power signal. Signals in Fig. 1.2a and 1.2b are examples of energy and power signals, respectively. Observe that power is the time average of energy. Since the averaging is over an infinitely large interval, a signal with finite energy has zero power, and a signal with finite power has infinite energy. Therefore, a signal cannot both be an energy signal and a power signal. If it is one, it cannot be the other. On the other hand, there are signals that are neither energy nor power signals. The ramp signal is one such case. Comments. All practical signals have finite energies and are therefore energy signals. A power signal must necessarily have infinite duration; otherwise its power, which is its energy averaged over an infinitely large interval, will not approach a (nonzero) limit. Clearly, it is impossible to generate a true power signal in practice because such a signal has infinite duration and infinite energy. Also, because of periodic repetition, periodic signals for which the area under |x(t)|2 over one period is finite are power signals; however, not all power signals are periodic. EXERCISE E1.6 Show that an everlasting exponential e −at is neither an energy nor a power signal for any real value of a. However, if a is imaginary, it is a power signal with power Px = 1 regardless of the value of a.

1.3-5 Deterministic and Random Signals A signal whose physical description is known completely, either in a mathematical form or a graphical form, is a deterministic signal. A

signal whose values cannot be predicted precisely but are known only in terms of probabilistic description, such as mean value or mean-squared value, is a random signal. In this book we shall exclusively deal with deterministic signals. Random signals are beyond the scope of this study.

1.4 SOME USEFUL SIGNAL MODELS In the area of signals and systems, the step, the impulse, and the exponential functions play very important role. Not only do they serve as a basis for representing other signals, but their use can simplify many aspects of the signals and systems.

1.4-1 Unit Step Function u(t) In much of our discussion, the signals begin at t = 0 (causal signals). Such signals can be conveniently described in terms of unit step function u(t) shown in Fig. 1.14a. This function is defined by

Figure 1.14: (a) Unit step function u(t). (b) Exponential e −at u(t). If we want a signal to start at t = 0 (so that it has a value of zero for t < 0), we need only multiply the signal by u(t). For instance, the

signal e −at represents an everlasting exponential that starts at t = − ∞. The causal form of this exponential (Fig. 1.14b) can be described as e −at u(t).

The unit step function also proves very useful in specifying a function with different mathematical descriptions over different intervals. Examples of such functions appear in Fig. 1.7. These functions have different mathematical descriptions over different segments of time as seen from Eqs. (1.14), (1.15a), and (1.15b). Such a description often proves clumsy and inconvenient in mathematical treatment. We can use the unit step function to describe such functions by a single expression that is valid for all t. Consider, for example, the rectangular pulse depicted in Fig. 1.15a. We can express such a pulse in terms of familiar step functions by observing that the pulse x(t) can be expressed as the sum of the two delayed unit step functions as shown in Fig. 1.15b. The unit step function u(t) delayed by T seconds is u(t − T). From Fig. 1.15b, it is clear that

Figure 1.15: Representation of a rectangular pulse by step functions. EXAMPLE 1.6 Describe the signal in Fig. 1.16a.

Figure 1.16: Representation of a signal defined interval by interval. The signal illustrated in Fig. 1.16a can be conveniently handled by breaking it up into the two components x 1 (t) and x 2 (t), depicted in Fig. 1.16b and 1.16c, respectively. Here, x 1 (t) can be obtained by multiplying the ramp t by the gate pulse u(t) − u(t − 2), as shown in Fig. 1.16b. Therefore The signal x 2 (t) can be obtained by multiplying another ramp by the gate pulse illustrated in Fig. 1.16c. This ramp has a slope −2; hence it can be described by −2t + c. Now, because the ramp has a zero value at t = 3, the constant c = 6, and the ramp can be described by −2(t − 3). Also, the gate pulse in Fig. 1.16c is u(t − 2) − u(t − 3). Therefore and

EXAMPLE 1.7 Describe the signal in Fig. 1.7a by a single expression valid for all t. Over the interval from −1.5 to 0, the signal can be described by a constant 2, and over the interval from 0 to 3, it can be described by 2e −t/2 . Therefore

Compare this expression with the expression for the same function found in Eq. (1.14). EXERCISE E1.7 Show that the signals depicted in Fig. 1.17a and 1.17b can be described as u(−t) and e −at u(−t), respectively.

Figure 1.17

EXERCISE E1.8 Show that the signal shown in Fig. 1.18 can be described as

Figure 1.18

1.4-2 The Unit Impulse Function δ(t) The unit impulse function δ(t) is one of the most important functions in the study of signals and systems. This function was first defined by P. A. M. Dirac as

We can visualize an impulse as a tall, narrow, rectangular pulse of unit area, as illustrated in Fig. 1.19b. The width of this rectangular pulse is a very small value ε → 0. Consequently, its height is a very large value 1/ε → ∞. The unit impulse therefore can be regarded as a rectangular pulse with a width that has become infinitesimally small, a height that has become infinitely large, and an overall area that has been maintained at unity. Thus δ(t) = 0 everywhere except at t = 0, where it is undefined. For this reason a unit impulse is represented by the spearlike symbol in Fig. 1.19a.

Figure 1.19: A unit impulse and its approximation. Other pulses, such as the exponential, triangular, or Gaussian types, may also be used in impulse approximation. The important feature of the unit impulse function is not its shape but the fact that its effective duration (pulse width) approaches zero while its area remains at unity. For example, the exponential pulse αe −αt u(t) in Fig. 1.20a becomes taller and narrower as α increases. In the limit as α → ∞, the pulse height → ∞, and its width or duration → 0. Yet, the area under the pulse is unity regardless of the value of α because

The pulses in Fig. 1.20b and 1.20c behave in a similar fashion. Clearly, the exact impulse function cannot be generated in practice; it can only be approached.

Figure 1.20: Other possible approximations to a unit impulse. From Eq. (1.21), it follows that the function kδ(t) = 0 for all t ≠ 0, and its area is k. Thus, kδ(t) is an impulse function whose area is k

(in contrast to the unit impulse function, whose area is 1). MULTIPLICATION OF A FUNCTION BY AN IMPULSE Let us now consider what happens when we multiply the unit impulse δ(t) by a function φ(t) that is known to be continuous at t = 0. Since the impulse has nonzero value only at t = 0, and the value of φ(t) at t = 0 is φ(0), we obtain

Thus, multiplication of a continuous-time function φ(t) with an unit impulse located at t = 0 results in an impulse, which is located at t = 0 and has strength φ(0) (the value of φ(t) at the location of the impulse). Use of exactly the same argument leads to the generalization of this result, stating that provided φ(t) is continuous at t = T, φ(t) multiplied by an impulse δ(t − T) (impulse located at t = T) results in an impulse located at t = T and having strength φ(T) [the value of φ(t) at the location of the impulse].

SAMPLING PROPERTY OF THE UNIT IMPULSE FUNCTION From Eq. (1.23a) it follows that

provided φ(t) is continuous at t = 0. This result means that the area under the product of a function with an impulse δ(t) is equal to the value of that function at the instant at which the unit impulse is located. This property is very important and useful and is known as the sampling or sifting property of the unit impulse. From Eq. (1.23b) it follows that

Equation (1.24b) is just another form of sampling or sifting property. In the case of Eq. (1.24b), the impulse δ(t − T) is located at t = T. Therefore, the area under φ(t)δ(t − T) is φ(T), the value of φ(t) at the instant at which the impulse is located (at t = T). In these derivations we have assumed that the function is continuous at the instant where the impulse is located. UNIT IMPULSE AS A GENERALIZED FUNCTION The definition of the unit impulse function given in Eq. (1.21) is not mathematically rigorous, which leads to serious difficulties. First, the

impulse function does not define a unique function: for example, it can be shown that δ(t) + δ(t) also satisfies Eq. (1.21).[1] Moreover, δ(t) is not even a true function in the ordinary sense. An ordinary function is specified by its values for all time t. The impulse function is zero everywhere except at t = 0, and at this, the only interesting part of its range, it is undefined. These difficulties are resolved by defining the impulse as a generalized function rather than an ordinary function. A generalized function is defined by its effect on other functions instead of by its value at every instant of time. In this approach the impulse function is defined by the sampling property [Eqs. (1.24)]. We say nothing about what the impulse function is or what it looks like. Instead, the impulse function is defined in terms of its effect on a test function φ(t). We define a unit impulse as a function for which the area under its product with a function φ(t) is equal to the value of the function φ(t) at the instant at which the impulse is located. It is assumed that φ(t) is continuous at the location of the impulse. Therefore, either Eq. (1.24a) or (1.24b) can serve as a definition of the impulse function in this approach. Recall that the sampling property [Eqs. (1.24)] is the consequence of the classical (Dirac) definition of impulse in Eq. (1.21). In contrast, the sampling property [Eqs. (1.24)] defines the impulse function in the generalized function approach. We now present an interesting application of the generalized function definition of an impulse. Because the unit step function u(t) is discontinuous at t = 0, its derivative du/dt does not exist at t = 0 in the ordinary sense. We now show that this derivative does exist in the generalized sense, and it is, in fact, δ(t). As a proof, let us evaluate the integral of (du/dt)φ(t), using integration by parts:

This result shows that du/dt satisfies the sampling property of δ(t). Therefore it is an impulse δ(t) in the generalized sense-that is,

Consequently

These results can also be obtained graphically from Fig. 1.19b. We observe that the area from − ∞ to t under the limiting form of δ(t) in Fig. 1.19b is zero if t < −ε/2 and unity if t ≥ ε/2 with ε → 0. Consequently

This result shows that the unit step function can be obtained by integrating the unit impulse function. Similarly the unit ramp function x(t) = tu(t) can be obtained by integrating the unit step function. We may continue with unit parabolic function t2 /2 obtained by integrating the unit ramp, and so on. On the other side, we have derivatives of impulse function, which can be defined as generalized functions (see Prob. 1.4-9). All these functions, derived from the unit impulse function (successive derivatives and integrals) are called singularity functions.[†]

EXERCISE E1.9 Show that a. (t 3 + 3)δ(t) = 3δ(t) b. c. e −2t δ(t) = δ(t)

d. EXERCISE E1.10 Show that a. ∫ ∞−∞ δ(t)e -jωt dt = 1

b. c. ∫ ∞−∞ δ e −2(x−t)δ(2−t dt =e −2(x− 2)

1.4-3 The Exponential Function est Another important function in the area of signals and systems is the exponential signal e st , where s is complex in general, given by Therefore

Since s* = σ − jω (the conjugate of s), then

and

Comparison of this equation with Euler's formula shows that e st is a generalization of the function e jωt , where the frequency variable jω

is generalized to a complex variable s = σ + jω. For this reason we designate the variable s as the complex frequency. From Eqs.

(1.30) it follows that the function e st encompasses a large class of functions. The following functions are either special cases of or can

be expressed in terms of e st :

1. A constant k = ke0t (s = 0) 2. A monotonic exponential e σt (ω = 0, s = σ) 3. A sinusoid cos ωt (σ = 0, s = ±jω) 4. An exponentially varying sinusoid e σt cos ωt (s = σ ± jω) These functions are illustrated in Fig. 1.21.

Figure 1.21: Sinusoids of complex frequency σ + jω. The complex frequency s can be conveniently represented on a complex frequency plane (s plane) as depicted in Fig. 1.22. The horizontal axis is the real axis (σ axis), and the vertical axis is the imaginary axis (jω axis). The absolute value of the imaginary part of s is |ω| (the radian frequency), which indicates the frequency of oscillation of e st ; the real part σ (the neper frequency) gives

information about the rate of increase or decrease of the amplitude of e st . For signals whose complex frequencies lie on the real axis (σ axis, where ω = 0), the frequency of oscillation is zero. Consequently these signals are monotonically increasing or decreasing

exponentials (Fig. 1.21a). For signals whose frequencies lie on the imaginary axis (jω axis where σ = 0), e σt = 1. Therefore, these signals are conventional sinusoids with constant amplitude (Fig. 1.21b). The case s = 0 (σ = ω = 0) corresponds to a constant (dc)

signal because e 0t = 1. For the signals illustrated in Fig. 1.21c and 1.21d, both σ and ω are nonzero; the frequency s is complex and does not lie on either axis. The signal in Fig. 1.21c decays exponentially. Therefore, σ is negative, and s lies to the left of the imaginary axis. In contrast, the signal in Fig. 1.21d grows exponentially. Therefore, σ is positive, and s lies to the right of the imaginary axis. Thus the s plane (Fig. 1.21) can be separated into two parts: the left half-plane (LHP) corresponding to exponentially decaying signals and the right half-plane (RHP) corresponding to exponentially growing signals. The imaginary axis separates the two regions and corresponds to signals of constant amplitude.

Figure 1.22: Complex frequency plane. An exponentially growing sinusoid e 2t cos 5t, for example, can be expressed as a linear combination of exponentials e (2+j5)t and

e (2−j5)t with complex frequencies 2 + j5 and 2 − j5, respectively, which lie in the RHP. An exponentially decaying sinusoid e −2t cos 5t can be expressed as a linear combination of exponentials e (−2+j5)t and e (−2−j5)t with complex frequencies −2 + j5 and-2 − j5,

respectively, which lie in the LHP. A constant amplitude sinusoid cos 5t can be expressed as a linear combination of exponentials e j5t

and e −j5t with complex frequencies ±j5, which lie on the imaginary axis. Observe that the monotonic exponentials e ±2t are also generalized sinusoids with complex frequencies ±2. [1] Papoulis, A. The Fourier Integral and Its Applications. McGraw-Hill, New York, 1962.

[†] Singularity functions were defined by late Prof. S. J. Mason as follows. A singularity is a point at which a function does not possess a

derivative. Each of the singularity functions (or if not the function itself, then the function differentiated a finite number of times) has a singular point at the origin and is zero elsewhere.[2]

[†] Mason, S. J. Electronic Circuits, Signals, and Systems. Wiley, New York, 1960.

1.5 EVEN AND ODD FUNCTIONS A real function x e (t) is said to be an even function of t if [†]

and a real function x 0 (t) is said to be an odd function of t if

An even function has the same value at the instants t and-t for all values of t. Clearly, x e (t) is symmetrical about the vertical axis, as shown in Fig. 1.23a. On the other hand, the value of an odd function at the instant t is the negative of its value at the instant -t. Therefore, x 0 (t) is antisymmetrical about the vertical axis, as depicted in Fig. 1.23b.

Figure 1.23: Functions of t: (a) even and (b) odd.

1.5-1 Some Properties of Even and Odd Functions Even and odd functions have the following properties:

The proofs are trivial and follow directly from the definition of odd and even functions [Eqs. (1.31) and (1.32)]. AREA Because x e (t) is symmetrical about the vertical axis, it follows from Fig. 1.23a that

It is also clear from Fig. 1.23b that

These results are valid under the assumption that there is no impulse (or its derivatives) at the origin. The proof of these statements is obvious from the plots of the even and the odd function. Formal proofs, left as an exercise for the reader, can be accomplished by using the definitions in Eqs. (1.31) and (1.32). Because of their properties, study of odd and even functions proves useful in many applications, as will become evident in later chapters.

1.5-2 Even and Odd Components of a Signal Every signal x(t) can be expressed as a sum of even and odd components because

From the definitions in Eqs. (1.31) and (1.32), we can clearly see that the first component on the right-hand side is an even function, while the second component is odd. This is apparent from the fact that replacing t by -t in the first component yields the same function. The same maneuver in the second component yields the negative of that component. Consider the function Expressing this function as a sum of the even and odd components x e (t) and x 0 (t), we obtain where [from Eq. (1.34)]

and

The function e −at u(t) and its even and odd components are illustrated in Fig. 1.24.

Figure 1.24: Finding even and odd components of a signal. EXAMPLE 1.8 Find the even and odd components of e jt . From Eq. (1.34) where and

[†] A complex signal x(t) is said to be conjugate symmetrical if x(t) = x*(−t). A real conjugate symmetrical signal is an even signal. A signal is conjugate antisymmetrical if x(t) = −x*(−t). A real conjugate antisymmetrical signal is an odd signal.

1.6 SYSTEMS As mentioned in Section 1.1, systems are used to process signals to allow modification or extraction of additional information from the signals. A system may consist of physical components (hardware realization) or of an algorithm that computes the output signal from the input signal (software realization).

Roughly speaking, a physical system consists of interconnected components, which are characterized by their terminal (input-output) relationships. In addition, a system is governed by laws of interconnection. For example, in electrical systems, the terminal relationships are the familiar voltage-current relationships for the resistors, capacitors, inductors, transformers, transistors, and so on, as well as the laws of interconnection (i.e., Kirchhoff's laws). Using these laws, we derive mathematical equations relating the outputs to the inputs. These equations then represent a mathematical model of the system. A system can be conveniently illustrated by a "black box" with one set of accessible terminals where the input variables x 1 (t), x 2 (t),..., x j (t) are applied and another set of accessible terminals where the output variables y 1 (t), y 2 (t),..., y k (t) are observed (Fig. 1.25).

Figure 1.25: Representation of a system. The study of systems consists of three major areas: mathematical modeling, analysis, and design. Although we shall be dealing with mathematical modeling, our main concern is with analysis and design. The major portion of this book is devoted to the analysis problem-how to determine the system outputs for the given inputs and a given mathematical model of the system (or rules governing the system). To a lesser extent, we will also consider the problem of design or synthesis-how to construct a system that will produce a desired set of outputs for the given inputs. DATA NEEDED TO COMPUTE SYSTEM RESPONSE To understand what data we need to compute a system response, consider a simple RC circuit with a current source x(t) as its input (Fig. 1.26). The output voltage y(t) is given by

Figure 1.26: Example of a simple electrical system. The limits of the integral on the right-hand side are from − ∞ to t because this integral represents the capacitor charge due to the current x(t) flowing in the capacitor, and this charge is the result of the current flowing in the capacitor from − ∞. Now, Eq. (1.36a) can be expressed as

The middle term on the right-hand side is v C(0), the capacitor voltage at t = 0. Therefore

This equation can be readily generalized as

From Eq. (1.36a), the output voltage y(t) at an instant t can be computed if we know the input current flowing in the capacitor throughout its entire past (− ∞ to t). Alternatively, if we know the input current x(t) from some moment t0 onward, then, using Eq.

(1.36d), we can still calculate y(t) for t ≥ t0 from a knowledge of the input current, provided we know v C(t0 ), the initial capacitor voltage (voltage at t0 ). Thus v C(t0 ) contains all the relevant information about the circuit's entire past (− ∞ to t0 ) that we need to compute y(t) for t ≥ t0 . Therefore, the response of a system at t ≥ t0 can be determined from its input(s) during the interval t0 to t and from certain initial conditions at t = t0 . In the preceding example, we needed only one initial condition. However, in more complex systems, several initial conditions may be

necessary. We know, for example, that in passive RLC networks, the initial values of all inductor currents and all capacitor voltages [†] are needed to determine the outputs at any instant t ≥ 0 if the inputs are given over the interval [0, t]. [†] Strictly speaking, this means independent inductor currents and capacitor voltages.

1.7 CLASSIFICATION OF SYSTEMS Systems may be classified broadly in the following categories: 1. Linear and nonlinear systems 2. Constant-parameter and time-varying-parameter systems 3. Instantaneous (memoryless) and dynamic (with memory) systems 4. Causal and noncausal systems 5. Continuous-time and discrete-time systems 6. Analog and digital systems 7. Invertible and noninvertible systems 8. Stable and unstable systems Other classifications, such as deterministic and probabilistic systems, are beyond the scope of this text and are not considered.

1.7-1 Linear and Nonlinear Systems THE CONCEPT OF LINEARITY A system whose output is proportional to its input is an example of a linear system. But linearity implies more than this; it also implies the additivity property: that is, if several inputs are acting on a system, then the total effect on the system due to all these inputs can be determined by considering one input at a time while assuming all the other inputs to be zero. The total effect is then the sum of all the component effects. This property may be expressed as follows: for a linear system, if an input x 1 acting alone has an effect y 1 , and if another input x 2 , also acting alone, has an effect y 2 , then, with both inputs acting on the system, the total effect will be y 1 + y 2 . Thus, if

then for all x 1 and x 2

In addition, a linear system must satisfy the homogeneity or scaling property, which states that for arbitrary real or imaginary number k, if an input is increased k-fold, the effect also increases k-fold. Thus, if then for all real or imaginary k

Thus, linearity implies two properties: homogeneity (scaling) and additivity. [†] Both these properties can be combined into one property (superposition), which is expressed as follows: If then for all values of constants k 1 and k 2 ,

This is true for all x 1 and x 2 . It may appear that additivity implies homogeneity. Unfortunately, homogeneity does not always follow from additivity. Exercise E1.11

demonstrates such a case. EXERCISE E1.11 Show that a system with the input x(t) and the output y(t) related by y(t) = Re{x(t)} satisfies the additivity property but violates the homogeneity property. Hence, such a system is not linear. [Hint: Show that Eq. (1.39) is not satisfied when k is complex.] RESPONSE OF A LINEAR SYSTEM For the sake of simplicity, we discuss only single-input, single-output (SISO) systems. But the discussion can be readily extended to multiple-input, multiple-output (MIMO) systems. A system's output for t ≥ 0 is the result of two independent causes: the initial conditions of the system (or the system state) at t = 0 and the input x(t) for t ≥ 0. If a system is to be linear, the output must be the sum of the two components resulting from these two causes: first, the zero-input response component that results only from the initial conditions at t = 0 with the input x(t) = 0 for t ≥ 0, and then the zero-state response component that results only from the input x(t) for t ≥ 0 when the initial conditions (at t = 0) are assumed to be zero. When all the appropriate initial conditions are zero, the system is said to be in zero state. The system output is zero when the input is zero only if the system is in zero state. In summary, a linear system response can be expressed as the sum of the zero-input and the zero-state component:

This property of linear systems, which permits the separation of an output into components resulting from the initial conditions and from the input, is called the decomposition property. For the RC circuit of Fig. 1.26, the response y(t) was found to be [see Eq. (1.36c)]

From Eq. (1.42), it is clear that if the input x(t) = 0 for t ≥ 0, the output y(t) = v C(0). Hence v C(0) is the zero-input component of the response y(t). Similarly, if the system state (the voltage v C in this case) is zero at t = 0, the output is given by the second component on the right-hand side of Eq. (1.42). Clearly this is the zero-state component of the response y(t). In addition to the decomposition property, linearity implies that both the zero-input and zero-state components must obey the principle of superposition with respect to each of their respective causes. For example, if we increase the initial condition k-fold, the zero-input component must also increase k-fold. Similarly, if we increase the input k-fold, the zero-state component must also increase k-fold. These facts can be readily verified from Eq. (1.42) for the RC circuit in Fig. 1.26. For instance, if we double the initial condition v C(0), the zero-input component doubles; if we double the input x(t), the zero-state component doubles. EXAMPLE 1.9 Show that the system described by the equation

is linear. [†] Let the system response to the inputs x 1 (t) and x 2 (t) be y 1 (t) and y 2 (t), respectively. Then

and

Multiplying the first equation by k 1 , the second with k 2 , and adding them yields

But this equation is the system equation [Eq. (1.43)] with and

Therefore, when the input is k 1 x 1 (t) + k 2 x 2 (t), the system response is k 1 y 1 (t) + k 2 y 2 (t). Consequently, the system is linear. Using this argument, we can readily generalize the result to show that a system described by a differential equation of the form

is a linear system. The coefficients a i and b i in this equation can be constants or functions of time. Although here we proved only zerostate linearity, it can be shown that such systems are also zero-input linear and have the decomposition property. EXERCISE E1.12 Show that the system described by the following equation is linear:

EXERCISE E1.13 Show that the system described by the following equation is nonlinear:

MORE COMMENTS ON LINEAR SYSTEMS Almost all systems observed in practice become nonlinear when large enough signals are applied to them. However, it is possible to approximate most of the nonlinear systems by linear systems for small-signal analysis. The analysis of nonlinear systems is generally difficult. Nonlinearities can arise in so many ways that describing them with a common mathematical form is impossible. Not only is each system a category in itself, but even for a given system, changes in initial conditions or input amplitudes may change the nature of the problem. On the other hand, the superposition property of linear systems is a powerful unifying principle that allows for a general solution. The superposition property (linearity) greatly simplifies the analysis of linear systems. Because of the decomposition property, we can evaluate separately the two components of the output. The zero-input component can be computed by assuming the input to be zero, and the zero-state component can be computed by assuming zero initial conditions. Moreover, if we express an input x(t) as a sum of simpler functions, then, by virtue of linearity, the response y(t) is given by

where y k (t) is the zero-state response to an input x k (t). This apparently trivial observation has profound implications. As we shall see repeatedly in later chapters, it proves extremely useful and opens new avenues for analyzing linear systems. For example, consider an arbitrary input x(t) such as the one shown in Fig. 1.27a. We can approximate x(t) with a sum of rectangular pulses of width Δt and of varying heights. The approximation improves as Δt → 0, when the rectangular pulses become impulses

spaced Δt seconds apart (with Δt → 0). [†] Thus, an arbitrary input can be replaced by a weighted sum of impulses spaced Δt (Δt → 0) seconds apart. Therefore, if we know the system response to a unit impulse, we can immediately determine the system response to an arbitrary input x(t) by adding the system response to each impulse component of x(t). A similar situation is depicted in Fig. 1.27b, where x(t) is approximated by a sum of step functions of varying magnitude and spaced Δt seconds apart. The approximation improves as Δt becomes smaller. Therefore, if we know the system response to a unit step input, we can compute the system response to any arbitrary input x(t) with relative ease. Time-domain analysis of linear systems (discussed in Chapter 2) uses this approach.

Figure 1.27: Signal representation in terms of impulse and step components. Chapters 4 through 7 employ the same approach but instead use sinusoids or exponentials as the basic signal components. We show that any arbitrary input signal can be expressed as a weighted sum of sinusoids (or exponentials) having various frequencies. Thus a knowledge of the system response to a sinusoid enables us to determine the system response to an arbitrary input x(t).

1.7-2 Time-Invariant and Time-Varying Systems Systems whose parameters do not change with time are time-invariant (also constant-parameter) systems. For such a system, if the

input is delayed by T seconds, the output is the same as before but delayed by T (assuming initial conditions are also delayed by T). This property is expressed graphically in Fig. 1.28. We can also illustrate this property, as shown in Fig. 1.29. We can delay the output y(t) of a system S by applying the output y(t) to a T second delay (Fig. 1.29a). If the system is time invariant, then the delayed output y(t − T) can also be obtained by first delaying the input x(t) before applying it to the system, as shown in Fig. 1.29b. In other words, the system S and the time delay commute if the system S is time invariant. This would not be true for time-varying systems. Consider, for instance, a time-varying system specified by y(t) = e −t x(t). The output for such a system in Fig. 1.29a is e −(t−T)x(t − T). In contrast, the output for the system in Fig. 1.29b is e −t x(t − T).

Figure 1.28: Time-invariance property.

Figure 1.29: Illustration of time-invariance property. It is possible to verify that the system in Fig. 1.26 is a time-invariant system. Networks composed of RLC elements and other commonly used active elements such as transistors are time-invariant systems. A system with an input-output relationship described by a linear differential equation of the form given in Example 1.9 [Eq. (1.44)] is a linear time-invariant (LTI) system when the coefficients a i and b i of such equation are constants. If these coefficients are functions of time, then the system is a linear time-varying system. The system described in Exercise E1.12 is linear time varying. Another familiar example of a time-varying system is the carbon microphone, in which the resistance R is a function of the mechanical pressure generated by sound waves on the carbon granules of the microphone. The output current from the microphone is thus modulated by the sound waves, as desired. EXERCISE E1.14 Show that a system described by the following equation is time-varying-parameter system: [Hint: Show that the system fails to satisfy the time-invariance property.]

1.7-3 Instantaneous and Dynamic Systems As observed earlier, a system's output at any instant t generally depends on the entire past input. However, in a special class of systems, the output at any instant t depends only on its input at that instant. In resistive networks, for example, any output of the network at some instant t depends only on the input at the instant t. In these systems, past history is irrelevant in determining the response. Such systems are said to be instantaneous or memoryless systems. More precisely, a system is said to be instantaneous (or memoryless) if its output at any instant t depends, at most, on the strength of its input(s) at the same instant t, and not on any past or future values of the input(s). Otherwise, the system is said to be dynamic (or a system with memory). A system whose response at t is completely determined by the input signals over the past T seconds [interval from (t − T) to t] is a finite-memory system with a memory of T seconds. Networks containing inductive and capacitive elements generally have infinite memory because the response of such

networks at any instant t is determined by their inputs over the entire past (− ∞, t). This is true for the RC circuit of Fig. 1.26. In this book we will generally examine dynamic systems. Instantaneous systems are a special case of dynamic systems.

1.7-4 Causal and Noncausal Systems A causal (also known as a physical or nonanticipative) system is one for which the output at any instant to depends only on the value of the input x(t) for t ≤ to . In other words, the value of the output at the present instant depends only on the past and present values of the input x(t), not on its future values. To put it simply, in a causal system the output cannot start before the input is applied. If the response starts before the input, it means that the system knows the input in the future and acts on this knowledge before the input is applied. A system that violates the condition of causality is called a noncausal (or anticipative) system. Any practical system that operates in real time [†] must necessarily be causal. We do not yet know how to build a system that can respond to future inputs (inputs not yet applied). A noncausal system is a prophetic system that knows the future input and acts on it in the present. Thus, if we apply an input starting at t = O to a noncausal system, the output would begin even before t = O. For example, consider the system specified by

For the input x(t) illustrated in Fig. 1.30a, the output y(t), as computed from Eq. (1.46) (shown in Fig. 1.30b), starts even before the input is applied. Equation (1.46) shows that y(t), the output at t, is given by the sum of the input values 2 seconds before and 2 seconds after t (at t − 2 and t + 2, respectively). But if we are operating the system in real time at t, we do not know what the value of the input will be 2 seconds later. Thus it is impossible to implement this system in real time. For this reason, noncausal systems are unrealizable in real time.

Figure 1.30: A noncausal system and its realization by a delayed causal system. WHY STUDY NONCAUSAL SYSTEMS? The foregoing discussion may suggest that noncausal systems have no practical purpose. This is not the case; they are valuable in the study of systems for several reasons. First, noncausal systems are realizable when the independent variable is other than "time" (e.g., space). Consider, for example, an electric charge of density q(x] placed along the x axis for x ≥ O. This charge density produces an electric field E(x) that is present at every point on the x axis from x = − ∞ to ∞. In this case the input [i.e., the charge density q(x)] starts at x = O, but its output [the electric field E(x)] begins before x = O. Clearly, this space-charge system is noncausal. This discussion shows that only temporal systems (systems with time as independent variable) must be causal to be realizable. The terms "before" and "after" have a special connection to causality only when the independent variable is time. This connection is lost for variables other than time. Nontemporal systems, such as those occurring in optics, can be noncausal and still realizable. Moreover, even for temporal systems, such as those used for signal processing, the study of noncausal systems is important. In such systems we may have all input data prerecorded. (This often happens with speech, geophysical, and meteorological signals, and with space probes.) In such cases, the input's future values are available to us. For example, suppose we had a set of input signal records available for the system described by Eq. (1.46). We can then compute y(t) since, for any t, we need only refer to the records to find the input's value 2 seconds before and 2 seconds after t. Thus, noncausal systems can be realized, although not in real time. We may therefore be able to realize a noncausal system, provided we are willing to accept a time delay in the output. Consider a system whose output Ŷ(t) is the same as y(t) in Eq. (1.46) delayed by 2 seconds (Fig 1.30c), so that

Here the value of the output Ŷ at any instant t is the sum of the values of the input x at t and at the instant 4 seconds earlier [at (t − 4)]. In this case, the output at any instant t does not depend on future values of the input, and the system is causal. The output of this

system, which is Ŷ(t), is identical to that in Eq. (1.46) or Fig. 1.30b except for a delay of 2 seconds. Thus, a noncausal system may be realized or satisfactorily approximated in real time by using a causal system with a delay.

Noncausal systems are realizable with time delay! A third reason for studying noncausal systems is that they provide an upper bound on the performance of causal systems. For example, if we wish to design a filter for separating a signal from noise, then the optimum filter is invariably a noncausal system. Although unrealizable, this noncausal system's performance acts as the upper limit on what can be achieved and gives us a standard for evaluating the performance of causal filters. At first glance, noncausal systems may seem to be inscrutable. Actually, there is nothing mysterious about these systems and their approximate realization through physical systems with delay. If we want to know what will happen one year from now, we have two choices: go to a prophet (an unrealizable person) who can give the answers instantly, or go to a wise man and allow him a delay of one year to give us the answer! If the wise man is truly wise, he may even be able, by studying trends, to shrewdly guess the future very closely with a delay of less than a year. Such is the case with noncausal systems-nothing more and nothing less. EXERCISE E1.15 Show that a system described by the following equation is noncausal:

Show that this system can be realized physically if we accept a delay of 5 seconds in the output.

1.7-5 Continuous-Time and Discrete-Time Systems Signals defined or specified over a continuous range of time are continuous-time signals, denoted by symbols x(t), y(t), and so on. Systems whose inputs and outputs are continuous-time signals are continuous-time systems. On the other hand, signals defined only at discrete instants of time to , t 1 , t,... are discrete-time signals, denoted by the symbols x(tn ), y(tn ), and so on, where n is some integer. Systems whose inputs and outputs are discrete-time signals are discrete-time systems. A digital computer is a familiar example of this type of system. In practice, discrete-time signals can arise from sampling continuous-time signals. For example, when the sampling is uniform, the discrete instants to , t 1 , t 2 ,... are uniformly spaced so that In such case, the discrete-time signals represented by the samples of continuous-time signals x(t), y(t), and so on can be expressed as x(nT), y(nT), and so on; for convenience, we further simplify this notation to x[n], y[nT],..., where it is understood that x[n] = x(nT) and that n is some integer. A typical discrete-time signal is shown in Fig. 1.31. A discrete-time signal may also be viewed as a sequence of numbers..., x[− 1], x[0], x[1], x[2],.... Thus a discrete-time system may be seen as processing a sequence of numbers x[n] and yielding as an output another sequence of numbers y[n].

Figure 1.31: A discrete-time signals. Discrete-time signals arise naturally in situations that are inherently discrete time, such as population studies, amortization problems, national income models, and radar tracking. They may also arise as a result of sampling continuous-time signals in sampled data systems, digital filtering, and the like. Digital filtering is a particularly interesting application in which continuous-time signals are processed by using discrete-time systems as shown in Fig. 1.32. A continuous-time signal x(t) is first sampled to convert it into a discrete-time signal x[n], which then is processed by the discrete-time system to yield a discrete-time output y[n]. A continuous-time signal y(t) is finally constructed from y[n]. In this manner we can process a continuous-time signal with an appropriate discrete-time

system such as a digital computer. Because discrete-time systems have several significant advantages over continuous-time systems.

Figure 1.32: Processing contiuous-time signals by discrete-time system.

1.7-6 Analog and Digital Systems Analog and digital signals are discussed in Section 1.3-2. A system whose input and output signals are analog is an analog system; a system whose input and output signals are digital is a digital system. A digital computer is an example of a digital (binary) system. Observe that a digital computer is digital as well as a discrete-time system.

1.7-7 Invertible and Noninvertible Systems A system S performs certain operation(s) on input signal(s). If we can obtain the input x(t) back from the corresponding output y(t) by some operation, the system S is said to be invertible. When several different inputs result in the same output (as in a rectifier), it is impossible to obtain the input from the output, and the system is noninvertible. Therefore, for an invertible system, it is essential that every input have a unique output so that there is a one-to-one mapping between an input and the corresponding output. The system that achieves the inverse operation [of obtaining x(t) from y(t)] is the inverse system for S. For instance, if S is an ideal integrator, then its inverse system is an ideal differentiator. Consider a system S connected in tandem with its inverse Si , as shown in Fig. 1.33. The input x(t) to this tandem system results in signal y(t) at the output of S, and the signal y(t), which now acts as an input to Si , yields back the signal x(t) at the output of Si , Thus, Si , undoes the operation of S on x(t), yielding back x(t). A system whose output is equal to the input (for all possible inputs) is an identity system. Cascading a system with its inverse system, as shown in Fig. 1.33, results in an identity system.

Figure 1.33: A cascade of a system with its inverse results in an identity system. In contrast, a rectifier, specified by an equation y(t) = |x(t)|, is noninvertibe because the rectification operation cannot be undone. Inverse systems are very important in signal processing. In many applications, the signals are distorted during the processing, and it is necessary to undo the distortion. For instance, in transmission of data over a communication channel, the signals are distorted owing to nonideal frequency response and finite bandwidth of a channel. It is necessary to restore the signal as closely as possible to its original shape. Such equalization is also used in audio systems and photographic systems.

1.7-8 Stable and Unstable Systems Systems can also be classified as stable or unstable systems. Stability can be internal or external. If every bounded input applied at the input terminal results in a bounded output, the system is said to be stable externally. The external stability can be ascertained by measurements at the external terminals (input and output) of the system. This type of stability is also known as the stability in the BIBO (bounded-input/bounded-output) sense. The concept of internal stability is postponed to Chapter 2 because it requires some understanding of internal system behavior, introduced in that chapter. EXERCISE E1.16 Show that a system described by the equation y(t) = x 2 (t) is noninvertible but BIBO stable. [†] A linear system must also satisfy the additional condition of smoothness, where small changes in the system's inputs must result in small changes in its outputs. [3] [†] Kailath, T. Linear Systems. Prentice-Hall, Englewood Cliffs, NJ, 1980. [†] Equations such as (1.43) and (1.44) are considered to represent linear systems in the classical definition of linearity. Some authors consider such equations to represent incrementally linear systems. According to this definition, linear system has only a zero-state component. The zero-input component is absent. Hence, incrementally linear system response can be represented as a response of a

linear system (linear in this new definition) plus a zero-input component. We prefer the classical definition to this new definition. It is just a matter of definition and makes no difference in the final results. [†] Here, the discussion of a rectangular pulse approaching an impulse at Δt → 0 is somewhat imprecise. It is explained in Section 2.4

with more rigor.

[†] In real-time operations, the response to an input is essentially simultaneous (contemporaneous) with the input itself.

1.8 SYSTEM MODEL: INPUT-OUTPUT DESCRIPTION A system description in terms of the measurements at the input and output terminals is called the input-output description. As mentioned earlier, systems theory encompasses a variety of systems, such as electrical, mechanical, hydraulic, acoustic, electromechanical, and chemical, as well as social, political, economic, and biological. The first step in analyzing any system is the construction of a system model, which is a mathematical expression or a rule that satisfactorily approximates the dynamical behavior of the system. In this chapter we shall consider only continuous-time systems. (Modeling of discrete-time systems is discussed in Chapter 3.)

1.8-1 Electrical Systems To construct a system model, we must study the relationships between different variables in the system. In electrical systems, for example, we must determine a satisfactory model for the voltage-current relationship of each element, such as Ohm's law for a resistor. In addition, we must determine the various constraints on voltages and currents when several electrical elements are interconnected. These are the laws of interconnection-the well-known Kirchhoff laws for voltage and current (KVL and KCL). From all these equations, we eliminate unwanted variables to obtain equation(s) relating the desired output variable(s) to the input(s). The following examples demonstrate the procedure of deriving input-output relationships for some LTI electrical systems. EXAMPLE 1.10 For the series RLC circuit of Fig. 1.34, find the input-output equation relating the input voltage x(t) to the output current (loop current) y(t).

Figure 1.34 Application of Kirchhoff's voltage law around the loop yields

By using the voltage-current laws of each element (inductor, resistor, and capacitor), we can express this equation as

Differentiating both sides of this equation, we obtain

This differential equation is the input-output relationship between the output y(t) and the input x(t). It proves convenient to use a compact notation D for the differential operator d/dt. Thus

and so on. With this notation, Eq. (1.49) can be expressed as

The differential operator is the inverse of the integral operator, so we can use the operator 1/D to represent integration. [†]

Consequently, the loop equation (1.48) can be expressed as

Multiplying both sides by D, that is, differentiating Eq. (1.54), we obtain

which is identical to Eq. (1.52). Recall that Eq. (1.55) is not an algebraic equation, and D 2 + 3D + 2 is not an algebraic term that multiplies y(t); it is an operator that operates on y(t). It means that we must perform the following operations on y(t): take the second derivative of y(t) and add to it 3 times the first derivative of y(t) and 2 times y(t). Clearly, a polynomial in D multiplied by y(t) represents a certain differential operation on y(t). EXAMPLE 1.11 Find the equation relating the input to output for the series RC circuit of Fig. 1.35 if the input is the voltage x(t) and output is a. the loop current i(t) b. the capacitor voltage y(t)

Figure 1.35 a. The loop equation for the circuit is

or

With operational notation, this equation can be expressed as

b. Multiplying both sides of Eqs. (1.58) by D (i.e., differentiating the equation), we obtain

or

Moreover,

Substitution of this result in Eq. (1.59a) yields

or

EXERCISE E1.17 For the RLC circuit in Fig. 1.34, find the input-output relationship if the output is the inductor voltage v L (t). Answers (D 2 + 3D + 2)v (t) = D 2 x(t) L EXERCISE E1.18 For the RLC circuit in Fig. 1.34, find the input-output relationship if the output is the capacitor voltage v c (t). Answers (D 2 + 3D + 2)v (t) = 2x(t) c

1.8-2 Mechanical Systems Planar motion can be resolved into translational (rectilinear) motion and rotational (torsional) motion. Translational motion will be considered first. We shall restrict ourselves to motions in one dimension. Translational Systems The basic elements used in modeling translational systems are ideal masses, linear springs, and dashpots providing viscous damping. The laws of various mechanical elements are now discussed. For a mass M (Fig. 1.36a), a force x(t) causes a motion y(t) and acceleration ÿ(t). From Newton's law of motion,

Figure 1.36: Some elements in translational mechanical systems. The force x(t) required to stretch (or compress) a linear spring (Fig. 1.36b) by an amount y(t) is given by

where K is the stiffness of the spring. For a linear dashpot (Fig. 1.36c), which operates by virtue of viscous friction, the force moving the dashpot is proportional to the relative velocity y(t) of one surface with respect to the other. Thus

where B is the damping coefficient of the dashpot or the viscous friction. EXAMPLE 1.12 Find the input-output relationship for the translational mechanical system shown in Fig. 1.37a or its equivalent in Fig. 1.37b. The input is the force x(t), and the output is the mass position y(t). In mechanical systems it is helpful to draw a free-body diagram of each junction, which is a point at which two or more elements are connected. In Fig. 1.37, the point representing the mass is a junction. The displacement of the mass is denoted by y(t). The spring is also stretched by the amount y(t), and therefore it exerts a force-Ky(t) on the mass. The dashpot exerts a force-By(t) on the mass as shown in the free-body diagram (Fig. 1.37c). By Newton's second law, the net force must be Mÿ(t). Therefore or

Figure 1.37 Rotational Systems In rotational systems, the motion of a body may be defined as its motion about a certain axis. The variables used to describe rotational motion are torque (in place of force), angular position (in place of linear position), angular velocity (in place of linear velocity), and angular acceleration (in place of linear acceleration). The system elements are rotational mass or moment of inertia (in place of mass) and torsional springs and torsional dashpots (in place of linear springs and dashpots). The terminal equations for these elements are analogous to the corresponding equations for translational elements. If J is the moment of inertia (or rotational mass) of a rotating body about a certain axis, then the external torque required for this motion is equal to J (rotational mass) times the angular acceleration. If θ is the angular position of the body, is its angular acceleration, and

Similarly, if K is the stiffness of a torsional spring (per unit angular twist), and θ is the angular displacement of one terminal of the spring with respect to the other, then

Finally, the torque due to viscous damping of a torsional dashpot with damping coefficient B is

EXAMPLE 1.13 The attitude of an aircraft can be controlled by three sets of surfaces (shown shaded in Fig. 1.38): elevators, rudder, and ailerons. By manipulating these surfaces, one can set the aircraft on a desired flight path. The roll angle φ can be controlled by deflecting in the opposite direction the two aileron surfaces as shown in Fig. 1.38. Assuming only rolling motion, find the equation relating the roll angle

φ to the input (deflection) θ.

Figure 1.38: Attitude control of an airplane. The aileron surfaces generate a torque about the roll axis proportional to the aileron deflection angle θ. Let this torque be cθ, where c . The torque available for rolling motion is then is the constant of proportionality. Air friction dissipates the torque . If J is the moment of inertia of the plane about the x axis (roll axis), then

and

or

This is the desired equation relating the output (roll angle φ) to the input (aileron angle θ). The roll velocity ω is be

. If the desired output is the roll velocity ω rather than the roll angle φ, then the input-output equation would

or

EXERCISE E1.19

Torque (t) is applied to the rotational mechanical system shown in Fig. 1.39a. The torsional spring stiffness is K; the rotational mass (the cylinder's moment of inertia about the shaft) is J; the viscous damping coefficient between the cylinder and the ground is B. Find the equation relating the output angle θ to the input torque . [Hint: A free-body diagram is shown in Fig. 1.39b.]

Figure 1.39: Rotational system. Answers or

1.8-3 Electromechanical Systems A wide variety of electromechanical systems convert electrical signals into mechanical motion (mechanical energy) and vice versa. Here we consider a rather simple example of an armaturecontrolled dc motor driven by a current source x(t), as shown in Fig. 1.40a. The torque (t) generated in the motor is proportional to the armature current x(t). Therefore

Figure 1.40: Armature-controlled dc motor. where K T is a constant of the motor. This torque drives a mechanical load whose free-body diagram is shown in Fig. 1.40b. The viscous damping (with coefficient B) dissipates a torque motor), then the net torque

must be equal to

. If J is the moment of inertia of the load (including the rotor of the :

Thus

which in conventional form can be expressed as

[†] Use of operator 1/D for integration generates some subtle mathematical difficulties because the operators D and 1/D do not

commute. For instance, we know that D(1/D) = 1 because

However, (1/D)D is not necessarily unity. Use of Cramer's rule in solving simultaneous integro-differential equations will always result in cancellation of operators 1/D and D. This procedure may yield erroneous results when the factor D occurs in the numerator as well as in the denominator. This happens, for instance, in circuits with all-inductor loops or all-capacitor cut sets. To eliminate this problem, avoid the integral operation in system equations so that the resulting equations are differential rather than integro-differential. In electrical circuits, this can be done by using charge (instead of current) variables in loops containing capacitors and choosing current variables for loops without capacitors. In the literature this problem of commutativity of D and 1/D is largely ignored. As mentioned earlier, such procedure gives erroneous results only in special systems, such as the circuits with all-inductor loops or all-capacitor cut sets. Fortunately such systems constitute a very small fraction of the systems we deal with. For further discussion of this topic and a correct method of handling problems involving integrals, see Ref. 4.

1.9 INTERNAL AND EXTERNAL DESCRIPTION OF A SYSTEM The input-output relationship of a system is an external description of that system. We have found an external description (not the internal description) of systems in all the examples discussed so far. This may puzzle the reader because in each of these cases, we derived the input-output relationship by analyzing the internal structure of that system. Why is this not an internal description? What makes a description internal? Although it is true that we did find the input-output description by internal analysis of the system, we did so strictly for convenience. We could have obtained the input-output description by making observations at the external (input and output) terminals, for example, by measuring the output for certain inputs such as an impulse or a sinusoid. A description that be obtained from measurements at the external terminals (even when the rest of the system is sealed inside an inaccessible black box) is an external description. Clearly, the input-output description is an external description. What, then, is an internal description? Internal

description is capable of providing the complete information about all possible signals in the system. An external description may not give such complete information. An external description can always be found from an internal description, but the converse is not necessarily true. We shall now give an example to clarify the distinction between an external and an internal description. Let the circuit in Fig. 1.41a with the input x(t) and the output y(t) be enclosed inside a "black box" with only the input and the output terminals accessible. To determine its external description, let us apply a known voltage x(t) at the input terminals and measure the resulting output voltage y(t).

Figure 1.41: A system that cannot be described by external measurements. Let us also assume that there is some initial charge Q o present on the capacitor. The output voltage will generally depend on both, the input x(t) and the initial charge Q o . To compute the output resulting because of the charge Q o , assume the input x(t) = O (short across the input). In this case, the currents in the two 2 Ω resistors in the upper and the lower branches at the output terminals are equal and opposite because of the balanced nature of the circuit. Clearly, the capacitor charge results in zero voltage at the outpu. [†]

Now, to compute the output y(t) resulting from the input voltage x(t), we assume zero initial capacitor charge (short across the capacitor terminals). The current i(t) (Fig. 1.41a), in this case, divides equally between the two parallel branches because the circuit is balanced. Thus, the voltage across the capacitor continues to remain zero. Therefore, for the purpose of computing the current i(t), the capacitor may be removed or replaced by a short. The resulting circuit is equivalent to that shown in Fig. 1.41b, which shows that the input x(t) sees a load of 5 Ω, and Also, because y(t) = 2i(t),

This is the total response. Clearly, for the external description, the capacitor does not exist. No external measurement or external observation can detect the presence of the capacitor. Furthermore, if the circuit is enclosed inside a "black box" so that only the external terminals are accessible, it is impossible to determine the currents (or voltages) inside the circuit from external measurements or observations. An internal description, however, can provide every possible signal inside the system. In Example 1.15, we shall find the internal description of this system and show that it is capable of determining every possible signal in the system. For most systems, the external and internal descriptions are equivalent, but there are a few exceptions, as in the present case, where the external description gives an inadequate picture of the systems. This happens when the system is uncontrollable and/or unobservable. Figure 1.42 shows structural representations of simple uncontrollable and unobservable systems. In Fig. 1.42a, we note that part of the system (subsystem S2 ) inside the box cannot be controlled by the input x(t). In Fig. 1.42b, some of the system outputs (those in subsystem S2 ) cannot be observed from the output terminals. If we try to describe either of these systems by applying an external input x(t) and then measuring the output y(t), the measurement will not characterize the complete system but only the part of the system (here S1 ) that is both controllable and observable (linked to both the input and output). Such systems are undesirable in practice and should be avoided in any system design. The system in Fig. 1.41a can be shown to be neither controllable nor observable. It can be represented structurally as a combination of the systems in Fig. 1.42a and 1.42b.

Figure 1.42: Structures of uncontrollable and unobservable systems. [†] The output voltage y(t) resulting because of the capacitor charge [assuming x(t) = O] is the zero-input response, which, as argued

above, is zero. The output component due to the input x(t) (assuming zero initial capacitor charge) is the zero-state response. Complete analysis of this problem is given later in Example 1.15.

1.10 INTERNAL DESCRIPTION: THE STATE-SPACE DESCRIPTION We shall now introduce the state-space description of a linear system, which is an internal description of a system. In this approach, we identify certain key variables, called the state variables, of the system. These variables have the property that every possible signal in the system can be expressed as a linear combination of these state variables. For example, we can show that every possible signal in a passive RLC circuit can be expressed as a linear combination of independent capacitor voltages and inductor currents, which, therefore, are state variables for the circuit. To illustrate this point, consider the network in Fig. 1.43. We identify two state variables; the capacitor voltage q 1 and the inductor current q 2 . If the values of q 1 , q 2 , and the input x(t) are known at some instant t, we can demonstrate that every possible signal (current or voltage) in the circuit can be determined at t. For example, if q 1 = 10, q 2 = 1, and the input x = 20 at some instant, the remaining voltages and currents at that instant will be

Thus all signals in this circuit are determined. Clearly, state variables consist of the key variables in a system; a knowledge of the state variables allows one to determine every possible output of the system. Note that the state-variable description is an internal description of a system because it is capable of describing all possible signals in the system.

Figure 1.43: Choosing suitable initial conditions in a network. EXAMPLE 1.14 This example illustrates how state equations may be natural and easier to determine than other descriptions, such as loop or node equations. Consider again the network in Fig. 1.43 with q 1 and q 2 as the state variables and write the state equations. This can be done by simple inspection of Fig. 1.43. Since

Also

or

, the voltage across the inductor, is given by

is the current through the capacitor,

Thus the state equations are

This is a set of two simultaneous first-order differential equations. This set of equations is known as the state equations. Once these equations have been solved for q 1 and q 2 , everything else in the circuit can be determined by using Eqs. (1.79). The set of output equations (1.79) is called the output equations. Thus, in this approach, we have two sets of equations, the state equations and the output equations. Once we have solved the state equations, all possible outputs can be obtained from the output equations. In the input-output description, an Nth-order system is described by an Nth-order equation. In the state-variable approach, the same system is described by N simultaneous first-order state equations.[†]

EXAMPLE 1.15 In this example, we investigate the nature of state equations and the issue of controllability and observability for the circuit in Fig. 1.41a. This circuit has only one capacitor and no inductors. Hence, there is only one state variable, the capacitor voltage q(t). Since C = 1 F, the capacitor current is q. There are two sources in this circuit: the input x(t) and the capacitor voltage q(t). The response due to x(t), assuming q(t) = 0, is the zero-state response, which can be found from Fig. 1.44a, where we have shorted the capacitor [q(t) = 0]. The response due to q(t) assuming x(t) = 0, is the zero-input response, which can be found from Fig. 1.44b, where we have shorted x(t) to ensure x(t) = 0. It is now trivial to find both the components. Figure 1.44a shows zero-state currents in every branch. It is clear that the input x(t) sees an effective resistance of 5 Ω, and, hence, the current through x(t) is x/5 A, which divides in the two parallel branches resulting in the current x/10 through each branch.

Figure 1.44: Analysis of a system that is neither controllable nor observable. Examining the circuit in Fig. 1.44b for the zero-input response, we note that the capacitor voltage is q and the current is q. We also observe that the capacitor sees two loops in parallel, each with resistance 4 Ω and current q/2. Interestingly, the 3 Ω branch is effectively shorted because the circuit is balanced, and thus the voltage across the terminals cd is zero. The total current in any branch is the sum of the currents in that branch in Fig. 1.44a and 1.44b (principle of superposition).

To find the state equation, we note that the current in branch ca is (x/10) + q/2 and the current in branch cb is (x/10) − q/2. Hence, the equation around the loop acba is

or

This is the desired state equation. Substitution of q = −0.5q in Eqs. (1.81) shows that every possible current and voltage in the circuit can be expressed in terms of the state variable q and the input x, as desired. Hence, the set of Eqs. (1.81) is the output equation for this circuit. Once we have solved the state equation (1.82) for q, we can determine every possible output in the circuit. The output y(t) is given by

A little examination of the state and the output equations indicates the nature of this system. The state equation (1.82) shows that the state q(t) is independent of the input x(t), and hence, the system state q cannot be controlled by the input. Moreover, Eq. (1.83) shows that the output y(t) does not depend on the state q(t). Thus, the system state cannot be observed from the output terminals. Hence, the system is neither controllable nor observable. Such is not the case of other systems examined earlier. Consider, for example, the circuit in Fig. 1.43. The state equation (1.80) shows that the states are influenced by the input directly or indirectly. Hence, the system is controllable. Moreover, as the output Eqs. (1.79) show, every possible output is expressed in terms of the state variables and the input. Hence, the states are also observable. State-space techniques are useful not just because of their ability to provide internal system description, but for several other reasons, including the following. 1. State equations of a system provide a mathematical model of great generality that can describe not just linear systems, but also nonlinear systems; not just time-invariant systems, but also time-varying parameter systems; not just SISO (single-input/single-output) systems, but also multiple-input/multiple-output (MIMO) systems. Indeed, state equations are ideally suited for the analysis, synthesis, and optimization of MIMO systems. 2. Compact matrix notation and the powerful techniques of linear algebra greatly facilitates complex manipulations. Without such features, many important results of the modern system theory would have been difficult to obtain. State equations can yield a great deal of information about a system even when they are not solved explicitly. 3. State equations lend themselves readily to digital computer simulation of complex systems of high order, with or without nonlinearities, and with multiple inputs and outputs. 4. For second-order systems (N = 2), a graphical method called phase-plane analysis can be used on state equations, whether they are linear or nonlinear. The real benefits of the state-space approach, however, are realized for highly complex systems of large order. Much of the book is devoted to introduction of the basic concepts of linear systems analysis, which must necessarily begin with simpler systems without using the state-space approach. Chapter 10 deals with the state-space analysis of linear, time invariant, continuous-time, and discretetime systems. EXERCISE E1.20

Write the state equations for the series RLC circuit shown in Fig. 1.45, using the inductor current q 1 (t) and the capacitor voltage q 2 (t) as state variables. Express every voltage and current in this circuit as a linear combination of q 1 , q 2 , and x.

Figure 1.45 Answers

[†] This assumes the system to be controllable and observable. If it is not, the input-output description equation will be of an order lower than the corresponding number of state equations.

1.11 SUMMARY A signal is a set of data or information. A system processes input signals to modify them or extract additional information from them to produce output signals (response). A system may be made up of physical components (hardware realization), or it may be an algorithm that computes an output signal from an input signal (software realization). A convenient measure of the size of a signal is its energy, if it is finite. If the signal energy is infinite, the appropriate measure is its power, if it exists. The signal power is the time average of its energy (averaged over the entire time interval from − ∞ to ∞). For periodic signals the time averaging need be performed only over one period in view of the periodic repetition of the signal. Signal power is also equal to the mean squared value of the signal (averaged over the entire time interval from t = − ∞ to ∞). Signals can be classified in several ways. 1. A continuous-time signal is specified for a continuum of values of the independent variable (such as time t). A discretetime signal is specified only at a finite or a countable set of time instants. 2. An analog signal is a signal whose amplitude can take on any value over a continuum. On the other hand, a signal whose amplitudes can take on only a finite number of values is a digital signal. The terms discrete-time and continuous-time qualify the nature of a signal along the time axis (horizontal axis). The terms analog and digital, on the other hand, qualify the nature of the signal amplitude (vertical axis). 3. A periodic signal x(t) is defined by the fact that x(t) = x(t + T0 ) for some T0 . The smallest value of T0 for which this relationship is satisfied is called the fundamental period. A periodic signal remains unchanged when shifted by an integer multiple of its period. A periodic signal x (t) can be generated by a periodic extension of any contiguous segment of x(t) of duration T0 . Finally, a periodic signal, by definition, must exist over the entire time interval − ∞ < t < ∞. A signal is aperiodic if it is not periodic. An everlasting signal starts at t = − ∞ and continues forever to t = ∞. Hence, periodic signals are everlasting signals. A causal signal is a signal that is zero for t < 0. 4. A signal with finite energy is an energy signal. Similarly a signal with a finite and nonzero power (mean square value) is a power signal. A signal can be either an energy signal or a power signal, but not both. However, there are signals that are neither energy nor power signals. 5. A signal whose physical description is known completely in a mathematical or graphical form is a deterministic signal. A

random signal is known only in terms of its probabilistic description such as mean value or mean-square value, rather than by its mathematical or graphical form. A signal x(t) delayed by T seconds (right-shifted) can be expressed as x(t − T); on the other hand, x(t) advanced by T (left-shifted) is x(t + T). A signal x(t) time-compressed by a factor a (a > 1) is expressed as x(at); on the other hand, the same signal time-expanded by factor a (a > 1) is x(t/a). The signal x(t) when time reversed can be expressed as x(− t). The unit step function u(t) is very useful in representing causal signals and signals with different mathematical descriptions over different intervals. In the classical (Dirac) definition, the unit impulse function δ(t) is characterized by unit area and is concentrated at a single instant t = 0. The impulse function has a sampling (or sifting) property, which states that the area under the product of a function with a unit impulse is equal to the value of that function at the instant at which the impulse is located (assuming the function to be continuous at the impulse location). In the modern approach, the impulse function is viewed as a generalized function and is defined by the sampling property. The exponential function e ST , where s is complex, encompasses a large class of signals that includes a constant, a monotonic exponential, a sinusoid, and an exponentially varying sinusoid. A real signal that is symmetrical about the vertical axis (t = 0) is an even function of time, and a real signal that is antisymmetrical about the vertical axis is an odd function of time. The product of an even function and an odd function is an odd function. However, the product of an even function and an even function or an odd function and an odd function is an even function. The area under an odd function from t = −a to a is always zero regardless of the value of a. On the other hand, the area under an even function from t = −a to a is two times the area under the same function from t = 0 to a (or from t = −a to 0). Every signal can be expressed as a sum of odd and even function of time. A system processes input signals to produce output signals (response). The input is the cause, and the output is its effect. In general, the output is affected by two causes: the internal conditions of the system (such as the initial conditions) and the external input. Systems can be classified in several ways. 1. Linear systems are characterized by the linearity property, which implies superposition; if several causes (such as various inputs and initial conditions) are acting on a linear system, the total output (response) is the sum of the responses from each cause, assuming that all the remaining causes are absent. A system is nonlinear if superposition does not hold. 2. In time-invariant systems, system parameters do not change with time. The parameters of time-varying-parameter systems change with time. 3. For memoryless (or instantaneous) systems, the system response at any instant t depends only on the value of the input at t. For systems with memory (also known as dynamic systems), the system response at any instant t depends not only on the present value of the input, but also on the past values of the input (values before t). 4. In contrast, if a system response at t also depends on the future values of the input (values of input beyond t), the system is noncausal. In causal systems, the response does not depend on the future values of the input. Because of the dependence of the response on the future values of input, the effect (response) of noncausal systems occurs before the cause. When the independent variable is time (temporal systems), the noncausal systems are prophetic systems, and therefore, unrealizable, although close approximation is possible with some time delay in the response. Noncausal systems with independent variables other than time (e.g., space) are realizable. 5. Systems whose inputs and outputs are continuous-time signals are continuous-time systems; systems whose inputs and outputs are discrete-time signals are discrete-time systems. If a continuous-time signal is sampled, the resulting signal is a discrete-time signal. We can process a continuous-time signal by processing the samples of the signal with a discrete-time system. 6. Systems whose inputs and outputs are analog signals are analog systems; those whose inputs and outputs are digital signals are digital systems. 7. If we can obtain the input x(t) back from the output y(t) of a system S by some operation, the system S is said to be invertible. Otherwise the system is noninvertible. 8. A system is stable if bounded input produces bounded output. This defines the external stability because it can be ascertained from measurements at the external terminals of the system. The external stability is also known as the stability in the BIBO (bounded-input/bounded-output) sense. The internal stability, discussed later in Chapter 2, is measured in terms of the internal behavior of the system. The system model derived from a knowledge of the internal structure of the system is its internal description. In contrast, an external description is a representation of a system as seen from its input and output terminals; it can be obtained by applying a known input and measuring the resulting output. In the majority of practical systems, an external description of a system so obtained is equivalent to

its internal description. At times, however, the external description fails to describe the system adequately. Such is the case with the socalled uncontrollable or unobservable systems. A system may also be described in terms of certain set of key variables called state variables. In this description, an Nth-order system can be characterized by a set of N simultaneous first-order differential equations in N state variables. State equations of a system represent an internal description of that system.

REFERENCES 1. Papoulis, A. The Fourier Integral and Its Applications. McGraw-Hill, New York, 1962. 2. Mason, S. J. Electronic Circuits, Signals, and Systems. Wiley, New York, 1960. 3. Kailath, T. Linear Systems. Prentice-Hall, Englewood Cliffs, NJ, 1980. 4. Lathi, B. P. Signals and Systems. Berkeley-Cambridge Press, Carmichael, CA, 1987.

MATLAB SESSION 1: WORKING WITH FUNCTIONS Working with functions is fundamental to signals and systems applications. MATLAB provides several methods of defining and evaluating functions. An understanding and proficient use of these methods is therefore necessary and beneficial.

M1.1 Inline Functions Many simple functions are most conveniently represented by using MATLAB inline objects. An inline object provides a symbolic representation of a function defined in terms of MATLAB operators and functions. For example, consider defining the exponentially damped sinusoid f(t) = e −t cos(2πt).

>> f = inline('exp(-t).*cos(2*pi*t)','t') f = Inline function: f(t) = exp(-t).*cos(2*pi*t) The second argument to the inline command identifies the function's input argument as t. Input arguments, such as t, are local to the inline object and are not related to any workspace variables with the same names. Once defined, f(t) can be evaluated simply by passing the input values of interest. For example, >> t = 0; >> f(t) ans = 1 evaluates f(t) at t = 0, confirming the expected result of unity. The same result is obtained by passing t = 0 directly. >> f(0) ans = 1 Vector inputs allow the evaluation of multiple values simultaneously. Consider the task of plotting f(t) over the interval (−2 ≤ t ≤ 2). Gross function behavior is clear: f(t) should oscillate four times with a decaying envelope. Since accurate hand sketches are cumbersome, MATLAB-generated plots are an attractive alternative. As the following example illustrates, care must be taken to ensure reliable results. Suppose vector t is chosen to include only the integers contained in (−2 ≤ t ≤ 2), namely [−2, −1, 0, 1, 2]. >> t = (-2:2); This vector input is evaluated to form a vector output. >> f(t) ans = 7.3891 2.7183 1.0000 0.3679 0.1353 The plot command graphs the result, which is shown in Fig. M1.1. >> plot(t,f(t)); >> xlabel('t'); ylable('f(t)'); grid;

Figure M1.1: f(t) = e −t cos (2πt) for t = (-2:2). Grid lines, added by using the grid command, aid feature identification. Unfortunately, the plot does not illustrate the expected oscillatory behavior. More points are required to adequately represent f(t). The question, then, is how many points is enough? [†] If too few points are chosen, information is lost. If too many points are chosen, memory and time are wasted. A balance is needed. For oscillatory functions, plotting 20 to 200 points per oscillation is normally adequate. For the present case, t is chosen to give 100 points per oscillation. >> t = (-2:0.01:2); Again, the function is evaluated and plotted. >> plot (t,f(t)); >> xlabel('t'); ylabel('f(t)'); grid; The result, shown in Fig. M1.2, is an accurate depiction of f(t).

Figure M1.2: f(t) = e −t cos(2πt) for t = (-2:0.01:2).

M1.2 Relational Operators and the Unit Step Function The unit step function u(t) arises naturally in many practical situations. For example, a unit step can model the act of turning on a system. With the help of relational operators, inline objects can represent the unit step function. In MATLAB, a relational operator compares two items. If the comparison is true, a logical true (1) is returned. If the comparison is false, a logical false (0) is returned. Sometimes called indicator functions, relational operators indicates whether a condition is true. Six relational operators are available: , =, ==, and ~=.

The unit step function is readily defined using the >= relational operator. >> u = inline('(t>=0)','t') u = Inline function: u(t) = (t>=0) Any function with a jump discontinuity, such as the unit step, is difficult to plot. Consider plotting u(t) by using t = (−2:2). >> t = (-2:2); >> plot (t,u(t)); >> xlable('t'); ylabel('u(t)'); Two significant problems are apparent in the resulting plot, shown in Fig. M1.3. First, MATLAB automatically scales plot axes to tightly bound the data. In this case, this normally desirable feature obscures most of the plot. Second, MATLAB connects plot data with lines, making a true jump discontinuity difficult to achieve. The coarse resolution of vector t emphasizes the effect by showing an erroneous sloping line between t = − 1 and t − 0.

Figure M1.3: u(t) for t = (−2:2). The first problem is corrected by vertically enlarging the bounding box with the axis command. The second problem is reduced, but not eliminated, by adding points to vector t. >> t = (-2:0.01:2); >> plot (t,u(t)); >> xlable('t'); ylabel('u(t)'); >> axis ([-2 2 -0.1 1.1]); The four-element vector argument of axis specifies x-axis minimum, x-axis maximum, y-axis minimum, and y-axis maximum, respectively. The improved results are shown in Fig. M1.4.

Figure M1.4: u(t) for t = (−2:0.01:2) with axis modification. Relational operators can be combined using logical AND, logical OR, and logical negation: &, |, and ~, respectively. For example, (t>0)&(t> >> >> >>

p = inline('(t>=0) & (t> g = inline('exp(-t).*cos(2*pi*t).*(t>=0)','t') g = Inline function: g(t) = exp(-t).*cos(2*pi*t).*(t>=0) A combined shifting and scaling operation is represented by g(at + b), where a and b are arbitrary real constants. As an example, consider plotting g(2t + 1) over (−2 ≤ t ≤ 2). With a = 2, the function is compressed by a factor of 2, resulting in twice the oscillations per unit t. Adding the condition b > 0, the waveform shifts to the left. Given inline function g, an accurate plot is nearly trivial to obtain. >> t = (-2:0.01:2); >> plot(t,g(2*t+1)); xlabel('t'); ylabel('g(2t+1)')'; grid; Figure M1.6 confirms the expected waveform compression and left shift. As a final check, realize that function g(·) turns on when the input argument is zero. Therefore, g(2t + 1) should turn on when 2t + 1 = 0 or at t = −0.5, a fact again confirmed by Fig. M1.6.

Figure M1.6: g(2t + 1) over (−2 ≤ t ≤ 2). Next, consider plotting g(−t + 1) over (−2 ≤ t ≤ 2). Since a < 0, the waveform will be reflected. Adding the condition b > 0, the final waveform shifts to the right >> plot(t,g(-t+1)); xlabel('t'); ylabel('g(-t+1)')'; grid; Figure M1.7 confirms both the reflection and the right shift.

Figure M1.7: g(−t + 1) over (−2 ≤ t ≤ 2). Up to this point, Figs. M1.6 and M1.7 could be reasonably sketched by hand. Consider plotting the more complicated function h(t) = g(2t + 1) + g(−t + 1) over (−2 ≤ t ≤ 2) (Fig. M1.8). In this case, an accurate hand sketch is quite difficult. With MATLAB, the work is much less burdensome. >> plot(t,g(2*t+1) +g(-t+1)); xlabel('t'); ylabel('h(t)')'; grid;

Figure M1.8: h(t) = g(2t + 1) + g(−t + 1) over (−2 ≤ t ≤ 2).

M1.4 Numerical Integration and Estimating Signal Energy Interesting signals often have nontrivial mathematical representations. Computing signal energy, which involves integrating the square of these expressions, can be a daunting task. Fortunately, many difficult integrals can be accurately estimated by means of numerical integration techniques. Even if the integration appears simple, numerical integration provides a good way to verify analytical results. To start, consider the simple signal x(t) = e −t (u(t) − u(t − 1)). The energy of x(t) is expressed as Ex = ∫ ∞−∞ |x(t)| 2 dt = ∫ 1 0 e −2t dt. Integrating yields Ex = 0.5(1 − e −2 ) ≈ 0.4323. The energy integral can also be evaluated numerically. Figure 1.27 helps illustrate the simple method of rectangular approximation: evaluate the integrand at points uniformly separated by Δt, multiply each by Δt to compute rectangle areas, and then sum over all rectangles. First, we create function x(t). >> x = inline('exp(-t).*((t>=0)&(t=0)&(t>1))','t'); Estimating Ex immediately follows. >> E_x = quad(x_squared,0,1) E_x = 0.4323 In this case, the relative error is -0.0026%. The same techniques can be used to estimate the energy of more complex signals. Consider g(t), defined previously. Energy is

expressed as Eg = ∫ ∞0 e −2t cos 2 (2πt) dt. A closed-form solution exists, but it takes some effort. MATLAB provides an answer more quickly. >> g_squared = inline('exp(-2*t).*(cos(2*pi*t).*^2).*(t>=0)','t');

Although the upper limit of integration is infinity, the exponentially decaying envelope ensures g(t) is effectively zero well before t = 100. Thus, an upper limit of t = 100 is used along with Δt = 0.001. >> t = (0:0.001:100); >> E_g = sum(g_squared(t)*0.001) E g = 0.2567 A slightly better approximation is obtained with the quad function. >> E_g = quad(g_squared, 0,100) E_g = 0.2562 As an exercise, confirm that the energy of signal h(t), defined previously, is Eh = 0.3768. [†] Sampling theory, presented later, formally addresses important aspects of this question. [†] The function f(t) = e −t cos(2πt) can never be realized in practice; it has infinite duration and, as t → −∞, infinite magnitude. [†] A comprehensive treatment of numerical integration is outside the scope of this text. Details of this particular method are not

important for the current discussion; it is sufficient to say that it is better than the rectangular approximation.

PROBLEMS 1.1.1

1.1.2

1.1.3

Find the energies of the signals illustrated in Fig. P1.1-1. Comment on the effect on energy of sign change, time shifting, or doubling of the signal. What is the effect on the energy if the signal is multiplied by k?

Figure P1.1-1 Repeat Prob. 1.1-1 for the signals in Fig. P1.1-2.

Figure P1.1-2 a. Find the energies of the pair of signals x(t) and y(t) depicted in Fig. P1.1-3a and P1.1-3b. Sketch and find the energies of signals x(t) + y(t) and x(t) − y(t).

Figure P1.1-3 Can you make any observation from these results?

1.1.4

b. Repeat part (a) for the signal pair illustrated in Fig. P1.1-3c. Is your observation in part (a) still valid? Find the power of the periodic signal x(t) shown in Fig. P1.1-4. Find also the powers and the rms values of: a. −x(t) b. 2x(t) c. cx(t).

Figure P1.1-4

1.1.5

Comment. Determine the power and the rms value for each of the following signals: a. 5 + 10 cos(100t + π/3) b. 10 cos(100t + π/3) + 16sin(150t + π/5) c. (10 + 2sin 3t)cos 10t d. 10 cos5t cos 10t e. 10 sin 5t cos 10t

1.1.6

f. e j αt cos ω0 t Figure P1.1-6 shows a periodic 50% duty cycle dc-offset sawtooth wave x(t) with peak amplitude A. Determine the energy and power of x(t).

1.1.7

Figure P1.1-6: 50% duty cycle dc-offset sawtooth wave x(t). a. There are many useful properties related to signal energy. Prove each of the following statements. In each case, let energy signal x 1 (t) have energy E|x 2 (t)], let energy signal x 2 (t) have energy E[x 2 (t)], and let T be a nonzero, finite, real-valued constant. i. Prove E[Tx1 (t)] = T2 E[x1 (t)]. That is, amplitude scaling a signal by constant T scales the signal energy by T2 .

ii. Prove E[x1 (t)] = E[x1 (t − T)]. That is, shifting a signal does not affect its energy. iii. If (x 1 (t) ≠ 0) ⇒ x 2 (t) = 0) and (x 2 (t) ≠ 0) ⇒ (x 1 (t) = 0), then prove E[x1 (t) + x 2 (t)] = E[x1 (t)] + E[x2 (t)]. That is, the energy of the sum of two nonoverlapping signals is the sum of the two individual energies. iv. Prove E[x1 (Tt)] = (1/|T|)E[x1 (t)]. That is, time-scaling a signal by T reciprocally scales the signal energy by 1/|7|. b. Consider the signal x(t) shown in Fig. P1.1-7. Outside the interval shown, x(t) is zero. Determine the signal energy E[x(t)].

1.1.8

Figure P1.1-7: Energy signal x(t). a. Show that the power of a signal

assuming all frequencies to be distinct, that is, ωi ≠ ωk for all i ≠ k.

1.1.9

b. Using the result in part (a) determine the power of each of the signals in Prob. 1.1-5. A binary signal x(t) = 0 for t < 0. For positive time, x(t) toggles between one and zero as follows: one for 1 second, zero for 1 second, one for 1 second, zero for 2 seconds, one for 1 second, zero for 3 seconds, and so forth. That is, the "on" time is always one second but the "off" time successively increases by one second between each toggle. A portion of x(t) is shown in Fig. P1.1-9. Determine the energy and power of x(t).

Figure P1.1-9: Binary signal x(t). 1.2.1

For the signal x(t) depicted in Fig. P1.2-1, sketch the signals

a. x(− t) b. x(t + 6) c. x(3t) d. x(t/2)

1.2.2

Figure P1.2-1 For the signal x(t) illustrated in Fig. P1.2-2, sketch a. x(t−4) b. x(t/1.5) c. x(−t) d. x(2t − 4) e. x(2 − t)

1.2.3

1.2.4

1.2.5

Figure P1.2-2 In Fig. P1.2-3, express signals x 1 (t), x 3 (t) x 3 (t), x 4 (t), and x 5 (t) in terms of signal x(t) and its time-shifted, time-scaled, or time-reversed versions.

Figure P1.2-3 For an energy signal x(t) with energy Ex , show that the energy of any one of the signals −x(t), x(− t), and x(t − T) is Ex .

Show also that the energy of x(at) as well as x(at − b) is Ex /a, but the energy of ax(t) is a 2 Ex . This shows that time inversion and time shifting do not affect signal energy. On the other hand, time compression of a signal (a > 1) reduces the energy, and time expansion of a signal (a < 1) increases the energy. What is the effect on signal energy if the signal is multiplied by a constant a? Define 2x(−3t+1) = t(u(−t−1)−u(−t+1)), where u(t) is the unit step function. a. Plot 2x(−3t + 1) over a suitable range of t.

1.2.6

b. Plot x(t) over a suitable range of t. Consider the signal x(t) = 2 −tu(t) where u(t) is the unit step function.

a. Accurately sketch x(t) over (−1 ≤ t ≤ 1). b. Accurately sketch y(t) = 0.5x(1 − 2t) over (−1 ≤ t ≤ 1). 1.3.1

Determine whether each of the following statements is true or false. If the statement is false, demonstrate this by proof or example. a. Every continuous-time signal is analog signal. b. Every discrete-time signal is digital signal. c. If a signal is not an energy signal, then it must be a power signal and vice versa. d. An energy signal must be of finite duration. e. A power signal cannot be causal.

1.3.2

f. A periodic signal cannot be anticausal. Determine whether each of the following statements is true or false. If the statement is false, demonstrate by proof or example why the statement is false. a. Every bounded periodic signal is a power signal. b. Every bounded power signal is a periodic signal. c. If an energy signal x(t) has energy E, then the energy of x(at) is E/a. Assume a is real and positive.

1.3.3

d. If a power signal x(t) has power P, then the power of x(at) is P/a. Assume a is real and positive. Given x 1 (t) = cos(t), x 2 (t) = sin(πt), and x 3 (t) = x 1 (t) + x 2 (t). a. Determine the fundamental periods T1 and T2 of signals x 1 (t) and x 2 (t). b. Show that x 3 (t) is not periodic, which requires T3 = k 1 T1 = k 2 T2 for some integers k 1 and k 2 .

c. Determine the powers Px1 , Px2 , and Px3 of signals x 1 (t), x 2 (t), and x 3 (t).

1.3.4

For any constant ω, is the function f(t) = sin (ωt) a periodic function of the independent variable t? Justify your answer.

1.3.5

The signal shown in Fig. P1.3-5 is defined as

Figure P1.3-5: Energy signal x(t). The energy of x(t) is E ≈ 1.0417. a. What is the energy of y 1 (t) = (⅓)x(2t)?

b. A periodic signal y 2 (t) is defined as

What is the power of y 2 (t)?

1.3.6

c. What is the power of y 3 (t) = (⅓)y 2 (2t)? Let y 1 (t) = y 2 (t) = t2 over 0 ≤ t ≤ 1. Notice, this statement does not require y 1 (t) = y 2 (t) for all t. a. Define y 1 (t) as an even, periodic signal with period T1 = 2. Sketch y 1 (t) and determine its power. b. Design an odd, periodic signal y 2 (t) with period T2 = 3 and power equal to unity. Fully describe y 2 (t) and sketch the signal over at least one full period. [Hint: There are an infinite number of possible solutions to this problem-you need to find only one of them!] c. We can create a complex-valued function y 3 (t) = y 1 (t) + jy 2 (t). Determine whether this signal is periodic. If yes, determine the period T3 . If no, justify why the signal is not periodic. d. Determine the power of y 3 (t) defined in part (c). The power of a complex-valued function z(t) is

1.4.1

Sketch the following signal: a. u(t − 5) − u(t − 7) b. u(t − 5) − u(t − 7) c. t2 [u(t − 1) − u(t − 2)]

1.4.2

1.4.3

d. (t − 4)[u(t − 2) − u(t − 4)] Express each of the signals in Fig. P1.4-2 by a single expression valid for all t.

Figure P1.4-2 Simplify the following expressions:

a.

b. c. [e −t cos(3t − 60°)]δ(t)

d.

e.

f.

1.4.4

[Hint: Use Eq. (1.23). For part (f) use L'Hôpital's rule.] Evaluate the following integrals: a. ∫ ∞−∞ δ(τ)x(t−τ)dτ b. ∫ ∞−∞ x(τ)δ(t−τ)dτ c. ∫ ∞−∞ δ(t)e −jωt dt d. ∫ ∞−∞ δ(2t−3)πtdt e. ∫ ∞−∞ δ (t + 3)ee −1 dt f. ∫ ∞−∞ (t 3 +4) δ (1−t) dt g. ∫ ∞−∞ x (2−t)δ (3−t)dt

h.

1.4.5

1.4.6

a. Find and sketch dx/dt for the signal x(t) shown in Fig. P1.2-2. b. Find and sketch d 2 x/dt2 for the signal x(t) depicted in Fig. P1.4-2a. Find and sketch ∫ t −∞ x(t) dt for the signal x(t) illustrated in Fig. P1.4-6.

Figure P1.4-6

1.4.7

Using the generalized function definition of impulse [Eq. (1.24a)], show that δ(t) is an even function of t.

1.4.8

Using the generalized function definition of impulse [Eq. (1.24a)], show that

1.4.9

1.4.10

Show that

where φ(t) and are continuous at t = 0, and φ(t) → 0 as t → ±∞. This integral defines function. [Hint: Use integration by parts.]

A sinusoid e σt cos ωt can be expressed as a sum of exponentials e st and e st [Eq. (1.30c)] with complex frequencies s = σ + jω and s = σ − jω. Locate in the complex plane the frequencies of the following sinusoids: a. cos 3t b. e −3t cos 3t c. e 2t cos 3t d. e −2t e. e 2t f. 5

1.5.1

as a generalized

Find and sketch the odd and the even components of the following: a. u(t) b. tu(t) c. sin ω0 t d. cos ω0 t e. cos (ω0 t + θ) f. sin ω0 tu(t) g. cos ω0 tu(t)

1.5.2

a. Determine even and odd components of the signal x(t) = e −2t u(t). b. Show that the energy of x(t) is the sum of energies of its odd and even components found in part (a).

1.5.3

c. Generalize the result in part (b) for any finite energy signal. a. If x e (t) and x 0 (t) are even and the odd components of a real signal x(t), then show that

b. Show that

1.5.4

1.5.5

1.5.6

An aperiodic signal is defined as x(t) = sin (πt)u(t), where u(t) is the continuous-time step function. Is the odd portion of this signal, x 0 (t), periodic? Justify your answer. An aperiodic signal is defined as x(t) = cos (πt)u(t), where u(t) is the continuous-time step function. Is the even portion of this signal, x e (t), periodic? Justify your answer. Consider the signal x(t) shown in Fig. P1.5-6. a. Determine and carefully sketch v(t) = 3x(-(1/2)(t + 1). b. Determine the energy and power of v(t). c. Determine and carefully sketch the ever portion of v(t), v e (t). d. Let a = 2 and b = 3, sketch v(at + b), v(at) + b, av(t + b), and av(t) + b. e. Let a = −3 and b = −2, sketch v(at + b), v(at) + b, av(t + b), and av(t) + b.

1.5.7

Figure P1.5-6: Input x(t). Consider the signal y(t) = ( )x(−2t − 3) shown in Figure P1.5-7. a. Does y(t) have an odd portion, y 0 (t)? If so, determine and carefully sketch y 0 (t). Otherwise, explain why no odd portion exists. b. Determine and carefully sketch the original signal x(t).

1.5.8

Figure P1.5-7: y(t) =

x(−2t − 3).

Consider the signal -(1/2)x(−3t + 2) show in Fig. P1.5-8. a. Determine and carefully sketch the original signal x(t). b. Determine and carefully sketch the even portion of the original signal x(t).

c. Determine and carefully sketch the odd portion of the original signal x(t).

1.5.9

1.5.10

1.5.11

Figure P1.5-8: -1/2x(−3t + 2). The conjugate symmetric (or Hermitian) portion of a signal is defined as w cs(t) = (w(t) + w*(−t))/2. Show that the real portion of w cs(t) is even and that the imaginary portion of w cs(t) is odd. The conjugate antisymmetric (or skew-Hermitian) portion of a signal is defined as w cs(t) = (w(t) + w*(−t))/2. Show that the real portion of w ca(t) is even and that the imaginary portion of w cs(t) is even. Figure P1.5-11 plots a complex signal w(t) in the complex plane over the time range (0 ≤ t ≤ 1). The time t = 0 corresponds with the origin, while the time t = 1 corresponds with the point (2,1). a. In the complex plane, plot w(t) over (−1 ≤ t ≤ 1) if: i. w(t) is an even signal. ii. w(t) is an odd signal. iii. w(t) is a conjugate symmetric signal. [Hint: See Prob. 1.5-9.] iv. w(t) is a conjugate antisymmetric signal. [Hint: See Prob. 1.5-10.] b. In the complex plane, plot as much of w(3t) as possible.

1.5.12

Figure P1.5-11: w(t) for (0 ≤ t ≤ 1). Define complex signal x(t) = t 2 (1 + j) over interval (1 ≤ t ≤ 2). The remaining portion is defined such that x(t) is a minimum-energy, skew-Hermitian signal. a. Fully describe x(t) for all t. b. Sketch y(t) = Re{x(t)} versus the independent variable t. c. Sketch z(t) = Re{jx(−2t + 1)} versus the independent variable t. d. Determine the energy and power of x(t).

1.6.1

1.6.2

Write the input-output relationship for an ideal integrator. Determine the zero-input and zero-state components of the response. A force x(t) acts on a ball of mass M (Fig. P1.6-2). Show that the velocity v(t) of the ball at any instant t > 0 can be determined if we know the force x(t) over the interval from 0 to t and the ball's initial velocity v(0).

Figure P1.6-2 1.7.1

For the systems described by the following equations, with the input x(t) and output y(t), determine which of the systems are linear and which are nonlinear. a.

b. c. 3 y(t) +2 = x(t) d.

e.

f.

g.

1.7.2

h. y(t) = ∫ t −∞ x (τ) d τ For the systems described by the following equations, with the input x(t) and output y(t), explain with reasons which of the systems are time-invariant parameter systems and which are time-varying-parameter systems. a. y(t) = x(t − 2) b. y(t) = x(−t) c. y(t) = x(at) d. y(t) = tx(t−2) e. y(t) = ∞ 5 −5 x(τ)dτ

f.

1.7.3

For a certain LTI system with the input x(t), the output y(t) and the two initial conditions q 1 (0) and q 2 (0), following observations were made: Open table as spreadsheet x(t)

q1 (0)

q2 (0)

y(t)

0

1

−1

e −t u(t)

0

2

1

e −t (3t + 2)u(t)

u(t)

−1

−1

2u(t)

Determine y(t) when both the initial conditions are zero and the input x(t) is as shown in Fig. P1.7-3. [Hint: There are three causes: the input and each of the two initial conditions. Because of the linearity property, if a cause is increased by a factor k, the response to that cause also increases by the same factor k. Moreover, if causes are added, the corresponding responses add.]

1.7.4

1.7.5

1.7.6

1.7.7

Figure P1.7-3 A system is specified by its input-output relationship as

Show that the system satisfies the homogeneity property but not the additivity property. Show that the circuit in Fig. P1.7-5 is zero-state linear but not zero-input linear. Assume all diodes to have identical (matched) characteristics. The output is the current y(t).

Figure P1.7-5 The inductor L and the capacitor C in Fig. P1.7-6 are nonlinear, which makes the circuit nonlinear. The remaining three elements are linear. Show that the output y(t) of this nonlinear circuit satisfies the linearity conditions with respect to the input x(t) and the initial conditions (all the initial inductor currents and capacitor voltages).

Figure P1.7-6 For the systems described by the following equations, with the input x(t) and output y(t), determine which are causal and which are noncausal. a. y(t) = x(t − 2) b. y(t) = x(− t) c. y(t) = x(at) a > 1

1.7.8

d. y(t) = x(at) a < 1 For the systems described by the following equations, with the input x(t) and output y(t), determine which are invertible and which are noninvertible. For the invertible systems, find the input-output relationship of the inverse system.

a. y(t) = ∫ t −∞ x (τ) d τ b. y(t) = x n (t) x(t) real and n integer c. d. y(t) = x (3t−6) e. y(t) = cos [x(t)]

1.7.9

f. y(t)= e x(t) x(t) real Consider a system that multiplies a given input by a ramp function, r(t) = tu(t). That is, y(t) = x(t)r(t). a. Is the system linear? Justify your answer. b. Is the system memoryless? Justify your answer. c. Is the system causal? Justify your answer.

1.7.10

d. Is the system time invariant? Justify your answer. A continuous-time system is given by

Recall that δ(t) designates the Dirac delta function. a. Explain what this system does. b. Is the system BIBO stable? Justify your answer. c. Is the system linear? Justify your answer. d. Is the system memoryless? Justify your answer. e. Is the system causal? Justify your answer.

1.7.11

f. Is the system time invariant? Justify your answer. A system is given by

a. Is the system BIBO stable? [Hint: Let system input x(t) be a square wave.] b. Is the system linear? Justify your answer. c. Is the system memoryless? Justify your answer. d. Is the system causal? Justify your answer.

1.7.12

e. Is the system time invariant? Justify your answer. A system is given by

a. Is the system BIBO stable? Justify your answer. b. Is the system linear? Justify your answer. c. Is the system memoryless? Justify your answer. d. Is the system causal? Justify your answer.

1.7.13

e. Is the system time invariant? Justify your answer. Figure P1.7-13 displays an input x 1 (t) to a linear time-invariant (LTI) system H, the corresponding output y 1 (t), and a

second input x 2 (t). a. Bill suggests that x 2 (t) = 2x 1 (3t) − x 1 (t − 1). Is Bill correct? If yes, prove it. If not, correct his error. b. Hoping to impress Bill, Sue wants to know the output y 2 (t) in response to the input x 2 (t). Provide her with an expression for y 2 (t) in terms of y 1 (t). Use MATLAB to plot y 2 (t).

Figure P1.7-13: 1.8.1

1.8.2

1.8.3

1.8.4

and x 2 (t).

For the circuit depicted in Fig. P1.8-1, find the differential equations relating outputs y 1 (t) and y 2 (t) to the input x(t).

Figure P1.8-1 Repeat Prob. 1.8-1 for the circuit in Fig. P1.8-2.

Figure P1.8-2 A simplified (one-dimensional) model of an automobile suspension system is shown in Fig. P1.8-3. In this case, the input is not a force but a displacement x(t) (the road contour). Find the differential equation relating the output y(t) (auto body displacement) to the input x(t) (the road contour).

Figure P1.8-3 A field-controlled dc motor is shown in Fig. P1.8-4. Its armature current ia is maintained constant. The torque generated by this motor is proportional to the field current ij (torque = Kf if ). Find the differential equation relating the output position θ to the input voltage x(t). The motor and load together have a moment of inertia J.

1.8.5

1.8.6

Figure P1.8-4 Water flows into a tank at a rate of q i units/s and flows out through the outflow valve at a rate of q 0 units/s (Fig. P1.8-5). Determine the equation relating the outflow q 0 to the input q i . The outflow rate is proportional to the head h. Thus q 0 = Rh, where R is the valve resistance. Determine also the differential equation relating the head h to the input q i . [Hint: The net inflow of water in time Δt is (q i − q 0 )Δt. This inflow is also AΔh where A is the cross section of the tank.]

Figure P1.8-5 Consider the circuit shown in Fig. P1.8-6, with input voltage x(t) and output currents y 1 (t), y 2 (t), and y 3 (t). a. What is the order of this system? Explain your answer. b. Determine the matrix representation for this system. c. Use Cramer's rule to determine the output current y 3 (t) for the input voltage x(t) = (2 − | cos(t)|)u(t − 1).

Figure P1.8-6: Resistor circuit. 1.10.1

1.10.2

Write state equations for the parallel RLC circuit in Fig. P1.8-2. Use the capacitor voltage q 1 and the inductor current q 2 as your state variables. Show that every possible current or voltage in the circuit can be expressed in terms of q 1 , q 2 and the input x(t) Write state equations for the third-order circuit shown in Fig. P1.10-2, using the inductor currents q 1 , q 2 and the capacitor voltage q 3 as state variables. Show that every possible voltage or current in this circuit can be expressed as a linear combination of q 1 , q 2 , q 3 , and the input x(t). Also, at some instant t it was found that q 1 = 5, q 2 = 1, q 3 = 2, and x = 10. Determine the voltage across and the current through every element in this circuit.

Figure P1.10-2

Chapter 2: Time-Domain Analysis of Continuous-Time Systems In this book we consider two methods of analysis of linear time-invariant (LTI) systems: the time-domain method and the frequency-domain method. In this chapter we discuss the time-domain analysis of linear, time-invariant, continuous-time (LTIC) systems.

2.1 INTRODUCTION For the purpose of analysis, we shall consider linear differential systems. This is the class of LTIC systems introduced in Chapter 1, for which the input x(t) and the output y(t) are related by linear differential equations of the form

where all the coefficients a i and b i are constants. Using operational notation D to represent d/dt, we can express this equation as

or

where the polynomials Q(D) and P(D) are

Theoretically the powers M and N in the foregoing equations can take on any value. However, practical considerations make M > N undesirable for two reasons. In Section 4.3-2, we shall show that an LTIC system specified by Eq. (2.1) acts as an (M − N)th-order differentiator. A differentiator represents an unstable system because a bounded input like the step input results in an unbounded output, δ (t). Second, the noise is enhanced by a differentiator. Noise is a wideband signal containing components of all frequencies from 0 to a very high frequency approaching

∞ [†] . Hence, noise contains a significant amount of rapidly varying components. We know that the derivative of any rapidly varying signal is high. Therefore, any system specified by Eq. (2.1) in which M > N will magnify the high-frequency components of noise through differentiation. It is entirely possible for noise to be magnified so much that it swamps the desired system output even if the noise signal at the system's input is tolerably small. Hence, practical systems generally use M ≤ N. For the rest of this text we assume implicitly that M ≤ N. For the sake of generality, we shall assume M = N in Eq. (2.1). In Chapter 1, we demonstrated that a system described by Eq. (2.1) is linear. Therefore, its response can be expressed as the sum of two

components: the zero-input component and the zero-state component (decomposition property).[‡] Therefore,

The zero-input component is the system response when the input x(t) = 0, and thus it is the result of internal system conditions (such as energy storages, initial conditions) alone. It is independent of the external input x(t). In contrast, the zero-state component is the system response to the external input x(t) when the system is in zero state, meaning the absence of all internal energy storages: that is, all initial conditions are zero. [†] Noise is any undesirable signal, natural or man-made, that interferes with the desired signals in the system. Some of the sources of noise are the electromagnetic radiation from stars, the random motion of electrons in system components, interference from nearby radio and television stations, transients produced by automobile ignition systems, and fluorescent lighting. [‡] We can verify readily that the system described by Eq. (2.1) has the decomposition property. If y (t) is the zero-input response, then, by definition, 0

If y(t) is the zero-state response, then y(t) is the solution of subject to zero initial conditions (zero-state). Adding these two equations, we have Clearly, y 0 (t)+y(t) is the general solution of Eq. (2.1).

2.2 SYSTEM RESPONSE TO INTERNAL CONDITIONS: THE ZERO-INPUT RESPONSE The zero-input response y 0 (t) is the solution of Eq. (2.1) when the input x(t) = 0 so that

or

A solution to this equation can be obtained systematically. [1] However, we will take a shortcut by using heuristic reasoning. Equation (2.4b) shows that a linear combination of y 0 (t) and its N successive derivatives is zero, not at some values of t, but for all t. Such a result is possible if and only if y 0 (t) and all its N successive derivatives are of the same form. Otherwise their sum can never add to zero for all values of t. We know that only an exponential function e λt has this property. So let us assume that

is a solution to Eq. (2.4b). Then

Substituting these results in Eq. (2.4b), we obtain For a nontrivial solution of this equation,

This result means that ceλt is indeed a solution of Eq. (2.4), provided λ satisfies Eq. (2.5a). Note that the polynomial in Eq. (2.5a) is identical to the polynomial Q(D) in Eq. (2.4), with λ replacing D. Therefore, Eq. (2.5a) can be expressed as

When Q (λ) is expressed in factorized form, Eq. (2.5b) can be represented as

Clearly, λ has N solutions: λ1 , λ2 ,..., λN, assuming that all λi , are distinct. Consequently, Eq. (2.4) has N possible solutions: c 1 e λ 1 t , c 2 e ? 2 t ,..., c Ne λ N t , with c 1 , c 2 ,..., c N as arbitrary constants. We can readily show that a general solution is given by the sum of these N solutions,[†]

so that

where c 1 , c 2 ,..., c N are arbitrary constants determined by N constraints (the auxiliary conditions) on the solution. Observe that the polynomial Q(λ), which is characteristic of the system, has nothing to do with the input. For this reason the polynomial Q(λ) is called the characteristic polynomial of the system. The equation

is called the characteristic equation of the system. Equation (2.5c) clearly indicates that ? 1 , ? 2 ,...,λN are the roots of the characteristic equation; consequently, they are called the characteristic roots of the system. The terms characteristic values, eigenvalues, and natural frequencies are also

used for characteristic roots. [†] The exponentials e λ it (i = 1, 2,..., n) in the zero-input response are the characteristic modes (also known as natural modes or simply as modes) of the system. There is a characteristic mode for each characteristic root of the system, and the zero-input response is a linear combination of the characteristic modes of the system. An LTIC system's characteristic modes comprise its single most important attribute. Characteristic modes not only determine the zero-input response but also play an important role in determining the zero-state response. In other words, the entire behavior of a system is dictated primarily by its characteristic modes. In the rest of this chapter we shall see the pervasive presence of characteristic modes in every aspect of system behavior. REPEATED ROOTS The solution of Eq. (2.4) as given in Eq. (2.6) assumes that the N characteristic roots ? 1 , ? 2 ,..., λN are distinct. If there are repeated roots (same root occurring more than once), the form of the solution is modified slightly. By direct substitution we can show that the solution of the equation is given by In this case the root λ repeats twice. Observe that the characteristic modes in this case are e λt and teλt . Continuing this pattern, we can show that for the differential equation

the characteristic modes are e λt , teλt , t 2 e ?t ,..., tr−1 e λt , and that the solution is

Consequently, for a system with the characteristic polynomial the characteristic modes are e λ 1 t , te? 1 t ,..., tr−1 e λ 1 t , e λ r+1 t ,..., e λ N t and the solution is COMPLEX ROOTS The procedure for handling complex roots is the same as that for real roots. For complex roots the usual procedure leads to complex characteristic modes and the complex form of solution. However, it is possible to avoid the complex form altogether by selecting a real form of solution, as described next. For a real system, complex roots must occur in pairs of conjugates if the coefficients of the characteristic polynomial Q(λ) are to be real. Therefore, if α + jβ is a characteristic root, α − jβ must also be a characteristic root. The zero-input response corresponding to this pair of complex conjugate roots is

For a real system, the response y 0 (t) must also be real. This is possible only if c 1 and c 2 are conjugates. Let

This yields

Therefore, the zero-input response corresponding to complex conjugate roots α ± jβ can be expressed in a complex form (2.10a) or a real form (2.10b). EXAMPLE 2.1 a. Find y 0 (t), the zero-input component of the response for an LTIC system described by the following differential equation: when the initial conditions are (D 2 + 3D + 2)y 0 (t) = 0.

. Note that y 0 (t), being the zero-input component (x(t) = 0), is the solution of

The characteristic polynomial of the system is λ2 + 3λ + 2. The characteristic equation of the system is therefore λ2 + 3λ + 2 = (λ + 1)

(λ + 2) = 0. The characteristic roots of the system are λ1 = −1 and λ2 = −2, and the characteristic modes of the system are e −t and e −2t . Consequently, the zero-input response is

To determine the arbitrary constants c 1 and c 2 , we differentiate Eq. (2.11a) to obtain

Setting t = 0 in Eqs. (2.11a) and (2.11b), and substituting the initial conditions y 0 (0) = 0 and

we obtain

Solving these two simultaneous equations in two unknowns for c 1 and c 2 yields Therefore This is the zero-input component of y(t). Because y 0 (t) is present at t = 0 − , we are justified in assuming that it exists for t ≥ 0.[†] b. A Similar procedure may be followed for repeated roots. For instance, for a system specified by let us determine y 0 (t), the zero-input component of the response if the initial conditions are y 0 (0) = 3 and

.

The characteristic polynomial is λ2 + 6λ + 9 = (λ + 3) 2 , and its characteristic roots are λ1 = −3, λ2 = −3 (repeated roots). Consequently, the characteristic modes of the system are e −3t and te3t . The zero-input response, being a linear combination of the characteristic modes, is given by We can find the arbitrary constants c 1 and c 2 from the initial conditions y 0 (0) = 3 and The reader can show that c 1 = 3 and c 2 = 2. Hence,

following the procedure in part (a).

c. For the case of complex roots, let us find the zero-input response of an LTIC system described by the equation with initial conditions y 0 (0) = 2 and

.

The characteristic polynomial is λ2 + 4λ + 40 = (λ + 2 − j6)(λ + 2 + j6). The characteristic roots are −2 ± j6.[†] The solution can be

written either in the complex form [Eq. (2.10a)] or in the real form [Eq. (2.10b)]. The complex form is y 0 (t) = c 1 e λ 1 t + c 2 e λ 2 t , where λ1 = −2 + j6 and λ2 = −2 − j6. Since α = −2 and β = 6, the real form solution is [see Eq. (2.10b)]

where c and θ are arbitrary constants to be determined from the initial conditions y 0 (0) = 2 and (2.12a) yields

Setting t = 0 in Eqs. (2.12a) and (2.12b), and then substituting initial conditions, we obtain

Solution of these two simultaneous equations in two unknowns c cos θ and c sin θ yields

Squaring and then adding the two sides of Eqs. (2.13) yields Next, dividing Eq. (2.13b) by Eq. (2.13a), that is, dividing c sin θ, by c cos θ, yields

and

Therefore

For the plot of y 0 (t), refer again to Fig. B.11c. COMPUTER EXAMPLE C2.1 Find the roots λ1 and λ2 of the polynomial λ2 + 4λ + k for three values of k : a. k = 3 b. k = 4 c. k = 40 >> r = roots ([1 4 3]); >> disp (['Case (k=3): roots = [',num2str(r.'),']']); Case (k=3): roots = [-3 -1] For k = 3, the polynomial roots are therefore λ1 = −3 and λ2 = −1. >> r = roots ([1 4 4]); >> disp (['Case (k=4): roots = [',num2str(r.'),']']); Case (k=4): roots = [-2 -2] For k = 4, the polynomial roots are therefore λ1 = λ2 = −2.

Differentiation of Eq.

>> r = roots ([1 4 40]); >> disp (['Case (k=40): roots = [',num2str(r.',' %0.5g'),']']); Case (k=40): roots = [-2+6i -2-6i] For k = 40, the polynomial roots are therefore λ1 = −2 + j6 and λ2 = −2 − j6. COMPUTER EXAMPLE C2.2 Consider an LTIC system specified by the differential equation Using initial conditions y 0 (0) = 3 and

, determine the zero-input component of the response for three values of k :

a. k = 3 b. k = 4 c. k = 40 >> y_0 = dsolve('D2y + 4*Dy + 3*y = 0','y(0) = 3','Dy(0) = -7','t'); >> disp(['(a) k = 3; y_0 = ',char(y_0)]) (a) k = 3; y 0 = 2*exp(-3*t) + exp(-t) For k = 3, the zero-input response is therfore y 0 (t) = 2e −3t + e −1 . >> y_0 = dsolve('D2y + 4*Dy + 4*y = 0','y(0) = 3','Dy(0) = -7','t'); >> disp(['(b) k = 4; y_0 = ',char(y_0)]) (b) k = 4; y 0 = 3*exp(-2*t) -exp(-2*t)*t For k = 4, the zero-input response is therfore y 0 (t) = 3e −2t − te−2t . >> y_0 = dsolve('D2y + 4*Dy + 40*y = 0','y(0) = 3','Dy(0) = -7','t'); >> disp(['(c) k = 40; y_0 = ',char(y_0)]) (c) k = 40; y 0 = -1/6*exp(-2*t) *sin(6*t) + 3*exp(-2*t)*cos(6*t) For k = 40, the zero-input response is therfore

EXERCISE E2.1

Find the zero-input response of an LTIC system described by (D + 5) y (t) = x(t) if the initial condition is y(0) = 5.

Answers y (t) = 5e −5t t ≥ 0 0 EXERCISE E2.2 Solve (D 2 + 2D)y 0 (t) = 0 if y 0 (0) = 1 and Answers y (t) = 3 −2e −2t t ≥ 0 0 PRACTICAL INITIAL CONDITIONS AND THE MEANING OF 0 − AND 0 + In Example 2.1 the initial conditions y 0 (0) and were supplied. In practical problems, we must derive such conditions from the physical situation. For instance, in an RLC circuit, we may be given the conditions (initial capacitor voltages, initial inductor currents, etc.). From this information, we need to derive y 0 (0)

, for the desired variable as demonstrated in the next example.

In much of our discussion, the input is assumed to start at t = 0, unless otherwise mentioned. Hence, t = 0 is the reference point. The conditions immediately before t = 0 (just before the input is applied) are the conditions at t = 0 -, and those immediately after t = 0 (just after the input is applied)

are the conditions at t = 0 + (compare this with the historical time frame B.C. and A.D.). In practice, we are likely to know the initial conditions at t =

0 − rather than at t = 0 + . The two sets of conditions are generally different, although in some cases they may be identical.

The total response y(t) consists of two components: the zero-input component y 0 (t) [response due to the initial conditions alone with x(t) = 0] and the zero-state component resulting from the input alone with all initial conditions zero. At t = 0 − , the total response y(t) consists solely of the zero-

input component y 0 (t) because the input has not started yet. Hence the initial conditions on y(t) are identical to those of y 0 (t). Thus, y(0 − ) = y 0 (0 − ), , and so on. Moreover, y 0 (t) is the response due to initial conditions alone and does not depend on the input x(t). Hence, application of the input at t = 0 does not affect y 0 (t). This means the initial conditions on y 0 (t) at t = 0 − and 0 + are identical; that is y 0 (0 -),

are identical to y 0 (0 + ), , respectively. It is clear that for y 0 (t), there is no distinction between the initial conditions at t = 0 − , 0 and 0 + . They are all the same. But this is not the case with the total response y(t), which consists of both the zero-input and the zero-state components. Thus, in general, y(0 − ) ≠ y(0 + )

, and so on.

EXAMPLE 2.2 A voltage x(t) = 10e −3t u(t) is applied at the input of the RLC circuit illustrated in Fig. 2.1a. Find the loop current y(t) for t ≥ 0 if the initial inductor current is zero; that is, y(0 − ) = 0 and the initial capacitor voltage is 5 volts; that is, υc (0 − ) = 5.

Figure 2.1 The differential (loop) equation relating y(t) to x(t) was derived in Eq. (1.55) as The zero-state component of y(t) resulting from the input x(t), assuming that all initial conditions are zero, that is, y(0 − ) = υc (0 − ) = 0, will be obtained later in Example 2.6. In this example we shall find the zero-input component y 0 (t). For this purpose, we need two initial conditions y 0 (0) and . − − These conditions can be derived from the given initial conditions, y(0 ) = 0 and υc (0 ) = 5, as follows. Recall that y 0 (t) is the loop current when the input terminals are shorted so that the input x(t) = 0 (zero-input) as depicted in Fig. 2.1b. , the values of the loop current and its derivative at t = 0, from the initial values of the inductor current and the We now compute y 0 (0) and capacitor voltage. Remember that the inductor current cannot change instantaneously in the absence of an impulsive voltage. Similarly, the capacitor voltage cannot change instantaneously in the absence of an impulsive current. Therefore, when the input terminals are shorted at t = 0, the inductor current is still zero and the capacitor voltage is still 5 volts. Thus, To determine , we use the loop equation for the circuit in Fig. 2.1b. Because the voltage across the inductor is L(dy0 /dt) or can be written as follows: Setting t = 0, we obtain But y 0 (0) = 0 and v c (0) = 5. Consequently, Therefore, the desired initial conditions are

, this equation

Thus, the problem reduces to finding y 0 (t), the zero-input component of y(t) of the system specified by the equation (D 2 + 3D + 2)y(t) = Dx(t), when the initial conditions are y 0 (0) = 0 and . We have already solved this problem in Example 2.1a, where we found

This is the zero-input component of the loop current y(t). It will be interesting to find the initial conditions at t = 0 − and 0 + for the total response y(t). Let us compare y(0 − ) and

with y(0 + ) and

The two pairs can be compared by writing the loop equation for the circuit in Fig. 2.1a at t = 0 − and t = 0 + . The only difference between the two situations is that at t = 0 − , the input x(t) = 0, whereas at t = 0 + , the input x(t) = 10 [because x(t) = 10e −3t ]. Hence, the two loop equations are

.

The loop current y(0 + ) = y0 − ) = 0 because it cannot change instantaneously in the absence of impulsive voltage. The same is true of the capacitor voltage. Hence, υc (0 + ) = υc (0 − ) = 5. Substituting these values in the foregoing equations, we obtain

and

Thus

EXERCISE E2.3 In the circuit in Fig. 2.1a, the inductance L = 0 and the initial capacitor voltage v c (0) = 30 volts. Show that the zero-input component of the loop current is given by y 0 (t) = −10e −2t/3 for t ≥ 0. INDEPENDENCE OF ZERO-INPUT AND ZERO-STATE RESPONSE In Example 2.2 we computed the zero-input component without using the input x(t). The zero-state component can be computed from the knowledge of the input x(t) alone; the initial conditions are assumed to be zero (system in zero state). The two components of the system response (the zero-input and zero-state components) are independent of each other. The two worlds of zero-input response and zero-state response coexist side by side, neither one knowing or caring what the other is doing. For each component, the other is totally irrelevant. ROLE OF AUXILIARY CONDITIONS IN SOLUTION OF DIFFERENTIAL EQUATIONS Solution of a differential equation requires additional pieces of information (the auxiliary conditions). Why? We now show heuristically why a differential equation does not, in general, have a unique solution unless some additional constraints (or conditions) on the solution are known. Differentiation operation is not invertible unless one piece of information about y(t) is given. To get back y(t) from dy/dt, we must know one piece of information, such as y(0). Thus, differentiation is an irreversible (noninvertible) operation during which certain information is lost. To invert this operation, one piece of information about y(t) must be provided to restore the original y(t). Using a similar argument, we can show that, given d 2 y/dt2 , we can determine y(t) uniquely only if two additional pieces of information (constraints) about y(t) are given. In general, to determine y(t) uniquely from its Nth derivative, we need N additional pieces of information (constraints) about y(t). These constraints are also called auxiliary conditions. When these conditions are given at t = 0, they are called initial conditions.

2.2-1 Some Insights into the Zero-Input Behavior of a System By definition, the zero-input response is the system response to its internal conditions, assuming that its input is zero. Understanding this phenomenon provides interesting insight into system behavior. If a system is disturbed momentarily from its rest position and if the disturbance is then removed, the system will not come back to rest instantaneously. In general, it will come back to rest over a period of time and only through a

special type of motion that is characteristic of the system.[†] For example, if we press on an automobile fender momentarily and then release it at t =

0, there is no external force on the automobile for t > 0.[‡] The auto body will eventually come back to its rest (equilibrium) position, but not through any arbitrary motion. It must do so by using only a form of response that is sustainable by the system on its own without any external source, since the input is zero. Only characteristic modes satisfy this condition. The system uses a proper combination of characteristic modes to come back to the rest position while satisfying appropriate boundary (or initial) conditions. If the shock absorbers of the automobile are in good condition (high damping coefficient), the characteristic modes will be monotonically decaying exponentials, and the auto body will come to rest rapidly without oscillation. In contrast, for poor shock absorbers (low damping coefficients), the characteristic modes will be exponentially decaying sinusoids, and the body will come to rest through oscillatory motion. When a series RC circuit with an initial charge on the capacitor is shorted, the capacitor will start to discharge exponentially through the resistor. This response of the RC circuit is caused entirely by its internal conditions and is sustained by this system without the aid of any external input. The exponential current waveform is therefore the characteristic mode of the RC circuit. Mathematically we know that any combination of characteristic modes can be sustained by the system alone without requiring an external input. This fact can be readily verified for the series RL circuit shown in Fig. 2.2. The loop equation for this system is

Figure 2.2: Modes always get a free ride. It has a single characteristic root λ = −2, and the characteristic mode is e −2t . We now verify that a loop current y(t) = ce-2t can be sustained through this circuit without any input voltage. The input voltage x(t) required to drive a loop current y(t) = ce−2t is given by

Clearly, the loop current y(t) = ce−2t is sustained by the RL circuit on its own, without the necessity of an external input. THE RESONANCE PHENOMENON We have seen that any signal consisting of a system's characteristic mode is sustained by the system on its own; the system offers no obstacle to such signals. Imagine what would happen if we were to drive the system with an external input that is one of its characteristic modes. This would be like pouring gasoline on a fire in a dry forest or hiring an alcoholic to taste liquor. An alcoholic would gladly do the job without pay. Think what would happen if he were paid by the amount of liquor he tasted! He would work overtime. He would work day and night, until he is burned out. The same

thing happens with a system driven by an input of the form of characteristic mode. The system response grows without limit, until it burns out.[†] We call this behavior the resonance phenomenon. An intelligent discussion of this important phenomenon requires an understanding of the zero-state response; for this reason we postpone this topic until Section 2.7-7. [1] Lathi, B. P. Signals and Systems. Berkeley-Cambridge Press, Carmichael, CA, 1987. [†] To prove this assertion, assume that y (t), y (t) ... y (t) are all solutions of Eq. (2.4). Then 1 2 N

Multiplying these equations by c 1 , c 2 ,..., c N, respectively, and adding them together yields This result shows that c 1 y 1 (t) + c 2 y 2 (t) + ... λ c Ny n (t) is also a solution of the homogeneous equation [Eq. (2.4)]. [†] Eigenvalue is German for "characteristic value." [†] y (t) may be present even before t = 0 − . However, we can be sure of its presence only from t = 0 − onward. 0 [†] The complex conjugate roots of a second-order polynomial can be determined by using the formula in Section B.7-10 or by expressing the

polynomial as a sum of two squares. The latter can be accomplished by completing the square with the first two terms, as follows:

[†] This assumes that the system will eventually come back to its original rest (or equilibrium) position. [‡] We ignore the force of gravity, which merely causes a constant displacement of the auto body without affecting the other motion. [†] In practice, the system in resonance is more likely to go in saturation because of high amplitude levels.

2.3 THE UNIT IMPULSE RESPONSE h(t) In Chapter 1 we explained how a system response to an input x(t) may be found by breaking this input into narrow rectangular pulses, as illustrated earlier in Fig. 1.27a, and then summing the system response to all the components. The rectangular pulses become impulses in the limit as their widths approach zero. Therefore, the system response is the sum of its responses to various impulse components. This discussion shows that if we know the system response to an impulse input, we can determine the system response to an arbitrary input x(t). We now discuss a method of determining h(t), the unit impulse response of an LTIC system described by the Nth-order differential equation [Eq. (2.1a)]

where Q(D) and P(D) are the polynomials shown in Eq. (2.2). Recall that noise considerations restrict practical systems to M ≤ N. Under this constraint, the most general case is M = N. Therefore, Eq. (2.16a) can be expressed as

Before deriving the general expression for the unit impulse response h(t), it is illuminating to understand qualitatively the nature of h(t). The impulse

response h(t) is the system response to an impulse input δ(t) applied at t = 0 with all the initial conditions zero at t = 0 − . An impulse input δ(t) is like lightning, which strikes instantaneously and then vanishes. But in its wake, in that single moment, objects that have been struck are rearranged. Similarly, an impulse input δ(t) appears momentarily at t = 0, and then it is gone forever. But in that moment it generates energy storages; that is, it

creates nonzero initial conditions instantaneously within the system at t = 0 + . Although the impulse input δ(t) vanishes for t > 0 so that the system has no input after the impulse has been applied, the system will still have a response generated by these newly created initial conditions. The impulse response h(t), therefore, must consist of the system's characteristic modes for t ≥ 0 + . As a result

This response is valid for t > 0. But what happens at t = 0? At a single moment t = 0, there can at most be an impulse, [†] so the form of the complete response h(t) is

because h(t) is the unit impulse response, setting x(t) = δ(t) and y(t) = h(t) in Eq. (2.16b) yields In this equation we substitute h(t) from Eq. (2.17) and compare the coefficients of similar impulsive terms on both sides. The highest order of the derivative of impulse on both sides is N, with its coefficient value as A0 on the left-hand side and b 0 on the right-hand side. The two values must be matched. Therefore, A0 = b 0 and

In Eq. (2.16b), if M < N, b 0 = 0. Hence, the impulse term b 0 δ(t) exists only if M = N. The unknown coefficients of the N characteristic modes in h(t) in Eq. (2.19) can be determined by using the technique of impulse matching, as explained in the following example. EXAMPLE 2.3 Find the impulse response h(t) for a system specified by

In this case, b 0 = 0. Hence, h(t) consists of only the characteristic modes. The characteristic polynomial is λ2 + 5λ + 6 = (λ + 2)(λ + 3). The roots are −2 and −3. Hence, the impulse response h(t) is

letting x(t) = δ(t) and y(t) = h(t) in Eq. (2.20), we obtain

Recall that initial conditions h(0 − ) and h(0 + ) = K1 and

are both zero. But the application of an impulse at t = 0 creates new initial conditions at t = 0 + . Let

. These jump discontinuities in h(t) and

at t = 0 result in impulse terms

and

on the left-hand side. Matching the coefficients of impulse terms on both sides of Eq. (2.22) yields We now use these values h(0 + ) = K1 = 1 and 1. Also setting t = 0 + in

in Eq. (2.21) to find c 1 and c 2 . Setting t = 0 + in Eq. (2.21), we obtain c 1 + c 2 =

, we obtain −2c 1 −3c 1 = −4. These two simultaneous equations yield c 1 = −1 and c 2 = 2. Therefore

Although, the method used in this example is relatively simple, we can simplify it still further by using a modified version of impulse matching. SIMPLIFIED IMPULSE MATCHING METHOD The alternate technique we present now allows us to reduce the procedure to a simple routine to determine h(t). To avoid the needless distraction, the proof for this procedure is placed in Section 2.8. There, we show that for an LTIC system specified by Eq. (2.16), the unit impulse response h(t)

is given by

where y n (t) is a linear combination of the characteristic modes of the system subject to the following initial conditions:

where y (k)n (0) is the value of the kth derivative of y n (t) at t = 0. We can express this set of conditions for various values of N (the system order) as follows:

and so on. As stated earlier, if the order of P(D) is less than the order of Q(D), that is, if M < N, then b 0 = 0, and the impulse term b 0 δ(t) in h(t) is zero. EXAMPLE 2.4 Determine the unit impulse response h(t) for a system specified by the equation

This is a second-order system (N = 2) having the characteristic polynomial The characteristic roots of this system are λ = −1 and λ = −2. Therefore

Differentiation of this equation yields

The initial conditions are [see Eq. (2.24b) for N = 2] Setting t = 0 in Eqs. (2.26a) and (2.26b), and substituting the initial conditions just given, we obtain

Solution of these two simultaneous equations yields Therefore Moreover, according to Eq. (2.25), P(D) = D, so that Also in this case, b 0 = 0 [the second-order term is absent in P(D)]. Therefore Comment. In the above discussion, we have assumed M ≤ N, as specified by Eq. (2.16b). Appendix 2.1 (i.e., Section 2.8) shows that the expression for h(t) applicable to all possible values of M and N is given by where y n (t) is a linear combination of the characteristic modes of the system subject to initial conditions (2.24). This expression reduces to Eq. (2.23) when M ≤ N. Determination of the impulse response h(t) using the procedure in this section is relatively simple. However, in Chapter 4 we shall discuss another, even simpler method using the Laplace transform. EXERCISE E2.4 Determine the unit impulse response of LTIC systems described by the following equations: a. (D + 2)y(t) = (3D + 5)x(t) b. D(D + 2)y(t) = (D + 4)x(t) c. (D 2 + 2D + 1)y(t) = Dx(t)

Answers

a. 3δ(t) − e −2t u(t) b. (2 − e −2t )u(t) c. (1 − t)e −1 u(t)

COMPUTER EXAMPLE C2.3 Determine the impulse response h(t) for an LTIC system specified by the differential equation This is a second-order system with b 0 = 0. First we find the zero-input component for initial conditions y(0 − ) = 0, and the zero-input response is differentiated and the impulse response immediately follows. >> y_n = desolve ('D2y+3*Dy+2*y=0','y (0)=0','Dy (0)=1','t'); >> Dy_n = diffy (y_n); >> disp(['h(t) = (',char (Dy_n),') u (t)']); h(t) = (-exp(-t)+2*exp (-2*t))u(t)

. Since P(D) = D,

Therefore, h(t) = b 0 δ(t) + [Dy0 (t)]u(t) = (−e −1 + 2e −2t )u(t). SYSTEM RESPONSE TO DELAYED IMPULSE If h(t) is the response of an LTIC system to the input δ(t), then h(t − T) is the response of this same system to the input δ(t − T). This conclusion follows from the time-invariance property of LTIC systems. Thus, by knowing the unit impulse response h(t), we can determine the system response to a delayed impulse δ(t − T). [†] It might be possible for the derivatives of δ(t) to appear at the origin. However, if M ≤ N, it is impossible for h(t) to have any derivatives of δ(t).

This conclusion follows from Eq. (2.16b) with x(t) = δ(t) and y(t) = h(t). The coefficients of the impulse and all its derivatives must be matched on both sides of this equation. If h(t) contains δ(1) (t), the first derivative of δ(t), the left-hand side of Eq. (2.16b) will contain a term δ(N+1) (t). But the

highest-order derivative term on the right-hand side is δ(N)(t). Therefore, the two sides cannot match. Similar arguments can be made against the presence of the impulse's higher-order derivatives in h(t).

2.4 SYSTEM RESPONSE TO EXTERNAL INPUT: ZERO-STATE RESPONSE This section is devoted to the determination of the zero-state response of an LTIC system. This is the system response y(t) to an input x(t) when the system is in the zero state, that is, when all initial conditions are zero. We shall assume that the systems discussed in this section are in the zero state unless mentioned otherwise. Under these conditions, the zero-state response will be the total response of the system. We shall use the superposition property for finding the system response to an arbitrary input x(t). Let us define a basic pulse p(t) of unit height and width Δτ, starting at t = 0 as illustrated in (Fig. 2.3a). Figure 2.3b shows an input x(t) as a sum of narrow rectangular pulses. The pulse starting at t = nΔτ in Fig. 2.3b has a height x(nΔτ), and can be expressed as x(nΔτ)p(t − nΔτ). Now, x(t) is the sum of all such pulses. Hence

Figure 2.3: Finding the system response to an arbitrary input x(t). The term [x(nΔτ)/Δτ]p(t − nΔτ) represents a pulse p(t − nΔτ) with height [x(nΔτ)/Δτ]. As Δτ → 0, the height of this strip →∞, but its area remains x(nΔτ). Hence, this strip approaches an impulse x(nΔτ)δ(t − nΔτ) as Δτ → 0 (Fig. 2.3e). Therefore

To find the response for this input x(t), we consider the input and the corresponding output pairs, as shown in Fig. 2.3c-2.3f and also shown by directed arrow notation as follows:

Therefore [†]

This is the result we seek. We have obtained the system response y(t) to an arbitrary input x(t) in terms of the unit impulse response h(t). Knowing h(t), we can determine the response y(t) to any input. Observe once again the all-pervasive nature of the system's characteristic modes. The system response to any input is determined by the impulse response, which, in turn, is made up of characteristic modes of the system. It is important to keep in mind the assumptions used in deriving Eq. (2.29). We assumed a linear, time-invariant (LTI) system. Linearity allowed us to use the principle of superposition, and time invariance made it possible to express the system's response to δ(t − nΔτ) as h(t − nΔτ).

2.4-1 The Convolution Integral The zero-state response y(t) obtained in Eq. (2.29) is given by an integral that occurs frequently in the physical sciences, engineering, and mathematics. For this reason this integral is given a special name: the convolution integral. The convolution integral of two functions x 1 (t) and x 2 (t) is denoted symbolically by x 1 (t) * x 2 (t) and is defined as

Some important properties of the convolution integral follow. THE COMMUTATIVE PROPERTY Convolution operation is commutative; that is, x 1 (t) * x 2 (t) = x 2 (t) * x 1 (t). This property can be proved by a change of variable. In Eq. (2.30), if we let z = t − τ so that τ = t − z and dτ = −dz, we obtain

THE DISTRIBUTIVE PROPERTY According to the distributive property,

THE ASSOCIATIVE PROPERTY According to the associative property,

The proofs of Eqs. (2.32) and (2.33) follow directly from the definition of the convolution integral. They are left as an exercise for the reader. THE SHIFT PROPERTY if then

and

Proof. We are given

Therefore

Equation (2.34b) follows from Eq. (2.34a). CONVOLUTION WITH AN IMPULSE Convolution of a function x(t) with a unit impulse results in the function x(t) itself. By definition of convolution

Because δ(t − τ) is an impulse located at τ = t, according to the sampling property of the impulse [Eq. (1.24)], the integral in Eq. (2.35) is the value of x(τ) at τ = t, that is, x(t). Therefore

Actually this result was derived earlier [Eq. (2.28)]. THE WIDTH PROPERTY If the durations (widths) of x 1 (t) and x 2 (t) are finite, given by T1 and T2 , respectively, then the duration (width) of x 1 (t) * x 2 (t) is T1 + T2 (Fig. 2.4). The proof of this property follows readily from the graphical considerations discussed later in Section 2.4-2.

Figure 2.4: Width property of convolution. ZERO-STATE RESPONSE AND CAUSALITY

The (zero-state) response y(t) of an LTIC system is

In deriving Eq. (2.37), we assumed the system to be linear and time invariant. There were no other restrictions either on the system or on the input signal x(t). In practice, most systems are causal, so that their response cannot begin before the input. Furthermore, most inputs are also causal, which means they start at t = 0. Causality restriction on both signals and systems further simplifies the limits of integration in Eq. (2.37). By definition, the response of a causal system cannot begin before its input begins. Consequently, the causal system's response to a unit impulse δ(t) (which is located at t = 0) cannot begin before t = 0. Therefore, a causal system's unit impulse response h(t) is a causal signal. It is important to remember that the integration in Eq. (2.37) is performed with respect to τ (not t). If the input x(t) is causal, x(τ) = 0 for τ < 0. Therefore, x(τ) = 0 for τ < 0, as illustrated in Fig. 2.5a. Similarly, if h(t) is causal, h(t − τ ) = 0 for t − τ < 0; that is, for τ > t, as depicted in Fig. 2.5a. Therefore, the product x(t)h(t − τ) = 0 everywhere except over the nonshaded interval 0 ≤ τ ≤ t shown in Fig. 2.5a (assuming t ≥ 0). Observe that if f is negative, x(τ)h(t − τ) = 0 for all τ as shown in Fig. 2.5b. Therefore, Eq. (2.37) reduces to

Figure 2.5: Limits of the convolution integral. The lower limit of integration in Eq. (2.38a) is taken as 0 − to avoid the difficulty in integration that can arise if x(t) contains an impulse at the origin. This result shows that if x(t) and h(t) are both causal, the response y(t) is also causal. Because of the convolution's commutative property [Eq. (2.31)], we can also express Eq. (2.38a) as [assuming causal x(t) and h(t)]

Hereafter, the lower limit of 0 - will be implied even when we write it as 0. As in Eq. (2.38a), this result assumes that both the input and the system are causal. EXAMPLE 2.5 For an LTIC system with the unit impulse response h(t) = e −2t u(t), determine the response y(t) for the input

Here both x(t) and h(t) are causal (Fig. 2.6). Hence, from Eq. (2.38a), we obtain

Figure 2.6: Convolution of x(t) and h(t). Because x(t) = e −t u(t) and h(t) = e −2t u(t) Remember that the integration is performed with respect to τ (not t), and the region of integration is 0 ≤ τ ≤ t. Hence, ≤ 0 and t − τ ≥ 0. Therefore, u(t) = 1 and u(t − τ) = 1; consequently

Because this integration is with respect to τ, we can pull e −2t outside the integral, giving us

Moreover, y(t) = 0 when t < 0 [see Eq. (2.38a)]. Therefore The response is depicted in Fig. 2.6c. EXERCISE E2.5

For an LTIC system with the impulse response h(t) = 6e −t u(t), determine the system response to the input: a. 2u(t) b. 3e −3t u(t)

Answers

a. 12(1−e −t )u(t) b. 9(e −t − e −3t )u(t)

EXERCISE E2.6 Repeat Exercise E2.5 for the input x(t) = e −t u(t).

Answers 6te−t u(t) THE CONVOLUTION TABLE The task of convolution is considerably simplified by a ready-made convolution table (Table 2.1). This table, which lists several pairs of signals and their convolution, can conveniently determine y (t), a system response to an input x(t), without performing the tedious job of integration. For instance, we could have readily found the convolution in Example 2.5 by using pair 4 (with λ = − 1 and λ = −2) to be (e −t − e −2t )u(t). The following example

demonstrates the utility of this table. Table 2.1: Convolution Table Open table as spreadsheet No.

x 1 (t)

x 2 (t)

x 1 (t)*x 2 (t) = x 2 (t)*x 1 (t)

1

x(t)

δ(t − T)

x(t − T)

2

e λt u(t)

u(t)

3

u(t)

u(t)

4

e λ 1 t u(t)

e λ 2 t u(t)

5

e λt u(t)

e λt u(t)

6

teλt u(t)

e λt u(t)

7

tNu(t)

e λt u(t)

8

tM u(t)

tNu(t)

9

teλ 1 t u(t)

e λ 2 t u(t)

10

tM e λt u(t)

tNe λt u(t)

11

tM e λ 1 t u(t) λ1 ≠ λ2

tNe λ 2 t u(t)

12

e −αt cos (βt + θ)u(t)

e λ 1 t u(t)

13

e λ 1 t u(t)

e λ 2 t u(−t)

14

e λ 1 t u(−t)

e λ 2 t u(−t)

tu(t)

teλt u(t)

EXAMPLE 2.6 Find the loop current y(t) of the RLC circuit in Example 2.2 for the input x(t) = 10e -3t u(t), when all the initial conditions are zero. The loop equation for this circuit [see Example 1.10 or Eq. (1.55)] is The impulse response h(t) for this system, as obtained in Example 2.4, is The input is x(t) = 10e −3 t x u(t), and the response y(t) is

Using the distributive property of the convolution [Eq. (2.32)], we obtain

Now the use of pair 4 in Table 2.1 yields

EXERCISE E2.7 Rework Exercises E2.5 and E2.6 using the convolution table. EXERCISE E2.8 Use the convolution table to determine Answers (1/2 - e -t + 1/2e −2t )u(t) EXERCISE E2.9

For an LTIC system with the unit impulse response h(t) = e -2t u(t), determine the zero-state response y(t) if the input x(t) = sin 3t u(t). [Hint: Use pair 12 from Table 2.1.]

Answers or

RESPONSE TO COMPLEX INPUTS The LTIC system response discussed so far applies to general input signals, real or complex. However, if the system is real, that is, if h(t) is real, then we shall show that the real part of the input generates the real part of the output, and a similar conclusion applies to the imaginary part. If the input is x (t) = x r (t) + jx i (t), where x r (t) and x i (t) are the real and imaginary parts of x(t), then for real h(t) where y r(t) and y i (t) are the real and the imaginary parts of y(t). Using the right-directed arrow notation to indicate a pair of the input and the corresponding output, the foregoing result can be expressed as follows. If then

MULTIPLE INPUTS Multiple inputs to LTI systems can be treated by applying the superposition principle. Each input is considered separately, with all other inputs assumed to be zero. The sum of all these individual system responses constitutes the total system output when all the inputs are applied simultaneously.

2.4-2 Graphical Understanding of Convolution Operation Convolution operation can be grasped readily by examining the graphical interpretation of the convolution integral. Such an understanding is helpful in evaluating the convolution integral of more complex signals. In addition, graphical convolution allows us to grasp visually or mentally the convolution integral's result, which can be of great help in sampling, filtering, and many other problems. Finally, many signals have no exact mathematical description, so they can be described only graphically. If two such signals are to be convolved, we have no choice but to perform their convolution graphically. We shall now explain the convolution operation by convolving the signals x(t) and g(t), illustrated in Fig. 2.7a and 2.7b, respectively. If c(t) is the convolution of x(t) with g(t), then

Figure 2.7: Graphical explanation of the convolution operation. One of the crucial points to remember here is that this integration is performed with respect to τ, so that t is just a parameter (like a constant). This consideration is especially important when we sketch the graphical representations of the functions x(τ) and g(t − τ) appearing in the integrand of Eq. (2.41). Both these functions should be sketched as functions of τ, not of t. The function x(τ) is identical to x(t), with τ replacing t (Fig. 2.7c). Therefore, x(t) and x(τ) will have the same graphical representations. Similar remarks apply to g(t) and g(τ) (Fig. 2.7d). To appreciate what g(t − τ) looks like, let us start with the function g(τ) (Fig. 2.7d). Time reversal of this function (reflection about the vertical axis τ = 0 yields g(− τ) (Fig. 2.7e). Let us denote this function by φ(τ) Now φ(τ) shifted by t seconds is φ(τ − 1), given by Therefore, we first time-reverse g(− τ) to obtain g(− τ) and then time-shift g(− τ) by t to obtain g(t− τ). For positive t, the shift is to the right (Fig. 2.7f); for negative t, the shift is to the left (Fig. 2.7g, 2.7h). The preceding discussion gives us a graphical interpretation of the functions x(τ) and g(t − τ). The convolution c(t) is the area under the product of these two functions. Thus, to compute c(t) at some positive instant t = t1 , we first obtain g(−τ) by inverting g(τ) about the vertical axis. Next, we right-shift or delay g(−τ) by t 1 to obtain g(t1 − τ) (Fig. 2.7f), and then we multiply this function by x(τ), giving us the product x( τ )g(t1 − τ) (shaded portion in Fig. 2.7f). The area A1 under this product is c(t1 ), the value of c(t) at t = t1 . We can therefore plot c(t1 ) = A1 on a curve describing c(t), as shown in Fig. 2.7i. The area under the product x( τ )g( τ ) in Fig. 2.7e is c(0), the value of the convolution for t = 0 (at the origin). A similar procedure is followed in computing the value of c(t) at t = t2 , where t2 is negative (Fig. 2.7g). In this case, the function g(− τ) is shifted by a negative amount (that is, left-shifted) to obtain g(t2 − τ). Multiplication of this function with x(τ) yields the product x(τ)g(t2 − τ). The area under this product is c(t2 ) = A2 , giving us another point on the curve c(t) at t = t2 (Fig. 2.7i). This procedure can be repeated for all values of t, from − ∞ to ∞. The result will be a curve describing c(t) for all time t. Note that when t ≤ −3, g(τ) and g(t − τ) do not overlap (see Fig. 2.7h); therefore, c(t) = 0 for t ≤ −3. SUMMARY OF THE GRAPHICAL PROCEDURE The procedure for graphical convolution can be summarized as follows 1. Keep the function x(τ) fixed. 2. Visualize the function g(τ) as a rigid wire frame, and rotate (or invert) this frame about the vertical axis (τ = 0) to obtain g(− τ). 3. Shift the inverted frame along the τ axis by t0 seconds. The shifted frame now represents g(t0 − τ).

4. The area under the product of x(τ) and g(t0 − τ) (the shifted frame) is c(t0 ), the value of the convolution at t = t0 . 5. Repeat this procedure, shifting the frame by different values (positive and negative) to obtain c(t) for all values of t. The graphical procedure discussed here appears very complicated and discouraging at first reading. Indeed, some people claim that convolution has driven many electrical engineering undergraduates to contemplate theology either for salvation or as an alternative career (IEEE Spectrum, March 1991, p. 60). [†] Actually, the bark of convolution is worse than its bite. In graphical convolution, we need to determine the area under the product x(τ)g(t − τ) for all values of t from −∞ to ∞. However, a mathematical description of x(τ)g(t −τ) is generally valid over a range of t. Therefore, repeating the procedure for every value of t amounts to repeating it only a few times for different ranges of t.

Convolution: its bark is worse than its bite! We can also use the commutative property of convolution to our advantage by computing x(t) * g(t) or g(t) * x(t), whichever is simpler. As a rule of thumb, convolution computations are simplified if we choose to invert (time-reverse) the simpler of the two functions. For example, if the mathematical description of g(t) is simpler than that of x(t), then x(t) * g(t) will be easier to compute than g(t) * x(t). In contrast, if the mathematical description of x(t) is simpler, the reverse will be true. We shall demonstrate graphical convolution with the following examples. Let us start by using this graphical method to rework Example 2.5. EXAMPLE 2.7 Determine graphically y(t) = x(t) * h(t) for x(t) = e −t u(t) and h(t) = e −2t u(t). In Fig. 2.8a and 2.8b we have x(t) and h(t), respectively; and Fig. 2.8c shows x(τ) and h (−τ) as functions of τ. The function h(t − τ) is now obtained by shifting h(− τ) by t. If t is positive, the shift is to the right (delay); if t is negative, the shift is to the left (advance). Figure 2.8d shows that for negative t, h(t − τ) [obtained by left-shifting h(− τ)] does not overlap x(τ), and the product x(τ )h(t − τ) = 0, so that

Figure 2.8: Convolution of x(t) and h(t). Figure 2.8e shows the situation for t ≥ 0. Here x(τ) and h(t − τ) do overlap, but the product is nonzero only over the interval 0 ≤ τ ≤ t (shaded interval). Therefore

All we need to do now is substitute correct expressions for x(τ) and h(t − τ) in this integral. From Fig. 2.8a and 2.8b it is clear that the segments of x(t) and g(t) to be used in this convolution (Fig. 2.8e) are described by Therefore Consequently

Moreover, y(t) = 0 for t ≤ 0, so that

EXAMPLE 2.8 Find c(t) = x(t) * g(t) for the signals depicted in Fig. 2.9a and 2.9b. Since x(t) is simpler than g(t), it is easier to evaluate g(t) * x(t) than x(t) * g(t). However, we shall intentionally take the more difficult route and evaluate x(t) * g(t). From x(t) and g(t) (Fig. 2.9a and 2.9b, respectively), observe that g(t) is composed of two segments. As a result, it can be described as

Figure 2.9: Convolution of x(t) and g(t).

Therefore

The segment of x(t) that is used in convolution is x(t) = 1, so that x(τ) = 1. Figure 2.9c shows x(τ) and g(−τ). To compute c(t) for t ≥ 0, we right-shift g(−τ) to obtain g(t − τ), as illustrated in Fig. 2.9d. Clearly, g(t − τ) overlaps with x(τ) over the shaded interval, that is, over the range ≥ 0; segment A overlaps with x(τ) over the interval (0, t), while segment B overlaps with x(τ) over (t, ∞). Remembering that x(τ) = 1, we have

Figure 2.9e shows the situation for t ≤ 0. Here the overlap is over the shaded interval, that is, over the range τ > 0, where only the segment B of g(t) is involved. Therefore

Therefore

Figure 2.9f shows a plot of c(t). EXAMPLE 2.9 Find x(t) * g(t) for the functions x(t) and g(t) shown in Fig. 2.10a and 2.10b.

Figure 2.10: Convolution of x(t) and g(t). Here, x(t) has a simpler mathematical description than that of g(t), so it is preferable to time-reverse x(t). Hence, we shall determine g(t) * x(t) rather than x(t) * g(t). Thus

First, we determine the expressions for the segments of x(t) and g(t) used in finding c(t). According to Fig. 2.10a and 2.10b, these segments can be expressed as so that Figure 2.10c shows g(τ) and x(− τ), whereas Fig. 2.10d shows g(τ) and x(t − τ), which is x(τ) shifted by t. Because the edges of x(− τ) are at τ = − 1 and 1, the edges of x(t − τ) are at − 1 + t and 1 + t. The two functions overlap over the interval (0,1 + t)(shaded interval), so that

This situation, depicted in Fig. 2.10d, is valid only for − 1 ≤ t ≤ 1. For t ≤ 1 but ≤ 2, the situation is as illustrated in Fig. 2.10e. The two functions overlap only over the range − 1+ t to 1 + t (shaded interval). Note that the expressions for g(τ) and x(t − τ) do not change; only the range of integration changes. Therefore

Also note that the expressions in Eqs. (2.42a) and (2.42b) both apply at t = 1, the transition point between their respective ranges. We can readily verify that both expressions yield a value of 2/3 at t = 1, so that c(1) = 2/3. The continuity of c(t) at transition points indicates a high probability of a

right answer. Continuity of c(t) at transition points is assured as long as there are no impulses at the edges of x(t) and g(t). For t ≥ 2 but ≤ 4 the situation is as shown in Fig. 2.10f. The functions g(τ) and x(t − τ) overlap over the interval from − 1 + t to 3 (shaded interval), so that

Again, both Eqs. (2.42b) and (2.42c) apply at the transition point t = 2. We can readily verify that c(2) = 4/3 when either of these expressions is used. For t ≥ 4, x(t − τ) has been shifted so far to the right that it no longer overlaps with g(τ) as depicted in Fig. 2.10g. Consequently

We now turn our attention to negative values of t. We have already determined c(t) up to t = − 1. For t < − 1 there is no overlap between the two functions, as illustrated in Fig. 2.10h, so that

Figure 2.10i plots c(t) according to Eqs. (2.42a) through (2.42e). WIDTH OF THE CONVOLVED FUNCTION The widths (durations) of x(t), g(t), and c(t) in Example 2.9 (Fig. 2.10) are 2, 3, and 5, respectively. Note that the width of c(t) in this case is the sum of the widths of x(t) and g(t). This observation is not a coincidence. Using the concept of graphical convolution, we can readily see that if x(t) and g(t) have the finite widths of T1 and T2 respectively, then the width of c(t) is equal to T1 + T2 . The reason is that the time it takes for a signal of width (duration) T1 to completely pass another signal of width (duration) T2 so that they become nonoverlapping is T1 + T2 . When the two signals become nonoverlapping, the convolution goes to zero. EXERCISE E2.10 Rework Example 2.8 by evaluating g(t) * x(t) EXERCISE E2.11 Use graphical convolution to show that x(t) * g(t) = g(t) * x(t) = c(t) in Fig. 2.11.

Figure 2.11: Convolution of x(t) and g(t). EXERCISE E2.12 Repeat Exercise E2.11 for the functions in Fig. 2.12.

Figure 2.12: Convolution of x(t) and g(t). EXERCISE E2.13 Repeat Exercise E2.11 for the functions in Fig. 2.13.

Figure 2.13: Convolution of x(t) and g(t). THE PHANTOM OF THE SIGNALS AND SYSTEMS OPERA In the study of signals and systems we often come across some signals such as an impulse, which cannot be generated in practice and have never

been sighted by anyone. [†] One wonders why we even consider such idealized signals. The answer should be clear from our discussion so far in this chapter. Even if the impulse function has no physical existence, we can compute the system response h(t) to this phantom input according to the procedure in Section 2.3, and knowing h(t), we can compute the system response to any arbitrary input. The concept of impulse response, therefore, provides an effective intermediary for computing system response to an arbitrary input. In addition, the impulse response h(t) itself provides a great deal of information and insight about the system behavior. In Section 2.7 we show that the knowledge of impulse response provides much valuable information, such as the response time, pulse dispersion, and filtering properties of the system. Many other useful insights about the system behavior

can be obtained by inspection of h(t). Similarly, in frequency-domain analysis (discussed in later chapters), we use an everlasting exponential (or sinusoid) to determine system response. An everlasting exponential (or sinusoid) too is a phantom, which no-body has ever seen and which has no physical existence. But it provides another effective intermediary for computing the system response to an arbitrary input. Moreover, the system response to everlasting exponential (or sinusoid) provides valuable information and insight regarding the system's behavior. Clearly, idealized impulse and everlasting sinusoids are friendly and helpful spirits. Interestingly, the unit impulse and the everlasting exponential (or sinusoid) are the dual of each other in the time-frequency duality, to be studied in Chapter 7. Actually, the time-domain and the frequency-domain methods of analysis are the dual of each other. WHY CONVOLUTION? AN INTUITIVE EXPLANATION OF SYSTEM RESPONSE On the surface, it appears rather strange that the response of linear systems (those gentlest of the gentle systems) should be given by such a tortuous operation of convolution, where one signal is fixed and the other is inverted and shifted. To understand this odd behavior, consider a hypothetical impulse response h(t) that decays linearly with time (Fig. 2.14a). This response is strongest at t = 0, the moment the impulse is applied, and it decays linearly at future instants, so that one second later (at t = 1 and beyond), it ceases to exist. This means that the closer the impulse input is to an instant t, the stronger is its response at t.

Figure 2.14: Intuitive explanation of convolution. Now consider the input x(t) shown in Fig. 2.14b. To compute the system response, we break the input into rectangular pulses and approximate these pulses with impulses. Generally the response of a causal system at some instant t will be determined by all the impulse components of the input before t. Each of these impulse components will have different weight in determining the response at the instant t, depending on its proximity to t. As seen earlier, the closer the impulse is to t, the stronger is its influence at t. The impulse at t has the greatest weight (unity) in determining the response at t. The weight decreases linearly for all impulses before t until the instant t − 1. The input before t − 1 has no influence (zero weight). Thus, to determine the system response at t, we must assign a linearly decreasing weight to impulses occurring before t, as shown in Fig. 2.14b. This weighting function is precisely the function h(t − τ). The system response at t is then determined not by the input x(τ) but by the weighted input x(τ)h(t − τ), and the summation of all these weighted inputs is the convolution integral.

2.4-3 Interconnected Systems A larger, more complex system can often be viewed as the interconnection of several smaller subsystems, each of which is easier to characterize. Knowing the characterizations of these subsystems, it becomes simpler to analyze such large systems. We shall consider here two basic interconnections, cascade and parallel. Figure 2.15a shows S1 and S2 , two LTIC subsystems connected in parallel, and Fig. 2.15b shows the same two systems connected in cascade.

Figure 2.15: Interconnected systems. In Fig. 2.15a, the device depicted by the symbol Σ inside a circle represents an adder, which adds signals at its inputs. Also the junction from which two (or more) branches radiate out is called the pickoff node. Every branch that radiates out from the pickoff node carries the same signal (the signal at the junction). In Fig. 2.15a, for instance, the junction at which the input is applied is a pickoff node from which two branches radiate out, each of which carries the input signal at the node. Let the impulse response of S1 and S2 be h 1 (t) and h 2 (t), respectively. Further assume that interconnecting these systems, as shown in Fig. 2.15, does not load them. This means that the impulse response of either of these systems remains unchanged whether observed when these systems are unconnected or when they are interconnected. To find h p (t), the impulse response of the parallel system Sp in Fig. 2.15a, we apply an impulse at the input of Sp . This results in the signal δ(t) at the inputs of S1 and S2 , leading to their outputs h 1 (t) and h 2 (t), respectively. These signals are added by the adder to yield h 1 (t) + h 2 (t) as the output of Sp . Consequently

To find h c (t), the impulse response of the cascade system Sc in Fig. 2.15b, we apply the input δ(t) at the input of Sc , which is also the input to S1 . Hence, the output of S1 is h 1 (t), which now acts as the input to S2 . The response of S2 to input h 1 (t) is h 1 (t) * h 2 (t). Therefore

Because of commutative property of the convolution, it follows that interchanging the systems S1 and S2 , as shown in Fig. 2.15c, results in the same impulse response h 1 (t)*h 2 (t). This means that when several LTIC systems are cascaded, the order of systems does not affect the impulse response of the composite system. In other words, linear operations, performed in cascade, commute. The order in which they are performed is not important, at least theoretically.[†]

We shall give here another interesting application of the commutative property of LTIC systems. Figure 2.15d shows a cascade of two LTIC systems: a system S with impulse response h(t), followed by an ideal integrator. Figure 2.15e shows a cascade of the same two systems in reverse order; an ideal integrator followed by S. In Fig. 2.15d, if the input x(t) to S yields the output y(t), then the output of the system 2.15d is the integral of y(t). In Fig. 2.15e, the output of the integrator is the integral of x(t). The output in Fig. 2.15e is identical to the output in Fig. 2.15d. Hence, it follows that if an LTIC system response to input x(t) is y(t), then the response of the same system to integral of x(t) is the integral of y(t). In other words,

Replacing the ideal integrator with an ideal differentiator in Fig. 2.15d and 2.15e, and following a similar argument, we conclude that

If we let x(t) = δ(t) and y(t) = h(t) in Eq. (2.44a), we find that g(t), the unit step response of an LTIC system with impulse h(t), is given by

We can also show that the system response to is dh(t)/dt. These results can be extended to other singularity functions. For example, the unit ramp response of an LTIC system is the integral of its unit step response, and so on. INVERSE SYSTEMS In Fig. 2.15b, if S1 and S2 are inverse systems with impulse response h(t and h i (t), respectively, then the impulse response of the cascade of these systems is h(t) * h i (t). But, the cascade of a system with its inverse is an identity system, whose output is the same as the input. In other words, the unit impulse response of the cascade of inverse systems is also an unit impulse δ(t). Hence

We shall give an interesting application of the commutivity property. As seen from Eq. (2.45), a cascade of inverse systems is an identity system. Moreover, in a cascade of several LTIC subsystems, changing the order of the subsystems in any manner does not affect the impulse response of the cascade system. Using these facts, we observe that the two systems, shown in Fig. 2.15f, are equivalent. We can compute the response of the . The impulse response of cascade system on the right-hand side, by computing the response of the system inside the dotted box to the input the dotted box is g(t), the integral of h(t), as given in Eq. (2.44c). Hence, it follows that

Recall that g(t) is the unit step response of the system. Hence, an LTIC response can also be obtained as a convolution of x(t) (the derivative of the input) with the unit step response of the system. This result can be readily extended to higher derivatives of the input. An LTIC system response is the convolution of the nth derivative of the input with the nth integral of the impulse response.

2.4-4 A Very Special Function for LTIC Systems: The Everlasting Exponential est There is a very special connection of LTIC systems with the everlasting exponential function e st , where s is a complex variable, in general. We now

show that the LTIC system's (zero-state) response to everlasting exponential input e st is also the same everlasting exponential (within a multiplicative constant). Moreover, no other function can make the same claim. Such an input for which the system response is also of the same form is called the charcteristic function (also eigenfunction) of the system. Because a sinusoid is a form of exponential (s = ±jω), everlasting sinusoid is also a characteristic function of an LTIC system. Note that we are talking here of an everlasting exponential (or sinusoid), which starts at t = −∞ If h(t) is the system's unit impulse response, then system response y(t) to an everlasting exponential e st is given by

The integral on the right-hand side is a function of a complex variable s. Let us denote it by H(s), which is also complex, in general. Thus

where

Equation (2.47) is valid only for the values of s for which H(s) exists, that is, if ∫ ∞− ∞ h(τ)e −sτ dτ exists (or converges). The region in the s plane for which this integral converges is called the region of convergence for H(s). Further elaboration of the region of convergence is presented in Chapter 4. Note that H(s) is a constant for a given s. Thus, the input and the output are the same (within a multiplicative constant) for the everlasting exponential signal. H(s), which is called the transfer function of the system, is a function of complex variable s. An alternate definition of the transfer function H(s) of an LTIC system, as seen from Eq. (2.47), is

The transfer function is defined for, and is meaningful to, LTIC systems only. It does not exist for nonlinear or time-varying systems in general. We repeat again that in this discussion we are talking of the everlasting exponential, which starts at t = − ∞, not the causal exponential e st u(t), which starts at t = 0. For a system specified by Eq. (2.1), the transfer function is given by

This follows readily by considering an everlasting input x(t) = e st . According to Eq. (2.47), the output is y(t) = H(s)e st . Substitution of this x(t) and y(t) in Eq. (2.1) yields Moreover

Hence Consequently,

EXERCISE E2.14 Show that the transfer function of an ideal integrator is H(s) = 1/s and that of an ideal differentiator is H(s) = s. Find the answer in two ways: using Eq. (2.48) and Eq. (2.50). [Hint: Find h(t) for the ideal integrator and differentiator. You also may need to use the result in Prob. 1.4-9.] A FUNDAMENTAL PROPERTY OF LTI SYSTEMS We can show that Eq. (2.47) is a fundamental property of LTI systems and it follows directly as a consequence of linearity and time invariance. To show this let us assume that the response of an LTI system to an everlasting exponential e st is y(s, t). If we define

then Because of the time-invariance property, the system response to input e s(t −T) is H(s, t− T) e s(t −T), that is,

The delayed input e s(t −T) represents the input e st multiplied by a constant e −sT . Hence, according to the linearity property, the system response to

e s(t −T) must be y(s, t) e −sT . Hence

Comparison of this result with Eq. (2.51) shows that This means H(s, t) is independent of t, and we can express H(s, t) = H(s). Hence

2.4-5 Total Response The total response of a linear system can be expressed as the sum of its zero-input and zero-state components:

assuming distinct roots. For repeated roots, the zero-input component should be appropriately modified. For the series RLC circuit in Example 2.2 with the input x(t) = 10 e -3t u(t) and the initial conditions y(0 -) = 0, v c (0 -) = 5, we determined the zero-input component in Example 2.1a [Eq. (2.11c)]. We found the zero-state component in Example 2.6. From the results in Examples 2.1a and 2.6, we obtain

Figure 2.16a shows the zero-input, zero-state, and total responses.

Figure 2.16: Total response and its components. NATURAL AND FORCED RESPONSE For the RLC circuit in Example 2.2, the characteristic modes were found to be e −1 and e −2t . As we expected, the zero-input response is composed exclusively of characteristic modes. Note, however, that even the zero-state response [Eq. (2.52a)] contains characteristic mode terms. This observation is generally true of LTIC systems. We can now lump together all the characteristic mode terms in the total response, giving us a component known as the natural response y n (t). The remainder, consisting entirely of noncharacteristic mode terms, is known as the forced response y φ (t). The total response of the RLC circuit in Example 2.2 can be expressed in terms of natural and forced components by regrouping the terms in Eq. (2.52a) as

Figure 2.16b shows the natural, forced, and total responses. [†] In deriving this result we have assumed a time-invariant system. If the system is time varying, then the system response to the input δ(t − nΔτ)

cannot be expressed as h(t − nΔτ) but instead has the form h(t, nΔτ). Use of this form modifies Eq. (2.29) to

where h(t, τ) is the system response at instant t to a unit impulse input located at τ. [†] Strange that religious establishments are not agitating for compulsory "convolution education" in schools and colleges! [†] The late Prof. S. J. Mason, the inventor of signal flow graph techniques, used to tell a story of a student frustrated with the impulse function. The student said, "The unit impulse is a thing that is so small you can't see it, except at one place (the origin), where it is so big you can't see it. In other

words, you can't see it at all; at least I can't!" [2]

[†] Mason, S. J. Electronic Circuits, Signals, and Systems. Wiley, New York, 1960. [†] Change of order, however, could affect performance because of physical limitations and sensitivities to changes in the subsystems involved.

2.5 CLASSICAL SOLUTION OF DIFFERENTIAL EQUATIONS In the classical method we solve differential equation to find the natural and forced components rather than the zero-input and zero-state components of the response. Although this method is relatively simple compared with the method discussed so far, as we shall see, it also has several glaring drawbacks. As Section 2.4-5 showed, when all the characteristic mode terms of the total system response are lumped together, they form the system's natural response y n (t) (also known as the homogeneous solution or complementary solution). The remaining portion of the response consists entirely of noncharacteristic mode terms and is called the system's forced response y φ (t) (also known as the particular solution). Equation (2.52b) showed these two components for the loop current in the RLC circuit of Fig. 2.1a. The total system response is y(t) = y n(t) + y φ (t). Since y(t) must satisfy the system equation [Eq. (2.1)], or But y n (t) is composed entirely of characteristic modes. Therefore so that

The natural response, being a linear combination of the system's characteristic modes, has the same form as that of the zero-input response; only its arbitrary constants are different. These constants are determined from auxiliary conditions, as explained later. We shall now discuss a method of determining the forced response.

2.5-1 Forced Response: The Method of Undetermined Coefficients It is a relatively simple task to determine y φ(t), the forced response of an LTIC system, when the input x(t) is such that it yields only a finite number of independent derivatives. Inputs having the form e ζt or tr fall into this category. For example, the repeated differentiation of e ζt yields the same form

as this input; that is, e ζt . Similarly, the repeated differentiation of tr yields only r independent derivatives. The forced response to such an input can be

expressed as a linear combination of the input and its independent derivatives. Consider, for example, the input has at2 + bt + c. The successive derivatives of this input are 2at + b and 2a. In this case, the input has only two independent derivatives. Therefore, the forced response can be assumed to be a linear combination of x(t) and its two derivatives. The suitable form for yφ(t) in this case is, therefore The undetermined coefficients β0 ,β1 and β2 are determined by substituting this expression for y φ (t)in Eq. (2.53) and then equating coefficients of similar terms on both sides of the resulting expression. Although this method can be used only for inputs with a finite number of derivatives, this class of inputs includes a wide variety of the most commonly encountered signals in practice. Table 2.2 shows a variety of such inputs and the form of the forced response corresponding to each input. We shall demonstrate this procedure with an example. Table 2.2: Forced Response Open table as spreadsheet No.

Input x(t)

Forced Response

1

e ζt ζ ? ? i (i = 1,2,...,N)

βe ζt

2

e ζt ζ = λi

βt ζt

3

k (a constant)

β (a constant)

4

cos (ωt + θ)

βcos (ωt + θ)

5

(t r + a r-1 tr-1 + ... + α 1 t + α 0 )e ζt )

(βrtr + βr-1 tr-1 + ... + β1 t + β0 )e ζt )

Note: By definition, y φ (t) cannot have any characteristic mode terms. If any term appearing in the right-hand column for the forced response is also a characteristic mode of the system, the correct form of the forced response must be modified to ti y φ (t), where i is the smallest possible integer that can be used and still can prevent ti y φ (t) from having a characteristic mode term. For example, when the input is e ζt , the forced response (right-hand column) has the form βe ζt . But if e ζt happens to be a characteristic mode of the system, the correct form of the forced

response is βteζt (see pair 2). If teζt also happens to be a characteristic mode of the system, the correct form of the forced response is βt 2 e ζt , and so on. EXAMPLE 2.10 Solve the differential equation if the input and the initial conditions are y(0 + ) = 2 and y(0 + ) = 3. The characteristic polynomial of the system is Therefore, the characteristic modes are e −t and e -2t . The natural response is then a linear combination of these modes, so that Here the arbitrary constants K1 and K2 must be determined from the system's initial conditions. The forced response to the input t2 + 5t + 3, according to Table 2.2 (pair 5 with ζ = 0), is Moreover, y φ (t) satisfies the system equation [Eq. (2.53)]; that is,

Now

and

Substituting these results in Eq. (2.54) yields or Equating coefficients of similar powers on both sides of this expression yields

Solution of these three simultaneous equations yields β0 = 1, β1 = 1, and β2 = 0. Therefore The total system response y(t) is the sum of the natural and forced solutions. Therefore

so that Setting t = 0 and substituting y(0) = 2 y(0) = 3 in these equations, we have

The solution of these two simultaneous equations is K1 = 4 and K2 = −3. Therefore COMMENTS ON INTIAL CONDITIONS

In the classical method, the initial conditions are required at t = 0 + . The reason is that because at t = 0 − , only the zero-input component exists, and

the initial conditions at t = 0 − can be applied to the zero-input component only. In the classical method, the zero-input and zero-state components

cannot be separated Consequently, the initial conditions must be applied to the total response, which begins at t = 0 + . EXERCISE E2.15 An LTIC system is specified by the equation The input is x(t) = 6t2 . Find the following: a. The forced response y φ (t) b. The total response y(t) if the initial conditions are y(0 + ) = 25/18 and y(0 + ) = −2/3 Answers a. b.

THE EXPONENTIAL INPUT e ζ(t) The exponential signal is the most important signal in the study of LTIC systems. Interestingly, the forced response for an exponential input signal

turns out to be very simple. From Table 2.2 we see that the forced response for the input e ζt has the form βe ζt . We now show that β = Q(ζ)/P(ζ).[†]

To determine the constant β, we substitute y φt in the system equation [Eq. (2.53)] to obtain Now observe that

Consequently Therefore, Eq. (2.53) becomes and

Thus, for the input x(t) = e ζt u(t), the forced response is given by

where

This is an interesting and significant result. It states that for an exponential input e ζt the forced response y ζ(t) is the same exponential multiplied by H(ζ) = P(ζ)/Q(ζ). The total system response y(t) to an exponential input e ζt is then given by[‡]

where the arbitrary constants K1 , K2 ,..., KN are determined from auxiliary conditions. The form of Eq. (2.57) assumes N distinct roots. If the roots are not distinct, proper form of modes should be used. Recall that the exponential signal includes a large variety of signals, such as a constant (ζ = 0), a sinusoid (ζ = ± jω), and an exponentially growing or decaying sinusoid (ζ = σ ± jω). Let us consider the forced response for some of these cases. THE CONSTANT INPUT x(t) = C

Because C = C e 0t , the constant input is a special case of the exponential input Ceζt with ζ = 0. The forced response to this input is then given by

THE EXPONENTIAL INPUT e jωt Here ζ = jω and

THE SINUSOIDA INPUT x(t) = cos ωt

We know that the forced response for the input e ±jwt is H(±jw)e ±jwt . Since cos ωt = (e jωt + e −jwt )/2, the forced response to cos ωt is

Because the two terms on the right-hand side are conjugates, But so that

This result can be generalized for the input x(t) = cos (ωt + θ). The forced response in this case is

EXAMPLE 2.11 Solve the differential equation if the initial conditions are y(0 + ) = 2 and

and the input is

a. 10e −3t b. 5 c. e −2t d. 10 cos(3t + 30°) According to Example 2.10, the natural response for this case is For this case

a. For input x(t) = 10e −3t ζ = −3, and

The total solution (the sum of the forced and the natural response) is and The initial conditions are y(0 + ) = 2 and yields

. Setting t = 0 in the foregoing equations and then substituting the initial conditions

Solution of these equations yields K1 = −8 and K2 = 25. Therefore b. For input x (t) = 5 = 5e 0t , ζ = 0, and The complete solution is K1 e −t + K2 e −2t + 2te − t. Using the initial conditions, we determine K1 and K2 as in part (a). c. Here ζ = −2, which is also a characteristic root of the system. Hence (see pair 2, Table 2.2, or the note at the bottom of the table). To find β, we substitute yφ,(t) in the system equation to obtain or But

Consequently or Therefore, β = 2 so that

The complete solution is Ke −t + K2 e −2u . Using the initial conditions, we determine K1 and K2 as in part (a). d. For the input x(t) = 10cos (3 t + 30°), the forced response [see Eq. (2.61)] is where

Therefore

and The complete solution is K1 e −1 + K2 e −2t + 2.63cos (3t − 7.9°). We then use the initial conditions to determine K1 and K2 as in part (a). EXAMPLE 2.12 Use the classical method to find the loop current y(t) in the RLC circuit of Example 2.2 (Fig. 2.1) if the input voltage x(t) = 10 e −3t and the initial conditions are y(0 − ) = 0 and υc (0 − ) = 5. The zero-input and zero-state responses for this problem are found in Examples 2.2 and 2.6, respectively. The natural and forced responses appear

in Eq. (2.52b). Here we shall solve this problem by the classical method, which requires the initial conditions at t = 0 + . These conditions, already found in Eq. (2.15), are The loop equation for this system [see Example 2.2 or Eq. (1.55)] is The characteristic polynomial is λ2 + 3λ + 2 = (λ + 1)(λ + 2) Therefore, the natural response is The forced response, already found in part (a) of Example 2.11, is The total response is Differentiation of this equation yields Setting t = 0 + and substituting y(0 + ) = 0, y(0 + ) = 5 in these equations yields

Therefore which agrees with the solution found earlier in Eq. (2.52b). COMPUTER EXAMPLE C2.4 Solve the differential equation using the input x(t) = 5t + 3 and initial conditions y0 (0) = 2 and y0 (0) = 3. >>y = dsolve('D2y+3*Dy+2*y=5*t+3', y(0)=2', 'Dy(0)=3', 't'); >>disp (['y(t) = (',char(y), ')u(t) ' ]); y(t) = (-9/4+5/2*t+9*exp(-t)-19/4*exp(-2*t))u(t) Therefore, ASSESSMENT OF THE CLASSICAL METHOD The development in this section shows that the classical method is relatively simple compared with the method of finding the response as a sum of the zero-input and zero-state components. Unfortunately, the classical method has a serious drawback because it yields the total response, which cannot be separated into components arising from the internal conditions and the external input. In the study of systems it is important to be able to express the system response to an input x(t) as an explicit function of x(t). This is not possible in the classical method. Moreover, the classical

method is restricted to a certain class of inputs; it cannot be applied to any input. Another minor problem is that because the classical method yields total response, the auxiliary conditions must be on the total response which exists only for t ≥ 0 + . In practice we are most likely to know the

conditions at t = 0 − (before the input is applied). Therefore, we need to derive a new set of auxiliary conditions at t = 0 + from the known conditions at

t = 0 −.

If we must solve a particular linear differential equation or find a response of a particular LTIC system, the classical method may be the best. In the theoretical study of linear systems, however, the classical method is not so valuable. Caution We have shown in Eq. (2.52a) that the total response of an LTI system can be expressed as a sum of the zero-input and the zerostate components. In Eq. (2.52b), we showed that the same response can also be expressed as a sum of the natural and the forced components. We have also seen that generally the zero-input response is not the same as the natural response (although both are made of natural modes). Similarly, the zero-state response is not the same as the forced response. Unfortunately, such erroneous claims are often encountered in the literature. [†] This result is valid only if ζ is not a characteristic root of the system. [‡] Observe the closeness of Eqs. (2.57) and (2.47). Why is there a difference between the two equations? Equation (2.47) is the response to an

exponential that started at −∞, while Eq. (2.57) is the response to an exponential that starts at t = 0. As t → ∞, Eq. (2.57) approaches Eq. (2.47). In Eq. (2.47), the term y n (t), which starts at t = −∞, has already decayed at t = 0, and hence, is missing.

2.6 SYSTEM STABILITY To understand the intuitive basis for the BIBO (bounded-input/bounded-output) stability of a system introduced in Section 1.7, let us examine the stability concept as applied to a right circular cone. Such a cone can be made to stand forever on its circular base, on its apex, or on its side. For this reason, these three states of the cone are said to be equilibrium states. Qualitatively, however, the three states show very different behavior. If the cone, standing on its circular base, were to be disturbed slightly and then left to itself, it would eventually return to its original equilibrium position. In such a case, the cone is said to be in stable equilibrium. In contrast, if the cone stands on its apex, then the slightest disturbance will cause the cone to move farther and farther away from its equilibrium state. The cone in this case is said to be in an unstable equilibrium. The cone lying on its side, if disturbed, will neither go back to the original state nor continue to move farther away from the original state. Thus it is said to be in a neutral equilibrium. Clearly, when a system is in stable equilibrium, application of a small disturbance (input) produces a small response. In contrast, when the system is in unstable equilibrium, even a minuscule disturbance (input) produces an unbounded response. BIBO stability definition can be

understood in the light of this concept. If every bounded input produces bounded output, the system is (BIBO) stable. [†] In contrast, if even one bounded input results in unbounded response, the system is (BIBO) unstable. For an LTIC system

Therefore

Moreover, if x(t) is bounded, then |(x − τ)t < K1 < ∞, and

Hence for BIBO stability

This is a sufficient condition for BIBO stability. We can show that this is also a necessary condition (see Prob. 2.6-4). Therefore, for an LTIC system, if its impulse response h(t) is absolutely integrale, the system is (BIBO) stable. Otherwise it is (BIBO) unstable. In addition, we shall show in Chapter 4 that a necessary (but not sufficient) condition for an LTIC system described by Eq. (2.1) to be BIBO stable is M ≤ N. If M > N, the system is unstable. This is one of the reasons to avoid systems with M > N. Because the BIBO stability of a system can be ascertained by measurements at the external terminals (input and output), this is an external stability criterion. It is no coincidence that the BIBO criterion in (2.64) is in terms of the impulse response, which is an external description of the system. As observed in Section 1.9, the internal behavior of a system is not always ascertainable from the external terminals. Therefore, the external (BIBO) stability may not be correct indication of the internal stability. Indeed, some systems that appear stable by the BIBO criterion may be internally unstable. This is like a room inside a house on fire: no trace of fire is visible from outside, but the entire house will be burned to ashes. The BIBO stability is meaningful only for systems in which the internal and the external description are equivalent (controllable and observable systems). Fortunately, most practical systems fall into this category, and whenever we apply this criterion, we implicitly assume that the system in fact belongs to this category. The internal stability is all-inclusive, and the external stability can always be determined from the internal stability. For this

reason, we now investigate the internal stability criterion.

2.6-1 Internal (Asymptotic) Stability Because of the great variety of possible system behaviors, there are several definitions of internal stability in the literature. Here we shall consider a definition that is suitable for causal, linear, time-invariant (LTI) systems. If, in the absence of an external input, a system remains in a particular state (or condition) indefinitely, then that state is said to be an equilibrium state of the system. For an LTI system, zero state, in which all initial conditions are zero, is an equilibrium state. Now suppose an LTI system is in zero state and we change this state by creating small nonzero initial conditions (small disturbance). These initial conditions will generate signals consisting of characteristic modes in the system. By analogy with the cone, if the system is stable it should eventually return to zero state. In other words, when left to itself, every mode in a stable system arising as a result of nonzero initial conditions should approach 0 as t → ∞. However, if even one of the modes grows with time, the system will never return to zero state, and the system would be identified as unstable. In the borderline case, some modes neither decay to zero nor grow indefinitely, while all the remaining modes decay to zero. This case is like the neutral equilibrium in the cone. Such a system is said to be marginally stable. The internal stability is also called asymptotic stability or stability in the sense of Lyapunov. For a system characterized by Eq. (2.1), we can restate the internal stability criterion in terms of the location of the N characteristic roots λ1 , ? 2 ,..., λN of the system in a complex plane. The characteristic modes are of the form e λ k t or tr e λ k t . Location of roots in the complex plane and the

corresponding modes are shown in Fig. 2.17. These modes → 0 as t → ∞ if Re λk < 0 In contrast, the modes → ∞* ∞ if Ra λk≥0 [†] Hence, a system is (asymptotically) stable if all its characteristic roots lie in the LHP, that is, if Re λk > MS2P1 After execution, all the resulting variables are available in the workspace. For example, to view the characteristic roots, type: >> lambda lambda = -261.8034 -38.1966 Thus, the characteristic modes are simple decaying exponentials: e −261.8034t and e −38.1966t . Script files permit simple or incremental changes, thereby saving significant effort. Consider what happens when capacitor C 1 is changed from 1.0 μF to 1.0 μF. Changing MS2PI.m so that C = [1e−9, 1e−6] , allows computation of the new characteristic roots: >> MS2P1 >> lambda lambada = 1.0e+003 * -0.1500 + 3.1587i -0.1500 - 3.1587i Perhaps surprisingly, the characteristic modes are now complex exponentials capable of supporting oscillations. The imaginary portion of λ dictates an oscillation rate of 3158.7 rad/s or about 503 Hz. The real portion dictates the rate of decay. The time expected to reduce the amplitude to 25% is approximately t = In 0.25/Re≈ λ0.01 second.

M2.2 Function M-Files It is inconvenient to modify and save a script file each time a change of parameters is desired. Function M-files provide a sensible alternative. Unlike script M-files, function M-files can accept input arguments as well as return outputs. Functions truly extend the MATLAB language in ways that script files cannot. Syntactically, a function M-file is identical to a script M-file except for the first line. The general form of the first line is: function [output1, output2, ...,outputN] = filename(input1, input2,...,inputM) For example, consider modification of MS2P1. m to make function MS2P2.m. Component values are passed to the function as two separate inputs: a length-3 vector of resistor values and a length-2 vector of capacitor values. The characteristic roots are returned as a 2 × 1 complex vector. function [lambda] = MS2P2 (R, C) % MS2P2.m : MATLAB Session 2, Program 2 % Function M-file determines characteristic roots of % op-amp circuit. % INPUTS: R =length-3 vector of resistances % C = length-2 vector of capacitances % OUTPUTS: lambda = characteristic roots % Determine coefficients for characteristic equation: a0 = 1; a1 = (1/R(1) + 1/R(2) + 1/R (3))/C(2); a2 = 1/(R(1) *R (2) *C(1) *C(2)); A = [a0 a1 a2]; % Determine characteristic roots: lambda = roots (A); As with script M-files, function M-files execute by typing the name at the command prompt. However, inputs must also be included. For example, MS2P2 easily confirms the oscillatory modes of the preceding example. >> lambda = MS2P2([le4, le4, le4], [le-9, le-6]) lambda = 1.0e + 003 * -0.1500 + 3.1587i -0.1500 - 3.1587i Although scripts and functions have similarities, they also have distinct differences that are worth pointing out. Scripts operate on workspace data; functions must either be supplied data through inputs or create their own data. Unless passed as an output, variables and data created by functions

remain local to the function; variables or data generated by scripts are global and are added to the workspace. To emphasize this point, consider polynomial coefficient vector A, which is created and used in both MS2P1.m and MS2P2.m. Following execution of function MS2P2, the variable A is not added to the workspace. Following execution of script MS2P1, however, A is available in the workspace. Recall, the workspace is easily viewed by typing either who or whos.

M2.3 For-Loops Real resistors and capacitors never exactly equal their nominal values. Suppose that the circuit components are measured as R 1 = 10.322 k, R 2 = 9.952 k, R 3 = 10.115 k C 1 = 1.120nF, and C 2 = 1.320 μF. These values are consistent with the 10 and 25% tolerance resistor and capacitor values commonly and readily available. MS2P2.m uses these component values to calculate the new values of λ. >> lambda = MS2P2 ([10322, 9592, 10115], [1.12e-9, 1.32e-6]) lambda = 1.0e+003 * -0.1136 + 2.6113i -0.1136 - 2.6113i Now the natural modes oscillate at 2611.3 rad/s or about 416 Hz. Decay to 25% amplitude is expected in t = In 0.25/(−113.6) ≈ 0.012 second. These values, which differ significantly from the nominal values of 503 Hz and t ≈ 0.01 second, warrant a more formal investigation of the effect of component variations on the locations of the characteristic roots. It is sensible to look at three values for each component: the nominal value, a low value, and a high value. Low and high values are based on component tolerances. For example, a 10% 1k Ω resistor could have an expected low value of 1000(1 − 0.1) = 900Ω and an expected high value of 1000(1 + 0.1) = 1100 Ω. For the five passive components in the design, 3 5 = 243 permutations are possible.

Using either MS2 PI.m or MS2 P2 .m to solve each of the 243 cases would be very tedious and boring. For-loops help automate repetitive tasks such as this. In MATLAB, the general structure of a for statement is: for variable = expression, statement,..., statement, end Five nested for-loops, one for each passive component, are required for the present example. % MS2P3.m : MATLAB Session 2, Program 3 % Script M-file determines characteristic roots over % a range of component values. % Pre-allocate memory for all computed roots: lambda = zeros(2, 243); % Initialize index to identify each permutation: p=0; for R1 = le4* [0.9, 1.0, 1.1], for R2 = le4* [0.9, 1.0, 1.1], for R3 = le4* [0.9, 1.0, 1.1], for C1 = le-9* [0.75, 1.0, 1.25], for C2 = le-6*[0.75,1.0,1.25], p = p+1; lambda (:, p) = MS2P2 ([R1 R2 R3], [C1 C2]); end end end end end plot (real(lambda(:)), imag(lambda(:)), 'kx',... real (lambda(:, 1)), image (lambda(:, 1)), 'kv',... real (lambda(:, end)), imag(lambda(:, end)), 'k^') xlabel ('Real'), ylabel ('Imaginary') legend('Characteristic Roots', 'Min-Component Values Roots',... 'Max-Component Values Roots', 0); The command lambda = zeros (2,243) preallocates a 2 × 243 array to store the computed roots. When necessary, MATLAB performs dynamic memory allocation, so this command is not strictly necessary. However, preallocation significantly improves script execution speed. Notice also that it would be nearly useless to call script MS2P1 from within the nested loop; script file parameters cannot be changed during execution. The plot instruction is quite long. Long commands can be broken across several lines by terminating intermediate lines with three dots (...). The three dots tell MATLAB to continue the present command to the next line. Black x's locate roots of each permutation. The command lambda (:) vectorizes the 2 × 243 matrix lambda into a 486 × 1 vector. This is necessary in this case to ensure that a proper legend is generated. Because of loop order, permutation p = 1 corresponds to the case of all components at the smallest values and permutation p = 243 corresponds to the case of all components at the largest values. This information is used to separately highlight the minimum and maximum cases using down-triangles (∇) and up-triangles (Δ), respectively. In addition to terminating each for loop, end is used to indicate the final index along a particular dimension, which eliminates the need to remember the particular size of a variable. An overloaded function, such as end, serves multiple uses and is typically interpreted based on context. The graphical results provided by MS2P3 are shown in Fig. M2.2. Between extremes, root oscillations vary from 365 to 745 Hz and decay times to 25% amplitude vary from 6.2 to 12.7 ms. Clearly, this circuit's behavior is quite sensitive to ordinary component variations.

Figure M2.2: Effect of component values on characteristic root locations.

M2.4 Graphical Understanding of Convolution MATLAB graphics effectively illustrate the convolution process. Consider the case of y(t) = x(t) * h(t), where x(t) = sin (πt)(u(t) − u(t − 1)) and h(t) =1.5(u(t) − u(t − 1.5)) −u(t − 2) + u(t − 2.5). Program MS2P4 steps through the convolution over the time interval (−0.25 ≤ t ≤ 3.75). % MS2p4.m : MATLAB Session 2, Program 4 % Script M-file graphically demonstrates the convolution process. figure (1) % Create figure window and make visible on screen x = inline('1.5*sin(pi*t).*(t>=0 & t=0&t=2&t> for k = 1:length(n)-2, >> y(k + 2) = y(k+1) - 0.24*y(k) + x(k+2) - 2*x(k+1); >> end; >> clf; stem(n,y,'k'); xlabel('n'); ylabel('y[n]'); >> disp(' n y'); disp([num2str([n,y])]); n y -2 1 -1 2 0 1.76 1 2.28 2 1.8576 3 0.3104 4 -2.13542 5 -5.20992 6 -8.69742 7 -12.447 8 -16.3597 9 -20.3724 10 -24.4461

Figure C3.3 We shall see in the future that the solution of a difference equation obtained in this direct (iterative) way is useful in many situations. Despite the many uses of this method, a closed-form solution of a difference equation is far more useful in study of the system behavior and its dependence on the input and the various system parameters. For this reason we shall develop a systematic procedure to analyze discrete-time systems along lines similar to those used for continuous-time systems. OPERATIONAL NOTATION In difference equations it is convenient to use operational notation similar to that used in differential equations for the sake of compactness. In continuous-time systems we used the operator D to denote the operation of differentiation. For discrete-time systems we shall use the operator E to denote the operation for advancing a sequence by one time unit. Thus

The first-order difference equation of the savings account problem was found to be [see Eq. (3.9b)]

Using the operational notation, we can express this equation as or

The second-order difference equation (3.10b) can be expressed in operational notation as A general Nth-order difference Eq. (3.17a) can be expressed as

or

where Q[E] and P[E] are Nth−order polynomial operators

RESPONSE OF LINEAR DISCRETE-TIME SYSTEMS Following the procedure used for continuous-time systems, we can show that Eq. (3.24) is a linear equation (with constant coefficients). A system described by such an equation is a linear time-invariant, discrete-time (LTID) system. We can verify, as in the case of LTIC systems (see the footnote on page 152), that the general solution of Eq. (3.24) consists of zero-input and zero-state components. [†] Equations such as (3.9), (3.10), (3.12), and (3.15) are considered to be linear according to the classical definition of linearity. Some authors label

such equations as incrementally linear. We prefer the classical definition. It is just a matter of individual choice and makes no difference in the final results.

3.6 SYSTEM RESPONSE TO INTERNAL CONDITIONS: THE ZERO-INPUT RESPONSE The zero-input response y 0 [n] is the solution of Eq. (3.24) with x[n] = 0; that is

or

or

We can solve this equation systematically. But even a cursory examination of this equation points to its solution. This equation states that a linear combination of y 0 [n] and advanced y 0 [n] is zero, not for some values of n, but for all n. Such situation is possible if and only if y 0 [n] and advanced y 0 [n] have the same form. Only an exponential function γ n has this property, as the following equation indicates.

Equation (3.28) shows that γ n advanced by k units is a constant (γ k ) times γ n . Therefore, the solution of Eq. (3.27) must be of the form[†]

To determine c and γ, we substitute this solution in Eq. (3.27b). Equation (3.29) yields

Substitution of this result in Eq. (3.27b) yields

For a nontrivial solution of this equation

or

Our solution cγ n [Eq. (3.29)] is correct, provided γ satisfies Eq. (3.32). Now, Q[γ] is an Nth−order polynomial and can be expressed in the factored form (assuming all distinct roots):

Clearly, γ has N solutions γ 1 , ? 2 ,...,γ N and, therefore, Eq. (3.27) also has N solutions c 1 γ n 1 , c 2 ? n 2 ,..., c n γ n N. In such a case, we have shown that the general solution is a linear combination of the N solutions (see the footnote on page 153). Thus

where ? 1 , ? 2 ,...,γ n are the roots of Eq. (3.32) and c 1 , c 2 ,..., c n are arbitrary constants determined from N auxiliary conditions, generally given in the form of initial conditions. The polynomial Q[γ] is called the characteristic polynomial of the system, and

is the characteristic equation of the system. Moreover, ? 1 , ? 2 ,...,γ n , the roots of the characteristic equation, are called characteristic roots or characteristic values (also eigenvalues) of the system. The exponentials γ n i (i = 1, 2,..., N) are the characteristic modes or natural modes of the system. A characteristic mode corresponds to each characteristic root of the system, and the zero-input response is a linear combination of the characteristic modes of the system. REPEATED ROOTS

So far we have assumed the system to have N distinct characteristic roots γ 1 , γ 2 ,...,γ N with corresponding characteristic modes γ n 1 , ? n 2 ,...,γ n N. If two or more roots coincide (repeated roots), the form of characteristic modes is modified. Direct substitution shows that if a root γ repeats r times

(root of multiplicity r), the corresponding characteristic modes for this root are γ n , nγ n ,n 2 ? n ..., n r−1 γ n . Thus, if the characteristic equation of a system is

the zero-input response of the system is

COMPLEX ROOTS As in the case of continuous-time systems, the complex roots of a discrete-time system will occur in pairs of conjugates if the system equation coefficients are real. Complex roots can be treated exactly as we would treat real roots. However, just as in the case of continuous-time systems, we can also use the real form of solution as an alternative. First we express the complex conjugate roots γ and γ * in polar form. If |γ| is the magnitude and β is the angle of γ, then The zero-input response is given by

For a real system, c 1 and c 2 must be conjugates so that y 0 [n] is a real function of n. Let

Then

where c and θ are arbitrary constants determined from the auxiliary conditions. This is the solution in real form, which avoids dealing with complex numbers. EXAMPLE 3.10 a. For an LTID system described by the difference equation

find the total response if the initial conditions are y[−1] = 0 and y[−2] = 25/4, and if the input x[n] = 4 −n u[n]. In this example we shall determine the zero-input component y 0 [n] only. The zero-state component is determined later, in Example 3.14. The system equation in operational notation is

The characteristic polynomial is

The characteristic equation is

The characteristic roots are γ 1 = −0.2 and γ 2 = 0.8. The zero-input response is

To determine arbitrary constants c 1 and c 2 , we set n = −1 and −2 in Eq. (3.40), then substitute y 0 [−1] = 0 and y 0 [−2] = 25/4 to

obtain [†]

Therefore

The reader can verify this solution by computing the first few terms using the iterative method (see Examples 3.8 and 3.9). b. A similar procedure may be followed for repeated roots. For instance, for a system specified by the equation Let us determine y 0 [n], the zero-input component of the response if the initial conditions are y 0 [−1] = −1/3 and y 0 [−2] = −2/9. The characteristic polynomial is γ 2 + 6γ + 9 = (γ + 3) 2 , and we have a repeated characteristic root at γ = −3. The characteristic modes are (−3) n and n(−3) n . Hence, the zero-input response is We can determine the arbitrary constants c 1 and c 2 from the initial conditions following the procedure in part (a). It is left as an exercise for the reader to show that c 1 = 4 and c 2 = 3 so that c. For the case of complex roots, let us find the zero-input response of an LTID system described by the equation when the initial conditions are y 0 [−1] = 2 and y 0 [−2] = 1. The characteristic polynomial is (γ 2 − 1.56γ + 0.81) = (γ − 0.78 − j0.45)(γ − 0.78 + j0.45). The characteristic roots are 0.78 ± j0.45; that is, 0.9e ±j(π/6). We could immediately write the solution as

Setting n = −1 and −2 and using the initial conditions y 0 [−1] = 2 and y 0 [−2] = 1, we find c = 2.34e −j0.17 and c* = 2.34e j0.17. Alternately, we could also find the solution by using the real form of solution, as given in Eq. (3.37b). In the present case, the roots

are 0.9e ±j(π/6). Hence, |γ| = 0.9 and β = π/6, and the zero-input response, according to Eq. (3.37b), is given by

To determine the arbitrary constants c and θ, we set n = −1 and −2 in this equation and substitute the initial conditions y 0 [−1] = 2, y 0 [−2] = 1 to obtain

or

These are two simultaneous equations in two unknowns c cos θ and c sin θ. Solution of these equations yields

Dividing c sin θ by c cos θ yields

Substituting θ = −0.17 radian in c cos θ = 2.308 yields c = 2.34 and

Observe that here we have used radian unit for both β and θ. We also could have used the degree unit, although this practice is not recommended. The important consideration is to be consistent and to use the same units for both β and θ. EXERCISE E3.11

Find and sketch the zero-input response for the systems described by the following equations: a. y[n + 1] − 0.8y[n] = 3x[n + 1] b. y[n + 1] + 0.8y[n] = 3x[n + 1] In each case the initial condition is y[−1] = 10. Verify the solutions by computing the first three terms using the iterative method.

Answers

a. 8(0.8)n b. −8(−0.8) n

EXERCISE E3.12

Find the zero-input response of a system described by the equation The initial conditions are y 0 [−1] = 1 and y 0 [−2] = 33. Verify the solution by computing the first three terms iteratively.

Answers y [n] = (0.2)n + 2(−0.5) n 0 EXERCISE E3.13

Find the zero-input response of a system described by the equation The initial conditions are y 0 [−1] = −1/(2√2) and y 0 [−2] = 1/(4√2). Verify the solution by computing the first three terms iteratively.

Answers

COMPUTER EXAMPLE C3.4 Using the initial conditions y[−1] = 2 and y[−2] = 1, find and sketch the zero-input response for the system described by (E2 − 1.56E + 0.81)y[n] = (E + 3)x[n]. >> n = (-2:20)'; y=[1;2;zeros(length(n)-2,1)]; >> for k = 1:length(n)-2 >> y(k+2) = 1.56*y(k+1) -0.81*y(k); >> end >> clf; stem(n,y,'k'); xlabel('n'); ylabel(y[n]');

Figure C3.4 [†] A signal of the form n m γ n also satisfies this requirement under certain conditions (repeated roots), discussed later. [†] The initial conditions y[−1] and y[−2] are the conditions given on the total response. But because the input does not start until n = 0, the zero-

state response is zero for n < 0. Hence, at n = −1 and −2 the total response consists of only the zero-input component, so that y[−1] = y 0 [−1] and y[−2] = y 0 [−2].

3.7 THE UNIT IMPULSE RESPONSE h[n] Consider an nth-order system specified by the equation

or

The unit impulse response h[n] is the solution of this equation for the input δ[n] with all the initial conditions zero; that is,

subject to initial conditions

Equation (3.43) can be solved to determine h[n] iteratively or in a closed form. The following example demonstrates the iterative solution. EXAMPLE 3.11: (Iterative Determination of h[n]) Find h[n], the unit impulse response of a system described by the equation

To determine the unit impulse response, we let the input x[n] = δ[n] and the output y[n] = h[n] in Eq. (3.45) to obtain

subject to zero initial state; that is, h[−1] = h[−2] = 0. Setting n = 0 in this equation yields Next, setting n = 1 in Eq. (3.46) and using h[0] = 5, we obtain Continuing this way, we can determine any number of terms of h[n]. Unfortunately, such a solution does not yield a closed-form expression for h[n]. Nevertheless, determining a few values of h[n] can be useful in determining the closed-form solution, as the following development shows. THE CLOSED-FORM SOLUTION OF h[n] Recall that h[n] is the system response to input δ[n], which is zero for n > 0. We know that when the input is zero, only the characteristic modes can be sustained by the system. Therefore, h[n] must be made up of characteristic modes for n > 0. At n = 0, it may have some nonzero value A0 ,

so that a general form of h[n] can be expressed as[†]

where y c [n] is a linear combination of the characteristic modes. We now substitute Eq. (3.47) in Eq. (3.43) to obtain Q[E] (A0 δ[n] + y c [n]u[n] = P[E]δ[n]). Because y c [n] is made up of characteristic modes. Q[E]y c [n]u[n] = 0, and we obtain A0 Q[E]δ[n] = P[E]δ[n], that is, Setting n = 0 in this equation and using the fact that δ[m] = 0 for all m ≠ 0, and δ[0] = 1, we obtain

Hence [‡]

The N unknown coefficients in y c [n] (on the right-hand side) can be determined from a knowledge of N values of h[n]. Fortunately, it is a straightforward task to determine values of h[n] iteratively, as demonstrated in Example 3.11. We compute N values h[0], h[1], h[2],..., h[N - 1] iteratively. Now, setting n = 0,1,2,..., N − 1 in Eq. (3.49), we can determine the N unknowns in y c [n]. This point will become clear in the following example. EXAMPLE 3.12 Determine the unit impulse response h[n] for a system in Example 3.11 specified by the equation This equation can be expressed in the advance operator form as

or

The characteristic polynomial is The characteristic modes are (−0.2) n and (0.8)n . Therefore

Also, from Eq. (3.51), we have a N = −0.16 and b N = 0. Therefore, according to Eq. (3.49)

To determine c 1 and c 2 , we need to find two values of h[n] iteratively. This step is already taken in Example 3.11, where we determined that h[0] = 5 and h[1] = 3. Now, setting n = 0 and 1 in Eq. (3.53) and using the fact that h[0] = 5 and h[1] = 3, we obtain

Therefore

COMPUTER EXAMPLE C3.5 Use MATLAB to solve Example 3.12. There are several ways to find the impulse response using MATLAB. In this method, we first specify the input as a unit impulse function. Vectors a and b are created to specify the system. The filter command is then used to determine the impulse response. In fact, this method can be used to determine the zero-state response for any input. >> n = (0: 19); x = inline ('n==0'); >> a = [1 -0.6 -0.16]; b = [5 0 0]; >> h = filter (b,a,x(n)); >> clf; stem(n,h,'k'); xlabel ('n'); ylabel('h[n]');

Figure C3.5 Comment. Although it is relatively simple to determine the impulse response h[n] by using the procedure in this section, in Chapter 5 we shall discuss the much simpler method of the z−transform. EXERCISE E3.14 Find h[n], the unit impulse response of the LTID systems specified by the following equations: a. y[n + 1] − y[n] = x[n] b. y[n] − 5y[n − 1] + 6y[n − 2] = 8x[n − 1] − 19x[n − 2] c. y[n + 2] − 4y[n + 1] + 4y[n] = 2x[n + 2] − 2x[n + 1] d. y[n] = 2x[n] − 2x[n − 1] Answers

a. h[n] = u[n − 1] b. c. h[n] = (2 + n)2 n u[n] d. h[n] = 2δ[n] − 2δ[n − 1]

[†] We assumed that the term y [n] consists of characteristic modes for n > 0 only. To reflect this behavior, the characteristic terms should be c expressed in the form γ n j u[n − 1]. But because u[n − 1] = u[n] − δ[n], c j γ n j u[n − 1] = c j γ n j u[n] − c j δ[n], and y c [n] can be expressed in terms of exponentials δn j u[n] (which start at n = 0), plus an impulse at n = 0. [‡] If a = 0, then A cannot be determined by Eq. (3.48). In such a case, we show in Section 3.12 that h[n] is of the form A δ[n] + A δ[n − 1] + N 0 0 1

y c [n]u[n]. We have here N + 2 unknowns, which can be determined from N + 2 values h[0], h[1],..., h[N + 1] found iteratively.

3.8 SYSTEM RESPONSE TO EXTERNAL INPUT: THE ZERO-STATE RESPONSE The zero-state response y[n] is the system response to an input x[n] when the system is in the zero state. In this section we shall assume that systems are in the zero state unless mentioned otherwise, so that the zero-state response will be the total response of the system. Here we follow the procedure parallel to that used in the continuous-time case by expressing an arbitrary input x[n] as a sum of impulse components. A signal x[n] in Fig. 3.16a can be expressed as a sum of impulse components such as those depicted in Fig. 3.16b-3.16f. The component of x[n] at n = m is x[m]δ[n − m], and x[n] is the sum of all these components summed from m = −∞ to ∞. Therefore

Figure 3.16: Representation of an arbitrary signal x[n] in terms of impulse components. For a linear system, knowing the system response to impulse δ[n], the system response to any arbitrary input could be obtained by summing the system response to various impulse components. Let h[n] be the system response to impulse input δ[n]. We shall use the notation to indicate the input and the corresponding response of the system. Thus, if then because of time invariance and because of linearity and again because of linearity

The left-hand side is x[n] [see Eq. (3.55)], and the right-hand side is the system response y[n] to input x[n]. Therefore [†]

The summation on the right-hand side is known as the convolution sum of x[n] and h[n], and is represented symbolically by x[n] * h[n]

PROPERTIES OF THE CONVOLUTION SUM The structure of the convolution sum is similar to that of the convolution integral. Moreover, the properties of the convolution sum are similar to those of the convolution integral. We shall enumerate these properties here without proof. The proofs are similar to those for the convolution integral and may be derived by the reader. The Commutative Property.

The Distributive Property.

The Associative Property.

The Shifting Property. If then

The Convolution with an Impulse.

The Width Property. If x 1 [n] and x 2 [n] have finite widths of W 1 and W 2 , respectively, then the width of x 1 [n] * x 2 [n] is W 1 + W 2 . The width of a signal is one less than the number of its elements (length). For instance, the signal in Fig. 3.17h has six elements (length of 6) but a width of only 5. Alternately, the property may be stated in terms of lengths as follows: if x 1 [n] and x 2 [n] have finite lengths of L 1 and L 2 elements, respectively, then the length of x 1 [n] * x 2 [n] is L 1 + L 2 − 1 elements. CAUSALITY AND ZERO-STATE RESPONSE In deriving Eq. (3.56), we assumed the system to be linear and time invariant. There were no other restrictions on either the input signal or the system. In our applications, almost all the input signals are causal, and a majority of the systems are also causal. These restrictions further simplify the limits of the sum in Eq. (3.56). If the input x[n] is causal, x[m] = 0 for m < 0. Similarly, if the system is causal (i.e., if h[n] is causal), then h[x] = 0 for negative x, so that h[n − m] = 0 when m > n. Therefore, if x[n] and h[n] are both causal, the product x[m]h[n − m] = 0 for m < 0 and for m > n, and it is nonzero only for the range 0 ≤ m ≤ n. Therefore, Eq. (3.56) in this case reduces to

We shall evaluate the convolution sum first by an analytical method and later with graphical aid. EXAMPLE 3.13 Determine c[n] = x[n] * g[n] for We have

Note that Both x[n] and g[n] are causal. Therefore, [see Eq. (3.63)]

In this summation, m lies between 0 and n (0 ≤ m ≤ n). Therefore, if n ≥ 0, then both m and n − m ≤ 0, so that u[m] = u[n − m] = 1. If n < 0, m is negative because m lies between 0 and n, and u[m] = 0. Therefore, Eq. (3.64) becomes

and

This is a geometric progression with common ratio (0.8/0.3). From Section B.7-4 we have

EXERCISE E3.15 Show that (0.8)n u[n] * u[n] = 5[1 − (0.8)n+1 ]u[n]. CONVOLUTION SUM FROM A TABLE Just as in the continuous-time case, we have prepared a table (Table 3.1) from which convolution sums may be determined directly for a variety of signal pairs. For example, the convolution in Example 3.13 can be read directly from this table (pair 4) as

Table 3.1: Convolution Sums

We shall demonstrate the use of the convolution table in the following example. EXAMPLE 3.14 Find the (zero-state) response y[n] of an LTID system described by the equation If the input x[n] = 4 −n u[n]. The input can be expressed as x[n] = 4 −n u[n] = (1/4)n u[n] = (0.25)n u[n]. The unit impulse response of this system was obtained in Example 3.12. Therefore

We use pair 4 (Table 3.1) to find the foregoing convolution sums.

Recognizing that We can express y[n] as

EXERCISE E3.16 Show that

EXERCISE E3.17 Show that

EXERCISE E3.18 Show that

COMPUTER EXAMPLE C3.6 Find and sketch the zero-state response for the system described by (E2 + 6E + 9)y[n] = (2E2 + 6E)x[n] for the input x[n] = 4 −n u[n]. Although the input is bounded and quickly decays to zero, the system itself is unstable and an unbounded output results. >> n = (0:11); x = inline('(4.^(-n)).*(n>=0)'); >> a = [1 6 9]; b = [2 6 0]; >> y = filter (b,a,x(n)); >> clf; stem(n,y,'k'); xlabel ('n'); ylabel('y[n]');

Figure C3.6 RESPONSE TO COMPLEX INPUTS As in the case of real continuous-time systems, we can show that for an LTID system with real h[n], if the input and the output are expressed in terms of their real and imaginary parts, then the real part of the input generates the real part of the response and the imaginary part of the input generates the imaginary part. Thus, if

using the right-directed arrow to indicate the input-output pair, we can show that

The proof is similar to that used to derive Eq. (2.40) for LTIC systems. MULTIPLE INPUTS Multiple inputs to LTI systems can be treated by applying the superposition principle. Each input is considered separately, with all other inputs assumed to be zero. The sum of all these individual system responses constitutes the total system output when all the inputs are applied simultaneously.

3.8-1 Graphical Procedure for the Convolution Sum The steps in evaluating the convolution sum are parallel to those followed in evaluating the convolution integral. The convolution sum of causal signals x[n] and g[n] is given by

We first plot x[m] and g[n − m] as functions of m (not n), because the summation is over m. Functions x[m] and g[m] are the same as x[n] and g[n], plotted respectively as functions of m (see Fig. 3.17). The convolution operation can be performed as follows: 1. Invert g[m] about the vertical axis (m = 0) to obtain g[−m] (Fig. 3.17d). Figure 3.17e shows both x[m] and g[−m]. 2. Shift g[−m] by n units to obtain g[n − m]. For n > 0, the shift is to the right (delay); for n < 0, the shift is to the left (advance). Figure 3.17f shows g[n − m] for n > 0; for n < 0, see Fig. 3.17g.

3. Next we multiply x[m] and g[n − m] and add all the products to obtain c[n]. The procedure is repeated for each value of n over the range −∞ to ∞. We shall demonstrate by an example the graphical procedure for finding the convolution sum. Although both the functions in this example are causal, this procedure is applicable to general case. EXAMPLE 3.15 Find where x[n] and g[n] are depicted in Fig. 3.17a and 3.17b, respectively.

Figure 3.17: Graphical understanding of convolution of x[n] and g[n]. We are given Therefore Figure 3.17f shows the general situation for n ≥ 0. The two functions x[m] and g[n − m] overlap over the interval 0 ≤ m ≤ n. Therefore

For n < 0, there is no overlap between x[m] and g[n − m], as shown in Fig. 3.17g so that and which agrees with the earlier result in Eq. (3.65). EXERCISE E3.19

Find (0.8)n u[n] * u[n] graphically and sketch the result. Answers

AN ALTERNATIVE FORM OF GRAPHICAL PROCEDURE: THE SLIDING-TAPE METHOD This algorithm is convenient when the sequences x[n] and g[n] are short or when they are available only in graphical form. The algorithm is basically the same as the graphical procedure in Fig. 3.17. The only difference is that instead of presenting the data as graphical plots, we display it as a sequence of numbers on tapes. Otherwise the procedure is the same, as will become clear in the following example. EXAMPLE 3.16 Use the sliding-tape method to convolve the two sequences x[n] and g[n] depicted in Fig. 3.18a and 3.18b, respectively.

Figure 3.18: Sliding-tape algorithm for discrete-time convolution. In this procedure we write the sequences x[n] and g[n] in the slots of two tapes: x tape and g tape (Fig. 3.18c). Now leave the x tape stationary (to correspond to x[m]). The g[−m] tape is obtained by inverting the g[m] tape about the origin (m = 0) so that the slots corresponding to x[0] and g[0] remain aligned (Fig. 3.18d). We now shift the inverted tape by n slots, multiply values on two tapes in adjacent slots, and add all the products to find c[n]. Figure 3.18d-3.18i shows the cases for n = 0-5. Figure 3.18j-3.18k, and 3.181 shows the cases for n = −1, −2, and −3, respectively. For the case of n = 0, for example (Fig. 3.18d) For n = 1 (Fig. 3.18e) Similarly,

Figure 3.18i shows that c[n] = 7 for n ≥ 4 Similarly, we compute c[n] for negative n by sliding the tape backward, one slot at a time, as shown in the plots corresponding to n = −1, −2, and −3, respectively (Fig. 3.18j, 3.18k, and 3.181).

Figure 3.181 shows that c[n] = 0 for n ≤ 3. Figure 3.18m shows the plot of c[n]. EXERCISE E3.20 Use the graphical procedure of Example 3.16 (sliding-tape technique) to show that x[n]*g[n] = c[n] in Fig. 3.19. Verify the width property of convolution.

Figure 3.19 COMPUTER EXAMPLE C3.7 For the signals x[n] and g[n] depicted in Fig. 3.19, use MATLAB to compute and plot c[n] = x[n] * g[n]. >> x = [0 1 2 3 2 1]; [1 1 1 1 1 1]; >> n= (0:1:length(x)+length(g)-2); >> c=conv(x,g); >> clf; stem(n, c, 'k'); xlabel('n'); ylabel('c[n]');

Figure C3.7

3.8-2 Interconnected Systems As with continuous-time case, we can determine the impulse response of systems connected in parallel (Fig. 3.20a) and cascade (Fig. 3.20b, 3.20c). We can use arguments identical to those used for the continuous-time systems in Section 2.4-3 to show that if two LTID systems S1 and S2 with impulse response h 1 [n] and h 2 [n], respectively, are connected in parallel, the composite parallel system impulse response is h 1 [n] + h 2 [n]. Similarly, if these systems are connected in cascade (in any order), the impulse response of the composite system is h 1 [n] *h 2 [n]. Moreover, because h 1 [n] *h 2 [n] = h 2 [n] *h 1 [n], linear systems commute. Their orders can be interchanged without affecting the composite system behavior.

Figure 3.20: Interconnected systems. INVERSE SYSTEMS If the two systems in cascade are inverse of each other, with impulse responses h[n] and h i [n], respectively, then the impulse response of the cascade of these systems is h[n] * h i [n]. But, the cascade of a system with its inverse is an identity system, whose output is the same as the input. Hence, the unit impulse response of an identity system is δ[n]. Consequently

As an example, we show that an accumulator system and a backward difference system are inverse of each other. An accumulator system is specified by[†]

The backward difference system is specified by

From Eq. (3.68a), we find h acc [n], the impulse response of the accumulator, as

Similarly, from Eq. (3.68b), h bdf [n], the impulse response of the backward difference system is given by

We can verify that Roughly speaking, in discrete-time systems, an accumulator is analogous to an integrator in continuous-time systems, and a backward difference system is analogous to a differentiator. We have already encountered examples of these systems in Examples 3.6 and 3.7 (digital differentiator and integrator). SYSTEM RESPONSE TO ∑ nk=−∞ x[k] Figure 3.20d shows a cascade of two LTID systems: a system S with impulse response h[n], followed by an accumulator. Figure 3.20e shows a cascade of the same two systems in reverse order: an accumulator followed by S. In Fig. 3.20d, if the input x[n] to S results in the output y[n], then the output of the system 3.20d is the ∑ y[k]. In Fig. 3.20e, the output of the accumulator is the sum ∑ x[k]. Because the output of the system in Fig. 3.20e is identical to that of system Fig. 3.20d, it follows that

If we let x[n] = δ[n] and y[n] = h[n] in Eq. (3.70a), we find that g[n], the unit step response of an LTID system with impulse response h[n], is given by

The reader can readily prove the inverse relationship

3.8-3 A Very Special Function for LTID Systems: The Everlasting Exponential zn In Section 2.4-4, we showed that there exists one signal for which the response of an LTIC system is the same as the input within a multiplicative constant. The response of an LTIC system to an everlasting exponential input e st is H(s)e st , where H(s) is the system transfer function. We now show that for an LTID system, the same role is played by an everlasting exponential z n . The system response y[n] in this case is given by

For causal h[n], the limits on the sum on the right-hand side would range from 0 to ∞. In any case, this sum is a function of z. Assuming that this sum converges, let us denote it by H[z]. Thus,

where

Equation (3.71a) is valid only for values of z for which the sum on the right-hand side of Eq. (3.71b) exists (converges). Note that H[z] is a

constant for a given z. Thus, the input and the output are the same (within a multiplicative constant) for the everlasting exponential input z n . H[z], which is called the transfer function of the system, is a function of the complex variable z. An alternate definition of the transfer function H[z] of an LTID system from Eq. (3.71a) as

The transfer function is defined for, and is meaningful to, LTID systems only. It does not exist for nonlinear or time-varying systems in general. We repeat again that in this discussion we are talking of the everlasting exponential, which starts at n = −∞, not the causal exponential z n u[n], which starts at n = 0. For a system specified by Eq. (3.24), the transfer function is given by

This follows readily by considering an everlasting input x[n] = z n . According to Eq. (3.72), the output is y[n] = H[z]z n . Substitution of this x[n] and y[n] in Eq. (3.24b) yields Moreover Hence Consequently,

EXERCISE E3.21 Show that the transfer function of the digital differentiator in Example 3.6 (big shaded block in Fig. 3.14b) is given by H[z] = (z − 1)/Tz, and the transfer function of an unit delay, specified by y[n] = x[n − 1], is given by 1/z.

3.8-4 Total Response The total response of an LTID system can be expressed as a sum of the zero-input and zero-state components:

In this expression, the zero-input component should be appropriately modified for the case of repeated roots. We have developed procedures to determine these two components. From the system equation, we find the characteristic roots and characteristic modes. The zero-input response is a linear combination of the characteristic modes. From the system equation, we also determine h[n], the impulse response, as discussed in Section 3.7. Knowing h[n] and the input x[n], we find the zero-state response as the convolution of x[n] and h[n]. The arbitrary constants c 1 , c 2 ,..., c n in the zero-input response are determined from the n initial conditions. For the system described by the equation with initial conditions y[−1] = 0, y[−2] = 25/4 and input x[n] = (4)−n u[n], we have determined the two components of the response in Examples 3.10a and 3.14, respectively. From the results in these examples, the total response for n ≥ 0 is

NATURAL AND FORCED RESPONSE

The characteristic modes of this system are (−0.2) n and (0.8)n . The zero-input component is made up of characteristic modes exclusively, as expected, but the characteristic modes also appear in the zero-state response. When all the characteristic mode terms in the total response are lumped together, the resulting component is the natural response. The remaining part of the total response that is made up of noncharacteristic modes is the forced response. For the present case, Eq. (3.74) yields

[†] In deriving this result, we have assumed a time-invariant system. The system response to input δ[n − m] for a time-varying system cannot be

expressed as h[n − m], but instead has the form h[n, m]. Using this form, Eq. (3.56) is modified as follows:

[†] Equations (3.68a) and (3.68b) are identical to Eqs. (3.14a) and (3.12), respectively, with T = 1.

3.9 CLASSICAL SOLUTION OF LINEAR DIFFERENCE EQUATIONS As in the case of LTIC systems, we can use the classical method, in which the response is obtained as a sum of natural and forced components of the response, to analyze LTID systems. FINDING NATURAL AND FORCED RESPONSE As explained earlier, the natural response of a system consists of all the characteristic mode terms in the response. The remaining noncharacteristic mode terms form the forced response. If y c [n] and y φ [n] denote the natural and the forced response respectively, then the total response is given by

Because the total response y c [n] + y φ [n] is a solution of the system equation (3.24b), we have

But since y c [n] is made up of characteristic modes,

Substitution of this equation in Eq. (3.77) yields

The natural response is a linear combination of characteristic modes. The arbitrary constants (multipliers) are determined from suitable auxiliary conditions usually given as y[0], y[1],..., y[n − 1]. The reasons for using auxiliary instead of initial conditions are explained later. If we are given initial conditions y[-1], y[-2],..., y[−N], we can readily use iterative procedure to derive the auxiliary conditions y[0], y[1],..., y[N − 1]. We now turn our attention to the forced response. Table 3.2: Forced Response Open table as spreadsheet No.

Input x[n]

Forced response y φ[n]

1

r n r ? ? i (i = 1, 2,..., N)

crn

2

rn r = γi

cnr n

3

cos (βn + θ)

c cos (βn + φ)

4

Note: By definition, yφ[n] cannot have any characteristic mode terms. Should any term shown in the right-hand column for the forced response be a characteristic mode of the system, the correct form of the forced response must be modified to n i yφ[n], where i is the smallest integer

that will prevent n i yφ[n] from having a characteristic mode term. For example, when the input is r n , the forced response in the right-hand

column is of the form crn . But if r n happens to be a natural mode of the system, the correct form of the forced response is cnr n (see pair 2).

The forced response yφ[n] satisfies Eq. (3.79) and, by definition, contains only nonmode terms. To determine the forced response, we shall use the method of undetermined coefficients, the same method used for the continuous-time system. However, rather than retracing all the steps of the continuous-time system, we shall present a table (Table 3.2) listing the inputs and the corresponding forms of forced function with undetermined coefficients. These coefficients can be determined by substituting yφ[n] in Eq. (3.79) and equating the coefficients of similar terms. EXAMPLE 3.17 Solve

if the input x[n] = (3n + 5)u[n] and the auxiliary conditions are y[0] = 4, y[1] = 13. The characteristic equation is Therefore, the natural response is To find the form of forced response yφ[n], we use Table 3.2, pair 4, with r = 1, m = 1. This yields Therefore

Also and Substitution of these results in Eq. (3.79) yields or Comparison of similar terms on the two sides yields

Therefore The total response is

To determine arbitrary constants B1 and B2 we set n = 0 and 1 and substitute the auxiliary conditions y[0] = 4, y[1] = 13 to obtain

Therefore

and

COMPUTER EXAMPLE C3.8 Use MATLAB to solve Example 3.17. >> n = (-0:10)'; y=[4;13;zeros(length(n)-2,1); x = [3*n+5).*(n>=0); >> for k = 1:length(n)-2 >> y(k+2) = 5*y(k+1) - 6*y(k) + x(k+1) - 5*x(k); >> end; >> clf; stem(n,y,'k'); xlabel('n'); ylabel('y[n]'); >> disp(' n y'); disp([num2str([n,y])]); n y 0 4 1 13 2 24 3 13 4 −120 5 −731 6 −3000 7 −10691 8 −35544 9 −113675 10 −355224

Figure C3.8 EXAMPLE 3.18 Find the sum y[n] if

Such problems can be solved by finding an appropriate difference equation that has y[n] as the response. From Eq. (3.83), we observe that y[n +

1] = y[n] + (n + 1) 2 . Hence

This is the equation we seek. For this first-order difference equation, we need one auxiliary condition, the value of y[n] at n = 0. From Eq. (3.83), it follows that y[0] = 0. Thus, we seek the solution of Eq. (3.83) subject to an auxiliary condition y[0] = 0.

The characteristic equation of Eq. (3.83) is γ − 1 = 0, the characteristic root is γ = 1, and the characteristic mode is c(1)n = cu[n], where c is an arbitrary constant. Clearly, the natural response is cu[n]. The input, x[n] = (n + 1) 2 = n 2 + 2n + 1, is of the form in pair 4 (Table 3.2) with r = 1 and m = 2. Hence, the desired forced response is Note, however, the term β0 in yφ[n] is of the form of characteristic mode. Hence, the correct form is yφ[n] = β3 n 3 + β1 n 2 + β0 n. Therefore From Eq. (3.79), we obtain or Equating the coefficients of similar powers, we obtain Hence

Setting n = 0 in this equation and using the auxiliary condition y[0] = 0, we find c = 0 and

COMMENTS ON AUXILIARY CONDITIONS This (classical) method requires auxiliary conditions y[0], y[1],..., y[N - 1]. This is because at n = -1, -2,..., −N, only the zero-input component exists, and these initial conditions can be applied to the zero-input component only. In the classical method, the zero-input and zero-state components cannot be separated. Consequently, the initial conditions must be applied to the total response, which begins at n = 0. Hence, we need the auxiliary conditions y[0], y[1],..., y[N - 1]. If we are given the initial conditions y[-1], y[-2],..., y[-N], we can use iterative procedure to derive the auxiliary conditions y[0], y[1],..., y[n − 1]. AN EXPONENTIAL INPUT As in the case of continuous-time systems, we can show that for a system specified by the equation

the forced response for the exponential input x[n] = r n is given by

where

The proof follows from the fact that if the input x[n] = r n , then from Table 3.2 (pair 4), yφ[n] = crn . Therefore

so that Eq. (3.85) reduces to which yields c = P[r]/Q[r] = H[r]. This result is valid only if r is not a characteristic root of the system. If r is a characteristic root, then the forced response is cnr n where c is

determined by substituting yφ[n] in Eq. (3.79) and equating coefficients of similar terms on the two sides. Observe that the exponential r n includes

a wide variety of signals such as a constant C, a sinusoid cos (βn + θ), and an exponentially growing or decaying sinusoid |γ| n cos (βn + θ). A Constant Input x[n] = C. This is a special case of exponential Crn with r = 1. Therefore, from Eq. (3.86), we have

A Sinusoidal Input. The input e jΩn is an exponential r n with r = e jΩ. Hence

−jΩn

Similarly, for the input e Consequently, if the input x[n] = cos Ωn = 1/2(e jΩn + e −jΩn ), then Since the two terms on the right-hand side are conjugates, If then

Using a similar argument, we can show that for the input

EXAMPLE 3.19 For a system specified by the equation find the forced response for the input x[n] = (3)n u[n]. In this case

and the forced response to input (3)n u[n] is H[3](3) n u[n]; that is,

EXAMPLE 3.20 For an LTID system described by the equation determine the forced response yφ[n] if the input is

Here

For the input cos (2n + (π/3))u[n], the forced response is

where

Therefore so that

ASSESSMENT OF THE CLASSICAL METHOD The remarks in Chapter 2 concerning the classical method for solving differential equations also apply to difference equations.

3.10 SYSTEM STABILITY: THE EXTERNAL (BIBO) STABILITY CRITERION

Concepts and criteria for the BIBO (external) stability and the internal (asymptotic) stability for discrete-time systems are identical to those corresponding to continuous-time systems. The comments in Section 2.6 for LTIC systems concerning the distinction between the external and the internal stability are also valid for LTID systems. Recall that

and

If x[n] is bounded, then |x[n − m]| < K1 < ∞, and

Clearly the output is bounded if the summation on the right-hand side is bounded; that is, if

This is a sufficient condition for BIBO stability. We can show that this is also a necessary condition (see Prob. 3.10-1). Therefore, for an LTID system, if its impulse response h[n] is absolutely summable, the system is (BIBO) stable. Otherwise it is unstable. All the comments about the nature of the external and the internal stability in Chapter 2 apply to discrete-time case. We shall not elaborate them further.

3.10-1 Internal (Asymptotic) Stability For LTID systems, as in the case of LTIC systems, the internal stability, called the asymptotical stability or the stability in the sense of Lyapunov (also the zero-input stability) is defined in terms of the zero-input response of a system. For an LTID system specified by a difference equation of the form (3.17) [or (3.24)], the zero-input response consists of the characteristic modes of the system. The mode corresponding to a characteristic root γ is γ n . To be more general, let γ be complex so that Since the magnitude of e nβn is always unity regardless of the value of n, the magnitude of γ n is |γ| n . Therefore

Figure 3.21 shows the characteristic modes corresponding to characteristic roots at various locations in the complex plane

Figure 3.21: Characteristic roots location and the corresponding characteristic modes. These results can be grasped more effectively in terms of the location of characteristic roots in the complex plane. Figure 3.22 shows a circle of unit radius, centered at the origin in a complex plane. Our discussion shows that if all characteristic roots of the system lie inside the unit circle, |γi| < 1 for all i and the system is asymptotically stable. On the other hand, even if one characteristic root lies outside the unit circle, the system is unstable. If none of the characteristic roots lie outside the unit circle, but some simple (unrepeated) roots lie on the circle itself, the system is marginally stable. If two or more characteristic roots coincide on the unit circle (repeated roots), the system is unstable. The reason is that for repeated roots, the zero-input response is of the form n r−1 γ n , and if |γ| = 1, then |n r−1 γ n | = n r−1 → ∞ as n → ∞.[†]

Figure 3.22: Characteristic root locations and system stability. Note, however, that repeated roots inside the unit circle do not cause instability. To summarize: 1. An LTID system is asymptotically stable if and only if all the characteristic roots are inside the unit circle. The roots may be simple or repeated. 2. An LTID system is unstable if and only if either one or both of the following conditions exist: (i) at least one root is outside the unit circle; (ii) there are repeated roots on the unit circle. 3. An LTID system is marginally stable if and only if there are no roots outside the unit circle and there are some unrepeated roots on the unit circle.

3.10-2 Relationship Between BIBO and Asymptotic Stability

For LTID systems, the relation between the two types of stability is similar to those in LTIC systems. For a system specified by Eq. (3.17), we can readily show that if a characteristic root γ k is inside the unit circle, the corresponding mode γ n k is absolutely summable. In contrast, if γ k lies outside the unit circle, or on the unit circle, γ n k is not absolutely summable. [†]

This means that an asymptotically stable system is BIBO stable. Moreover, a marginally stable or asymptotically unstable system is BIBO unstable. The converse is not necessarily true. The stability picture portrayed by the external description is of questionable value. BIBO (external) stability cannot ensure internal (asymptotic) stability, as the following example shows. EXAMPLE 3.21 An LTID systems consists of two subsystems S1 and S2 in cascade (Fig. 3.23). The impulse response of these systems are h 1 [n] and h 2 [n], respectively, given by

Figure 3.23: BIBO and asymptotic stability. The composite system impulse response h[n] is given by

If the composite cascade system were to be enclosed in a black box with only the input and the output terminals accessible, any measurement

from these external terminals would show that the impulse response of the system is (0.5)n u[n], without any hint of the unstable system sheltered inside the composite system. The composite system is BIBO stable because its impulse response (0.5)n u[n] is absolutely summable. However, the system S2 is asymptotically unstable because its characteristic root, 2, lies outside the unit circle. This system will eventually burn out (or saturate) because of the unbounded characteristic response generated by intended or unintended initial conditions, no matter how small. The system is asymptotically unstable, though BIBO stable. This example shows that BIBO stability does not necessarily ensure asymptotic stability when a system is either uncontrollable, or unobservable, or both. The internal and the external descriptions of a system are equivalent only when the system is controllable and observable. In such a case, BIBO stability means the system is asymptotically stable, and vice versa. Fortunately, uncontrollable or unobservable systems are not common in practice. Henceforth, in determining system stability, we shall assume that unless otherwise mentioned, the internal and the external descriptions of the system are equivalent, implying that the system is controllable and observable. EXAMPLE 3.22 Determine the internal and external stability of systems specified by the following equations. In each case plot the characteristic roots in the complex plane. a. y[n + 2] + 2.5y[n + 1] + y[n] = x[n + 1] − 2x[n] b. y[n] − y[n − 1] + 0.21y[n − 2] = 2x[n − 1] + 3x[n − 2] c. d. (E2 − E + 1) 2 y[n] = (3E + 1)x[n] a. The characteristic polynomial is The characteristic roots are −0.5 and −2. Because |−2| > 1 (−2 lies outside the unit circle), the system is BIBO unstable and also asymptotically unstable (Fig. 3.24a).

Figure 3.24: Location of characteristic roots for the systems. b. The characteristic polynomial is The characteristic roots are 0.3 and 0.7, both of which lie inside the unit circle. The system is BIBO stable and asymptotically stable (Fig. 3.24b). c. The characteristic polynomial is The characteristic roots are −1, −0.5 ± j0.5 (Fig. 3.24c). One of the characteristic roots is on the unit circle and the remaining two roots are inside the unit circle. The system is BIBO unstable but marginally stable. d. The characteristic polynomial is

The characteristic roots are (1/2) ± j(√3/2) = 1e ±j(π/3) repeated twice, and they lie on the unit circle (Fig. 3.24d). The system is BIBO unstable and asymptotically unstable. EXERCISE E3.22

Find and sketch the location in the complex plane of the characteristic roots of the system specified by the following equation: Determine the external and the internal stability of the system.

Answers BIBO and asymptotically unstable EXERCISE E3.23 Repeat Exercise E3.22 for Answers BIBO and asymptotically unstable [†] If the development of discrete−time systems is parallel to that of continuous-time systems, we wonder why the parallel breaks down here. Why, for instance, are LHP and RHP not the regions demarcating stability and instability? The reason lies in the form of the characteristic modes. In

continuous-time systems, we chose the form of characteristic mode as e λit . In discrete-time systems, for computational convenience, we choose the

form to be γ n i . Had we chosen this form to be e λin where γ i = e λi , then the LHP and RHP (for the location of λi ) again would demarcate stability and instability. The reason is that if γ = e λ |γ| = 1 implies |e λ | = 1, and therefore λ = jω. This shows that the unit circle in γ plane maps into the imaginary axis in the λ plane.

[†] This conclusion follows from the fact that (see Section B.7-4)

Moreover, if |γ| ≥ 1, the sum diverges and goes to ∞. These conclusions are valid also for the modes of the form n rγ n k

3.11 INTUITIVE INSIGHTS INTO SYSTEM BEHAVIOR The intuitive insights into the behavior of continuous-time systems and their qualitative proofs, discussed in Section 2.7, also apply to discrete-time systems. For this reason, we shall merely mention here without discussion some of the insights presented in Section 2.7. The system's entire (zero-input and zero-state) behavior is strongly influenced by the characteristic roots (or modes) of the system. The system responds strongly to input signals similar to its characteristic modes and poorly to inputs very different from its characteristic modes. In fact, when the input is a characteristic mode of the system, the response goes to infinity, provided the mode is a nondecaying signal. This is the resonance phenomenon. The width of an impulse response h[n] indicates the response time (time required to respond fully to an input) of the system. It is the

time constant of the system.[†] Discrete-time pulses are generally dispersed when passed through a discrete-time system. The amount of dispersion (or spreading out) is equal to the system time constant (or width of h[n]). The system time constant also determines the rate at which the system can transmit information. Smaller time constant corresponds to higher rate of information transmission, and vice versa. [†] This part of the discussion applies to systems with impulse response h[n] that is a mostly positive (or mostly negative) pulse.

3.12 APPENDIX 3.1: IMPULSE RESPONSE FOR A SPECIAL CASE When a N = 0, A0 = b N/a N becomes indeterminate, and the procedure needs to be modified slightly. When a N = 0, Q[E] can be expressed as and Eq. (3.43) can be expressed as Hence In this case the input vanishes not for n ≥ 1, but for n ≥ 2. Therefore, the response consists not only of the zero-input term and an impulse A0 δ[n] (at n = 0), but also of an impulse A1 δ[n − 1] (at n = 1). Therefore We can determine the unknowns A0 , A1 , and the N − 1 coefficients in y c [n] from the N + 1 number of initial values h[0], h[1],..., h[N], determined

as usual from the iterative solution of the equation Q[E]h[n] = P[E]δ[n]. [‡] Similarly, if a N = a N−1 = 0, we need to use the form h[n] = A0 δ[n] + A1 δ[n − 1] + A2 δ[n − 2] + y c [n]u[n]. The N + 1 unknown constants are determined from the N + 1 values h[0], h[1],..., h[N], determined iteratively, and so on. [‡]

is now an (N − 1)-order polynomial. Hence there are only N − 1 unknowns in y c [n].

3.13 SUMMARY This chapter discusses time-domain analysis of LTID (linear, time-invariant, discrete-time) systems. The analysis is parallel to that of LTIC systems, with some minor differences. Discrete-time systems are described by difference equations. For an Nth-order system, N auxiliary conditions must be specified for a unique solution. Characteristic modes are discrete-time exponentials of the form γ n corresponding to an unrepeated root γ, and the

modes are of the form n i γ n corresponding to a repeated root γ.

The unit impulse function δ[n] is a sequence of a single number of unit value at n = 0. The unit impulse response h[n] of a discrete-time system is

a linear combination of its characteristic modes.[†]

The zero-state response (response due to external input) of a linear system is obtained by breaking the input into impulse components and then adding the system responses to all the impulse components. The sum of the system responses to the impulse components is in the form of a sum, known as the convolution sum, whose structure and properties are similar to the convolution integral. The system response is obtained as the convolution sum of the input x[n] with the system's impulse response h[n]. Therefore, the knowledge of the system's impulse response allows us to determine the system response to any arbitrary input. LTID systems have a very special relationship to the everlasting exponential signal z n because the response of an LTID system to such an input

signal is the same signal within a multiplicative constant. The response of an LTID system to the everlasting exponential input z n is H[z]z n , where H[z] is the transfer function of the system. Difference equations of LTID systems can also be solved by the classical method, in which the response is obtained as a sum of the natural and the forced components. These are not the same as the zero-input and zero-state components, although they satisfy the same equations, respectively. Although simple, this method is applicable to a restricted class of input signals, and the system response cannot be expressed as an

explicit function of the input. These limitations diminish its value considerably in the theoretical study of systems. The external stability criterion, the bounded-input/bounded-output (BIBO) stability criterion, states that a system is stable if and only if every bounded input produces a bounded output. Otherwise the system is unstable. The internal stability criterion can be stated in terms of the location of characteristic roots of the system as follows: 1. An LTID system is asymptotically stable if and only if all the characteristic roots are inside the unit circle. The roots may be repeated or unrepeated. 2. An LTID system is unstable if and only if either one or both of the following conditions exist: (i) at least one root is outside the unit circle; (ii) there are repeated roots on the unit circle. 3. An LTID system is marginally stable if and only if there are no roots outside the unit circle and some unrepeated roots on the unit circle. An asymptotically stable system is always BIBO stable. The converse is not necessarily true. [†] There is a possibility of an impulse δ[n] in addition to characteristic modes.

MATLAB SESSION 3: DISCRETE-TIME SIGNALS AND SYSTEMS MATLAB is naturally and ideally suited to discrete-time signals and systems. Many special functions are available for discrete-time data operations, including the stem, filter, and conv commands. In this session, we investigate and apply these and other commands.

M3.1 Discrete-Time Functions and Stem Plots Consider the discrete-time function f[n] = e −n/5 cos (πn/5)u[n]. In MATLAB, there are many ways to represent f[n] including M-files or, for particular n, explicit command line evaluation. In this example, however, we use an inline object >> f = inline('exp(-n/5).*cos(pi*n/5).*(n>=0)','n'); A true discrete-time function is undefined (or zero) for noninteger n. Although inline object f is intended as a discrete-time function, its present construction does not restrict n to be integer, and it can therefore be misused. For example, MATLAB dutifully returns 0.8606 to f (0.5) when a NaN (not-a-number) or zero is more appropriate. The user is responsible for appropriate function use. Next, consider plotting the discrete-time function f[n] over (−10 ≤ n ≤ 10). The stem command simplifies this task. >> n = (-10:10)'; >> stem(n, f(n),'k'); >> xlabel ('n'); ylabel('f[n]'); Here, stem operates much like the plot command: dependent variable f (n) is plotted against independent variable n with black lines. The stem command emphasizes the discrete-time nature of the data, as Fig. M3.1 illustrates.

Figure M3.1: f[n] over (−10 ≤ n ≤ 10). For discrete-time functions, the operations of shifting, inversion, and scaling can have surprising results. Compare f[−2n] with f[−2n + 1]. Contrary to the continuous case, the second is not a shifted version of first. We can use separate subplots, each over (−10 ≤ n ≤ 10), to help illustrate this fact. Notice that unlike the plot command, the stem command cannot simultaneously plot multiple functions on a single axis; overlapping stem lines would make such plots difficult to read anyway. >> subplot (2,1,1); stem(n, f(-2*n), 'k'); ylabel('f[-2n]'); >> subplot(2,1,2); stem(n, f(-2*n+1),'k'); ylabel('f[-2n+1]'); xlabel('n'); The results are shown in Fig. M3.2. Interestingly, the original function f[n] can be recovered by interleaving samples of f[−2n] and f[−2n + 1] and

then time-reflecting the result.

Figure M3.2: f[−2n] and f[−2n + 1] over (−10 ≤ n ≤ 10). Care must always be taken to ensure that MATLAB performs the desired computations. Our inline function f is a case in point: although it correctly downsamples, it does not properly upsample (see Prob. 3.M-1). MATLAB does what it is told, but it is not always told how to do everything correctly!

M3.2 System Responses Through Filtering MATLAB's filter command provides an efficient way to evaluate the system response of a constant coefficient linear difference equation represented in delay form as

In the simplest form, filter requires three input arguments: a length−(N + 1) vector of feedforward coefficients [b 0 , b 1 ,..., b N], a length-(N + 1)

vector of feedback coefficients [a 0 , a 1 ,..., a N], and an input vector. [†] Since no initial conditions are specified, the output corresponds to the system's zero-state response.

To serve as an example, consider a system described by y[n] − y[n − 1] + y[n − 2] = x[n]. When x[n] = δ[n], the zero-state response is equal to the impulse response h[n], which we compute over (0 ≤ n ≤ 30). >> b = [1 0 0]; a = [1 -1 1]; >> n = (0:30)'; delta = inline('n==0','n'); >> h = filter(b,a,delta(n)); >> stem(n,h,'k'); axis([-.5 30.5 -1.1 1.1]); >> xlabel ('n'); ylabel('h[n]'); As shown in Fig. M3.3, h[n] appears to be (N 0 = 6)−periodic for n ≥ 0. Since periodic signals are not absolutely summable, ∑ ∞n = −∞ |h[n]| is not finite and the system is not BIBO stable. Furthermore, the sinusoidal input x[n] = cos (2πn/6)u[n], which is (N 0 = 6)−periodic for n ≥ 0, should generate a resonant zero-state response. >> x = inline('cos(2*pi*n/6).*(n>=0)','n'); >> y = filter(b,a,x(n)); >> stem(n,y,'k'); xlabel('n'); ylabel('y[n]');

Figure M3.3: h[n] for y[n] − y[n − 1] + y[n − 2] = x[n].

The response's linear envelope, shown in Fig. M3.4, confirms a resonant response. The characteristic equation of the system is γ 2 − γ + 1, which

has roots γ = e ±jπ/3 . Since the input x[n] = cos (2πn/6)u[n] = (1/2)(e jπn/3 + e −jπn/3 )u[n] coincides with the characteristic roots, a resonant response is guaranteed.

Figure M3.4: Resonant zero-state response y[n] for x[n] = cos(2πn/6)u[n]. By adding initial conditions, the filter command can also compute a system's zero-input response and total response. Continuing the preceding example, consider finding the zero-input response for y[−1] = 1 and y[−2] = 2 over (0 ≤ n ≤ 30). >> z_i = filtic(b,a,[1 2]); >> y_0 = filter(b,a,zeros(size(n)),z_i); >> stem(n,y_0,'k'); xlabel('n'); ylabel('y_{0} [n]'); >> axis([-0.5 30.5 -2.1 2.1]); There are many physical ways to implement a particular equation. MATLAB implements Eq. (M3.1) by using the popular direct form II transposed

structure. [†] Consequently, initial conditions must be compatible with this implementation structure. The signal processing toolbox function filtic converts the traditional y[-1], y[-2],..., y[−N] initial conditions for use with the filter command. An input of zero is created with the zeros command. The dimensions of this zero input are made to match the vector n by using the size command. Finally, −{ } forces subscript text in the graphics window, and ^{ } forces superscript text. The results are shown in Fig. M3.5.

Figure M3.5: Zero-input response y 0 [n] for y[−1] = 1 and y[−2] = 2. Given y[−1] = 1 and y[−2] = 2 and an input x[n] = cos (2πn/6)u[n], the total response is easy to obtain with the filter command. >> y_total = filter(b,a,x(n),z_i); Summing the zero-state and zero-input response gives the same result. Computing the total absolute error provides a check. >> sum(abs(y_total-(y + y_0))) ans = 1.8430e-014 Within computer round-off, both methods return the same sequence.

M3.3 A Custom Filter Function The filtic command is only available if the signal processing toolbox is installed. To accommodate installations without the signal processing toolbox and to help develop your MATLAB skills, consider writing a function similar in syntax to filter that directly uses the ICS y[-1], y[2]....y[−N]. Normalizing a 0 = 1 and solving Eq. (M3.1) for y[n] yields

This recursive form provides a good basis for our custom filter function. function [y] = MS3P1(b, a, x, yi); % MS3P1.m : MATLAB Session 3, Program 1 % Function M-file filters data x to create y % INPUTS: b = vector of feedforward coefficients % a = vector of veedback coefficients % x = input data vector % yi = vector of initial conditions [y[-1], y[-2], ...] % OUTPUTS: y = vector of filtered output data yi = flipud(yi(:)); % Properly format IC's. y = [yi;zeros(length(x),1)]; % Preinitialize y, beginning with IC's x = [zeros(length(yi),1);x(:)]; % Append x with zeros to match size of y. b = b/a(1);a = a/a(1); % Normalize coefficients. for n = length(yi)+1:length(y), for nb = 0:length(b)-1, y(n) = y(n) + b(nb+1)*x(n-na); % Feedforward terms. end for na = 1:length(a)-1 y(n) = y(n) − a(na+1)*y(n-na); % Feedback terms. end end y = y(length)(yi)+1:end); % Strip of IC's for final output. Most instructions in MS3P1 have been discussed; now we turn to the flipud instruction. The flip up-down command flipud reverses the order of elements in a column vector. Although not used here, the flip left-right command fliplr reverses the order of elements in a row vector. Note that typing help filename displays the first contiguous set of comment lines in an M-file. Thus, it is good programming practice to document M-files, as in MS3P1, with an initial block of clear comment lines. As an exercise, the reader should verify that MS3P1 correctly computes the impulse response h[n], the zero-state response y[n], the zero-input response y 0 [n], and the total response y[n] + y 0 [n].

M3.4 Discrete-Time Convolution Convolution of two finite-duration discrete-time signals is accomplished by using the conv command. For example, the discrete-time convolution of two length-4 rectangular pulses, g[n] = (u[n] − u[n − 4]) * (u[n] − u[n − 4]), is a length-(4 + 4 − 1 = 7) triangle. Representing u[n] − u[n − 4] by the vector [1, 1, 1, 1], the convolution is computed by: >> conv ( [1 1 1 1], [1 1 1 1]) ans = 1 2 3 4 3 2 1 Notice that (u[n+4] − u[n])*(u[n] − u[n−4]) is also computed by conv ([1 1 1 1], [1 1 1 1]) and obviously yields the same result. The difference between these two cases is the regions of support: (0 ≤ n ≤ 6) for the first and (−4 ≤ n ≤ 2) for the second. Although the conv command does not compute the region of support, it is relatively easy to obtain. If vector w begins at n = n w and vector v begins at n = n ν , then conv (w, v) begins at n = n w + n ν . In general, the conv command cannot properly convolve infinite-duration signals. This is not too surprising, since computers themselves cannot store an infinite-duration signal. For special cases, however, conv can correctly compute a portion of such convolution problems. Consider the common case of convolving two causal signals. By passing the first N samples of each, conv returns a length-(2N − 1) sequence. The first N samples of this sequence are valid; the remaining N − 1 samples are not. To illustrate this point, reconsider the zero-state response y[n] over (0 ≤ n ≤ 30) for system y[n] − y[n − 1] + y[n − 2] = x[n] given input x[n] = cos (2πn/6)u[n]. The results obtained by using a filtering approach are shown in Fig. M3.4. The response can also be computed using convolution according to y[n] = h[n]*x[n]. The impulse response of this system is [†]

Both h[n] and x[n] are causal and have infinite duration, so conv can be used to obtain a portion of the convolution. >> h = inline('(cos(pi*n/3)+sin(pi*n/3)/sqrt(3)).*(n>=0)','n'); >> y = conv(h(n), x(n)); >> stem([0:60],y,'k'); xlabel('n'); ylabel('y[n]'); The conv output is fully displayed in Fig. M3.6. As expected, the results are correct over (0 ≤ n ≤ 30). The remaining values are clearly incorrect; the output envelope should continue to grow, not decay. Normally, these incorrect values are not displayed. >> stem(n,y(1:31),'k'); xlabel('n'); ylabel('y[n]');

Figure M3.6: y[n] for x[n] = cos (2ダn/6)u[n] computed with conv. The resulting plot is identical to Fig. M3.4. [†] It is important to pay close attention to the inevitable notational differences found throughout engineering documents. In MATLAB help documents, coefficient subscripts begin at 1 rather than 0 to better conform with MATLAB indexing conventions. That is, MATLAB labels a 0 as a (1), b 0 as b (1), and so forth. [†] Implementation structures, such as direct form II transposed, are discussed in Chapter 4. [†] Techniques to analytically determine h[n] are presented in Chapter 5.

PROBLEMS 3.1.1

3.1.2

Find the energy of the signals depicted in Figs. P3.1-1.

Figure P3.1-1 Find the power of the signals illustrated in Figs. P3.1-2.

3.1.3

Figure P3.1-2 Show that the power of a signal Dej(2π/N0 )n is |D| 2 . Hence, show that the power of a signal

Use the fact that

3.1.4

a. Determine even and odd components of the signal x[n] = (0.8)n u[n]. b. Show that the energy of x[n] is the sum of energies of its odd and even components found in part (a).

3.1.5

c. Generalize the result in part (b) for any finite energy signal. a. If x e [n] and x 0 [n] are the even and the odd components of a real signal x[n], then show that Ex e = Ex 0 = 0.5Ex . b. Show that the cross-energy of x e and x 0 is zero, that is,

3.2.1

If the energy of a signal x[n] is Ex , then find the energy of the following: a. x[−n] b. x[n − m] c. x[m − n]

3.2.2

d. Kx[n] (m integer and K constant) If the power of a periodic signal x[n] is Px , find and comment on the powers and the rms values of the following: a. −x[n] b. x[−n] c. x[n − m] (m integer) d. cx[n]

3.2.3

e. x[m − n] (m integer) For the signal shown in Fig. P3.1-1b, sketch the following signals: a. x[−n] b. x[n + 6] c. x[n − 6]

d. x[3n] e.

f. x[3 − n]

3.2.4

Repeat Prob. 3.2-3 for the signal depicted in Fig.P3.1-1c.

3.3.1

Sketch, and find the power of, the following signals: a. (1)n b. (−1) n c. u[n] d. (−1) n u[n]

3.3.2

e. Show that a. δ[n] + δ[n − 1] = u[n] − u[n − 2] b. c. n(n − 1)γ n u[n] = n(n − 1)γ n u[n − 2] d.

3.3.3

e. Sketch the following signals: a. u[n − 2] − u[n − 6] b. n{u[n] − u[n − 7]} c. (n − 2) {u[n − 2] − u[n − 6]} d. (−n + 8){u[n − 6] − u[n − 9]}

e. (n − 2){u[n − 2] − u[n − 6]} + (− n + 8){u[n − 6] − u[n − 9]}

3.3.4

Describe each of the signals in Fig. P3.1-1 by a single expression valid for all n.

3.3.5

The following signals are in the form e λn . Express them in the form γ n :

a. e −0.5n b. e 0.5n c. e −jπn d. e jπn

3.3.6

In each case show the locations of λ and γ in the complex plane. Verify that an exponential is growing if γ lies outside the unit circle (or if λ lies in the RHP), is decaying if γ lies within the unit circle (or if λ lies in the LHP), and has a constant amplitude if γ lies on the unit circle (or if λ lies on the imaginary axis). Express the following signals, which are in the form e λn , in the form n : a. e −(1+jπ)n b. e −(1−jπ)n c. e (1+jπ)n d. e (1−jπ)n

e. e −[1+j(π/3)]n

3.3.7

f. e [1−j(π/3)]n The concepts of even and odd functions for discrete-time signals are identical to those of the continuous-time signals discussed in Section 1.5. Using these concepts, find and sketch the odd and the even components of the following: a. u[n] b. nu[n] c. d.

3.4.1

A cash register output y[n] represents the total cost of n items rung up by a cashier. The input x[n] is the cost of the nth item. a. Write the difference equation relating y[n] to x[n].

3.4.2

3.4.3

b. Realize this system using a time-delay element. Let p[n] be the population of a certain country at the beginning of the nth year. The birth and death rates of the population during any year are 3.3 and 1.3%, respectively. If i[n] is the total number of immigrants entering the country during the nth year, write the difference equation relating p[n + 1], p[n], and i[n]. Assume that the immigrants enter the country throughout the year at a uniform rate. A moving average is used to detect a trend of a rapidly fluctuating variable such as the stock market average. A variable may fluctuate (up and down) daily, masking its long-term (secular) trend. We can discern the long-term trend by smoothing or averaging the past N values of the variable. For the stock market average, we may consider a 5-day moving average y[n] to be the mean of the past 5 days' market closing values x[n], x[n - 1],..., x[n − 4]. a. Write the difference equation relating y[n] to the input x[n].

3.4.4

3.4.5

3.4.6

b. Use time-delay elements to realize the 5-day moving-average filter. The digital integrator in Example 3.7 is specified by If an input u[n] is applied to such an integrator, show that the output is (n + 1)Tu[n], which approaches the desired ramp nTu[n] as T → 0. Approximate the following second-order differential equation with a difference equation.

The voltage at the nth node of a resistive ladder in Fig. P3.4-6 is v[n]

Figure P3.4-6 (n = 0, 1, 2,..., N). Show that ν[n] satisfies the second-order difference equation

3.4.7

[Hint: Consider the node equation at the nth node with voltage ν[n].] Determine whether each of the following statements is true or false. If the statement is false, demonstrate by proof or example why the statement is false. If the statement is true, explain why. a. A discrete-time signal with finite power cannot be an energy signal. b. A discrete-time signal with infinite energy must be a power signal. c. The system described by y[n] = (n+1)x[n] is causal. d. The system described by y[n − 1] = x[n] is causal.

3.4.8

e. If an energy signal x[n] has energy E, then the energy of x[an] is E/|a|. A linear, time-invariant system produces output y 1 [n] in response to input x 1 [n], as shown in Fig. P3.4-8. Determine and sketch the output y 2 [n] that results when input x 2 [n] is applied to the same system.

3.4.9

Figure P3.4-8: Input-output plots. A system is described by

a. Explain what this system does. b. Is the system BIBO stable? Justify your answer. c. Is the system linear? Justify your answer. d. Is the system memoryless? Justify your answer. e. Is the system causal? Justify your answer.

3.4.10

f. Is the system time invariant? Justify your answer. A discrete-time system is given by

a. Is the system BIBO stable? Justify your answer. b. Is the system memoryless? Justify your answer.

3.4.11

3.4.12

c. Is the system causal? Justify your answer. Explain why the continuous-time system y(t) = x(2t) is always invertible and yet the corresponding discrete-time system y[n] = x[2n] is not invertible. Consider the input-output relationships of two similar discrete-time systems:

and

3.4.13

Explain why x[n] can be recovered from y 1 [n] yet x[n] cannot be recovered from y 2 [n]. Consider a system that multiplies a given input by a ramp function, r[n]. That is, y[n] = x[n]r[n]. a. Is the system BIBO stable? Justify your answer. b. Is the system linear? Justify your answer. c. Is the system memoryless? Justify your answer. d. Is the system causal? Justify your answer.

3.4.14

e. Is the system time invariant? Justify your answer. A jet-powered car is filmed using a camera operating at 60 frames per second. Let variable n designate the film frame, where n = 0 corresponds to engine ignition (film before ignition is discarded). By analyzing each frame of the film, it is possible to determine the car position x[n], measured in meters, from the original starting position x[0] = 0.

From physics, we know that velocity is the time derivative of position,

Furthermore, we know that acceleration is the time derivative of velocity,

We can estimate the car velocity from the film data by using a simple difference equation ν[n] = k(x[n] − x[n − 1]) a. Determine the appropriate constant k to ensure ν[n] has units of meters per second.

3.4.15

3.5.1

b. Determine a standard-form constant coefficient difference equation that outputs an estimate of acceleration, a[n], using an input of position, x[n]. Identify the advantages and shortcomings of estimating acceleration a(t) with a[n]. What is the impulse response h[n] for this system? Do part (a) of Prob. 3.M-2. Solve recursively (first three terms only): a. y[n + 1] − 0.5y[n] = 0, with y[−1] = 10

3.5.2

b. y[n + 1] + 2y[n] = x[n + 1], with x[n] = e −n u[n] and y[−1] = 0 Solve the following equation recursively (first three terms only): with

3.5.3

3.5.4

3.5.5

Solve recursively the second-order difference Eq. (3.10b) for sales estimate (first three terms only), assuming y[−1] = y[−2] = 0 and x[n] = 100u[n]. Solve the following equation recursively (first three terms only):

with x[n] = (3)n u[n], y[−1] = 3, and y[−2] = 2 Repeat Prob. 3.5−4 for with x[n] = (3)−n u[n], y[−1] = 2, and y[−2] = 3.

3.6.1

3.6.2

3.6.3

3.6.4

Solve

Solve

Solve

For the general Nth-order difference Eq. (3.17b), letting results in a general causal Nth-order LTI nonrecursive difference equation

3.6.5

Show that the characteristic roots for this system are zero, and hence, the zero-input response is zero. Consequently, the total response consists of the zero-state component only. Leonardo Pisano Fibonacci, a famous thirteenth-century mathematician, generated the sequence of integers {0, 1, 1, 2, 3, 5, 8, 13, 21, 34,....} while addressing, oddly enough, a problem involving rabbit reproduction. An element of the Fibonacci sequence is the sum of the previous two. a. Find the constant-coefficient difference equation whose zero-input response f[n] with auxiliary conditions f[1] = 0 and f[2] = 1 is a Fibonacci sequence. Given f[n] is the system output, what is the system input?

b. What are the characteristic roots of this system? Is the system stable?

3.6.6

c. Designating 0 and 1 as the first and second Fibonacci numbers, determine the fiftieth Fibonacci number. Determine the thousandth Fibonacci number. Find ν[n], the voltage at the nth node of the resistive ladder depicted in Fig. P3.4-6, if V = 100 volts and a = 2. [Hint 1: Consider the node equation at the nth node with voltage ν[n]. Hint 2: See Prob. 3.4-6 for the equation for ν[n]. The auxiliary conditions are ν[0] = 100 and ν[N] = 0.]

3.6.7

Consider the discrete-time system y[n] + y[n − 1] + 0.25y[n − 2] = √x[n − 8]. Find the zero input response, y 0 [n], if y 0 [−1] = 1 and y 0 [1] = 1

3.7.1

Find the unit impulse response h[n] of systems specified by the following equations: a. y[n + 1] + 2y[n] = x[n]

3.7.2

3.7.3

b. y[n] + 2y[n − 1] = x[n] Repeat Prob. 3.7−1 for Repeat Prob. 3.7−1 for

3.7.4

a. For the general Nth-order difference Eq. (3.17), letting results in a general causal Nth-order LTI nonrecursive difference equation

Find the impulse response h[n] for this system. [Hint: The characteristic equation for this case is γ n = 0. Hence, all the characteristic roots are zero. In this case, y c [n] = 0, and the approach in Section 3.7 does not work. Use a direct method to find h[n] by realizing that h[n] is the response to unit impulse input.] b. Find the impulse response of a nonrecursive LTID system described by the equation Observe that the impulse response has only a finite (N) number of nonzero elements. For this reason, such systems are called finite-impulse response (FIR) systems. For a general recursive case [Eq. (3.24)], the impulse response has an infinite number of nonzero elements, and such systems are called infinite-impulse response (IIR) systems. 3.8.1

3.8.2

3.8.3

3.8.4

3.8.5

Find the (zero-state) response y[n] of an LTID system whose unit impulse response is and the input is x[n] = e −n u[n + 1]. Find your answer by computing the convolution sum and also by using the convolution table (Table 3.1). Find the (zero-state) response y[n] of an LTID system if the input is x[n] = 3 n−1 u[n + 2] and Find the (zero-state) response y[n] of an LTID system if the input x[n] = (3)n+2 u[n + 1], and Find the (zero-state) response y[n] of an LTID system if the input x[n] = (3)−n+2 u[n + 3], and Find the (zero-state) response y[n] of an LTID system if its input x[n] = (2)n u[n − 1], and

Find your answer using only Table 3.1, the convolution table.

3.8.6

Derive the results in entries 1, 2 and 3 in Table 3.1. [Hint: You may need to use the information in Section B.7-4.]

3.8.7

Derive the results in entries 4, 5, and 6 in Table 3.1.

3.8.8

Derive the results in entries 7 and 8 in Table 3.1. [Hint: You may need to use the information in Section B.7-4.]

3.8.9

Derive the results in entries 9 and 11 in Table 3.1. [Hint: You may need to use the information in Section B.7-4.]

3.8.10

3.8.11

Find the total response of a system specified by the equation if y[−1] = 10, and the input x[n] = e −n u[n]. Find an LTID system (zero-state) response if its impulse response h[n] = (0.5)n u[n], and the input x[n] is a. 2 n u[n] b. 2 n−3 u[n] c. 2 n u[n − 2]

3.8.12

3.8.13

[Hint: You may need to use the shift property (3.61) of the convolution.] For a system specified by equation Find the system response to input x[n] = u[n]. What is the order of the system? What type of system (recursive or nonrecursive) is this? Is the knowledge of initial condition(s) necessary to find the system response? Explain. a. A discrete-time LTI system is shown in Fig. P3.8-13. Express the overall impulse response of the system, h[n], in terms of h 1 [n], h 2 [n], h 3 [n], h 4 [n], and h 5 [n]. b. Two LTID systems in cascade have impulse response h 1 [n] and h 2 [n], respectively. Show that if h 1 [n] = (0.9)n u[n] − 0.5(0.9)n−1 u[n −1] and h 2 [n] = (0.5)n u[n] − 0.9(0.5)n−1 u[n − 1], the cascade system is an identity system.

3.8.14

3.8.15

3.8.16

3.8.17

3.8.18

Figure P3.8-13 a. Show that for a causal system, Eq. (3.70b) can also be expressed as

b. How would the expressions in part (a) change if the system is not causal? In the savings account problem described in Example 3.4, a person deposits $500 at the beginning of every month, starting at n = 0 with the exception at n = 4, when instead of depositing $500, she withdraws $1000. Find y[n] if the interest rate is 1% per month (r = 0.01). To pay off a loan of M dollars in N number of payments using a fixed monthly payment of P dollars, show that

where r is the interest rate per dollar per month. [Hint: This problem can be modeled by Eq. (3.9a) with the payments of P dollars starting at n = 1. The problem can be approached in two ways (1) Consider the loan as the initial condition y 0 [0] = −M, and the input x[n] = Pu[n − 1]. The loan balance is the sum of the zero-input component (due to the initial condition) and the zero-state component h[n] * x[n]. (2) Consider the loan as an input −M at n = 0 along with the input due to payments. The loan balance is now exclusively a zero-state component h[n] * x[n]. Because the loan is paid off in N payments, set y[N] = 0.] A person receives an automobile loan of $10,000 from a bank at the interest rate of 1.5% per month. His monthly payment is $500, with the first payment due one month after he receives the loan. Compute the number of payments required to pay off the loan. Note that the last payment may not be exactly $500. [Hint: Follow the procedure in Prob. 3.8−16 to determine the balance y[n]. To determine N, the number of payments, set y[N] = 0. In general, N will not be an integer. The number of payments K is the largest integer ≤ N. The residual payment is |y[K]|.] Using the sliding-tape algorithm, show that a. u[n] * u[n] = (n + 1)u[n] b. (u[n] − u[n − m]) * u[n] = (n + 1)u[n] − (n − m + 1)u[n − m]

3.8.19

3.8.20

3.8.21

3.8.22

Using the sliding-tape algorithm, find x[n] * g[n] for the signals shown in Fig. P3.8-19.

Figure P3.8-19 Repeat Prob. 3.8-19 for the signals shown in Fig. P3.8-20.

Figure P3.8-20 Repeat Prob. 3.8-19 for the signals depicted in Fig. P3.8-21.

Figure P3.8-21 The convolution sum in Eq. (3.63) can be expressed in a matrix form as

or and Knowing h[n] and the output y[n], we can determine the input x[n]. This operation is the reverse of the convolution and is known as the deconvolution. Moreover, knowing x[n] and y[n], we can determine h[n]. This can be done by expressing the foregoing matrix equation as n + 1 simultaneous equations in terms of n + 1 unknowns h[0], h[1],..., h[n]. These equations can readily be solved iteratively. Thus, we can synthesize a system that yields a certain output y[n] for a given input x[n]. a. Design a system (i.e., determine h[n]) that will yield the output sequence (8, 12, 14, 15, 15.5, 15.75,...) for the input sequence (1, 1, 1, 1, 1, 1,...).

3.8.23

b. For a system with the impulse response sequence (1, 2, 4,...), the output sequence was (1, 7/3, 43/9,...). Determine the input sequence. A second-order LTID system has zero-input response

a. Determine the characteristic equation of this system, a 0 γ 2 + a 1 γ + a 2 = 0. b. Find a bounded, causal input with infinite duration that would cause a strong response from this system. Justify your choice.

3.8.24

c. Find a bounded, causal input with infinite duration that would cause a weak response from this system. Justify your choice. An LTID filter has an impulse response function given by h 1 [n] = δ[n + 2] − δ[n − 2]. A second LTID system has an impulse response function given by h 2 [n] = n(u[n + 4] − u[n − 4]). a. Carefully sketch the functions h 1 [n] and h 2 [n] over (−10 ≤ n ≤ 10). b. Assume that the two systems are connected in parallel as shown in Fig. P3.8-24. Determine the impulse response h p [n] for the parallel system in terms of h 1 [n] and h 2 [n]. Sketch h p [n] over (−10 ≤ n ≤ 10).

Figure P3.8-24: Parallel and series system connections.

3.8.25

c. Assume that the two systems are connected in cascade as shown in Fig. P3.8-24. Determine the impulse response h s [n] for the cascade system in terms of h 1 [n] and h 2 [n]. Sketch h s [n] over (−10 ≤ n ≤ 10). This problem investigates an interesting application of discrete-time convolution: the expansion of certain polynomial expressions. a. By hand, expand (z 3 + z 2 + z + 1) 2 . Compare the coefficients to [1, 1, 1, 1] * [1, 1, 1, 1]. b. Formulate a relationship between discrete-time convolution and the expansion of constant-coefficient polynomial expressions. c. Use convolution to expand (z −4 − 2z −3 + 3z −2 ) 4 .

3.8.26

d. Use convolution to expand (z 5 + 2z 4 + 3z 2 + 5) 2 (z −4 − 5z −2 + 13). Joe likes coffee, and he drinks his coffee according to a very particular routine. He begins by adding two teaspoons of sugar to his mug, which he then fills to the brim with hot coffee. He drinks 2/3 of the mug's contents, adds another two teaspoons of sugar, and tops the mug off with steaming hot coffee. This refill procedure continues, sometimes for many, many cups of coffee. Joe has noted that his coffee tends to taste sweeter with the number of refills. Let independent variable n designate the coffee refill number. In this way, n = 0 indicates the first cup of coffee, n = 1 is the first refill, and so forth. Let x[n] represent the sugar (measured in teaspoons) added into the system (a coffee mug) on refill n. Let y[n] designate the amount of sugar (again, teaspoons) contained in the mug on refill n. a. The sugar (teaspoons) in Joe's coffee can be represented using a standard second-order constant coefficient difference equation y[n] + a 1 y[n − 1] + a 2 y[n − 2] = b 0 x[n] + b 1 x[n − 1] + b 2 x[n − 2]. Determine the constants a 1 , a 2 , b 0 , b 1 , and b 2 . b. Determine x[n], the driving function to this system. c. Solve the difference equation for y[n]. This requires finding the total solution. Joe always starts with a clean mug from the dishwasher, so y[−1] (the sugar content before the first cup) is zero.

3.8.27

d. Determine the steady-state value of y[n]. That is, what is y[n] as n → ∞? If possible, suggest a way of modifying x[n] so that the sugar content of Joe's coffee remains a constant for all nonnegative n. A system is called complex if a real-valued input can produce a complex-valued output. Consider a causal complex system described by a first-order constant coefficient linear difference equation: a. Determine the impulse response function h[n] for this system.

3.8.28

b. Given input x[n] = u[n − 5] and initial condition y 0 [−1] = j, determine the system's total output y[n] for n ≥ 0. A discrete-time LTI system has impulse response function h[n] = n(u[n − 2] − u[n + 2]). a. Carefully sketch the function h[n] over (−5 ≤ n ≤ 5).

b. Determine the difference equation representation of this system, using y[n] to designate the output and x[n] to designate the input.

3.8.29

Do part (a) of Prob. 3.M-3.

3.8.30

Consider three discrete-time signals: x[n], y[n], and z[n]. Denoting convolution as *, identify the expression(s) that is(are) equivalent to x[n](y[n] * z[n]):

a. (x[n] * y[n])z[n]

b. (x[n]y[n]) * (x[n]z[n]) c. (x[n]y[n]) * z[n] d. none of the above Justify your answer! 3.9.1

3.9.2

3.9.3

Use the classical method to solve with the input x[n] = e −n u[n], and the auxiliary condition y[0] = 1. Use the classical method to solve with the input x[n] = e −n u[n] and the auxiliary condition y[−1] = 0. [Hint: You will have to determine the auxiliary condition y[0] by using the iterative method.] a. Use the classical method to solve

with the input x[n] = (3)n and the auxiliary conditions y[0] = 1, y[1] = 3.

3.9.4

3.9.5

b. Repeat part (a) for auxiliary conditions y[−1] = y[−2] = 1. [Hint: Use the iterative method to determine to y[0] and y[1].] Use the classical method to solve

with the input x[n] = 3 −n u[n] and the auxiliary conditions y[0] = 2 and y[1] = −13/3. Use the classical method to find the following sums:

a.

3.9.6

3.9.7

3.9.8

b. Repeat Prob. 3.9-5 to find ∑ n k=0 krk . Use the classical method to solve with the input x[n] = (0.2)n u[n] and the auxiliary conditions y[0] = 1, y[1] = 2. [Hint: The input is a natural mode of the system.] Use the classical method to solve with the input

and the initial conditions y[−1] = y[−2] = 0. [Hint: Find y[0] and y[1] iteratively.] 3.10.1

3.10.2

In Section 3.10 we showed that for BIBO stability in an LTID system, it is sufficient for its impulse response h[n] to satisfy Eq. (3.90). Show that this is also a necessary condition for the system to be BIBO stable. In other words, show that if Eq. (3.90) is not satisfied, there exists a bounded input that produces unbounded output. [Hint: Assume that a system exists for which h[n] violates Eq. (3.90), yet its output is bounded for every bounded input. Establish the contradiction in this statement by considering an input x[n] defined by x[n 1 − m] = 1 when h[m] > 0 and x[n 1 − m] = −1 when h[m] < 0, where n 1 is some fixed integer.] Each of the following equations specifies an LTID system. Determine whether each of these systems is BIBO stable or unstable. Determine also whether each is asymptotically stable, unstable, or marginally stable. a. y[n+2]+0.6y[n+1]−0.16y[n] = x[n+1]−2x[n] b. y[n]+3y[n−1]+2y[n−2] = x[n−1]+2x[n−2] c. (E − 1) 2 (E + 1/2) y[n] = x[n]

d. y[n]+2y[n−1]+0.96y[n−2] = x[n] e. y[n]+y[n−1]−2y[n−2] = x[n] + 2x[n−1]

3.10.3

3.10.4

f. (E 2 − 1)(E2 + 1)y[n] = x[n] Consider two LTIC systems in cascade, as illustrated in Fig. 3.23. The impulse response of the system S1 is h 1 [n] = 2 n u[n] and the impulse response of the system S2 is h 2 [n] = δ[n] − 2δ[n − 1]. Is the cascaded system asymptotically stable or unstable? Determine the BIBO stability of the composite system. Figure P3.10-4 locates the characteristic roots of nine causal, LTID systems, labeled A through I. Each system has only two roots and is described using operator notation as Q(E)y[n] = P(E)x[n]. All plots are drawn to scale, with the unit circle shown for reference. For each of the following parts, identify all the answers that are correct. a. Identify all systems that are unstable. b. Assuming all systems have P(E) = E2 , identify all systems that are real. Recall that a real system always generates a real-valued response to a real-valued input. c. Identify all systems that support oscillatory natural modes. d. Identify all systems that have at least one mode whose envelop decays at a rate of 2 −n . e. Identify all systems that have only one mode.

3.10.5

Figure P3.10-4: Characteristic roots for systems A through I. A discrete-time LTI system has impulse response given by a. Is the system stable? Is the system causal? Justify your answers. b. Plot the signal x[n] = u[n − 3] − u[n + 3].

3.10.6

c. Determine the system's zero-state response y[n] to the input x[n] = u[n − 3] − u[n + 3]. Plot y[n] over (−10 ≤ n ≤ 10). An LTID system has impulse response given by a. Is the system causal? Justify your answer. b. Compute ∑ ∞n = −∞ |h[n]|. Is this system BIBO stable? c. Compute the energy and power of input signal x[n] = 3u[n − 5]. d. Using input x[n] = 3u[n − 5], determine the zero-state response of this system at time n = 10. That is, determine y zs[10].

3.m.1

Consider the discrete-time function f[n] = e −n/5 cos(πn/5)u[n]. MATLAB Session 3 uses an inline object in describing this function. >> f = inline('exp(-n/5).* cos(pi*n/5).* (n>=0)','n'); While this inline object operates correctly for a downsampling operation such as f[2n], it does not operate correctly for an

3.m.2

upsampling operation such as f[n/2]. Modify the inline object f so that it also correctly accommodates upsampling operations. Test your code by computing and plotting f[n/2] over (−10 ≤ n ≤ 10). An indecisive student contemplates whether he should stay home or take his final exam, which is being held 2 miles away. Starting at home, the student travels half the distance to the exam location before changing his mind. The student turns around and travels half the distance between his current location and his home before changing his mind again. This process of changing direction and traveling half the remaining distance continues until the student either reaches a destination or dies from exhaustion. a. Determine a suitable difference equation description of this system. b. Use MATLAB to simulate the difference equation in part (a). Where does the student end up as n → ∞? How do your answer change if the student goes two-thirds the way each time, rather than halfway?

3.m.3

c. Determine a closed-form solution to the equation in part (a). Use this solution to verify the results in part (b). The cross-correlation function between x[n] and y[n] is given as

Notice that r xy[k] is quite similar to the convolution sum. The independent variable k corresponds to the relative shift between the two inputs. a. Express r xy[k] in terms of convolution. Is r xy[k] = r yx[k]? b. Cross-correlation is said to indicate similarity between two signals. Do you agree? Why or why not? c. If x[n] and y[n] are both finite duration, MATLAB's conv command is well suited to compute r xy[k]. i. Write a MATLAB function that computes the cross-correlation function using the conv command. Four vectors are passed to the function (x, y, nx, and ny) corresponding to the inputs x[n], y[n], and their respective time vectors. Notice that, x and y are not necessarily the same length. Two outputs should be created (rxy and k) corresponding to r xy[k] and its shift vector.

3.m.4

ii. Test your code from part c(i), using x[n] = u[n − 5] − u[n − 10] over (0≤n = n x ≤ 20) and y[n] = u[−n − 15] − u[−n − 10] + δ[n − 2] over (−20 ≤ n = n y ≤ 10). Plot the result rxy as a function of the shift vector k. What shift k gives the largest magnitude of r xy[k]? Does this make sense? A causal N-point max filter assigns y[n] to the maximum of {x[n],..., x[n − (N − 1)]}. a. Write a MATLAB function that performs N-point max filtering on a length-M input vector x. The two function inputs are vector x and scalar N. To create the length-M output vector Y, initially pad the input vector with N − 1 zeros. The MATLAB command max may be helpful.

3.m.5

b. Test your filter and MATLAB code by filtering a length-45 input defined as x[n] = cos(πn/5) + δ[n − 30] − δ[n − 35]. Separately plot the results for N = 4, N = 8, and N = 12. Comment on the filter behavior. A causal N-point min filter assigns y[n] to the minimum of {x[n],..., x[n − (N − 1)]}. a. Write a MATLAB function that performs N-point min filtering on a length-M input vector x. The two function inputs are vector x and scalar N. To create the length-M output vector Y, initially pad the input vector with N − 1 zeros. The MATLAB command min may be helpful.

3.m.6

b. Test your filter and MATLAB code by filtering a length-45 input defined as x[n] = cos(πn/5) + δ[n − 30] − δ[n − 35]. Separately plot the results for N = 4, N = 8, and N = 12. Comment on the filter behavior. A causal N-point median filter assigns y[n] to the median of {x[n],..., x[n − (N - 1)]}. The median is found by sorting sequence {x[n],..., x[n − (N − 1)]} and choosing the middle value (odd N) or the average of the two middle values (even N). a. Write a MATLAB function that performs N-point median filtering on a length-M input vector x. The two function inputs are vector x and scalar N. To create the length-M output vector Y, initially pad the input vector with N − 1 zeros. The MATLAB command sort or median may be helpful.

3.m.7

b. Test your filter and MATLAB code by filtering a length-45 input defined as x[n] = cos(πn/5) + δ[n − 30] − δ[n − 35]. Separately plot the results for N = 4, N = 8, and N = 12. Comment on the filter behavior. Recall that y[n] = x[n/N] represents an up-sample by N operation. An interpolation filter replaces the inserted zeros with more realistic values. A linear interpolation filter has impulse response

a. Determine a constant coefficient difference equation that has impulse response h[n]. b. The impulse response h[n] is noncausal. What is the smallest time shift necessary to make the filter causal? What is the

effect of this shift on the behavior of the filter? c. Write a MATLAB function that will compute the parameters necessary to implement an interpolation filter using MATLAB's filter command. That is, your function should output filter vectors b and a given an input scalar N.

3.m.8

d. Test your filter and MATLAB code. To do this, create x[n] = cos(n) for (0 ≤ n ≤ 9). Upsample x[n] by N = 10 to create a new signal x up [n]. Design the corresponding N = 10 linear interpolation filter, filter x up [n] to produce y[n], and plot the results. A causal N-point moving-average filter has impulse response h[n] = (u[n]−u[n−N])/N. a. Determine a constant coefficient difference equation that has impulse response h[n]. b. Write a MATLAB function that will compute the parameters necessary to implement an N-point moving-average filter using MATLAB's filter command. That is, your function should output filter vectors b and a given a scalar input N. c. Test your filter and MATLAB code by filtering a length-45 input defined as x[n] = cos(πn/5) + δ[n − 30] − δ[n − 35]. Separately plot the results for N = 4, N = 8, and N = 12. Comment on the filter behavior. d. Problem 3.M-7 introduces linear interpolation filters, for use following an up-sample by N operation. Within a scale factor, show that a cascade of two N−point moving-average filters is equivalent to the linear interpolation filter. What is the scale factor difference? Test this idea with MATLAB. Create x[n] = cos(n) for (0 ≤ n ≤ 9). Upsample x[n] by N = 10 to create a new signal x up [n]. Design an N = 10 moving-average filter. Filter x up [n] twice and scale to produce y[n]. Plot the results. Does the output from the cascaded pair of moving-average filters linearly interpolate the upsampled data?

Chapter 4: Continuous-Time System Analysis Using the Laplace Transform OVERVIEW Because of the linearity (superposition) property of linear time-invariant systems, we can find the response of these systems by breaking the input x(t) into several components and then summing the system response to all the components of x(t). We have already used this procedure in time-domain analysis, in which the input x(t) is broken into impulsive components. In the frequency-domain analysis developed in this chapter, we break up the input x(t) into exponentials of the form e st , where the parameter s is the complex frequency of the signal e st , as explained in Section 1.4-3. This method offers an insight into the system behavior complementary to that seen in the time-domain analysis. In fact, the time-domain and the frequency-domain methods are duals of each other.

The tool that makes it possible to represent arbitrary input x(t) in terms of exponential components is the Laplace transform, which is discussed in the following section.

4.1 THE LAPLACE TRANSFORM For a signal x(t), its Laplace transform X(s) is defined by

The signal x(t) is said to be the inverse Laplace transform of X(s). It can be shown that[1]

where c is a constant chosen to ensure the convergence of the integral in Eq. (4.1), as explained later. This pair of equations is known as the bilateral Laplace transform pair, where X(s) is the direct Laplace transform of x(t) and x(t) is the inverse Laplace transform of X(s). Symbolically,

Note that It is also common practice to use a bidirectional arrow to indicate a Laplace transform pair, as follows: The Laplace transform, defined in this way, can handle signals existing over the entire time interval from −∞ to ∞ (causal and noncausal signals). For this reason it is called the bilateral (or two-sided) Laplace transform. Later we shall consider a special case-the unilateral or one-sided Laplace transform-which can handle only causal signals. LINEARITY OF THE LAPLACE TRANSFORM We now prove that the Laplace transform is a linear operator by showing that the principle of superposition holds, implying that if then The proof is simple. By definition

This result can be extended to any finite sum. THE REGION OF CONVERGENCE (ROC) The region of convergence (ROC), also called the region of existence, for the Laplace transform X(s), is the set of values of s (the region in the complex plane) for which the integral in Eq. (4.1) converges. This concept will become clear in the following example. EXAMPLE 4.1 For a signal x(t) = e −at u(t), find the Laplace transform X(s) and its ROC. By definition

Because u(t) = 0 for t < 0 and u(t) = 1 for t ≥ 0,

Note that s is complex and as t → ∞, the term e −(s+a)t does not necessarily vanish. Here we recall that for a complex number z = α + jβ, Now |e −jβt | = 1 regardless of the value of βt. Therefore, as t → ∞, e −zt → 0 only if α > 0, and e zt → if α < 0. Thus

Clearly

Use of this result in Eq. (4.5) yields

or

The ROC of X(s) is Re s > −a, as shown in the shaded area in Fig. 4.1a. This fact means that the integral defining X(s) in Eq. (4.5) exists only for the values of s in the shaded region in Fig. 4.1 a. For other values of s, the integral in Eq. (4.5) does not converge. For this reason the shaded region is called the ROC (or the region of existence) for X(s).

Figure 4.1: Signals (a) e −at u(t) and (b) −e at u(−t) have the same Laplace transform but different regions of convergence. REGION OF CONVERGENCE FOR FINITE-DURATION SIGNALS A finite-duration signal x f (t) is a signal that is nonzero only for t1 ≤ t ≤ t2 , where both t1 and t2 are finite numbers and t2 > t1 . For a finite-duration, absolutely integrable signal, the ROC is the entire s plane. This is clear from the fact that if x f (t) is absolutely integrable and a finite-duration signal,

then x(t)e −σt is also absolutely integrable for any value of σ because the integration is over only finite range of t. Hence, the Laplace transform of such a signal converges for every value of s. This means that the ROC of a general signal x(t) remains unaffected by addition of any absolutely represents the ROC of a signal x(t), then the ROC of a signal x(t) + x f (t) is also . integrable, finite-duration signal x f (t) to x(t). In other words, if ROLE OF THE REGION OF CONVERGENCE The ROC is required for evaluating the inverse Laplace transform x(t) from X(s), as defined by Eq. (4.2). The operation of finding the inverse transform requires an integration in the complex plane, which needs some explanation. The path of integration is along c + jω, with ω varying from −∞ to ∞.[†] Moreover, the path of integration must lie in the ROC (or existence) for X(s). For the signal e −at u(t), this is possible if c > −a. One possible path of integration is shown (dotted) in Fig. 4.1a. Thus, to obtain x(t) from X(s), the integration in Eq. (4.2) is performed along this path.

When we integrate [1/(s + a)]e st along this path, the result is e −at u(t). Such integration in the complex plane requires a background in the theory of functions of complex variables. We can avoid this integration by compiling a table of Laplace transforms (Table 4.1), where the Laplace transform pairs are tabulated for a variety of signals. To find the inverse Laplace transform of, say, 1/(s + a), instead of using the complex integral of Eq. (4.2), we look up the table and find the inverse Laplace transform to be e −at u(t) (assuming that the ROC is Re s > −a). Although the table given here is rather short, it comprises the functions of most practical interest. A more comprehensive table appears in Doetsch. [2]

Table 4.1: A Short Table of (Unilateral) Laplace Transforms Open table as spreadsheet

No.

x(t)

X(s)

1

δ(t)

1

2

u(t)

3

tu(t)

4

tn u(t)

5

e λt u(t)

6

teλt u(t)

7

tn e λt u(t)

8a

cos bt u(t)

8b

sin bt u(t)

9a

e −at cos bt u(t)

9b

e −at sin bt u(t)

10a

re −at cos (bt + θ)u(t)

10b

re −at cos (bt + θ)u(t)

10c

re −at cos (bt + θ)u(t)

10d

THE UNILATERAL LAPLACE TRANSFORM To understand the need for defining unilateral transform, let us find the Laplace transform of signal x(t) illustrated in Fig. 4.1b: The Laplace transform of this signal is

Because u(−t) = 1 for t < 0 and u(−t) = 0 for t > 0,

Equation (4.6) shows that

Hence

The signal −e −at u(−t) and its ROC (Re s < −a) are depicted in Fig. 4.1b. Note that the Laplace transforms for the signals e −at u(t) and −e −at u(−t) are identical except for their regions of convergence. Therefore, for a given X(s), there may be more than one inverse transform, depending on the ROC. In other words, unless the ROC is specified, there is no one-to-one correspondence between X(s) and x(t). This fact increases the complexity in using the Laplace transform. The complexity is the result of trying to handle causal as well as noncausal signals. If we restrict all our signals to the

causal type, such an ambiguity does not arise. There is only one inverse transform of X(s) = 1/(s + a), namely, e −at u(t). To find x(t) from X(s), we need not even specify the ROC. In summary, if all signals are restricted to the causal type, then, for a given X(s), there is only one inverse transform x(t).[†]

The unilateral Laplace transform is a special case of the bilateral Laplace transform in which all signals are restricted to being causal; consequently the limits of integration for the integral in Eq. (4.1) can be taken from 0 to ∞. Therefore, the unilateral Laplace transform X(s) of a signal x(t) is defined as

We choose 0 − (rather than 0 + used in some texts) as the lower limit of integration. This convention not only ensures inclusion of an impulse function at t = 0, but also allows us to use initial conditions at 0 − (rather than at 0 + ) in the solution of differential equations via the Laplace transform. In

practice, we are likely to know the initial conditions before the input is applied (at 0 − ), not after the input is applied (at 0 + ). Indeed, the very meaning of the term "initial conditions" implies conditions at t = 0 − (conditions before the input is applied). Detailed analysis of desirability of using t = 0 − appears in Section 4.3.

The unilateral Laplace transform simplifies the system analysis problem considerably because of its uniqueness property, which says that for a given X(s), there is a unique inverse transform. But there is a price for this simplification: we cannot analyze noncausal systems or use noncausal inputs. However, in most practical problems, this restriction is of little consequence. For this reason, we shall first consider the unilateral Laplace transform and its application to system analysis. (The bilateral Laplace transform is discussed later, in Section 4.11.) Basically there is no difference between the unilateral and the bilateral Laplace transform. The unilateral transform is the bilateral transform that deals with a subclass of signals starting at t = 0 (causal signals). Therefore, the expression [Eq. (4.2)] for the inverse Laplace transform remains unchanged. In practice, the term Laplace transform means the unilateral Laplace transform. EXISTENCE OF THE LAPLACE TRANSFORM The variable s in the Laplace transform is complex in general, and it can be expressed as s = σ + jω. By definition

Because |e jωt | = 1, the integral on the right-hand side of this equation converges if

Hence the existence of the Laplace transform is guaranteed if the integral in expression (4.9) is finite for some value of σ. Any signal that grows no

faster than an exponential signal Me σ0 t for some M and σ0 satisfies the condition (4.9). Thus, if for some M and σ0 ,

2

we can choose σ > σ0 to satisfy (4.9).[†] The signal e t , in contrast, grows at a rate faster than e σ0 t , and consequently not Laplace transformable. [‡] Fortunately such signals (which are not Laplace transformable) are of little consequence from either a practical or a theoretical viewpoint. If σ0 is the smallest value of σ for which the integral in (4.9) is finite, σ0 is called the abscissa of convergence and the ROC of X(s) is Re s > σ0 . The abscissa

of convergence for e −at u(t) is −a (the ROC is Re s > −a). EXAMPLE 4.2 Determine the Laplace transform of the following: a. δ(t) b. u(t) 0

c. cos ω t u(t)

a. Using the sampling property [Eq. (1.24a)], we obtain that is,

b. To find the Laplace transform of u(t), recall that u(t) = 1 for t ≥ 0. Therefore

We also could have obtained this result from Eq. (4.7b) by letting a = 0. c. Because

From Eq. (4.7), it follows that

For the unilateral Laplace transform, there is a unique inverse transform of X(s); consequently, there is no need to specify the ROC explicitly. For this reason, we shall generally ignore any mention of the ROC for unilateral transforms. Recall, also, that in the unilateral Laplace transform it is understood that every signal x(t) is zero for t < 0, and it is appropriate to indicate this fact by multiplying the signal by u(t). EXERCISE E4.1

By direct integration, find the Laplace transform X(s) and the region of convergence of X (s) for the signals shown in Fig. 4.2.

Figure 4.2 Answers

a. for all s b. for all s

4.1-1 Finding the Inverse Transform Finding the inverse Laplace transform by using the Eq. (4.2) requires integration in the complex plane, a subject beyond the scope of this book (but see, e.g., Ref. 3). For our purpose, we can find the inverse transforms from the transform table (Table 4.1). All we need is to express X(s) as a sum of simpler functions of the forms listed in the table. Most of the transforms X(s) of practical interest are rational functions, that is, ratios of polynomials in s. Such functions can be expressed as a sum of simpler functions by using partial fraction expansion (see Section B.5).

Values of s for which X(s) = 0 are called the zeros of X(s); the values of s for which X(s) → ∞ are called the poles of X(s). If X(s) is a rational function of the form P(s)/Q(s), the roots of P(s) are the zeros and the roots of Q(s) are the poles of X(s). EXAMPLE 4.3 Find the inverse Laplace transforms of a.

b.

c.

d.

In no case is the inverse transform of these functions directly available in Table 4.1. Rather, we need to expand these functions into partial fractions, as discussed in Section B.5-1. In this computer age, it is very easy to find partial fractions on a computers. However, just as the availability of a handheld computer does not obviate the need for learning the mechanics of arithmetical operations (addition, multiplication, etc.), the widespread availability of computers does not eliminate the need to learn the mechanics of partial fraction expansion.

a. To determine k 1 , corresponding to the term (s + 2), we cover up (conceal) the term (s + 2) in X(s) and substitute s = −2 (the value of s that makes s + 2 = 0) in the remaining expression (see Section B.5-2):

Similarly, to determine k 2 corresponding to the term (s − 3), we cover up the term (s − 3) in X(s) and substitute s = 3 in the remaining expression

Therefore

CHECKING THE ANSWER It is easy to make a mistake in partial fraction computations. Fortunately it is simple to check the answer by recognizing that X(s) and its partial fractions must be equal for every value of s if the partial fractions are correct. Let us verify this assertion in Eq. (4.15a) for some convenient value, say s = 0. Substitution of s = 0 in Eq. (4.15a) yields [†]

We can now be sure of our answer with a high margin of confidence. Using pair 5 of Table 4.1 in Eq. (4.15a), we obtain

b.

Observe that X(s) is an improper function with M = N. In such a case we can express X(s) as a sum of the coefficient of the highest power in the numerator plus partial fractions corresponding to the poles of X(s) (see Section B.5-5). In the present case the coefficient of the highest power in the numerator is 2. Therefore

where

and

Therefore

From Table 4.1, pairs 1 and 5, we obtain

Note that the coefficients (k 2 and k* 2 ) of the conjugate terms must also be conjugate (see Section B.5). Now

Therefore To use pair 10b of Table 4.1, we need to express k 2 and k* 2 in polar form. Observe that tan −1 (4/−3) ≠ tan −1 (−4/3). This fact is evident in Fig. 4.3. For further discussion of this topic, see Example B.1.

Figure 4.3: tan −1 (−4/3) ≠ tan −1 (4/−3). From Fig. 4.3, we observe that so that Therefore

From Table 4.1 (pairs 2 and 10b), we obtain

ALTERNATIVE METHOD USING QUADRATIC FACTORS The foregoing procedure involves considerable manipulation of complex numbers. Pair 10c (Table 4.1) indicates that the inverse transform of quadratic terms (with complex conjugate poles) can be found directly without having to find first-order partial fractions. We discussed such a procedure in Section B.5-2. For this purpose, we shall express X(s) as

We have already determined that k 1 = 6 by the (Heaviside) "cover-up" method. Therefore

Clearing the fractions by multiplying both sides by s(s 2 + 10s + 34) yields Now, equating the coefficients of s 2 and s on both sides yields and

We now use pairs 2 and 10c to find the inverse Laplace transform. The parameters for pair 10c are A = −6, B = −54, a = 5, c −34, b = √c − a 2 = 3, and

Therefore which agrees with the earlier result. SHORTCUTS The partial fractions with quadratic terms also can be obtained by using shortcuts. We have

We can determine A by eliminating B on the right-hand side. This step can be accomplished by multiplying both sides of the equation for X(s) by s and then letting s → ∞. This procedure yields Therefore

To find B, we let s take on any convenient value, say s = 1, in this equation to obtain

a result that agrees with the answer found earlier.

c. where

Therefore

and

ALTERNATIVE METHOD: A HYBRID OF HEAVISIDE AND CLEARING FRACTIONS In this method, the simpler coefficients k 1 and a 0 are determined by the Heaviside "cover-up" procedure, as discussed earlier. To determine the remaining coefficients, we use the clearing-fraction method. Using the values k 1 = 2 and a 0 = 6 obtained earlier by the Heaviside "cover-up" method, we have

We now clear fractions by multiplying both sides of the equation by (s + 1)(s + 2) [3] . This procedure yields [†]

Equating coefficients of s 3 and s 2 on both sides, we obtain

We can stop here if we wish, since the two desired coefficients a 1 and a 2 have already been found. However, equating the coefficients of s 1 and s 0 serves as a check on our answers. This step yields

Substitution of a 1 = a 2 = −2, obtained earlier, satisfies these equations. This step assures the correctness of our answers. ANOTHER ALTERNATIVE: A HYBRID OF HEAVISIDE AND SHORTCUTS In this method, the simpler coefficients k 1 and a 0 are determined by the Heaviside "cover-up" procedure, as discussed earlier. The usual shortcuts are then used to determine the remaining coefficients. Using the values k 1 = 2 and a 0 = 6, determined earlier by the Heaviside method, we have

There are two unknowns, a 1 and a 2 . If we multiply both sides by s and then let s → ∞, we elminate a 1 . This procedure yields Therefore

There is now only one unknown, a 1 . This value can be determined readily by setting s equal to any convenient value, say s = 0. This step yields

COMPUTER EXAMPLE C4.1

Using the MATLAB residue command, determine the inverse Laplace transform of each of the following functions: a.

b.

c.

>> num = [2 0 5]; den = [1 3 2]; >> [r, p, k] = residue(num,den); >> disp([ '(a) r = [ ',num2str(r. ', ' %0.5g '), '] ']);... >> disp([ ' p = [ ',num2str(p. ', ' %0.5g '), '] ']);... >> disp([ ' k = [ ',num2str(k. ', ' %0.5g '), '] ']);... (a) r = [-13 7] p [-2 -1] k = [2] Therefore, Xa (s) = −13/(s + 2) + 7/(s + 1)+2 and x a (t) = (−13e −2t +7e −t )u(t)+2δ(t). >> num = [2 7 4]; den = [conv([1 1],conv([1 2], [1 2])]); >> [r, p, k] = residue(num,den); >> disp([ '(b) r = [ ',num2str(r. ', ' %0.5g '), '] ']);... >> disp([ ' p = [ ',num2str(p. ', ' %0.5g '), '] ']);... >> disp([ ' k = [ ',num2str(k. ', ' %0.5g '), '] ']);... (b) r = [3 2 -1] p [-2 -2 -1] k = [] Therefore, Xb (s) = 3/(s + 2) + 2/(s + 2) 2 − 1/(s + 1) and x b (t) = (3e −2t + 2te−2t −e −t )u(t). >> >> >> >> >> >> >>

num = [8 21 19]; den = [conv([1 2], ([1 1 7])]; [r, p, k] = residue(num,den); disp([ '(c) r = [ ',num2str(r. ', ' %0.5g '), '] ']);... disp([ ' p = [ ',num2str(p. ', ' %0.5g '), '] ']);... disp([ ' k = [ ',num2str(k. ', ' %0.5g '), '] ']);... disp([ ' rad = [ ',num2str(rad. ', ' %0.5g '), '] ']);... disp([ ' mag = [ ',num2str(mag. ', ' %0.5g '), '] ']);

(c) r = [3.5-0.48113i 3.5+0.48113i 1+0i] p [-0.5+2.5981i -0.5-2.5981i -2+0i] k = [] rad = [-0.13661 0.13661 0] mag = [3.5329 3.5329 1] Thus,

and COMPUTER EXAMPLE C4.2 Using MATLAB 's symbolic math toolbox, determine the following: a. the direct Laplace transform of x a (t) = sin (at) + cos (bt) b. the inverse Laplace transform of Xb (s) = as2 /(s 2 + b 2 ) *** Therefore, Xa = (s 3 + as2 + a 2 s + b 2 a)/(s 2 + a 2 )(s 2 + b 2 ) *** Therefore, x b (t) = aδ(t) − ab sin (bt)u(t). EXERCISE E4.2

i. Show that the Laplace transform of 10e −3t cos (4t + 53.13°) is (6s − 14)/ (s 2 + 6s + 25). Use pair 10a from Table 4.1. ii. Find the inverse Laplace transform of the following:

a.

b.

c. Answers

a. (3e t − 2e −5t )u(t) b. c. [3e 2t + (t − 3)e −3t ]u{t)

A HISTORICAL NOTE: MARQUIS PIERRE-SIMON DE LAPLACE (1749-1827) The Laplace transform is named after the great French mathematician and astronomer Laplace, who first presented the transform and its applications to differential equations in a paper published in 1779.

Pierre-Simon de Laplace Laplace developed the foundations of potential theory and made important contributions to special functions, probability theory, astronomy, and celestial mechanics. In his Exposition du système du monde (1796), Laplace formulated a nebular hypothesis of cosmic origin and tried to explain the universe as a pure mechanism. In his Traité de mécanique céleste (celestial mechanics), which completed the work of Newton, Laplace used mathematics and physics to subject the solar system and all heavenly bodies to the laws of motion and the principle of gravitation. Newton had been unable to explain the irregularities of some heavenly bodies; in desperation, he concluded that God himself must intervene now and then to prevent such catastrophes as Jupiter eventually falling into the sun (and the moon into the earth) as predicted by Newton 's calculations. Laplace proposed to show that these irregularities would correct themselves periodically and that a little patience -in Jupiter 's case, 929 years -would see everything returning automatically to order; thus there was no reason why the solar and the stellar systems could not continue to operate by the laws of Newton and Laplace to the end of time. [4]

Laplace presented a copy of Mécanique céleste to Napoleon, who, after reading the book, took Laplace to task for not including God in his scheme: "You have written this huge book on the system of the world without once mentioning the author of the universe." "Sire," Laplace retorted, "I had no need of that hypothesis." Napoleon was not amused, and when he reported this reply to another great mathematician-astronomer, Louis de Lagrange, the latter remarked, "Ah, but that is a fine hypothesis. It explains so many things."[5]

Napoleon, following his policy of honoring and promoting scientists, made Laplace the minister of the interior. To Napoleon 's dismay, however, the new appointee attempted to bring "the spirit of infinitesimals" into administration, and so Laplace was transferred hastily to the senate.

OLIVER HEAVISIDE (1850-1925) Although Laplace published his transform method to solve differential equations in 1779, the method did not catch on until a century later. It was

rediscovered independently in a rather awkward form by an eccentric British engineer, Oliver Heaviside (1850-1925), one of the tragic figures in the history of science and engineering. Despite his prolific contributions to electrical engineering, he was severely criticized during his lifetime and was neglected later to the point that hardly a textbook today mentions his name or credits him with contributions. Nevertheless, his studies had a major impact on many aspects of modern electrical engineering. It was Heaviside who made transatlantic communication possible by inventing cable loading, but no one ever mentions him as a pioneer or an innovator in telephony. It was Heaviside who suggested the use of inductive cable loading, but the credit is given to M. Pupin, who was not even responsible for building the first loading coil. [†] In addition, Heaviside was [6] The first to find a solution to the distortionless transmission line. The innovator of lowpass filters. The first to write Maxwell 's equations in modern form. The codiscoverer of rate energy transfer by an electromagnetic field. An early champion of the now-common phasor analysis. An important contributor to the development of vector analysis. In fact, he essentially created the subject independently of Gibbs.[7] An originator of the use of operational mathematics used to solve linear integro-differential equations, which eventually led to rediscovery of the ignored Laplace transform. The first to theorize (along with Kennelly of Harvard) that a conducting layer (the Kennelly-Heaviside layer) of atmosphere exists, which allows radio waves to follow earth 's curvature instead of traveling off into space in a straight line. The first to posit that an electrical charge would increase in mass as its velocity increases, an anticipation of an aspect of Einstein 's special theory of relativity. [8] He also forecast the possibility of superconductivity.

Heaviside was a self-made, self-educated man. Although his formal education ended with elementary school, he eventually became a pragmatically successful mathematical physicist. He began his career as a telegrapher, but increasing deafness forced him to retire at the age of 24. He then devoted himself to the study of electricity. His creative work was disdained by many professional mathematicians because of his lack of formal education and his unorthodox methods. Heaviside had the misfortune to be criticized both by mathematicians, who faulted him for lack of rigor, and by men of practice, who faulted him for using too much mathematics and thereby confusing students. Many mathematicians, trying to find solutions to the distortionless transmission line, failed because no rigorous tools were available at the time. Heaviside succeeded because he used mathematics not with rigor, but with insight and intuition. Using his much maligned operational method, Heaviside successfully attacked problems that the rigid mathematicians could not solve, problems such as the flow of heat in a body of spatially varying conductivity. Heaviside brilliantly used this method in 1895 to demonstrate a fatal flaw in Lord Kelvin 's determination of the geological age of the earth by secular cooling; he used the same flow of heat theory as for his cable analysis. Yet the mathematicians of the Royal Society remained unmoved and were not the least impressed by the fact that Heaviside had found the answer to problems no one else could solve. Many mathematicians who examined his work dismissed it with contempt, asserting that his methods were either complete nonsense or a rehash of known ideas.[6]

Sir William Preece, the chief engineer of the British Post Office, a savage critic of Heaviside, ridiculed Heaviside 's work as too theoretical and, therefore, leading to faulty conclusions. Heaviside 's work on transmission lines and loading was dismissed by the British Post Office and might have remained hidden, had not Lord Kelvin himself publicly expressed admiration for it. [6]

Heaviside 's operational calculus may be formally inaccurate, but in fact it anticipated the operational methods developed in more recent years. [9] Although his method was not fully understood, it provided correct results. When Heaviside was attacked for the vague meaning of his operational calculus, his pragmatic reply was, "Shall I refuse my dinner because I do not fully understand the process of digestion?" Heaviside lived as a bachelor hermit, often in near-squalid conditions, and died largely unnoticed, in poverty. His life demonstrates the persistent arrogance and snobbishness of the intellectual establishment, which does not respect creativity unless it is presented in the strict language of the establishment. [1] Lathi, B. P. Signal Processing and Linear Systems, 1st ed. Oxford University Press, New York, 1998. [†] The discussion about the path of convergence is rather complicated, requiring the concepts of contour integration and understanding of the theory of complex variables. For this reason, the discussion here is somewhat simplified. [2] Doetsch, G. Introduction to the Theory and Applications of the Laplace Transformation with a Table of Laplace Transformations. Springer-Verlag, New York, 1974. [†] Actually, X(s) specifies x(t), within a null function n(t), which has the property that the area under |n(t)|2 is zero over any finite interval 0 to t (t >

0) (Lerch 's theorem). For example, if two functions are identical everywhere except at finite number of points, they differ by a null function.

[†] Condition (4.10) is sufficient but not necessary for the existence of the Laplace transform. For example x(t) = 1/√t is infinite at t = 0 and, (4.10)

cannot be satisfied, but the transform of 1/√t exists and is given by √π/s.

[‡] However, if we consider a truncated (finite duration) signal e t 2 , the Laplace transform exists. [†] Because X(s) = ∞ at its poles, we should avoid the pole values (−2 and 3 in the present case) for checking. The answers may check even if

partial fractions are wrong. This situation can occur when two or more errors cancel their effects. But the chances of this problem arising for randomly selected values of s are extremely small. [3] LePage, W. R. Complex Variables and the Laplace Transforms for Engineers. McGraw-Hill, New York, 1961. [†] We could have cleared fractions without finding k and a . This alternative, however, proves more laborious because it increases the number of 1 0 unknowns to 4. By predetermining k 1 and a 0 , we reduce the unknowns to 2. Moreover, this method provides a convenient check on the solution. This hybrid procedure achieves. the best of both methods. [4] Durant, Will, and Ariel Durant. The Age of Napoleon, Part XI in The Story of Civili ation Series. Simon & Schuster, New York, 1975. [5] Bell, E. T. Men of Mathematics. Simon & Schuster, New York, 1937. [†] Heaviside developed the theory for cable loading, George Campbell built the first loading coil, and the telephone circuits using Campbell 's coils were in operation before Pupin published his paper. In the legal fight over the patent, however, Pupin won the battle because of his shrewd selfpromotion and the poor legal support for Campbell. [6] Nahin, P. J. "Oliver Heaviside: Genius and Curmudgeon." IEEE Spectrum, vol. 20, pp. 63 -69, July 1983. [7] Berkey, D. Calculus, 2nd ed. Saunders, Philadelphia, 1988. [8] Encyclopaedia Britannica. Micropaedia IV, 15th ed., p. 981, Chicago, 1982. [9] Churchill, R. V. Operational Mathematics, 2nd ed. McGraw-Hill, New York, 1958.

4.2 SOME PROPERTIES OF THE LAPLACE TRANSFORM Properties of the Laplace transform are useful not only in the derivation of the Laplace transform of functions but also in the solutions of linear integro-differential equations. A glance at Eqs. (4.2) and (4.1) shows that there is a certain measure of symmetry in going from x(t) to X(s), and vice versa. This symmetry or duality is also carried over to the properties of the Laplace transform. This fact will be evident in the following development. We are already familiar with two properties; linearity [Eq. (4.4)] and the uniqueness property of the Laplace transform discussed earlier.

4.2-1 Time Shifting The time-shifting property states that if then for t0 ≥ 0

Observe that x(t) starts at t = 0, and, therefore, x(t − t0 ) starts at t = t0 . This fact is implicit, but is not explicitly indicated in Eq. (4.19a). This often leads to inadvertent errors. To avoid such a pitfall, we should restate the property as follows. If then

Proof.

Setting t − t0 = τ, we obtain

Because u(τ) = 0 for τ < 0 and u(τ) = 1 for τ ≥ 0, the limits of integration can be taken from 0 to ∞. Thus

Note that x(t − t0 )u(t − t0 ) is the signal x(t)u(t) delayed by t0 seconds. The time-shifting property states that delaying a signal by t0 seconds amounts to multiplying its transform e −st 0 .

This property of the unilateral Laplace transform holds only for positive t0 because if t0 were negative, the signal x(t − t0 )u(t − t0 ) may not be causal. We can readily verify this property in Exercise E4.1. If the signal in Fig. 4.2a is x(t)u(t), then the signal in Fig. 4.2b is x(t − 2)u(t − 2). The Laplace transform for the pulse in Fig. 4.2a is (1/s)(1 − e −2s ). Therefore, the Laplace transform for the pulse in Fig. 4.2b is (1/s)(1 − e −2s)e −2 s.

The time-shifting property proves very convenient in finding the Laplace transform of functions with different descriptions over different intervals, as the following example demonstrates. EXAMPLE 4.4 Find the Laplace transform of x(t) depicted in Fig. 4.4a.

Figure 4.4: Finding a mathematical description of a function x(t). Describing mathematically a function such as the one in Fig. 4.4a is discussed in Section 1.4. The function x(t) in Fig. 4.4a can be described as a sum of two components shown in Fig. 4.4b. The equation for the first component is t − 1 over 1 ≤ t ≤ 2, so that this component can be described by (t − 1)[u(t − 1) − u(t − 2)]. The second component can be described by u(t − 2) − u(t − 4). Therefore

The first term on the right-hand side is the signal tu(t) delayed by 1 second. Also, the third and fourth terms are the signal u(t) delayed by 2 and 4 seconds, respectively. The second term, however, cannot be interpreted as a delayed version of any entry in Table 4.1. For this reason, we rearrange it as We have now expressed the second term in the desired form as tu(t) delayed by 2 seconds plus u(t) delayed by 2 seconds. With this result, Eq. (4.20a) can be expressed as

Application of the time-shifting property to tu(t)

1/s 2 yields

Also

Therefore

EXAMPLE 4.5 Find the inverse Laplace transform of

Observe the exponential term e −2s in the numerator of X(s), indicating time delay. In such a case we should separate X(s) into terms with and without delay factor, as

where

Therefore

Also, because We can write

EXERCISE E4.3 Find the Laplace transform of the signal illustrated in Fig. 4.5.

Figure 4.5 Answers

EXERCISE E4.4 Find the inverse Laplace transform of

Answers [e t−2 − e −2(t−2)]u(t−2)

4.2-2 Frequency Shifting The frequency-shifting property states that if then

Observe the symmetry (or duality) between this property and the time-shifting property (4.19a). Proof.

EXAMPLE 4.6 Derive pair 9a in Table 4.1 from pair 8a and the frequency-shifting property. Pair 8a is

From the frequency-shifting property [Eq. (4.23)] with s 0 = −a we obtain

EXERCISE E4.5 Derive pair 6 in Table 4.1 from pair 3 and the frequency-shifting property. We are now ready to consider the two of the most important properties of the Laplace transform: time differentiation and time integration.

4.2-3 The Time-Differentiation Property[†] The time-differentiation property states that if then

Repeated application of this property yields

where x (r)(0 − ) is d r x/dtr at t = 0 − . Proof.

Integrating by parts, we obtain

For the Laplace integral to converge [i.e., for X (s) to exist], it is necessary that x(t)e −st → 0 as t → ∞ for the values of s in the ROC for X(s). Thus,

Repeated application of this procedure yields Eq. (4.24c). EXAMPLE 4.7 Find the Laplace transform of the signal x(t) in Fig. 4.6a by using Table 4.1 and the time-differentiation and time-shifting properties of the Laplace transform.

Figure 4.6: Finding the Laplace transform of a piecewise-linear function by using the time-differentiation property. Figures 4.6b and 4.6c show the first two derivatives of x(t). Recall that the derivative at a point of jump discontinuity is an impulse of strength equal to the amount of jump [see Eq. (1.27)]. Therefore

The Laplace transform of this equation yields

Using the time-differentiation property Eq. (4.24b), the time-shifting property (4.19a), and the facts that Therefore

which confirms the earlier result in Exercise E4.3.

4.2-4 The Time-Integration Property The time-integration property states that if then [†]

and

Proof. We define

, and δ(t)

1, we obtain

so that

Now, if then

Therefore

or

To prove Eq. (4.26), observe that

Note that the first term on the right-hand side is a constant for t ≥ 0. Taking the Laplace transform of the foregoing equation and using Eq. (4.25), we obtain

Scaling The scaling property states that if then for a > 0

The proof is given in Chapter 7. Note that a is restricted to positive values because if x(t) is causal, then x(at) is anticausal (is zero for t ≥ 0) for negative a, and anticausal signals are not permitted in the (unilateral) Laplace transform. Recall that x(at) is the signal x(t) time-compressed by the factor a, and is X(s) expanded along the s-scale by the same factor a (see Section 1.2-2). The scaling property states that time compression of a signal by a factor a causes expansion of its Laplace transform in the s-scale by the same factor. Similarly, time expansion x(t) causes compression of X(s) in the s-scale by the same factor.

4.2-5 Time Convolution and Frequency Convolution Another pair of properties states that if then (time-convolution property)

and (frequency-convolution property)

Observe the symmetry (or duality) between the two properties. Proofs of these properties are postponed to Chapter 7. Equation (2.48) indicates that H(s), the transfer function of an LTIC system, is the Laplace transform of the system's impulse response h(t); that is,

If the system is causal, h(t) is causal, and, according to Eq. (2.48), H(s) is the unilateral Laplace transform of h(t). Similarly, if the system is noncausal, h(t) is noncausal, and H(s) is the bilateral transform of h(t). We can apply the time-convolution property to the LTIC input-output relationship y(t) = x(t) * h(t) to obtain

The response y(t) is the zero-state response of the LTIC system to the input x(t). From Eq. (4.31), it follows that

This may be considered to be an alternate definition of the LTIC system transfer function H(s). It is the ratio of the transform of zero-state response to the transform of the input. EXAMPLE 4.8 Using the time-convolution property of the Laplace transform to determine c(t) = e at u(t)*e bt u(t). From Eq. (4.28), it follows that

The inverse transform of this equation yields

Table 4.2: The Laplace Transform Properties Open table as spreadsheet Operation

x(t)

X(s)

Addition

x 1 (t) + x 2 (t)

X1 (s) + X2 (s)

Scalar multiplication

kx(t)

kX(s)

Time differentiation

sX(s) − x(0 − )

Time integration

Time shifting

x(t − t0 )u(t − t0 )

X(s)e −st 0 t0 ≥ 0

Frequency shifting

x(t)e s 0 t

X(s − s 0 )

Frequency differentiation

−tx(t)

Frequency integration

Scaling

x(at), a ≥ 0

Time convolution

x 1 (t)x 2 (t)

Frequency convolution

x 1 (t)x 2 (t)

Initial value

x(0 + )

Final value

x(∞)

Initial and Final Values

X1 (s) X2 (s)

In certain applications, it is desirable to know the values of x(t) as t → 0 and t → ∞ [initial and final values of x(t)] from the knowledge of its Laplace transform X(s). Initial and final value theorems provide such information. The initial value theorem states that if x(t) and its derivative dx/dt are both Laplace transformable, then

provided the limit on the right-hand side of Eq. (4.33) exists. The final value theorem states that if both x(t) and dx/dt are Laplace transformable, then

provided sX(s) has no poles in the RHP or on the imaginary axis. To prove these theorems, we use Eq. (4.24a)

Therefore

and

Comment. The initial value theorem applies only if X(s) is strictly proper (M < N), because for M ≥ N, lim s→∞ sX(s) does not exist, and the theorem does not apply. In such a case, we can still find the answer by using long division to express X(s) as a polynomial in s plus a strictly proper fraction, where M ≤ N. For example, by using long division, we can express

The inverse transform of the polynomial in s is in terms of δ(t), and its derivatives, which are zero at t = 0 + . In the foregoing case, the inverse transform of s + 1 is applies. In the present case

. Hence, the desired x(0 + ) is the value of the remainder (strictly proper) fraction, for which the initial value theorem

To prove the final value theorem, we let s → 0 in Eq. (4.24a) to obtain

a deduction that leads to the desired result, Eq. (4.34). Comment. The final value theorem applies only if the poles of X(s) are in the LHP (including s = 0). If X(s) has a pole in the RHP, x(t) contains an exponentially growing term and x(∞) does not exist. If there is a pole on the imaginary axis, then x(t) contains an oscillating term and x(∞) does not exist. However, if there is a pole at the origin, then x(t) contains a constant term, and hence, x(∞) exists and is a constant. EXAMPLE 4.9 Determine the initial and final values of y(t) if its Laplace transform Y(s) is given by

Equations (4.33) and (4.34) yield

[†] The dual of the time-differentiation property is the frequency-differentiation property, which states that

[†] The dual of the time-integration property is the frequency-integration property, which states that

4.3 SOLUTION OF DIFFERENTIAL AND INTEGRO-DIFFERENTIAL EQUATIONS The time-differentiation property of the Laplace transform has set the stage for solving linear differential (or integro-differential) equations with

constant coefficients. Because d k y/dtk s k Y(s), the Laplace transform of a differential equation is an algebraic equation that can be readily solved for Y(s). Next we take the inverse Laplace transform of Y(s) to find the desired solution y(t). The following examples demonstrate the Laplace transform procedure for solving linear differential equations with constant coefficients. EXAMPLE 4.10 Solve the second-order linear differential equation

for the initial conditions y(0 − ) = 2 and

and the input x(t) = e −4t u(t).

The equation is

Let Then from Eqs. (4.24)

and

Moreover, for x(t) = e −4t u(t),

Taking the Laplace transform of Eq. (4.35b), we obtain

Collecting all the terms of Y(s) and the remaining terms separately on the left-hand side, we obtain

Therefore

and

Expanding the right-hand side into partial fractions yields

The inverse Laplace transform of this equation yields

Example 4.10 demonstrates the ease with which the Laplace transform can solve linear differential equations with constant coefficients. The method is general and can solve a linear differential equation with constant coefficients of any order. Zero-Input and Zero-State Components of Response The Laplace transform method gives the total response, which includes zero-input and zero-state components. It is possible to separate the two components if we so desire. The initial condition terms in the response give rise to the zero-input response. For instance, in Example 4.10, the terms

in Eq. (4.36a) generate the zero-input response. These initial condition terms are −(2s + attributable to initial conditions y(0 − ) = 2 and 11), as seen in Eq. (4.36b). The terms on the right-hand side are exclusively due to the input. Equation (4.36b) is reproduced below with the proper labeling of the terms.

so that

Therefore

Taking the inverse transform of this equation yields

COMMENTS ON INITIAL CONDITIONS AT 0 − AND AT 0 +

The initial conditions in Example 4.10 are y(0 − ) = 2 and

. If we let t = 0 in the total response in Eq. (4.37), we find y(0) = 2 and

, which is at odds with the given initial conditions. Why? Because the initial conditions are given at t = 0 − (just before the input is applied), when only the zero-input response is present. The zero-state response is the result of the input x(t) applied at t = 0. Hence, this component does not exist at t = 0 − . Consequently, the initial conditions at t = 0 − are satisfied by the zero-input response, not by the total response. We can readily

verify in this example that the zero-input response does indeed satisfy the given initial conditions at t = 0 − . It is the total response that satisfies the initial conditions at t = 0 + , which are generally different from the initial conditions at 0 − . There also exists a

version of the Laplace transform, which uses the initial conditions at t = 0 + rather than at 0 − (as in our present

version).

The version, which was in vogue till the early 1960s, is identical to the version except the limits of Laplace integral [Eq. (4.8)] are from 0 + to ∞. Hence, by definition, the origin t = 0 is excluded from the domain. This version, still used in some math books, has some serious difficulties. For

instance, the Laplace transform of δ(t) is zero because δ(t) = 0 for t ≥ 0 + . Moreover, this approach is rather clumsy in the theoretical study of linear systems because the response obtained cannot be separated into zero-input and zero-state components. As we know, the zero-state component represents the system response as an explicit function of the input, and without knowing this component, it is not possible to assess the effect of the version can separate the response in terms of the natural and the forced components, input on the system response in a general way. The which are not as interesting as the zero-input and the zero-state components. Note that we can always determine the natural and the forced components from the zero-input and the zero-state components [see Eqs. (2.52)], but the converse is not true. Because of these and some other problems, electrical engineers (wisely) started discarding the

version in the early sixties.

It is interesting to note the time-domain duals of these two Laplace versions. The classical method is the dual of the

method, and the convolution

(zero-input/zero-state) method is the dual of the

method. The first pair uses the initial conditions at 0 + , and the second pair uses those at t = 0 − .

The first pair (the classical method and the version) is awkward in the theoretical study of linear system analysis. It was no coincidence that the version was adopted immediately after the introduction to the electrical engineering community of state-space analysis (which uses zeroinput/zero-state separation of the output). EXERCISE E4.6 Solve

for the input x(t) = u(t). The initial conditions are y(0 − ) = 1 and

.

Answers y(t) = (1 + 9e −t − 7e −3t )u(t)u(t) EXAMPLE 4.11 In the circuit of Fig. 4.7a, the switch is in the closed position for a long time before t = 0, when it is opened instantaneously. Find the inductor current y(t) for t ≥ 0.

Figure 4.7: Analysis of a network with a switching action. When the switch is in the closed position (for a long time), the inductor current is 2 amperes and the capacitor voltage is 10 volts. When the switch is

opened, the circuit is equivalent to that depicted in Fig. 4.7b, with the initial inductor current y(0 − ) = 2 and the initial capacitor voltage v C(0 − ) = 10. The input voltage is 10 volts, starting at t = 0, and, therefore, can be represented by 10u(t). The loop equation of the circuit in Fig. 4.7b is

If

then

and [see Eq. (4.26)]

− Because y(t) is the capacitor current, the integral ∫ 0 −∞ y(τ)dτ is q c (0 − ), the capacitor charge at t = 0 − , which is given by C times the capacitor voltage at t = 0 − . Therefore

From Eq. (4.39c) it follows that

Taking the Laplace transform of Eq. (4.38) and using Eqs. (4.39a), (4.39b), and (4.40), we obtain

or

and

To find the inverse Laplace transform of Y(s), we use pair 10c (Table 4.1) with values A = 2, B = 0, a = 1, and c = 5. This yields

Therefore This response is shown in Fig. 4.7c. Comment. In our discussion so far, we have multiplied input signals by u(t), implying that the signals are zero prior to t = 0. This is needlessly restrictive. These signals can have any arbitrary value prior to t = 0. As long as the initial conditions at t = 0 are specified, we need only the knowledge of the input for t ≥ 0 to compute the response for t ≥ 0. Some authors use the notation 1(t) to denote a function that is equal to u(t) for t ≥ 0 and that has arbitrary value for negative t. We have abstained from this usage to avoid needless confusion caused by introduction of a new function, which is very similar to u(t).

4.3-1 Zero-State Response Consider an Nth-order LTIC system specified by the equation or

We shall now find the general expression for the zero-state response of an LTIC system. Zero-state response y(t), by definition, is the system response to an input when the system is initially relaxed (in zero state). Therefore, y(t) satisfies the system equation (4.41) with zero initial conditions Moreover, the input x(t) is causal, so that Let Because of zero initial conditions

Therefore, the Laplace transform of Eq. (4.41) yields or

But we have shown in Eq. (4.31) that Y(s) = H(s)X(s). Consequently,

This is the transfer function of a linear differential system specified in Eq. (4.41). The same result has been derived earlier in Eq. (2.50) using an

alternate (time-domain) approach. We have shown that Y(s), the Laplace transform of the zero-state response y(t), is the product of X(s) and H(s), where X(s) is the Laplace transform of the input x(t) and H(s) is the system transfer function [relating the particular output y(t) to the input x(t)]. INTUITIVE INTERPRETATION OF THE LAPLACE TRANSFORM So far we have treated the Laplace transform as a machine, which converts linear integro-differential equations into algebraic equations. There is no physical understanding of how this is accomplished or what it means. We now discuss a more intuitive interpretation and meaning of the Laplace transform. In Chapter 2, Eq. (2.47), we showed that LTI system response to an everlasting exponential e st is H (s)e st . If we could express every signal as a

linear combination of everlasting exponentials of the form e st , we could readily obtain the system response to any input. For example, if

The response of an LTIC system to such input x(t) is given by

Unfortunately, a very small class of signals can be expressed in this form. However, we can express almost all signals of practical utility as a sum of everlasting exponentials over a continuum of frequencies. This is precisely what the Laplace transform in Eq. (4.2) does.

Invoking the linearity property of the Laplace transform, we can find the system response y(t) to input x(t) in Eq. (4.44) as[†]

Clearly We can now represent the transformed version of the system, as depicted in Fig. 4.8a. The input X(s) is the Laplace transform of x(t), and the output Y(s) is the Laplace transform of (the zero-input response) y(t). The system is described by the transfer function H(s). The output Y(s) is the product X(s)H(s).

Figure 4.8: Alternate interpretation of the Laplace transform. Recall that s is the complex frequency of e st . This explains why the Laplace transform method is also called the frequency-domain method. Note that in Fig. X(s), Y(s), and H(s) are the frequency-domain representations of x(t), y(t), and h(t), respectively. We may view the boxes marked and 4.8a as the interfaces that convert the time-domain entities into the corresponding frequency-domain entities, and vice versa. All real-life signals begin in the time domain, and the final answers must also be in the time domain. First, we convert the time-domain input(s) into the frequencydomain counterparts. The problem itself is solved in the frequency domain, resulting in the answer Y(s), also in the frequency domain. Finally, we convert Y(s) to y(t). Solving the problem is relatively simpler in the frequency domain than in the time domain. Henceforth, we shall omit the explicit , representing signals and systems in the frequency domain, as shown in Fig. 4.8b. representation of the interface boxes and THE DOMINANCE CONDITION In this intuitive interpretation of the Laplace transform, one problem should have puzzled the reader. In Section 2.5 (classical solution of differential

equations), we showed in Eq. (2.57) that an LTI system response to input e st is H(s) e st plus characteristic mode terms. In the intuitive interpretation, an LTI system response is found by adding the system responses to all the infinite exponential components of the input. These components are exponentials of the form e st starting at t = −∞. We showed in Eq. (2.47) that the response to everlasting input e st is also an everlasting exponential

H(s) e st . Does this result not conflict with the result in Eq. (2.57)? Why are there no characteristic mode terms in Eq. (2.47), as predicted by Eq.

(2.57)? The answer is that the mode terms are also present. The system response to an everlasting input e st is indeed an everlasting exponential

H(s) e st plus mode terms. All these signals start at t = −∞. Now, if a mode e λ it is such that it decays faster than (or grows slower than) e st , that is, if Re λi < Re s, then after some time interval, e st will be overwhelmingly stronger than e λ it , and hence will completely dominate such a mode term. In such a case, at any finite time (which is long time after the start at t = −∞), we can ignore the mode terms and say that the complete response is st

H(s) e . Hence, we can reconcile Eq. (2.47) to Eq. (2.57) only if the dominance condition is satisfied, that is, if Re λi < Re s for all i. If the dominance condition is not satisfied, the mode terms dominate e st and Eq. (2.47) does not hold. [10] Careful examination shows that the dominance condition is implied in Eq. (2.47). This is because of the caviat in Eq. (2.47) that the response of an

LTIC system to everlasting e st is H(s) e st , provided H(s) exists (or converges). We can show that this condition amounts to dominance condition. If a

system has characteristic roots ? 1 , ? 2 , ..., λN, then h(t) consists of exponentials of the form e λ it (i = 1, 2, ..., N) and the convergence of H (s) requires that Re s > Re λi for i = 1, 2, ..., N, which precisely is the dominance condition. Clearly, the dominance condition is implied in Eq. (2.47), and also in the entire fabric of the Laplace transform. It is interesting to note that the elegant structure of convergence in Laplace transform is rooted in such a lowly, mundane origin, as Eq. (2.57). EXAMPLE 4.12 Find the response y(t) of an LTIC system described by the equation

if the input x(t) = 3e −5t u(t) and all the initial conditions are zero; that is, the system is in the zero state. The system equation is

Therefore

Also

and

The inverse Laplace transform of this equation is EXAMPLE 4.13 Show that the transfer function of a. an ideal delay of T seconds is e −sT b. an ideal differentiator is s c. an ideal integrator is 1/s a. Ideal Delay. For an ideal delay of T seconds, the input x(t) and output y(t) are related by or Therefore

b. Ideal Differentiator. For an ideal differentiator, the input x(t) and the output y(t) are related by

The Laplace transform of this equation yields and

c. Ideal Integrator. For an ideal integrator with zero initial state, that is, y(0 − ) = 0,

and

Therefore

EXERCISE E4.7

For an LTIC system with transfer function

a. Describe the differential equation relating the input x(t) and output y(t). b. Find the system response y(t) to the input x(t) = e −2t u(t) if the system is initially in zero state. Answers

a.

b. y(t) = (2e −t − 3e −2t − 3e −2t + e −3t )u(t)

4.3-2 Stability Equation (4.43) shows that the denominator of H(s) is Q(s), which is apparently identical to the characteristic polynomial Q(λ) defined in Chapter 2. Does this mean that the denominator of H(s) is the characteristic polynomial of the system? This may or may not be the case, since if P(s) and Q(s) in Eq. (4.43) have any common factors, they cancel out, and the effective denominator of H(s) is not necessarily equal to Q(s). Recall also that the system transfer function H(s), like h(t), is defined in terms of measurements at the external terminals. Consequently, H(s) and h(t) are both external descriptions of the system. In contrast, the characteristic polynomial Q(s) is an internal description. Clearly, we can determine only external stability, that is, BIBO stability, from H(s). If all the poles of H(s) are in LHP, all the terms in h(t) are decaying exponentials, and h(t) is absolutely integrable [see Eq. (2.64)]. [†] Consequently, the system is BIBO stable. Otherwise the system is BIBO unstable.

Beware of the RHP poles! So far, we have assumed that H(s) is a proper function, that is, M ≥ N. We now show that if H(s) is improper, that is, if M > N, the system is BIBO unstable. In such a case, using long division, we obtain H(s) = R(s) + H′(s), where R(s) is an (M − N)th-order polynomial and H′(s) is a proper transfer function. For example,

As shown in Eq. (4.47), the term s is the transfer function of an ideal differentiator. If we apply step function (bounded input) to this system, the output will contain an impulse (unbounded output). Clearly, the system is BIBO unstable. Moreover, such a system greatly amplifies noise because differentiation enhances higher frequencies, which generally predominate in a noise signal. These are two good reasons to avoid improper systems (M > N). In our future discussion, we shall implicitly assume that the systems are proper, unless stated otherwise. If P(s) and Q(s) do not have common factors, then the denominator of H(s) is identical to Q(s), the characteristic polynomial of the system. In this case, we can determine internal stability by using the criterion described in Section 2.6. Thus, if P(s) and Q(s) have no common factors, the asymptotic stability criterion in Section 2.6 can be restated in terms of the poles of the transfer function of a system, as follows: 1. An LTIC system is asymptotically stable if and only if all the poles of its transfer function H(s) are in the LHP. The poles may be simple or repeated. 2. An LTIC system is unstable if and only if either one or both of the following conditions exist: (i) at least one pole of H(s) is in the RHP; (ii) there are repeated poles of H(s) on the imaginary axis. 3. An LTIC system is marginally stable if and only if there are no poles of H(s) in the RHP and some unrepeated poles on the imaginary axis. Location of zeros of H(s) have no role in determining the system stability. EXAMPLE 4.14 followed by . The transfer functions of these systems are H 1 (s) = 1/(s − 1) and Figure 4.9a shows a cascade connection of two LTIC systems H 2 (s) = (s − 1)/(s + 1), respectively. We shall find the BIBO and asymptotic stability of the composite (cascade) system.

Figure 4.9: Distinction between BIBO and asymptotic stability. and are h 1 (t) and h 2 (t), respectively, then the impulse response of the cascade system is h(t) = h 1 (t) * h 2 (t). If the impulse response of Hence, H(s) = H 1 (s)H 2 (s). In the present case,

The pole of at s = 1 cancels with the zero at s = 1 of . This results in a composite system having a single pole at s = − 1. If the composite cascade system were to be enclosed inside a black box with only the input and the output terminals accessible, any measurement from these external terminals would show that the transfer function of the system is 1/(s + 1), without any hint of the fact that the system is housing an unstable system (Fig. 4.9b). The impulse response of the cascade system is h(t) = e −t u(t), which is absolutely integrable. Consequently, the system is BIBO stable. has one characteristic root at 1, and also has one root at − 1. Recall that the two systems To determine the asymptotic stability, we note that are independent (one does not load the other), and the characteristic modes generated in each subsystem are independent of the other. Clearly, the

mode e t will not be eliminated by the presence of asymptotically unstable, though BIBO stable.

. Hence, the composite system has two characteristic roots, located at ±1, and the system is

and makes no difference in this conclusion. This example shows that BIBO stability can be misleading. If a Interchanging the positions of system is asymptotically unstable, it will destroy itself (or, more likely, lead to saturation condition) because of unchecked growth of the response due to intended or unintended stray initial conditions. BIBO stability is not going to save the system. Control systems are often compensated to realize certain desirable characteristics. One should never try to stabilize an unstable system by canceling its RHP pole(s) by RHP zero(s). Such a misguided attempt will fail, not because of the practical impossibility of exact cancellation but for the more fundamental reason, as just explained. EXERCISE E4.8 Show that an ideal integrator is marginally stable but BIBO unstable.

4.3-3 Inverse Systems If H(s) is the transfer function of a system

, then

, its inverse system has a transfer function H i (s) given by

This follows from the fact the cascade of with its inverse system is an identity system, with impulse response δ(t), implying H(s)H i (s) = 1. For example, an ideal integrator and its inverse, an ideal differentiator, have transfer functions 1/s and s, respectively, leading to H(s)H i (s) = 1. [†] Recall that H(s) has its own region of validity. Hence, the limits of integration for the integral in Eq. (4.44) are modified in Eq. (4.45) to

accommodate the region of existence (validity) of X(s) as well as H(s).

[10] Lathi, B. P. Signals, Systems, and Communication. Wiley, New York, 1965. [†] Values of s for which H(s) is ∞ are the poles of H(s). Thus poles of H(s) are the values of s for which the denominator of H(s) is zero.

4.4 ANALYSIS OF ELECTRICAL NETWORKS: THE TRANSFORMED NETWORK Example 4.10 shows how electrical networks may be analyzed by writing the integro-differential equation(s) of the system and then solving these equations by the Laplace transform. We now show that it is also possible to analyze electrical networks directly without having to write the integrodifferential equations. This procedure is considerably simpler because it permits us to treat an electrical network as if it were a resistive network. For this purpose, we need to represent a network in the "frequency domain" where all the voltages and currents are represented by their Laplace transforms. For the sake of simplicity, let us first discuss the case with zero initial conditions. If v(t) and i(t) are the voltage across and the current through an inductor of L henries, then

The Laplace transform of this equation (assuming zero initial current) is Similarly, for a capacitor of C farads, the voltage-current relationship is i(t) = C(dv/dt) and its Laplace transform, assuming zero initial capacitor voltage, yields I(s) = CsV(s); that is,

For a resistor of R ohms, the voltage-current relationship is v(t) = Ri(t), and its Laplace transform is Thus, in the "frequency domain," the voltage-current relationships of an inductor and a capacitor are algebraic; these elements behave like resistors of "resistance" Ls and 1/Cs, respectively. The generalized "resistance" of an element is called its impedance and is given by the ratio V(s)/I(s) for the element (under zero initial conditions). The impedances of a resistor of R ohms, an inductor of L henries, and a capacitance of C farads are R, Ls, and 1/Cs, respectively. Also, the interconnection constraints (Kirchhoff's laws) remain valid for voltages and currents in the frequency domain. To demonstrate this point, let v j (t) (j = 1, 2, ..., k) be the voltages across k elements in a loop and let ij (t)(j = 1, 2, ..., m) be the j currents entering a node. Then

Now if then

This result shows that if we represent all the voltages and currents in an electrical network by their Laplace transforms, we can treat the network as if it consisted of the "resistances" R, Ls, and 1/Cs corresponding to a resistor R, an inductor L, and a capacitor C, respectively. The system equations (loop or node) are now algebraic. Moreover, the simplification techniques that have been developed for resistive circuits-equivalent series and parallel impedances, voltage and current divider rules, Thevenin and Norton theorems-can be applied to general electrical networks. The following examples demonstrate these concepts. EXAMPLE 4.15 Find the loop current i(t) in the circuit shown in Fig. 4.10a if all the initial conditions are zero.

Figure 4.10: (a) A circuit and (b) its transformed version. In the first step, we represent the circuit in the frequency domain, as illustrated in Fig. 4.10b. All the voltages and currents are represented by their Laplace transforms. The voltage 10u(t) is represented by 10/s and the (unknown) current i(t) is represented by its Laplace transform I(s). All the circuit elements are represented by their respective impedances. The inductor of 1 henry is represented by s, the capacitor of 1/2 farad is represented by 2/s, and the resistor of 3 ohms is represented by 3. We now consider the frequency-domain representation of voltages and currents. The voltage across any element is I(s) times its impedance. Therefore, the total voltage drop in the loop is I(s) times the total loop impedance, and it must be equal to V(s), (transform of) the input voltage. The total impedance in the loop is

The input "voltage" is V(s) = 10/s. Therefore, the "loop current" I(s) is

The inverse transform of this equation yields the desired result: INITIAL CONDITION GENERATORS The discussion in which we assumed zero initial conditions can be readily extended to the case of nonzero initial conditions because the initial

condition in a capacitor or an inductor can be represented by an equivalent source. We now show that a capacitor C with an initial voltage v(0 − ) (Fig. 4.11a) can be represented in the frequency domain by an uncharged capacitor of impedance 1/Cs in series with a voltage source of value v(0 − )/s

(Fig. 4.11b) or as the same uncharged capacitor in parallel with a current source of value Cv(0 − ) (Fig. 4.11c). Similarly, an inductor L with an initial

current i(0 − ) (Fig. 4.11d) can be represented in the frequency domain by an inductor of impedance Ls in series with a voltage source of value Li(0 − )

(Fig. 4.11e) or by the same inductor in parallel with a current source of value i(0 − )/s (Fig. 4.11f). To prove this point, consider the terminal relationship of the capacitor in Fig. 4.11a

Figure 4.11: Initial condition generators for a capacitor and an inductor. The Laplace transform of this equation yields This equation can be rearranged as

Observe that V(s) is the voltage (in the frequency domain) across the charged capacitor and I(s)/Cs is the voltage across the same capacitor without

any charge. Therefore, the charged capacitor can be represented by the uncharged capacitor in series with a voltage source of value v(0 − )/s, as depicted in Fig. 4.11b. Equation (4.51a) can also be rearranged as

This equation shows that the charged capacitor voltage V(s) is equal to the uncharged capacitor voltage caused by a current I(s) + Cv(0 − ). This

result is reflected precisely in Fig. 4.11c, where the current through the uncharged capacitor is I(s) + Cv(0 − ).[†] For the inductor in Fig. 4.11d, the terminal equation is

and

We can verify that Fig. 4.11e satisfies Eq. (4.52a) and that Fig. 4.11f satisfies Eq. (4.52b). Let us rework Example 4.11 using these concepts. Figure 4.12a shows the circuit in Fig. 4.7b with the initial conditions y(0 − ) = 2 and v c (0 − ) = 10. Figure 4.12b shows the frequency-domain representation (transformed circuit) of the circuit in Fig. 4.12a. The resistor is represented by its impedance 2; the inductor with initial current of 2 amperes is represented according to the arrangement in Fig. 4.11e with a series voltage source

Ly(0 − ) = 2. The capacitor with initial voltage of 10 volts is represented according to the arrangement in Fig. 4.11b with a series voltage source v(0 − )/s = 10/s. Note that the impedance of the inductor is s and that of the capacitor is 5/s. The input of 10u(t) is represented by its Laplace transform 10/s.

Figure 4.12: A circuit and its transformed version with initial condition generators. The total voltage in the loop is (10/s) + 2 − (10/s) = 2, and the loop impedance is (s + 2 + (5/s)). Therefore

which confirms our earlier result in Example 4.11. EXAMPLE 4.16 The switch in the circuit of Fig. 4.13a is in the closed position for a long time before t = 0, when it is opened instantaneously. Find the currents y 1 (t) and y 2 (t) for t ≥ 0.

Figure 4.13: Using initial condition generators and Thévenin equivalent representation. Inspection of this circuit shows that when the switch is closed and the steady-state conditions are reached, the capacitor voltage v c = 16 volts, and the inductor current y 2 = 4 amperes. Therefore, when the switch is opened (at t = 0), the initial conditions are v c (0 − ) = 16 and y 2 (0 − ) = 4. Figure 4.13b shows the transformed version of the circuit in Fig. 4.13a. We have used equivalent sources to account for the initial conditions. The initial capacitor voltage of 16 volts is represented by a series voltage of 16/s and the initial inductor current of 4 amperes is represented by a source of value Ly2 (0 − ) = 2

From Fig. 4.13b, the loop equations can be written directly in the frequency domain as

Application of Cramer 's rule to this equation yields

and Similarly, we obtain

and We also could have used Thévenin's theorem to compute Y1 (s) and Y2 (s) by replacing the circuit to the right of the capacitor (right of terminals ab) with its Thévenin equivalent, as shown in Fig. 4.13c. Figure 4.13b shows that the Thévenin impedance Z(s) and the Thévenin source V(s) are

According to Fig. 4.13c, the current Y1 (s) is given by

which confirms the earlier result. We may determine Y2 (s) in a similar manner. EXAMPLE 4.17 The switch in the circuit in Fig. 4.14a is at position a for a long time before t = 0, when it is moved instantaneously to position b. Determine the current y 1 (t) and the output voltage v 0 (t) for t ≥ 0.

Figure 4.14: Solution of a coupled inductive network by the transformed circuit method. Just before switching, the values of the loop currents are 2 and 1, respectively, that is, y 1 (0 − ) = 2 and y 2 (0 − ) = 1. The equivalent circuits for two types of inductive coupling are illustrated in Fig. 4.14b and 4.14c. For our situation, the circuit in Fig. 4.14c applies. Figure 4.14d shows the transformed version of the circuit in Fig. 4.14a after switching. Note that the inductors L 1 + M, L 2 + M, and − M are 3,4, and −1 henries with impedances 3s, 4s, and −s respectively. The initial condition voltages in the three branches are (L 1 + M)y 1 (0 − ) = 6, (L 2 + M)y 2 (0 − ) = 4, and −M[y 1 (0 − ) − y 2 (0 − )] = − 1, respectively. The two loop equations of the circuit are[†]

or

and

Therefore Similarly

and The output voltage EXERCISE E4.9

For the RLC circuit in Fig. 4.15, the input is switched on at t = 0. The initial conditions are y(0 − ) = 2 amperes and v c (0 − )

= 50 volts. Find the loop current y(t) and the capacitor voltage v c (t) for ≥ 0.

Figure 4.15 Answers y(t) = 10√2e −t cos (2t + 81.8°)u(t)

v C(t) = [24 + 31.62e −t cos (2t − 34.7°)]u(t)

4.4-1 Analysis of Active Circuits Although we have considered examples of only passive networks so far, the circuit analysis procedure using the Laplace transform is also applicable to active circuits. All that is needed is to replace the active elements with their mathematical models (or equivalent circuits) and proceed as before. The operational amplifier (depicted by the triangular symbol in Fig. 4.16a) is a well-known element in modern electronic circuits. The terminals with the positive and the negative signs correspond to noninverting and inverting terminals, respectively. This means that the polarity of the output voltage v 2 is the same as that of the input voltage at the terminal marked by the positive sign (noninverting). The opposite is true for the inverting terminal, marked by the negative sign.

Figure 4.16: Operational amplifier and its equivalent circuit. Figure 4.16b shows the model (equivalent circuit) of the operational amplifier (op amp) in Fig. 4.16a. A typical op amp has a very large gain. The

output voltage v 2 = −Av 1 , where A is typically 10 5 to 10 6 . The input impedance is very high, of the order of 10 12 Ω and the output impedance is very low (50-100 Ω). For most applications, we are justified in assuming the gain A and the input impedance to be infinite and the output impedance to be zero. For this reason we see an ideal voltage source at the output.

Consider now the operational amplifier with resistors R a and R b connected, as shown in Fig. 4.16c. This configuration is known as the noninverting amplifier. Observe that the input polarities in this configuration are inverted in comparison to those in Fig. 4.16a. We now show that the output voltage v 2 and the input voltage v 1 in this case are related by

First, we recognize that because the input impedance and the gain of the operational amplifier approach infinity, the input current ix and the input voltage v x in Fig. 4.16c are infinitesimal and may be taken as zero. The dependent source in this case is Av x instead of −Av x because of the input polarity inversion. The dependent source Av x (see Fig. 4.16b) at the output will generate current io , as illustrated in Fig. 4.16c. Now also

Therefore

or The equivalent circuit of the noninverting amplifier is depicted in Fig. 4.16d. EXAMPLE 4.18 The circuit in Fig. 4.17a is called the Sallen-Key circuit, which is frequently used in filter design. Find the transfer function H(s) relating the output voltage v o (t) to the input voltage v i (t).

Figure 4.17: (a) Sallen-Key circuit and (b) its equivalent. We are required to find

assuming all initial conditions to be zero. Figure 4.17b shows the transformed version of the circuit in Fig. 4.17a. The noninverting amplifier is replaced by its equivalent circuit. All the voltages are replaced by their Laplace transforms and all the circuit elements are shown by their impedances. All the initial conditions are assumed to be zero, as required for determining H(s). We shall use node analysis to derive the result. There are two unknown node voltages, Va (s) and Vb (s) requiring two node equations. At node a, IR1 (s), the current in R 1 (leaving the node a), is [Va (s) − Vj (s)]/R 2 ], Similarly, IR2 (s), the current in R 2 (leaving the node a), is [Va (s) − Vb (s)]R 2 , and Ic , (s), the current in capacitor C 1 (leaving the node a), is [Va (s) − Va (s)]C 1 s = [Va (s) − KV b (s)]C 1 s. The sum of all the three currents is zero. Therefore

or

Similarly, the node equation at node b yields

or

The two node equations (4.55a) and (4.55b) in two unknown node voltages Va (s) and Vb (s) can be expressed in matrix form as

where

Application of Cramer 's rule to Eq. (4.56) yields

where

Now Therefore

[†] In the time domain, a charged capacitor C with initial voltage v(0 − ) can be represented as the same capacitor uncharged in series with a voltage source v(0 − )u(t) or in parallel with a current source Cv(0 − )δ(t). Similarly, an inductor L with initial current i(0 − ) can be represented by the same

inductor with zero initial current in series with a voltage source Li(0 − )δ(t) or with a parallel current source i(0 − )u(t).

[†] The time domain equations (loop equations) are

The Laplace transform of these equations yields Eq. (4.53).

4.5 BLOCK DIAGRAMS Large systems may consist of an enormous number of components or elements. As anyone who has seen the circuit diagram of a radio or a television receiver can appreciate, analyzing such systems all at once could be next to impossible. In such cases, it is convenient to represent a system by suitably interconnected subsystems, each of which can be readily analyzed. Each subsystem can be characterized in terms of its inputoutput relationships. A linear system can be characterized by its transfer function H(s). Figure 4.18a shows a block diagram of a system with a transfer function H(s) and its input and output X(s) and Y(s), respectively. Subsystems may be interconnected by using cascade, parallel, and feedback interconnections (Fig. 4.18b, 4.18c, 4.18d), the three elementary types. When transfer functions appear in cascade, as depicted in Fig. 4.18b, then, as shown earlier, the transfer function of the overall system is the product of the two transfer functions. This result can also be proved by observing that in Fig. 4.18b

Figure 4.18: Elementary connections of blocks and their equivalents. We can extend this result to any number of transfer functions in cascade. It follows from this discussion that the subsystems in cascade can be interchanged without affecting the overall transfer function. This commutation property of LTI systems follows directly from the commutative (and associative) property of convolution. We have already proved this property in Section 2.4-3. Every possible ordering of the subsystems yields the same overall transfer function. However, there may be practical consequences (such as sensitivity to parameter variation) affecting the behavior of different ordering. Similarly, when two transfer functions, H(s) and H 2 (s), appear in parallel, as illustrated in Fig. 4.18c, the overall transfer function is given by H 1 (s) + H 2 (s), the sum of the two transfer functions. The proof is trivial. This result can be extended to any number of systems in parallel. When the output is fed back to the input, as shown in Fig. 4.18d, the overall transfer function Y(s)/X(s) can be computed as follows. The inputs to the adder are X(s) and −H(s)Y(s). Therefore, E(s), the output of the adder, is But

Therefore so that

Therefore, the feedback loop can be replaced by a single block with the transfer function shown in Eq. (4.59) (see Fig. 4.18d). In deriving these equations, we implicitly assume that when the output of one subsystem is connected to the input of another subsystem, the latter does not load the former. For example, the transfer function H 1 (s) in Fig. 4.18b is computed by assuming that the second subsystem H 2 (s) was not connected. This is the same as assuming that H 2 (s) does not load H 1 (s). In other words, the input-output relationship of H 1 (s) will remain unchanged regardless of whether H 2 (s) is connected. Many modern circuits use op amps with high input impedances, so this assumption is justified. When such an assumption is not valid, H 1 (s) must be computed under operating conditions [i.e., with H 2 (s) connected]. COMPUTER EXAMPLE C4.3 Using the feedback system ofFig 4.18d with G(s) = K/(s(s + 8)) and H(s) = 1, determine the transfer function for each of the following cases: a. K = 7 b. K = 16 c. K = 80 >> H = tf(1, 1); K = 7; G = tf([0 0 K], [1 8 0]); >> disp(['(a) K = ',num2str(K)]); TFa = feedback(G,H) (a) K = 7 Transfer function: 7 ------------s^2 + 8 s + 7

Thus, H a (s) = 7/s 2 + 8s + 7). >> H = tf(1, 1); K = 16; G = tf([0 0 K], [1 8 0]); >> disp(['(b) K = ',num2str(K)]); TFa = feedback(G,H) (b) K = 16 Transfer function: 16 ------------s^2 + 8 s + 16 Thus, H B (s) = 16/(s2 + 8s+ 16). >> H = tf(1, 1); K = 80; G = tf([0 0 K], [1 8 0]); >> disp(['(c) K = ',num2str(K)]); TFa = feedback(G,H) (c) K = 80 Transfer function: 80 ------------s^2 + 8 s + 80 Thus, H c (s) = 80/(s2 + 8s + 80).

4.6 SYSTEM REALIZATION We now develop a systematic method for realization (or implementation) of an arbitrary Nth-order transfer function. The most general transfer function with M = N is given by

Since realization is basically a synthesis problem, there is no unique way of realizing a system. A given transfer function can be realized in many different ways. A transfer function H(s) can be realized by using integrators or differentiators along with adders and multipliers. We avoid use of differentiators for practical reasons discussed in Sections 2.1 and 4.3-2. Hence, in our implementation, we shall use integrators along with scalar multipliers and adders. We are already familiar with representation of all these elements except the integrator. The integrator can be represented by a box with integral sign (time-domain representation, Fig. 4.19a) or by a box with transfer function 1/s (frequency-domain representation, 4.19b).

Figure 4.19: (a) Time-domain and (b) frequency-domain representations of an integrator.

4.6-1 Direct Form I Realization Rather than realize the general Nth-order system described by Eq. (4.60), we begin with a specific case of the following third-order system and then extend the results to the Nth-order case

We can express H (s) as

We can realize H(s) as a cascade of transfer function H 1 (s) followed by H 2 (s), as depicted in Fig. 4.20a, where the output of H 1 (s) is denoted by W(s). Because of the commutative property of LTI system transfer functions in cascade, we can also realize H(s) as a cascade of H 2 (s) followed by H 1 (s), as illustrated in Fig. 4.20b, where the (intermediate) output of H 2 (s) is denoted by V(s).

Figure 4.20: Realization of a transfer function in two steps. The output of H 1 (s) in Fig. 4.20a is given by W(s) = H 1 (s)X(s). Hence

Also, the output Y(s) and the input W(s) of H 2 (s) in Fig. 4.20a are related by Y(s) = H 2 (s)W(s). Hence

We shall first realize H 1 (s). Equation (4.63) shows that the output W(s) can be synthesized by adding the input b 0 X(s) to b 1 (X(s)/s), b 2 (X(s)/s 2 ), and b 3 (X(s)/s 3 ). Because the transfer function of an integrator is 1/s, the signals X(s)/s, X(s)/s 2 , and X(s)/s 3 can be obtained by successive integration of the input x(t). The left-half section of Fig. 4.21a shows how W(s) can be synthesized from X(s), according to Eq. (4.63). Hence, this section represents a realization of H 1 (s).

Figure 4.21: Direct form I realization of an LTIC system: (a) third-order and (b) Nth-order. To complete the picture, we shall realize H 2 (s), which is specified by Eq. (4.64). We can rearrange Eq. (4.64) as

Hence, to obtain Y(s), we subtract a 1 Y(s)/s, a 2 Y(s)/s 2 , and a 3 Y(s)/s 3 from W(s). We have already obtained W(s) from the first step [output of H 1 (s)]. To obtain signals Y(s)/s, Y(s)/s 2 , and Y(s)/s 3 , we assume that we already have the desired output Y(s). Successive integration of Y(s) yields the needed signals Y(s)/s, Y(s)/s 2 , and Y(s)/s 3 . We now synthesize the final output Y(s) according to Eq. (4.65), as seen in the right-half section of Fig. 4.21a.[†] The left-half section in Fig. 4.21a represents H 1 (s) and the right-half is H 2 (s). We can generalize this procedure, known as the direct form I (DFI) realization, for any value of N. This procedure requires 2N integrators to realize an Nth-order transfer function, as shown in Fig. 4.21b.

4.6-2 Direct Form II Realization In the direct form I, we realize H(s) by implementing H 1 (s) followed by H 2 (s), as shown in Fig. 4.20a. We can also realize H(s), as shown in Fig. 4.20b, where H 2 (s) is followed by H 1 (s). This procedure is known as the direct form II realization. Figure 4.22a shows direct form II realization, where we have interchanged sections representing H 1 (s) and H 2 (s) in Fig. 4.21b. The output of H 2 (s) in this case is denoted by V(s).[†]

Figure 4.22: Direct form II realization of an Nth-order LTIC system. An interesting observation in Fig. 4.22a is that the input signal to both the chains of integrators is V(s). Clearly, the outputs of integrators in the leftside chain are identical to the corresponding outputs of the right-side integrator chain, thus making the right-side chain redundant. We can eliminate this chain and obtain the required signals from the left-side chain, as shown in Fig. 4.22b. This implementation halves the number of integrators to N, and, thus, is more efficient in hardware utilization than either Fig. 4.21b or 4.22a. This is the direct form II (DFII) realization. An Nth-order differential equation with N = M has a property that its implementation requires a minimum of N integrators. A realization is canonic if the number of integrators used in the realization is equal to the order of the transfer function realized. Thus, canonic realization has no redundant integrators. The DFII form in Fig. 4.22b is a canonic realization, and is also called the direct canonic form. Note that the DFI is noncanonic. The direct form I realization (Fig. 4.21b) implements zeros first [the left-half section represented by H 1 (s)] followed by realization of poles [the righthalf section represented by H 2 (s)] of H(s). In contrast, canonic direct implements poles first followed by zeros. Although both these realizations result in the same transfer function, they generally behave differently from the viewpoint of sensitivity to parameter variations. EXAMPLE 4.19

Find the canonic direct form realization of the following transfer functions: a.

b.

c.

d.

All four of these transfer functions are special cases of H(s) in Eq. (4.60). a. The transfer function 5/(s + 7) is of the first order (N = 1); therefore, we need only one integrator for its realization. The feedback and feedforward coefficients are The realization is depicted in Fig. 4.23a. Because N = 1, there is a single feedback connection from the output of the integrator to the input adder with coefficient a 1 = 7. For N = 1, generally, there are N + 1 = 2 feedforward connections. However, in this case, b 0 = 0, and there is only one feedforward connection with coefficient b 1 = 5 from the output of the integrator to the output adder. Because there is only one input signal to the output adder, we can do away with the adder, as shown in Fig. 4.23a.

Figure 4.23: Realization of H(s).

b. In this first-order transfer function, b 1 = 0. The realization is shown in Fig. 4.23b. Because there is only one signal to be added at the output adder, we can discard the adder.

c. The realization appears in Fig. 4.23c. Here H(s) is a first-order transfer function with a 1 = 7 and b 0 = 1, b 1 = 5. There is a single feedback connection (with coefficient 7) from the integrator output to the input adder. There are two feedforward connections (Fig. 4.23c).[†]

d. This is a second-order system with b 0 = 0, b 1 = 4, b 2 = 28, a 1 = 6, and a 2 = 5. Figure 4.23d shows a realization with two feedback connections and two feedforward connections. EXERCISE E4.10 Give canonic direct realization of

4.6-3 Cascade and Parallel Realizations An Nth-order transfer function H(s) can be expressed as a product or a sum of N first-order transfer functions. Accordingly, we can also realize H(s) as a cascade (series) or parallel form of these N first-order transfer functions. Consider, for instance, the transfer function in part (d) of the Example 4.19.

We can express H(s) as

We can also express H(s) as a sum of partial fractions as

Equations (4.66) give us the option of realizing H(s) as a cascade of H 1 (s) and H 2 (s), as shown in Fig. 4.24a, or a parallel of H 3 (s) and H 4 (s), as depicted in Fig. 4.24b. Each of the first-order transfer functions in Fig. 4.24 can be implemented by using canonic direct realizations, discussed earlier.

Figure 4.24: Realization of (4s + 28)/((s + 1)(s + 5)): (a) cascade form and (b) parallel form. This discussion by no means exhausts all the possibilities. In the cascade form alone, there are different ways of grouping the factors in the numerator and the denominator of H(s), and each grouping can be realized in DFI or canonic direct form. Accordingly, several cascade forms are possible. In Section 4.6-4, we shall discuss yet another form that essentially doubles the numbers of realizations discussed so far. From a practical viewpoint, parallel and cascade forms are preferable because parallel and certain cascade forms are numerically less sensitive than canonic direct form to small parameter variations in the system. Qualitatively, this difference can be explained by the fact that in a canonic realization all the coefficients interact with each other, and a change in any coefficient will be magnified through its repeated influence from feedback and feedforward connections. In a parallel realization, in contrast, the change in a coefficient will affect only a localized segment; the case with a cascade realization is similar. In the examples of cascade and parallel realization, we have separated H(s) into first-order factors. For H(s) of higher orders, we could group H(s) into factors, not all of which are necessarily of the first order. For example, if H(s) is a third-order transfer function, we could realize this function as a cascade (or a parallel) combination of a first-order and a second-order factor. REALIZATION OF COMPLEX CONJUGATE POLES The complex poles in H(s) should be realized as a second-order (quadratic) factor because we cannot implement multiplication by complex numbers. Consider, for example,

We cannot realize first-order transfer functions individually with the poles −2 ± j3 because they require multiplication by complex numbers in the

feedback and the feedforward paths. Therefore, we need to combine the conjugate poles and realize them as a second-order transfer function. [†] In the present case, we can express H(s) as

Now we can realize H(s) in cascade form by using Eq. (4.67a) or in parallel form by using Eq. (4.67b).

REALIZATION OF REPEATED POLES When repeated poles occur, the procedure for canonic and cascade realization is exactly the same as before. In parallel realization, however, the procedure requires special handling, as explained in Example 4.20. EXAMPLE 4.20 Determine the parallel realization of

This third-order transfer function should require no more than three integrators. But if we try to realize each of the three partial fractions separately, we require four integrators because of the one second-order term. This difficulty can be avoided by observing that the terms 1 / (s + 3) and 1 / (s +

3) 2 can be realized with a cascade of two subsystems, each having a transfer function 1 / (s + 3), as shown in Fig. 4.25. Each of the three firstorder transfer functions in Fig. 4.25 may now be realized as in Fig. 4.23.

Figure 4.25: Parallel realization of (7s 2 + 37s + 51)/((s + 2)(s + 3) 2 ). EXERCISE E4.11 Find the canonic, cascade, and parallel realization of

4.6-4 Transposed Realization Two realizations are said to be equivalent if they have the same transfer function. A simple way to generate an equivalent realization from a given realization is to use its transpose. To generate a transpose of any realization, we change the given realization as follows: 1. Reverse all the arrow directions without changing the scalar multiplier values. 2. Replace pickoff nodes by adders and vice versa. 3. Replace the input X(s) with the output Y(s) and vice versa. Figure 4.26a shows the transposed version of the canonic direct form realization in Fig. 4.22b found according to the rules just listed. Figure 4.26b is Fig. 4.26a reoriented in the conventional form so that the input X(s) appears at the left and the output Y(s) appears at the right. Observe that this realization is also canonic.

Figure 4.26: Realization of an Nth-order LTI transfer function in the transposed form. Rather than prove the theorem on equivalence of the transposed realizations, we shall verify that the transfer function of the realization in Fig. 4.26b is identical to that in Eq. (4.60).

Figure 4.26b shows that Y(s) is being fed back through N paths. The fed-back signal appearing at the input of the top adder is

The signal X(s), fed to the top adder through N + 1 forward paths, contributes

The output Y(s) is equal to the sum of these two signals (feed forward and feed back). Hence

Transporting all the Y(s) terms to the left side and multiplying throughout by s N, we obtain Consequently

Hence, the transfer function H(s) is identical to that in Eq. (4.60). We have essentially doubled the number of possible realizations. Every realization that was found earlier has a transpose. Note that the transpose of a transpose results in the same realization. EXAMPLE 4.21 Find the transpose of the canonic direct realization found in parts (a) and (d) of Example 4.19 (Fig. 4.23c and 4.23d). The transfer functions are a.

b.

Both these realizations are special cases of the one in Fig. 4.26b. a. In this case, N = 1 with a 1 = 7, b 0 = 1, b 1 = 5. The desired realization can be obtained by transposing Fig. 4.23c. However, we already have the general model of the transposed realization in Fig. 4.26b. The desired solution is a special case of Fig. 4.26b with N = 1 and a 1 = 7, b 0 = 1, b 1 = 5, as shown in Fig. 4.27a.

Figure 4.27: Transposed form realization of (a) (s + 5)/(s + 7) and (b) (4s + 28)/(s 2 + 6s + 5). b. In this case N = 2 with b 0 = 0, b 1 = 4, b 2 = 28, a 1 = 6, a 2 = 5. Using the model of Fig. 4.26b, we obtain the desired realization, as shown in Fig. 4.27b. EXERCISE E4.12 Find the realization that is the transposed version of (a) DFI realization and (b) canonic direct realization of H(s) in Exercise E4.10.

4.6-5 Using Operational Amplifiers for System Realization In this section, we discuss practical implementation of the realizations described in Section 4.6-4. Earlier we saw that the basic elements required for the synthesis of an LTIC system (or a given transfer function) are (scalar) multipliers, integrators, and adders. All these elements can be realized by operational amplifier (op-amp) circuits.

OPERATIONAL AMPLIFIER CIRCUITS Figure 4.28 shows an op-amp circuit in the frequency domain (the transformed circuit). Because the input impedance of the op amp is infinite (very high), all the current I (s) flows in the feedback path, as illustrated. Moreover Vx (s), the voltage at the input of the op amp, is zero (very small) because of the infinite (very large) gain of the op amp. Therefore, for all practical purposes, Moreover, because v x ≈ 0,

Substitution of the second equation in the first yields

Therefore, the op-amp circuit in Fig. 4.28 has the transfer function

Figure 4.28: A basic inverting configuration op-amp circuit. By properly choosing Z(s) and Zf (s), we can obtain a variety of transfer functions, as the following development shows. THE SCALAR MULTIPLIER If we use a resistor R f in the feedback and a resistor R at the input (Fig. 4.29a), then Zf (s) = R f , Z(s) = R, and

Figure 4.29: (a) Op-amp inverting amplifier. (b) Integrator. The system acts as a scalar multiplier (or an amplifier) with a negative gain R f /R. A positive gain can be obtained by using two such multipliers in cascade or by using a single noninverting amplifier, as depicted in Fig. 4.16c. Figure 4.29a also shows the compact symbol used in circuit diagrams for a scalar multiplier.

THE INTEGRATOR If we use a capacitor C in the feedback and a resistor R at the input (Fig. 4.29b), then Zf (s) = 1/C s , Z(s) = R, and

The system acts as an ideal integrator with a gain −1/RC. Figure 4.29b also shows the compact symbol used in circuit diagrams for an integrator. THE ADDER Consider now the circuit in Fig. 4.30a with r inputs X1 (s), X2 (s),..., Xr(s). As usual, the input voltage Vx (s) ≈ 0 because the gain of op amp → ∞. Moreover, the current going into the op amp is very small (≈0) because the input impedance → ∞. Therefore, the total current in the feedback resistor R f is I1 (s) + I2 (s) +...+ Ir(s). Moreover, because Vx (s) = 0,

Figure 4.30: Op-amp summing and amplifying circuit. Also

where

Clearly, the circuit in Fig. 4.30 serves a adder and an amplifier with any desired gain for each of the input signals. Figure 4.30b shows the compact symbol used in circuit diagrams for a adder with r inputs. EXAMPLE 4.22 Use op-amp circuits to realize the canonic direct form of the transfer function

The basic canonic realization is shown in Fig. 4.31a. The same realization with horizontal reorientation is shown in Fig. 4.31b. Signals at various points are also indicated in the realization. For convenience, we denote the output of the last integrator by W(s). Consequently, the signals at the

inputs of the two integrators are sW(s) and s 2 W(s), as shown in Fig. 4.31a and 4.31b. Op-amp elements (multipliers, integrators, and adders) change the polarity of the output signals. To incorporate this fact, we modify the canonic realization in Fig. 4.31b to that depicted in Fig. 4.31c. In Fig.

4.31b, the successive outputs of the adder and the integrators are s 2 W(s), sW(s), and W(s) respectively. Because of polarity reversals in opamp

circuits, these outputs are −s 2 W(s), sW(s), and −W(s), respectively, in Fig. 4.31c. This polarity reversal requires corresponding modifications in the signs of feedback and feedforward gains. According to Fig. 4.31b

Figure 4.31: Op-amp realization of a second-order transfer function (2s + 5)/(s 2 + 4s + 10). Therefore Because the adder gains are always negative (see Fig. 4.30b), we rewrite the foregoing equation as Figure 4.31c shows the implementation of this equation. The hardware realization appears in Fig. 4.31d. Both integrators have a unity gain which requires RC = 1. We have used R = 100 kΩ and C = 10 μF. The gain of 10 in the outer feedback path is obtained in the adder by choosing the feedback resistor of the adder to be 100 kΩ and an input resistor of 10 kΩ. Similarly, the gain of 4 in the inner feedback path is obtained by using the corresponding input resistor of 25 kΩ. The gains of 2 and 5, required in the feedforward connections, are obtained by using a feedback resistor of 100 kΩ and input resistors of 50 and 20 kΩ, respectively. [†]

The op-amp realization in Fig. 4.31 is not necessarily the one that uses the fewest op amps. This example is given just to illustrate a systematic procedure for designing an op-amp circuit of an arbitrary transfer function. There are more efficient circuits (such as Sallen-Key or biquad) that use fewer op amp to realize a second-order transfer function. EXERCISE E4.13 Show that the transfer functions of the op-amp circuits in Fig. 4.32a and 4.32b are H 1 (s) and H 2 (s), respectively, where

Figure 4.32 [†] It may seem odd that we first assumed the existence of Y(s), integrated it successively, and then in turn generated Y(s) from W(s) and the three

successive integrals of signal Y(s). This procedure poses a dilemma similar to "Which came first, the chicken or the egg?" The problem here is satisfactorily resolved by writing the expression for Y(s) at the output of the right-hand adder (at the top) in Fig. 4.21a and verifying that this expression is indeed the same as Eq. (4.64). [†] The reader can show that the equations relating X(s), V(s), and Y(s) in Fig. 4.22a are

and

[†] When M = N (as in this case), H(s) can also be realized in another way by recognizing that

We now realize H(s) as a parallel combination of two transfer functions, as indicated by this equation. [†] It is possible to realize complex, conjugate poles indirectly by using a cascade of two first-order transfer functions and feedback. A transfer

function with poles −a ±jb can be realized by using a cascade of two identical first-order transfer functions, each having a pole at −a. (See Prob. 4.6-13.) [†] It is possible to avoid the two inverting op amps (with gain −1) in Fig. 4.31d by adding signal sW(s) to the input and output adders directly, using the noninverting amplifier configuration in Fig. 4.16d.

4.7 APPLICATION TO FEEDBACK AND CONTROLS Generally, systems are designed to produce a desired output y(t) for a given input x(t). Using the given performance criteria, we can design a system, as shown in Fig. 4.33a. Ideally, such an open-loop system should yield the desired output. In practice, however, the system characteristics change with time, as a result of aging or replacement of some components or because of changes in the environment in which the system is operating. Such variations cause changes in the output for the same input. Clearly, this is undesirable in precision systems.

Figure 4.33: (a) Open-loop and (b) closed-loop (feedback) systems. A possible solution to this problem is to add a signal component to the input that is not a predetermined function of time but will change to counteract the effects of changing system characteristics and the environment. In short, we must provide a correction at the system input to account for the undesired changes just mentioned. Yet since these changes are generally unpredictable, it is not clear how to preprogram appropriate corrections to the input. However, the difference between the actual output and the desired output gives an indication of the suitable correction to be applied to the system input. It may be possible to counteract the variations by feeding the output (or some function of output) back to the input. We unconsciously apply this principle in daily life. Consider an example of marketing a certain product. The optimum price of the product is the value that maximizes the profit of a merchant. The output in this case is the profit, and the input is the price of the item. The output (profit) can be controlled (within limits) by varying the input (price). The merchant may price the product too high initially, in which case, he will sell too few items, reducing the profit. Using feedback of the profit (output), he adjusts the price (input), to maximize his profit. If there is a sudden or unexpected change in the business environment, such as a strike-imposed shutdown of a large factory in town, the demand for the item goes down, thus reducing his output (profit). He adjusts his input (reduces price) using the feedback of the output (profit) in a way that will optimize his profit in the changed circumstances. If the town suddenly becomes more prosperous because of a new factory opens, he will increase the price to maximize the profit. Thus, by continuous feedback of the output to the input, he realizes his goal of maximum profit (optimum output) in any given circumstances. We observe thousands of examples of feedback systems around us in everyday life. Most social, economical, educational, and political processes

are, in fact, feedback processes. A block diagram of such a system, called the feedback or closed-loop system is shown in Fig. 4.33b. A feedback system can address the problems arising because of unwanted disturbances such as random-noise signals in electronic systems, a gust of wind affecting a tracking antenna, a meteorite hitting a spacecraft, and the rolling motion of antiaircraft gun platforms mounted on ships or moving tanks. Feedback may also be used to reduce nonlinearities in a system or to control its rise time (or bandwidth). Feedback is used to achieve, with a given system, the desired objective within a given tolerance, despite partial ignorance of the system and the environment. A feedback system, thus, has an ability for supervision and self-correction in the face of changes in the system parameters and external disturbances (change in the environment). Consider the feedback amplifier in Fig. 4.34. Let the forward amplifier gain G = 10,000. One-hundredth of the output is fed back to the input (H = 0.01). The gain T of the feedback amplifier is obtained by [see Eq. (4.59)]

Figure 4.34: Effects of negative and positive feedback. Suppose that because of aging or replacement of some transistors, the gain G of the forward amplifier changes from 10,000 to 20,000. The new gain of the feedback amplifier is given by

Surprisingly, 100% variation in the forward gain G causes only 0.5% variation in the feedback amplifier gain T. Such reduced sensitivity to parameter variations is a must in precision amplifiers. In this example, we reduced the sensitivity of gain to parameter variations at the cost of forward gain, which is reduced from 10,000 to 99. There is no dearth of forward gain (obtained by cascading stages). But low sensitivity is extremely precious in precision systems. Now, consider what happens when we add (instead of subtract) the signal fed back to the input. Such addition means the sign on the feedback connection is + instead of − (which is same as changing the sign of H in Fig. 4.34). Consequently

If we let G = 10,000 as before and H = 0.9 × 10 −4 , then

Suppose that because of aging or replacement of some transistors, the gain of the forward amplifier changes to 11,000. The new gain of the feedback amplifier is

Observe that in this case, a mere 10% increase in the forward gain G caused 1000% increase in the gain T (from 100,000 to 1,100,000). Clearly, the amplifier is very sensitive to parameter variations. This behavior is exactly opposite of what was observed earlier, when the signal fed back was subtracted from the input. What is the difference between the two situations? Crudely speaking, the former case is called the negative feedback and the latter is the positive feedback. The positive feedback increases system gain but tends to make the system more sensitive to parameter variations. It can also lead to instability. In our example, if G were to be 111,111, then GH = 1, T = ∞, and the system would become unstable because the signal fed back was exactly equal to the input signal itself, since GH = 1. Hence, once a signal has been applied, no matter how small and how short in duration, it comes back to reinforce the input undiminished, which further passes to the output, and is fed back again and again and again. In essence, the signal perpetuates itself forever. This perpetuation, even when the input ceases to exist, is precisely the symptom of instability. Generally speaking, a feedback system cannot be described in black and white terms, such as positive or negative. Usually H is a frequencydependent component, more accurately represented by H(s), varies with frequency. Consequently, what was negative feedback at lower frequencies can turn into positive feedback at higher frequencies and may give rise to instability. This is one of the serious aspects of feedback systems, which warrants careful attention of a designer.

4.7-1 Analysis of a Simple Control System Figure 4.35a represents an automatic position control system, which can be used to control the angular position of a heavy object (e.g., a tracking antenna, an antiaircraft gun mount, or the position of a ship). The input θi is the desired angular position of the object, which can be set at any given value. The actual angular position θo of the object (the output) is measured by a potentiometer whose wiper is mounted on the output shaft. The difference between the input θi (set at the desired output position) and the output θo (actual position) is amplified; the amplified output, which is proportional to θi − θo , is applied to the motor input. If θi − θo = 0 (the output being equal to the desired angle), there is no input to the motor, and the motor stops. But if θo ≠ θi , there will be a nonzero input to the motor, which will turn the shaft until θo = θi . It is evident that by setting the input

potentiometer at a desired position in this system, we can control the angular position of a heavy remote object.

Figure 4.35: (a) An automatic position control system. (b) Its block diagram. (c) The unit step response. (d) The unit ramp response. The block diagram of this system is shown in Fig. 4.35b. The amplifier gain is K, where K is adjustable. Let the motor (with load) transfer function that relates the output angle θo to the motor input voltage be G(s) [see Eq. (1.77)]. This feedback arrangement is identical to that in Fig. 4.18d with H(s) = 1. Hence, T(s), the (closed-loop) system transfer function relating the output θo to the input θi , is

From this equation, we shall investigate the behavior of the automatic position control system in Fig. 4.35a for a step and a ramp input. STEP INPUT If we desire to change the angular position of the object instantaneously, we need to apply a step input. We may then want to know how long the system takes to position itself at the desired angle, whether it reaches the desired angle, and whether it reaches the desired position smoothly (monotonically) or oscillates about the final position. If the system oscillates, we may want to know how long it takes for the oscillations to settle down. All these questions can be readily answered by finding the output θo (t) when the input θi (t) = u(t). A step input implies instantaneous change in the angle. This input would be one of the most difficult to follow; if the system can perform well for this input, it is likely to give a good account of itself under most other expected situations. This is why we test control systems for a step input. For the step input θi (t) = u(t), θi (s) = 1/s and

Let the motor (with load) transfer function relating the load angle θo (t) to the motor input voltage be G(s) = 1/(s(s + 8)) [see Eq. (1.77)]. This yields

Let us investigate the system behavior for three different values of gain K. For K = 7,

and

This response, illustrated in Fig. 4.35c, shows that the system reaches the desired angle, but at a rather leisurely pace. To speed up the response let us increase the gain to, say, 80. For K = 80,

and

This response, also depicted in Fig. 4.35c, achieves the goal of reaching the final position at a faster rate than that in the earlier case (K = 7). Unfortunately the improvement is achieved at the cost of ringing (oscillations) with high overshoot. In the present case the percent overshoot (PO) is 21%. The response reaches its peak value at peak time tp = 0.393 second. The rise time, defined as the time required for the response to rise from

10% to 90% of its steady-state value, indicates the speed of response. [†] In the present case tp = 0.175 second. The steady-state value of the response is unity so that the steady-state error is zero. Theoretically it takes infinite time for the response to reach the desired value of unity. In practice, however, we may consider the response to have settled to the final value if it closely approaches the final value. A widely accepted measure of closeness is within 2% of the final value. The time required for the response to reach and stay within 2% of the final value is called the settling time ts .[‡] In Fig. 4.35c, we find ts ≈ 1 second (when K = 80). A good system has a small overshoot, small tr and ts and a small steady-state error. A large overshoot, as in the present case, may be unacceptable in many applications. Let us try to determine K (the gain) that yields the fastest response without oscillations. Complex characteristic roots lead to oscillations; to avoid oscillations, the characteristic roots should be real. In the

present case the characteristic polynomial is s 2 +8s+K. For K > 16, the characteristic roots are complex; for K < 16, the roots are real. The fastest response without oscillations is obtained by choosing K = 16. We now consider this case. For K = 16,

and This response also appears in Fig. 4.35c. The system with K > 16 is said to be underdamped (oscillatory response), whereas the system with K < 16 is said to be overdamped. For K = 16, the system is said to be critically damped. There is a trade-off between undesirable overshoot and rise time. Reducing overshoots leads to higher rise time (sluggish system). In practice, a small overshoot, which is still faster than the critical damping, may be acceptable. Note that percent overshoot PO and peak time tp are meaningless for the overdamped or critically damped cases. In addition to adjusting gain K, we may need to augment the system with some type of compensator if the specifications on overshoot and the speed of response are too stringent. RAMP INPUT If the antiaircraft gun in Fig. 4.35a is tracking an enemy plane moving with a uniform velocity, the gun-position angle must increase linearly with t. Hence, the input in this case is a ramp; that is, θi (t) = tu(t). Let us find the response of the system to this input when K = 80. In this case, θi (s) = 1/s 2 , and

Use of Table 4.1 yields This response, sketched in Fig. 4.35d, shows that there is a steady-state error e r = 0.1 radian. In many cases such a small steady-state error may be tolerable. If, however, a zero steady-state error to a ramp input is required, this system in its present form is unsatisfactory. We must add some form of compensator to the system. COMPUTER EXAMPLE C4.4 Using the feedback system of Fig. 4.18d with G(s) = K/(s(s + 8)) and H(s) = 1, determine the step response for each of the following cases: a. K = 7 b. K = 16 c. K = 80

Additionally, d. Find the unit ramp response when K = 80. Computer Example C4.3 computes the transfer functions of these feedback systems in a simple way. In this example, the conv command is used to demonstrate polynomial multiplication of the two denominator factors of G(s). Step responses are computed by using the step command. (a-c) >> H = tf(1,1); K = 7; G = tf([0 0 K], conv([0 1 0], [0 1 8])); >> TFa = feedback(G, H); >> H = tf(1,1); K = 16; G = tf([0 0 K]. conv([0 1 0], [0 1 8])); >> TFb = feeback (G,H); >> H = tf(1,1); K = 80; G = tf([0 0 K]. conv([0 1 0], [0 1 8])); >> TFc = feeback (G,H); >> figure(1); clf; step(TFa, 'k-',TFb, 'k - ',TFc, 'k-. '); >> legend( '(a) K = 7 ', '(b) K = 16 ', ' (c) K = 80 ',0);

Figure C4.4-1 The unit ramp response is equivalent to the derivative of the unit step response. >> TFd = series(TFc, tf([0 1], [1 0])); >> figure(2); clf; step(TFd, 'k-'); legend( '(d) k = 80 ', 0); >> title( 'Unit Ramp Response ')

Figure C4.4-2 Design Specifications Now the reader has some idea of the various specifications a control system might require. Generally, a control system is designed to meet given transient specifications, steady-state error specifications, and sensitivity specifications. Transient specifications include overshoot, rise time, and settling time of the response to step input. The steady-state error is the difference between the desired response and the actual response to a test input in steady-state. The system should also satisfy a specified sensitivity specifications to some system parameter variations, or to certain disturbances. Above all, the system must remain stable under operating conditions. Discussion of design procedures used to realize given specifications is beyond the scope of this book. [†] Delay time t , defined as the time required for the response to reach 50% of its steady-state value, is another indication of speed. For the present d

case, t d = 0.141 second.

[‡] Typical percentage values used are 2 to 5% for t . s

4.8 FREQUENCY RESPONSE OF AN LTIC SYSTEM Filtering is an important area of signal processing. Filtering characteristics of a system are indicated by its response to sinusoids of various

frequencies varying from 0 to ∞. Such characteristics are called the frequency response of the system. In this section, we shall find the frequency response of LTIC systems. In Section 2.4-4 we showed that an LTIC system response to an everlasting exponential input x(t) = e st is also an everlasting exponential H(s)e st . As before, we use an arrow directed from the input to the output to represent an input -output pair:

Setting s = jω in this relationship yields

Noting that cos ωt is the real part of e jωt , use of Eq. (2.40) yields

We can express H(jω) in the polar form as

With this result, the relationship (4.73) becomes In other words, the system response y(t) to a sinusoidal input cos ωt is given by Using a similar argument, we can show that the system response to a sinusoid cos (ωt + θ) is

This result is valid only for BIBO-stable systems. The frequency response is meaningless for BIBO-unstable systems. This follows from the fact that the frequency response in Eq. (4.72) is obtained by setting s = jω in Eq. (4.71). But, as shown in Section 2.4-4 [Eqs. (2.47) and (2.48)], the relationship (4.71) applies only for the values of s for which H(s) exists. For BIBO-unstable systems, the ROC for H(s) does not include the jω axis

where s = jω [see Eq. (4.14)]. This means that H(s) when s = jω, is meaningless for BIBO-unstable systems. [†]

Equation (4.75b) shows that for a sinusoidal input of radian frequency ω, the system response is also a sinusoid of the same frequency ω. The amplitude of the output sinusoid is |H(jω)| times the input amplitude, and the phase of the output sinusoid is shifted by ∠H(jω) with respect to the input phase (see later Fig. 4.36 in Example 4.23). For instance, a certain system with |H(j10)| = 3 and ∠H(j10) = −30° amplifies a sinusoid of frequency ω = 10 by a factor of 3 and delays its phase by 30°. The system response to an input 5 cos (10t + 50°) is 3 × 5 cos (10t + 50° − 30°) = 15 cos (10t + 20°).

Figure 4.36: Frequency responses of the LTIC system. Clearly |H(jω)| is the amplitude gain of the system, and a plot of |H(jω)| versus ω shows the amplitude gain as a function of frequency ω. We shall call ∠H(jω) the amplitude response. It also goes under the name magnitude response in the literature. [‡] Similarly, ∠H(jω) is the phase response and a plot of ∠H(jω) versus ω shows how the system modifies or changes the phase of the input sinusoid. Observe that H(jω) has the information of |H(jω)| and ∠H(jω). For this reason, H(jω) is also called the frequency response of the system. The frequency response plots |H(jω)| and ∠H(jω) show at a glance how a system responds to sinusoids of various frequencies. Thus, the frequency response of a system represents its filtering characteristic. EXAMPLE 4.23 Find the frequency response (amplitude and phase response) of a system whose transfer function is

Also, find the system response y(t) if the input x(t) is a. cos 2t b. cos (10t − 50°) In this case

Therefore

Both the amplitude and the phase response are depicted in Fig. 4.36a as functions of ω. These plots furnish the complete information about the frequency response of the system to sinusoidal inputs. a. For the input x(t) = cos 2t, ω = 2, and

We also could have read these values directly from the frequency response plots in Fig. 4.36a corresponding to ω = 2. This result means that for a sinusoidal input with frequency ω = 2, the amplitude gain of the system is 0.372, and the phase shift is 65.3°. In other words, the output amplitude is 0.372 times the input amplitude, and the phase of the output is shifted with respect to that of the input by 65.3°. Therefore, the system response to an input cos 2t is The input cos 2t and the corresponding system response 0.372 cos (2t + 65.3°) are illustrated in Fig. 4.36b. b. For the input cos (10t − 50°), instead of computing the values |H(jω)| and ∠H(jω) as in part (a), we shall read them directly from the frequency response plots in Fig. 4.36a corresponding to ω = 10. These are: Therefore, for a sinusoidal input of frequency ω = 10, the output sinusoid amplitude is 0.894 times the input amplitude, and the output sinusoid is shifted with respect to the input sinusoid by 26°. Therefore, y(t), the system response to an input cos (10t = 50°), is If the input were sin (10t − 50°), the response would be 0.894 sin (10t − 50° + 26°) = 0.894 sin (10t − 24°). The frequency response plots in Fig. 4.36a show that the system has highpass filtering characteristics; it responds well to sinusoids of higher frequencies (ω well above 5), and suppresses sinusoids of lower frequencies (ω well below 5). COMPUTER EXAMPLE C4.5 Plot the frequency response of the transfer function H(s) = (s + 5)/(s 2 + 3s + 2). >> H = tf([1 5], [1 3 2]); >> bode(H, 'k-',{0.1 100});

Figure C4.5 EXAMPLE 4.24

Find and sketch the frequency response (amplitude and phase response) for the following. a. an ideal delay of T seconds b. an ideal differentiator c. an ideal integrator a. Ideal delay of T seconds. The transfer function of an ideal delay is [see Eq. (4.46)] Therefore Consequently

These amplitude and phase responses are shown in Fig. 4.37a. The amplitude response is constant (unity) for all frequencies. The phase shift increases linearly with frequency with a slope of −T. This result can be explained physically by recognizing that if a sinusoid cos ωt is passed through an ideal delay of T seconds, the output is cos ω(t − T). The output sinusoid amplitude is the same as that of the input for all values of ω. Therefore, the amplitude response (gain) is unity for all frequencies. Moreover, the output cos ω(t − T) = cos (ωt − ωT) has a phase shift − ωT with respect to the input cos ωt. Therefore, the phase response is linearly proportional to the frequency ω with a slope −T.

Figure 4.37: Frequency response of an ideal (a) delay, (b) differentiator, and (c) integrator. b. An ideal differentiator. The transfer function of an ideal differentiator is [see Eq. (4.47)] Therefore Consequently

This amplitude and phase response are depicted in Fig. 4.37b. The amplitude response increases linearly with frequency, and phase response is constant (π/2) for all frequencies. This result can be explained physically by recognizing that if a sinusoid cos ωt is passed through an ideal differentiator, the output is −ω sin ωt = ωcos[ωt + (π/2)]. Therefore, the output sinusoid amplitude is ω times the input amplitude; that is, the amplitude response (gain) increases linearly with frequency ω. Moreover, the output sinusoid undergoes a phase shift π/2 with respect to the input cos ωt. Therefore, the phase response is constant (π/2) with frequency. In an ideal differentiator, the amplitude response (gain) is proportional to frequency [|H(jω)| = ω], so that the higher-frequency components are enhanced (see Fig. 4.37b). All practical signals are contaminated with noise, which, by its nature, is a broadband (rapidly varying) signal containing components of very high frequencies. A differentiator can increase the noise disproportionately to the point of drowning out the desired signal. This is why ideal differentiators are avoided in practice. c. An ideal integrator. The transfer function of an ideal integrator is [see Eq. (4.48)]

Therefore

Consequently

These amplitude and the phase responses are illustrated in Fig. 4.37c. The amplitude response is inversely proportional to frequency, and the phase shift is constant (−π/2) with frequency. This result can be explained physically by recognizing that if a sinusoid cos ωt is passed through an ideal integrator, the output is (1/ω) sin ωt = (1/ω) cos [ωt − (π/2)]. Therefore, the amplitude response is inversely proportional to ω, and the phase response is constant (−π/2) with frequency.[†] Because its gain is 1/ω, the ideal integrator suppresses higher-frequency components but enhances lower-frequency components with ω < 1. Consequently, noise signals (if they do not contain an appreciable amount of very-low-frequency components) are suppressed (smoothed out) by an integrator.

EXERCISE E4.14 Find the response of an LTIC system specified by

if the input is a sinusoid 20 sin (3t + 35°). Answers 10.23 sin (3t −61.91°)

4.8-1 Steady-State Response to Causal Sinusoidal Inputs So far we have discussed the LTIC system response to everlasting sinusoidal inputs (starting at t = −∞). In practice, we are more interested in

causal sinusoidal inputs (sinusoids starting at t = 0). Consider the input e jωt u(t), which starts at t = 0 rather than at t = −∞. In this case X(s) = 1/(s + jω). Moreover, according to Eq. (4.43), H(s) = P(s)/Q(s), where Q(s) is the characteristic polynomial given by Q(s) = (s − λ1 )(s − λ2 ) (s − λN).[‡] Hence,

In the partial fraction expansion of the right-hand side, let the coefficients corresponding to the N terms (s -? 1 ), (s -? 2 ), ..., (s - ? N) be k 1 , k 2 ,..., k N. The coefficient corresponding to the last term (s − jω) is P(s)/Q(s)|s=jω = H(jω). Hence,

and

For an asymptotically stable system, the characteristic mode terms e jωt decay with time, and, therefore, constitute the so-called transient component

of the response. The last term H(jω)e jωt persists forever, and is the steady-state component of the response given by

This result also explains why an everlasting exponential input e jωt results in the total response H(jω)e jωt for BIBO systems. Because the input started at t = −∞, at any finite time the decaying transient component has long vanished, leaving only the steady-state component. Hence, the total response appears to be H(jω)e jωt .

From the argument that led to Eq. (4.75a), it follows that for a causal sinusoidal input cos ωt, the steady-state response y ss(t) is given by

In summary, |H(jω)|cos[ωt + ∠H(jω)] is the total response to everlasting sinusoid cos ωt. In contrast, it is the steady-state response to the same input applied at t = 0. [†] This may also be argued as follows. For BIBO-unstable systems, the zero-input response contains nondecaying natural mode terms of the form cos ω0 t or e at cos ω0 t (a > 0). Hence, the response of such a system to a sinusoid cos ωt will contain not just the sinusoid of frequency ω, but

also nondecaying natural modes, rendering the concept of frequency response meaningless. Alternately, we can argue that when s = jω, a BIBOunstable system violates the dominance condition Re λi < Re jω for all i, where λi , represents ith characteristic root of the system (see Section 4.31). [‡] Strictly speaking, |H(ω)| is magnitude response. There is a fine distinction between amplitude and magnitude. Amplitude A can be positive and negative. In contrast, the magnitude |A| is always nonnegative. We refrain from relying on this useful distinction between amplitude and magnitude in the interest of avoiding proliferation of essentially similar entities. This is also why we shall use the "amplitude" (instead of "magnitude") spectrum for |H(ω)|.

[†] A puzzling aspect of this result is that in deriving the transfer function of the integrator in Eq. (4.48), we have assumed that the input starts at t = 0. In contrast, in deriving its frequency response, we assume that the everlasting exponential input e jωt starts at t = −∞. There appears to be a

fundamental contradiction between the everlasting input, which starts at t = −∞, and the integrator, which opens its gates only at t = 0. What use is everlasting input, since the integrator starts integrating at t = 0? The answer is that the integrator gates are always open, and integration begins whenever the input starts. We restricted the input to start at t = 0 in deriving Eq. (4.48) because we were finding the transfer function using the unilateral transform, where the inputs begin at t = 0. So the integrator starting to integrate at t = 0 is restricted because of the limitations of the unilateral transform method, not because of the limitations of the integrator itself. If we were to find the integrator transfer function using Eq. (2.49), where there is no such restriction on the input, we would still find the transfer function of an integrator as 1/s. Similarly, even if we were to use the bilateral Laplace transform, where t starts at −∞, we would find the transfer function of an integrator to be 1/s. The transfer function of a system is the property of the system and does not depend on the method used to find it.

[‡] For simplicity, we have assumed nonrepeating characteristic roots. The procedure is readily modified for repeated roots, and the same conclusion

results.

4.9 BODE PLOTS Sketching frequency response plots (|H(jω)| and ∠H(jω) versus ω) is considerably facilitated by the use of logarithmic scales. The amplitude and phase response plots as a function of ω on a logarithmic scale are known as Bode plots. By using the asymptotic behavior of the amplitude and the phase responses, we can sketch these plots with remarkable ease, even for higher-order transfer functions. Let us consider a system with the transfer function

where the second-order factor (s 2 + b 2 s + b 3 ) is assumed to have complex conjugate roots. [†] We shall rearrange Eq. (4.81a) in the form

and

This equation shows that H(jω) is a complex function of ω. The amplitude response |H(jω)) and the phase response ∠H(jω) are given by

and

From Eq. (4.82b) we see that the phase function consists of the addition of only three kinds of term: (i) the phase of jω), which is 90° for all values of ω, (ii) the phase for the first-order term of the form 1 + jω/a, and (iii) the phase of the second-order term

We can plot these three basic phase functions for ω in the range 0 to ∞ and then, using these plots, we can construct the phase function of any transfer function by properly adding these basic responses. Note that if a particular term is in the numerator, its phase is added, but if the term is in the denominator, its phase is subtracted. This makes it easy to plot the phase function ∠H(jω) as a function of ω. Computation of |H(jω)|, unlike that of the phase function, however, involves the multiplication and division of various terms. This is a formidable task, especially when, we have to plot this function for the entire range of ω (0 to ∞). We know that a log operation converts multiplication and division to addition and subtraction. So, instead of plotting |H(jω)|, why not plot log |H(jω)| to simplify our task? We can take advantage of the fact that logarithmic units are desirable in several applications, where the variables considered have a very large range of variation. This is particularly true in frequency response plots, where we may have to plot frequency response over a range from a very low frequency, near 0, to a very high frequency, in the range of 10 10 or higher. A plot on a linear scale of frequencies for such a

large range will bury much of the useful information at lower frequencies. Also, the amplitude response may have a very large dynamic range from a low of 10 −6 to a high of 10 6 . A linear plot would be unsuitable for such a situation. Therefore, logarithmic plots not only simplify our task of plotting, but, fortunately, they are also desirable in this situation.

There is another important reason for using logarithmic scale. The Weber-Fechner law (first observed by Weber in 1834) states that human senses (sight, touch, hearing, etc.) generally respond in logarithmic way. For instance, when we hear sound at two different power levels, we judge one sound twice as loud when the ratio of the two sound powers is 10. Human senses respond to equal ratios of power, not equal increments in power. [11] This is clearly a logarithmic response. [†]

The logarithmic unit is the decibel and is equal to 20 times the logarithm of the quantity (log to the base 10). Therefore, 20 log 10 |H(jω)| is simply the log amplitude in decibels (dB). [‡] Thus, instead of plotting |H(jω)|, we shall plot 20 log 10 |H(jω)| as a function of ω. These plots (log amplitude and phase) are called Bode plots. For the transfer function in Eq. (4.82a), the log amplitude is

The term 20 log(Ka1 a 2 /b 1 b 3 ) is a constant. We observe that the log amplitude is a sum of four basic terms corresponding to a constant, a pole or

zero at the origin (20 log |jω|), a first-order pole or zero (20 log |1 + jω/a|), and complex-conjugate poles or zeros (20 log |1 + jωb 2 /b 3 + (jω) 2 /b 3 |). We can sketch these four basic terms as functions of ω and use them to construct the log-amplitude plot of any desired transfer function. Let us discuss each of the terms.

4.9-1 Constant ka1 a2 /b1 b3 The log amplitude of the constant ka1 a 2 /b 1 b 2 term is also a constant, 20 log(Ka1 a 2 /b 1 b 3 ). The phase contribution from this term is zero for positive value and π for negative value of the constant.

4.9-2 Pole (or Zero) at the Origin LOG MAGNITUDE A pole at the origin gives rise to the term −20 log |jω|, which can be expressed as This function can be plotted as a function of ω. However, we can effect further simplification by using the logarithmic scale for the variable ω itself. Let us define a new variable u such that Hence The log-amplitude function −20u is plotted as a function of u in Fig. 4.38a. This is a straight line with a slope of −20. It crosses the u axis at u = 0. The ω-scale (u = log ω) also appears in Fig. 4.38a. Semilog graphs can be conveniently used for plotting, and we can directly plot ω on semilog paper. A ratio of 10 is a decade, and a ratio of 2 is known as an octave. Furthermore, a decade along the ω-scale is equivalent to 1 unit along the u-scale. We can also show that a ratio of 2 (an octave) along the ω-scale equals to 0.3010 (which is log 10 2) along the u-scale.[†]

Figure 4.38: (a) Amplitude and (b) phase responses of a pole or a zero at the origin. Note that equal increments in u are equivalent to equal ratios on the ω-scale. Thus, one unit along the u-scale is the same as one decade along the ω-scale. This means that the amplitude plot has a slope of −20 dB/decade or −20(0.3010) = −6.02 dB/octave (commonly stated as −6 dB/octave). Moreover, the amplitude plot crosses the ω axis at ω = 1, since u = log 10 ω = 0 when ω = 1. For the case of a zero at the origin, the log-amplitude term is 20 log ω. This is a straight line passing through ω = 1 and having a slope of 20

dB/decade (or 6 dB/octave). This plot is a mirror image about the ω axis of the plot for a pole at the origin and is shown dashed in Fig. 4.38a. PHASE The phase function corresponding to the pole at the origin is −∠jω [see Eq. (4.82b)]. Thus The phase is constant (−90°) for all values of ω, as depicted in Fig. 4.38b. For a zero at the origin, the phase is ∠jω = 90°. This is a mirror image of the phase plot for a pole at the origin and is shown dotted in Fig. 4.38b.

4.9-3 First-Order Pole (or Zero) THE LOG MAGNITUDE The log amplitude of a first-order pole at -a is −20 log |1 + jω/a|. Let us investigate the asymptotic behavior of this function for extreme values of ω (ω ≪ a and ω >> a). a. For ω ≪ a,

Hence, the log-amplitude function → 0 asymptotically for ω ≪ a (Fig. 4.39a).

Figure 4.39: (a) Amplitude and (b) phase responses of a first-order pole or zero at s = −a. b. For the other extreme case, where ω >> a,

This represents a straight line (when plotted as a function of u, the log of ω) with a slope of −20 dB/decade (or −6 dB/octave). When ω = a, the log amplitude is zero [Eq. (4.84b)]. Hence, this line crosses the ω axis at ω = a, as illustrated in Fig. 4.39a. Note that the asymptotes in (a) and (b) meet at ω = a. The exact log amplitude for this pole is

This exact log magnitude function also appears in Fig. 4.39a. Observe that the actual and the asymptotic plots are very close. A maximum error of 3 dB occurs at ω = a. This frequency is known as the corner frequency or break frequency. The error everywhere else is less than 3 dB. A plot of the error as a function of ω is shown in Fig. 4.40a. This figure shows that the error at one octave above or below the corner frequency is 1 dB and the error at two octaves above or below the corner frequency is 0.3 dB. The actual plot can be obtained by adding the error to the asymptotic plot.

Figure 4.40: Errors in asymptotic approximation of a first-order pole at s = −a. The amplitude response for a zero at −a (shown dotted in Fig. 4.39a) is identical to that of the pole at −a with a sign change and therefore is the mirror image (about the 0 dB line) of the amplitude plot for a pole at −a. PHASE The phase for the first-order pole at −a is

Let us investigate the asymptotic behavior of this function. For ω ≪ a,

and, for >> a,

The actual plot along with the asymptotes is depicted in Fig. 4.39b. In this case, we use a three-line segment asymptotic plot for greater accuracy. The asymptotes are a phase angle of 0° for ω ≤ a/10, a phase angle of −90° for ω ≥ 10a, and a straight line with a slope −45°/decade connecting these two asymptotes (from ω = a/10 to 10a) crossing the ω axis at ω = a/10. It can be seen from Fig. 4.39b that the asymptotes are very close to the curve and the maximum error is 5.7°. Figure 4.40b plots the error as a function of ω; the actual plot can be obtained by adding the error to the asymptotic plot. The phase for a zero at −a (shown dotted in Fig. 4.39b) is identical to that of the pole at −a with a sign change, and therefore is the mirror image (about the 0° line) of the phase plot for a pole at −a.

4.9-4 Second-Order Pole (or Zero) Let us consider the second-order pole in Eq. (4.81a). The denominator term is s 2 + b 2 s + b 3 . We shall introduce the often-used standard form s 2 +

2ζωn s + ω2 n instead of s 2 + b 2 s + b 3 . With this form, the log amplitude function for the second-order term in Eq. (4.83) becomes

and the phase function is

THE LOG MAGNITUDE The log amplitude is given by

For ω ≪ ωn , the log amplitude becomes For ω >> ωn , the log amplitude is

The two asymptotes are zero for ω < ωn and − 40u − 40 logωn for ω > ωn . The second asymptote is a straight line with a slope of −40 dB/decade (or −12 dB/octave) when plotted against the log ω scale. It begins at ω = ωn [see Eq. (4.87b)]. The asymptotes are depicted in Fig. 4.41a. The exact log amplitude is given by [see Eq. (4.86)]

Figure 4.41: Amplitude and phase response of a second-order pole. The log amplitude in this case involves a parameter ζ, resulting in a different plot for each value of ζ. For complex-conjugate poles,[†] ζ < 1. Hence, we must sketch a family of curves for a number of values of ζ in the range 0 to 1. This is illustrated in Fig. 4.41a. The error between the actual plot and the asymptotes is shown in Fig. 4.42. The actual plot can be obtained by adding the error to the asymptotic plot.

Figure 4.42: Errors in the asymptotic approximation of a second-order pole.

For second-order zeros (complex-conjugate zeros), the plots are mirror images (about the 0dB line) of the plots depicted in Fig. 4.41a. Note the resonance phenomenon of the complex-conjugate poles. This phenomenon is barely noticeable for ζ > 0.707 but becomes pronounced as ζ → 0. PHASE The phase function for second-order poles, as apparent in Eq. (4.85b), is

For ω ≪ ωn , For ω >> ωn , Hence, the phase → −180° as ω → ∞. As in the case of amplitude, we also have a family of phase plots for various values of ζ, as illustrated in Fig. 4.41b. A convenient asymptote for the phase of complex-conjugate poles is a step function that is 0° for ω < ωn and −180° for ω > ωn . An error plot for such an asymptote is shown in Fig. 4.42 for various values of ζ. The exact phase is the asymptotic value plus the error. For complex-conjugate zeros, the amplitude and phase plots are mirror images of those for complex conjugate-poles. We shall demonstrate the application of these techniques with two examples. EXAMPLE 4.25 Sketch Bode plots for the transfer function

First, we write the transfer function in normalized form

Here, the constant term is 100; that is, 40 dB (20 log 100 = 40). This term can be added to the plot by simply relabeling the horizontal axis (from which the asymptotes begin) as the 40 dB line (see Fig. 4.43a). Such a step implies shifting the horizontal axis upward by 40 dB. This is precisely what is desired.

Figure 4.43: (a) Amplitude and (b) phase responses of the second-order system. In addition, we have two first-order poles at −2 and −10, one zero at the origin, and one zero at −100. Step 1. For each of these terms, we draw an asymptotic plot as follows (shown in Fig. 4.43a by dotted lines):

i. For the zero at the origin, draw a straight line with a slope of 20 dB/decade passing through ω = 1. ii. For the pole at −2, draw a straight line with a slope of −20 dB/decade (for ω > 2) beginning at the corner frequency ω = 2 iii. For the pole at −10, draw a straight line with a slope of −20 dB/decade beginning at the corner frequency ω = 10. iv. For the zero at −100, draw a straight line with a slope of 20 dB/decade beginning at the corner frequency ω = 100. Step 2. Add all the asymptotes, as depicted in Fig. 4.43a by solid line segments. Step 3. Apply the following corrections (see Fig. 4.40a): i. The correction at ω = 1 because of the corner frequency at ω = 2 is −1 dB. The correction at ω = 1 because of the corner frequencies at ω − 10 and ω = 100 are quite small (see Fig. 4.40a) and may be ignored. Hence, the net correction at ω = 1 is −1 dB. ii. The correction at ω = 2 because of the corner frequency at ω = 2 is − 3 dB, and the correction because of the corner frequency at ω = 10 is −0.17 dB. The correction because of the corner frequency ω = 100 can be safely ignored. Hence the net correction at ω = 2 is −3.17 dB. iii. The correction at ω = 10 because of the corner frequency at ω = 10 is −3 dB, and the correction because of the corner frequency at ω = 2 is −0.17 dB. The correction. because of ω = 100 can be ignored. Hence the net correction at ω = 10 is − 3.17dB. iv. The correction at ω = 100 because of the corner frequency at ω = 100 is 3 dB, and the corrections because of the other corner frequencies may be ignored. v. In addition to the corrections at corner frequencies, we may consider corrections at intermediate points for more accurate plots. For instance, the corrections at ω = 4 because of corner frequencies at ω = 2 and 10 are −1 and about −0.65, totaling − 1.65 dB. In the same way the correction at ω = 5 because of corner frequencies at ω = 2 and 10 are −0.65 and −1, totaling −1.65 dB. With these corrections, the resulting amplitude plot is illustrated in Fig. 4.43a. PHASE PLOTS We draw the asymptotes corresponding to each of the four factors: i. The zero at the origin causes a 90° phase shift. ii. The pole at s = − 2 has an asymptote with a zero value for − ∞ < ω < 0.2 and a slope of −45°/decade beginning at ω = 0.2 and going up to ω = 20. The asymptotic value for ω > 20 is −90°. iii. The pole at s = −10 has an asymptote with a zero value for − ∞ < ω < 1 and a slope of − 45°/decade beginning at ω = 10 and going up to ω = 100. The asymptotic value for ω > 100 is −90°. iv. The zero at s = −100 has an asymptote with a zero value for − ∞ < ω < 10 and a slope of −45°/decade beginning at ω = 10 and going up to ω = 1000. The asymptotic value for ω > 1000 is 90°. All the asymptotes are added, as shown in Fig. 4.43b. The appropriate corrections are applied from Fig. 4.40b, and the exact phase plot is depicted in Fig. 4.43b. EXAMPLE 4.26 Sketch the amplitude and phase response (Bode plots) for the transfer function

Here, the constant term is 10: that is, 20 dB(20 log 10 = 20). To add this term, we simply label the horizontal axis (from which the asymptotes begin) as the 20 dB line, as before (see Fig. 4.44a).

Figure 4.44: (a) Amplitude and (b) phase responses of the second-order system. In addition, we have a real zero at s = −100 and a pair of complex conjugate poles. When we express the second-order factor in standard form, we have Step 1. Draw an asymptote of −40 dB/decade (−12 dB/octave) starting at ω = 10 for the complex conjugate poles, and draw another asymptote of 20 dB/decade, starting at ω = 100 for the (real) zero. Step 2. Add both asymptotes. Step 3. Apply the correction at ω = 100, where the correction because of the corner frequency ω = 100 is 3 dB. The correction because of the corner frequency ω = 10, as seen from Fig. 4.42a for ζ =0.1, can be safely ignored. Next, the correction at ω = 10, because of the corner frequency ω = 10 is 13.90 dB (see Fig. 4.42a for ζ = 0.1). The correction because of the real zero at −100 can be safely ignored at ω = 10. We may find corrections at a few more points. The resulting plot is illustrated in Fig. 4.44a. PHASE PLOT The asymptote for the complex conjugate poles is a step function with a jump of −90° at ω = 10. The asymptote for the zero at s = −100 is zero for ω > 10 and is a straight line with a slope of 45°/decade, starting at ω = 10 and going to ω = 1000. For ω ≥ 1000, the asymptote is 90°. The two asymptotes add to give the sawtooth shown in Fig. 4.44b. We now apply the corrections from Figs. 4.42b and 4.40b to obtain the exact plot. Comment. These two examples demonstrate that actual frequency response plots are very close to asymptotic plots, which are so easy to construct. Thus, by mere inspection of H(s) and its poles and zeros, one can rapidly construct a mental image of the frequency response of a system. This is the principal virtue of Bode plots. COMPUTER EXAMPLE C4.6 Use MATLAB function bode to solve Examples 4.25 and 4.26. >> bode(tf(conv([20 0],[1 100]), conv([1 2],[1 10])), 'k-',... >> tf([10 1000], [1 2 100]), 'k: '); >> legend( 'Ex. 4.25 ', 'Ex. 4.26 ',0)

Figure C4.6

POLES AND ZEROS IN THE RIGHT-HAND PLANE In our discussion so far, we have assumed the poles and zeros of the transfer function to be in the left-hand plane. What if some of the poles and/or zeros of H(s) lie in the RHP? If there is a pole in the RHP, the system is unstable. Such systems are useless for any signal processing application. For this reason, we shall consider only the case of the RHP zero. The term corresponding to RHP zero at s = a is (s/a) − 1, and the corresponding frequency response is (jω/a) − 1. The amplitude response is

This shows that the amplitude response of an RHP zero at s = a is identical to that of an LHP zero or s = −a. Therefore, the log amplitude plots remain unchanged whether the zeros are in the LHP or the RHP. However, the phase corresponding to the RHP zero at s = a is

whereas the phase corresponding to the LHP zero at s = −a is tan −1 (ω/a). The complex-conjugate zeros in the RHP give rise to a term s 2 − 2ζωns + ω2 n , which is identical to the term s 2 + 2ζωn s + ω2 n with a sign change in ζ. Hence, from Eqs. (4.88) and (4.89) it follows that the amplitudes are identical, but the phases are of opposite signs for the two terms. Systems whose poles and zeros are restricted to the LHP are classified as minimum phase systems

4.9-5 The Transfer Function from the Frequency Response In the preceding section we were given the transfer function of a system. From a knowledge of the transfer function, we developed techniques for determining the system response to sinusoidal inputs. We can also reverse the procedure to determine the transfer function of a minimum phase system from the system 's response to sinusoids. This application has significant practical utility. If we are given a system in a black box with only the input and output terminals available, the transfer function has to be determined by experimental measurements at the input and output terminals. The frequency response to sinusoidal inputs is one of the possibilities that is very attractive because the measurements involved are so simple. One only needs to apply a sinusoidal signal at the input and observe the output. We find the amplitude gain |H(jω)| and the output phase shift ∠H(jω) (with respect to the input sinusoid) for various values of ω over the entire range from 0 to ∞. This information yields the frequency response plots (Bode plots) when plotted against log ω. From these plots we determine the appropriate asymptotes by taking advantage of the fact that the slopes of all asymptotes must be multiples of ±20 dB/decade if the transfer function is a rational function (function that is a ratio of two polynomials in s). From the asymptotes, the corner frequencies are obtained. Corner frequencies determine the poles and zeros of the transfer function. Because of the ambiguity about the location of zeros since LHP and RHP zeros (zeros at s = ±a) have identical magnitudes, this procedure works only for minimum phase systems. [†] Coefficients a , a and b , b , b used in this section are not to be confused with those used in the representation of Nth-order LTIC system 1 2 1 2 3

equations given earlier [Eqs. (2.1) or (4.41)].

[11] Truxal, J. G. The Age of Electronic Messages. McGraw-Hill, New York, 1990. [†] Observe that that the frequencies of musical notes are spaced logarithmically (not linearly). The octave is a ratio of 2. The frequencies of the same

note in the successive octaves have a ratio of 2. On the Western musical scale, there are 12 distinct notes in each octave. The frequency of each note is about 6% higher than the frequency of the preceding note. Thus, the successive notes are separated not by some constant frequency, but by constant ratio of 1.06. [‡] Originally, the unit bel (after the inventor of telephone, Alexander Graham Bell) was introduced to represent power ratio as log , P /P bels. A 10 2 1

tenth of this unit is a decibel, as in 10 log 10 P2 /P2 decibels. Since, the power ratio of two signals is proportional to the amplitude ratio squared, or |H(jω)|2 , we have 10 log 10 P2 /P1 = 10 log 10 |H(jω)|2 = 20 log 10 |H(jω)| dB. [†] This point can be shown as follows. Let ω and ω along the ω-scale correspond to u and u along the u-scale so that log ω = u , and log 1 2 1 2 1 1

ω2 = u 2 . Then

Thus, if

then and if then [†] For ζ ≥ 1, the two poles in the second-order factor are no longer complex but real, and each of these two real poles can be dealt with as a

separate first-order factor.

4.10 FILTER DESIGN BY PLACEMENT OF POLES AND ZEROS OF H(s) In this section we explore the strong dependence of frequency response on the location of poles and zeros of H(s). This dependence points to a simple intuitive procedure to filter design.

4.10-1 Dependence of Frequency Response on Poles and Zeros of H(s) Frequency response of a system is basically the information about the filtering capability of the system. A system transfer function can be expressed as

where 1, 2, N are ? 1 , ? 2 ,..., λN are the poles of H(s). Now the value of the transfer function H(s) at some frequency s = p is

This equation consists of factors of the form p − i and p − λi . The factor p − i is a complex number represented by a vector drawn from point to the point p in the complex plane, as illustrated in Fig. 4.45a. The length of this line segment is | p − i | the magnitude of p − i . The angle of this directed line segment (with the horizontal axis) is ∠(p − i ). To compute H(s) at s = p, we draw line segments from all poles and zeros of H(s) to the point p, as shown in Fig. 4.45b. The vector connecting a zero i to the point p is p − i . Let the length of this vector be r j , and let its angle with the horizontal axis be φ i . Then p − i = r i e jφ i. Similarly, the vector connecting a pole λi to the point p is p − λi = d e e jθi, where d i and θi , are the length and the angle (with the horizontal axis), respectively, of the vector p − λi Now from Eq. (4.90b) it follows that

Figure 4.45: Vector representations of (a) complex numbers and (b) factors of H(s). Therefore

and

Here, we have assumed positive b 0 . If b 0 is negative, there is an additional phase π. Using this procedure, we can determine H(s) for any value of s. To compute the frequency response H(jω), we use s = jω (a point on the imaginary axis), connect all poles and zeros to the point jω, and determine |H(jω)| and ∠H(jω) from Eqs. (4.91). We repeat this procedure for all values of ω from 0 to ∞ to obtain the frequency response. GAIN ENHANCEMENT BY A POLE To understand the effect of poles and zeros on the frequency response, consider a hypothetical case of a single pole −α + jω0 , as depicted in Fig. 4.46a. To find the amplitude response |H(jω)| for a certain value of ω, we connect the pole to the point jω (Fig. 4.46a). If the length of this line is d, then |H(jω)| is proportional to 1/d,

where the exact value of constant K is not important at this point. As ω increases from zero, d decreases progressively until ω reaches the value ω0 . As ω increases beyond ω0 , d increases progressively. Therefore, according to Eq. (4.92), the amplitude response |H(jω)| increases from ω − 0 until ω = ω0 , and it decreases continuously as ω increases beyond ω0 , as illustrated in Fig. 4.46b. Therefore, a pole at −α + jω0 results in a frequency-selective behavior that enhances the gain at the frequency ω0 (resonance). Moreover, as the pole moves closer to the imaginary axis (as α is reduced), this enhancement (resonance) becomes more pronounced. This is because α, the distance between the pole and jω0 (d corresponding to jω0 ), becomes smaller, which increases the gain K/d. In the extreme case, when α = 0 (pole on the imaginary axis), the gain at α 0 goes to infinity. Repeated poles further enhance the frequency-selective effect. To summarize, we can enhance a gain at a frequency ω0 by placing a pole opposite the point jω0 . The closer the pole is to jω0 , the higher is the gain at ω0 , and the gain variation is more rapid (more frequency selective) in the vicinity of frequency ω0 - Note that a pole must be placed in the LHP for stability.

Figure 4.46: The role of poles and zeros in determining the frequency response of an LTIC system. Here we have considered the effect of a single complex pole on the system gain. For a real system, a complex pole −α + jω0 must accompany its conjugate −α − jω0 . We can readily show that the presence of the conjugate pole does not appreciably change the frequency-selective behavior in the vicinity of ω0 . This is because the gain in this case is K/dd′, where d′ is the distance of a point jω from the conjugate pole −α − jω0 . Because the conjugate pole is far from jω0 , there is no dramatic change in the length d′ as ω varies in the vicinity of ω0 . There is a gradual increase in the value of d′ as ω increases, which leaves the frequency-selective behavior as it was originally, with only minor changes. GAIN SUPPRESSION BY A ZERO Using the same argument, we observe that zeros at −α ±jω0 (Fig. 4.46d) will have exactly the opposite effect of suppressing the gain in the vicinity of ω0 , as shown in Fig. 4.46e). A zero on the imaginary axis at jω0 will totally suppress the gain (zero gain) at frequency ω0 . Repeated zeros will further enhance the effect. Also, a closely placed pair of a pole and a zero (dipole) tend to cancel out each other 's influence on the frequency response. Clearly, a proper placement of poles and zeros can yield a variety of frequency-selective behavior. We can use these observations to design lowpass, highpass, bandpass, and bandstop (or notch) filters. Phase response can also be computed graphically. In Fig. 4.46a, angles formed by the complex conjugate poles −α ± jω0 ), at ω − 0 (the origin) are equal and opposite. As ω increases from 0 up, the angle θ1 (due to the pole −α + jω0 ), which has a negative value at ω = 0,is reduced in magnitude; the angle θ2 because of the pole −α − jω0 , which has a positive value at ω = 0, increases in magnitude. As a result, θ1 + θ2 , the sum of the two angles, increases continuously, approaching a value π as ω → ∞. The resulting phase response ∠H(jω)) = −(θ1 + θ2 ) is illustrated in Fig. 4.46c. Similar arguments apply to zeros at −α ± jω0 . The resulting phase response ∠H(jω) = (φ 1 + φ 2 ) is depicted in Fig. 4.46f. We now focus on simple filters, using the intuitive insights gained in this discussion. The discussion is essentially qualitative.

4.10-2 Lowpass Filters A typical lowpass filter has a maximum gain at ω = 0. Because a pole enhances the gain at frequencies in its vicinity, we need to place a pole (or poles) on the real axis opposite the origin (jω = 0), as shown in Fig. 4.47a. The transfer function of this system is

Figure 4.47: Pole-zero configuration and the amplitude response of a lowpass (Butterworth) filter. We have chosen the numerator of H(s) to be ωc to normalize the dc gain H(0) to unity. If d is the distance from the pole −ωc to a point jω (Fig. 4.47a), then

with H(0) = 1. As ω to increases, d increases and |H (jω)| decreases monotonically with ω, as illustrated in Fig. 4.47d with label N = 1. This is clearly a lowpass filter with gain enhanced in the vicinity of ω = 0. WALL OF POLES An ideal lowpass filter characteristic (shaded in Fig. 4.47d) has a constant gain of unity up to frequency ωc . Then the gain drops suddenly to 0 for ω > ω. To achieve the ideal lowpass characteristic, we need enhanced gain over the entire frequency band from 0 to ωc . We know that to enhance a gain at any frequency ω, we need to place a pole opposite ω. To achieve an enhanced gain for all frequencies over the band (0 to ωc ), we need to place a pole opposite every frequency in this band. In other words, we need a continuous wall of poles facing the imaginary axis opposite the frequency band 0 to ωc (and from 0 to − ωc for conjugate poles), as depicted in Fig. 4.47b. At this point, the optimum shape of this wall is not obvious because our arguments are qualitative and intuitive. Yet, it is certain that to have enhanced gain (constant gain) at every frequency over this range, we need an infinite number of poles on this wall. We can show that for a maximally flat [†] response over the frequency range (0 to ωc ), the

wall is a semicircle with an infinite number of poles uniformly distributed along the wall. [12] . In practice, we compromise by using a finite number (N) of poles with less-than-ideal characteristics. Figure 4.47c shows the pole configuration for a fifth-order (N = 5) filter. The amplitude response for various values of N are illustrated in Fig. 4.47d. As N → ∞, the filter response approaches the ideal. This family of filters is known as the Butterworth filters. There are also other families. In Chebyshev filters, the wall shape is a semiellipse rather than a semicircle. The characteristics of a Chebyshev filter are inferior to those of Butterworth over the passband (0, ωc ), where the characteristics show a rippling effect instead of the maximally flat response of Butterworth. But in the stopband (ω > ωc ), Chebyshev behavior is superior in the sense that Chebyshev filter gain drops faster than that of the Butterworth.

4.10-3 Bandpass Filters The shaded characteristic in Fig. 4.48b shows the ideal bandpass filter gain. In the bandpass filter, the gain is enhanced over the entire passband. Our earlier discussion indicates that this can be realized by a wall of poles opposite the imaginary axis in front of the passband centered at ω0 . (There is also a wall of conjugate poles opposite −ω0 ) Ideally, an infinite number of poles is required. In practice, we compromise by using a finite number of poles and accepting less-than-ideal characteristics (Fig. 4.48).

Figure 4.48: (a) Pole-zero configuration and (b) the amplitude response of a bandpass filter.

4.10-4 Notch (Bandstop) Filters

An ideal notch filter amplitude response (shaded in Fig. 4.49b) is a complement of the amplitude response of an ideal bandpass filter. Its gain is zero over a small band centered at some frequency ω0 and is unity over the remaining frequencies. Realization of such a characteristic requires an infinite number of poles and zeros. Let us consider a practical second-order notch filter to obtain zero gain at a frequency ω = ω0 . For this purpose we must have zeros at ±jω0 . The requirement of unity gain at ω = ∞ requires the number of poles to be equal to the number of zeros (M = N). This ensures that for very large values of ω, the product of the distances of poles from ω will be equal to the product of the distances of zeros from ω. Moreover, unity gain at ω = 0 requires a pole and the corresponding zero to be equidistant from the origin. For example, if we use two (complexconjugate) zeros, we must have two poles; the distance from the origin of the poles and of the zeros should be the same. This requirement can be met by placing the two conjugate poles on the semicircle of radius ω0 , as depicted in Fig. 4.49a. The poles can be any where on the semicircle to satisfy the equidistance condition. Let the two conjugate poles be at angles ±θ with respect to the negative real axis. Recall that a pole and a zero in the vicinity tend to cancel out each other's influences. Therefore, placing poles closer to zeros (selecting θ closer to π/2) results in a rapid recovery of the gain from value 0 to 1 as we move away from ω0 in either direction. Figure 4.49b shows the gain |H(jω)| for three different values of θ.

Figure 4.49: (a) Pole-zero configuration and (b) the amplitude response of a bandstop (notch) filter. EXAMPLE 4.27 Design a second-order notch filter to suppress 60 Hz hum in a radio receiver. We use the poles and zeros in Fig. 4.49a with ω0 = 120π. The zeros are at s = ±jω0 . The two poles are at −ω0 cos θ ± jω0 sin θ. The filter transfer function is (with ω0 = 120π)

and

The closer the poles are to the zeros (the closer θ is to π/2), the faster the gain recovery from 0 to 1 on either side of ω0 = 120π. Figure 4.49b shows the amplitude response for three different values of θ. This example is a case of very simple design. To achieve zero gain over a band, we need an infinite number of poles as well as of zeros. COMPUTER EXAMPLE C4.7 The transfer function of a second-order notch filter is

Using ω0 = 2π60, plot the magnitude response for the following cases: a. θa = 60° b. θb = 80° >> >> >> >> >> >> >> >> >>

c. θc = 87° omega_0 = 2*pi*60; theta = [60 80 87]*(pi/180); omega = (0:.5:1000) '; mag = zeros(3,length(omega)); for m=1:length (theta) H = tf([1 0 omega_0^2],{1 2*omega_0*cos (theta(m)) omega_0^2]); [mag(m,:),phase] = bode (H,omega); end f = omega/(2*pi); plot (f,mag (1,:) ,'k-',f,mag (2,:),'k--',f,mag(3,:),'k-.'); xlabel ('f [Hz] '); ylabel ('|H(j2\pi f)|'); legend (\theta = 60^\circ','\theta = 80^\circ','\theta = 87^\circ',0)

Figure C4.7 EXERCISE E4.15 Use the qualitative method of sketching the frequency response to show that the system with the pole-zero configuration in Fig. 4.50a is a highpass filter and the configuration in Fig. 4.50b is a bandpass filter.

Figure 4.50: Pole-zero configuration of (a) a highpass filter and (b) a bandpass filter.

4.10-5 Practical Filters and Their Specifications For ideal filters, everything is black and white; the gains are either zero or unity over certain bands. As we saw earlier, real life does not permit such a worldview. Things have to be gray or shades of gray. In practice, we can realize a variety of filter characteristics that can only approach ideal characteristics. An ideal filter has a passband (unity gain) and a stopband (zero gain) with a sudden transition from the passband to the stopband. There is no transition band. For practical (or realizable) filters, on the other hand, the transition from the passband to the stopband (or vice versa) is gradual and takes place over a finite band of frequencies. Moreover, for realizable filters, the gain cannot be zero over a finite band (Paley-Wiener condition). As a result, there can no true stopband for practical filters. We therefore define a stopband to be a band over which the gain is below some small number G s , as illustrated in Fig. 4.51. Similarly, we define a passband to be a band over which the gain is between 1 and some number G p (G p < 1), as shown in Fig. 4.51. We have selected the passband gain of unity for convenience. It could be any constant. Usually the gains are specified in terms of decibels. This is simply 20 times the log (to base 10) of the gain. Thus

Figure 4.51: Passband, stopband, and transition band in filters of various types. A gain of unity is 0 dB and a gain of √2 is 3.01 dB, usually approximated by 3 dB. Sometimes the specification may be in terms of attenuation, which is the negative of the gain in dB. Thus a gain of √2; that is, 0.707, is −3 dB, but is an attenuation of 3 dB. In a typical design procedure, G p (minimum passband gain) and G s (maximum stopband gain) are specified. Figure 4.51 shows the passband, the stopband, and the transition band for typical lowpass, bandpass, highpass, and bandstop filters. Fortunately, the highpass, bandpass, and bandstop filters can be obtained from a basic lowpass filter by simple frequency transformations. For example, replacing s with ωc/s in the lowpass filter transfer function results in a highpass filter. Similarly, other frequency transformations yield the bandpass and bandstop filters. Hence, it is necessary to develop a design procedure only for a basic lowpass filter. Then, by using appropriate transformations, we can design filters of other types. The design procedures are beyond our scope here and will not be discussed. Interested reader is referred to Ref. 1. [†] Maximally flat amplitude response means the first 2N − 1 derivatives of |H(jω)| with respect to ω are zero at ω = 0. [12] Van Valkenberg, M. Analog Filter Design. Oxford University Press, New York, 1982.

4.11 THE BILATERAL LAPLACE TRANSFORM Situations involving noncausal signals and/or systems cannot be handled by the (unilateral) Laplace transform discussed so far. These cases can be analyzed by the bilateral (or two-sided) Laplace transform defined by

and x(t) can be obtained from X(s) by the inverse transformation

Observe that the unilateral Laplace transform discussed so far is a special case of the bilateral Laplace transform, where the signals are restricted to the causal type. Basically, the two transforms are the same. For this reason we use the same notation for the bilateral Laplace transform. Earlier we showed that the Laplace transforms of e −at u(t) and of −e at u(−t) are identical. The only difference is in their regions of convergence (ROC). The ROC for the former is Re s > −a; that for the latter is Re s < −a; as illustrated in Fig. 4.1. Clearly, the inverse Laplace transform of X(s) is not unique unless the ROC is specified. If we restrict all our signals to the causal type, however, this ambiguity does not arise. The inverse transform of 1/(s + a) is e −at u(t). Thus, in the unilateral Laplace transform, we can ignore the ROC in determining the inverse transform of X(s). We now show that any bilateral transform can be expressed in terms of two unilateral transforms. It is, therefore, possible to evaluate bilateral transforms from a table of unilateral transforms. Consider the function x(t) appearing in Fig. 4.52a. We separate x(t) into two components, x 1 (t) and x 2 (t), representing the positive time (causal) component and the negative time (anticausal) component of x(t), respectively (Fig. 4.52b and 4.52c):

Figure 4.52: Expressing a signal as a sum of causal and anticausal components. The bilateral Laplace transform of x(t) is given by

where X1 (s) is the Laplace transform of the causal component x 1 (t) and X2 (s) is the Laplace transform of the anticausal component x 2 (t). Consider X2 (S), given by

Therefore

If x(t) has any impulse or its derivative(s) at the origin, they are included in x 1 (t). Consequently, x 2 (t) = 0 at the origin; that is, x 2 (0) = 0. Hence, the lower limit on the integration in the preceding equation can be taken as 0 − instead of 0 + . Therefore

Because x 2 (−t) is causal (Fig. 4.52d), X2 (−s) can be found from the unilateral transform table. Changing the sign of s in X2 (−s) yields X2 (s). To summarize, the bilateral transform X(s) in Eq. (4.93) can be computed from the unilateral transforms in two steps: 1. Split x(t) into its causal and anticausal components, x 1 (t) and x 2 (t), respectively. 2. The signals x 1 (t) and x 2 (−t) are both causal. Take the (unilateral) Laplace transform of x 1 (t) and add to it the (unilateral) Laplace transform of x 2 (−t), with s replaced by −s. This procedure gives the (bilateral) Laplace transform of x(t). Since x 1 (t) and x 2 (−t) are both causal, X1 (s) and X2 (−s) are both unilateral Laplace transforms. Let σc1 and σc2 be the abscissas of convergence

of X1 (s) and X2 (−s), respectively. This statement implies that X1 (s) exists for all s with Re s > σc1 , and X2 (−s) exists for all s with Re s > σc2 . Therefore, X2 (s) exists for all s with Res < σc2 [†] . Therefore, X (s) = X1 (s)+X2 (s) exists for all s such that The regions of convergence (or existence) of X1 (s), X2 (s), and X(s) are shown in Fig. 4.53. Because X(s) is finite for all values of s lying in the strip of convergence (σc1 < Re s < −σc2 ), poles of X (s) must lie outside this strip. The poles of X(s) arising from the causal component x 1 (t) lie to the left of the strip (region) of convergence, and those arising from its anticausal component x 2 (t) lie to its right (see Fig. 4.53). This fact is of crucial importance in finding the inverse bilateral transform.

Figure 4.53 This result can be generalized to left-sided and right-sided signals. We define a signal x(t) as a right-sided signal if x(t) = 0 for t < T1 for some finite positive or negative number T1 . A causal signal is always a right-sided signal, but the converse is not necessarily true. A signal is said to left sided if it is zero for t > T2 for some finite, positive, or negative number T2 . An anticausal signal is always a left-sided signal, but the converse is not necessarily true. A two-sided signal is of infinite duration on both positive and negative sides of t and is neither right sided nor left sided. We can show that the conclusions for ROC for causal signals also hold for right-sided signals, and those for anticausal signals hold for left-sided signals. In other words, if x(t) is causal or right-sided, the poles of X(s) lie to the left of the ROC, and if x(t) is anticausal or left-sided, the poles of X(s) lie to the right of the ROC. To prove this generalization, we observe that a right-sided signal can be expressed as x(t) + x(t), where x(t) is a causal signal and x f (t) is some finite-duration signal. ROC of any finite-duration signal is the entire s-plane (no finite poles). Hence, the ROC of the right-sided signal x(t) + x(t) is the region common to the ROCs of x(t) and x f (t), which is same as the ROC for x(t). This proves the generalization for right-sided signals. We can use a similar argument to generalize the result for left-sided signals. Let us find the bilateral Laplace transform of

We already know the Laplace transform of the causal component

For the anticausal component, x 2 (t) = e bt u(−t), we have

so that

Therefore

and the Laplace transform of x(t) in Eq. (4.94) is

Figure 4.54 shows x(t) and the ROC of X(s) for various values of a and b. Equation (4.97) indicates that the ROC of X(s) does not exist if a > b, which is precisely the case in Fig. 4.54g.

Figure 4.54 Observe that the poles of X (s) are outside (on the edges) of the ROC. The poles of X (s) because of the anticausal component of x(t) lie to the right of the ROC, and those due to the causal component of x(t) lie to its left. When X(s) is expressed as a sum of several terms, the ROC for X(s) is the intersection of (region common to) the ROCs of all the terms. In general,

if x(t) = ∑ k i=1 x i (t), then the ROC for X(s) is the intersection of the ROCs (region common to all ROCs) for the transforms X1 (s), X2 (s),...,Xk (s). EXAMPLE 4.28 Find the inverse Laplace transform of

if the ROC is a. −2 < Re s < 1 b. Re s > 1 c. Re s < −2

a. Now, X(s) has poles at −2 and 1. The strip of convergence is −2 < Re s < 1. The pole at −2, being to the left of the strip of convergence, corresponds to the causal signal. The pole at 1, being to the right of the strip of convergence, corresponds to the anticausal signal. Equations (4.95) and (4.96) yield b. Both poles lie to the left of the ROC, so both poles correspond to causal signals. Therefore c. Both poles lie to the right of the region of convergence, so both poles correspond to anticausal signals, and Figure 4.55 shows the three inverse transforms corresponding to the same X (s) but with different regions of convergence.

Figure 4.55: Three possible inverse transforms of −3/((s + 2)(s −1)).

4.11-1 Properties of Bilateral Laplace Transform Properties of the bilateral Laplace transform are similar to those of the unilateral transform. We shall merely state the properties here without proofs. Let the ROC of X(s) be a < Re s < b. Similarly, let the ROC of Xi (s) is a i < Re s < b i for (i = 1, 2). LINEARITY The ROC for a 1 X1 (s) + a 2 X2 (s) is the region common to (intersection of) the ROCs for X1 (s) and X2 (s). TIME SHIFT The ROC for X(s)e −sT is identical to the ROC for X(s). FREQUENCY SHIFT The ROC for X(s − s 0 ) is a + c < Re s < b + c, where c = Re s 0 . TIME DIFFERENTIATION

The ROC for sX (s) contains the ROC for X(s) and may be larger than that of X(s) under certain conditions [e.g., if X(s) has a first-order pole at s = 0 that is canceled by the factor s in sX(s)]. TIME INTEGRATION

The ROC for sX(s) is max (a, 0) < Re s < b. TIME SCALING

The ROC for X (s/β) is βa < Re s < βb. For β > 1, x(βt) represents time compression and the corresponding ROC expands by factor β. For 0 > β > 1, x(βt) represents time expansion and the corresponding ROC is compressed by factor β. TIME CONVOLUTION The ROC for X1 (s)X2 (s) is the region common to (intersection of) the ROCs for X1 (s) and X2 (s). FREQUENCY CONVOLUTION

The ROC for X1 (s) * X2 (s) is a 1 + a 2 < Re s < b 1 + b 2 . TIME REVERSAL

The ROC for X(−s) is −b < Re s < −a.

4.11-2 Using the Bilateral Transform for Linear System Analysis Since the bilateral Laplace transform can handle noncausal signals, we can analyze noncausal LTIC systems using the bilateral Laplace transform. We have shown that the (zero-state) output y(t) is given by

This expression is valid only if X(s)H(s) exists. The ROC of X(s)H(s) is the region in which both X (s) and H (s) exist. In other words, the ROC of X(s)H (s) is the region common to the regions of convergence of both X(s) and H(s). These ideas are clarified in the following examples. EXAMPLE 4.29 Find the current y(t) for the RC circuit in Fig. 4.56a if the voltage x(t) is

Figure 4.56: Response of a circuit to a noncausal input. The transfer function H(s) of the circuit is given by

Because h(t) is a causal function, the ROC of H(s) is Re s > −1. Next, the bilateral Laplace transform of x (t) is given by

The response y(t) is the inverse transform of X(s)H(s)

The ROC of X(s)H(s) is that ROC common to both X(s) and H(s). This is 1 < Re s < 2. The poles s = ±1 lie to the left of the ROC and, therefore, correspond to causal signals; the pole s = 2 lies to the right of the ROC and thus represents an anticausal signal. Hence Figure 4.56c shows y(t). Note that in this example, if then the ROC of X(s) is −4 < Re s < −2. Here no region of convergence exists for X(s)H(s). Such a situation means that the dominance condition cannot be satisfied by any permissible value of s in the range (1 < Re s < 2). Hence, the response y(t) goes to infinity. EXAMPLE 4.30 Find the response y(t) of a noncausal system with the transfer function

to the input x(t) = e −2 t u(t). We have

and

The ROC of X(s)H(s) is the region −2 < Re s < 1. By partial fraction expansion

and Note that the pole of H(s) lies in the RHP at 1. Yet the system is not unstable. The pole(s) in the RHP may indicate instability or noncausality, depending on its location with respect to the region of convergence of H(s). For example, if H(s) = −1/(s − 1) with Re s > 1, the system is causal

and unstable, with h(t) = −e t u(t). In contrast, if H(s) = −1/(s −1) with Re s < 1, the system is noncausal and stable, with h(t) = e t u(−t). EXAMPLE 4.31 Find the response y(t) of a system with the transfer function

and the input The input x(t) is of the type depicted in Fig. 4.54g, and the region of convergence for X(s) does not exist. In this case, we must determine separately the system response to each of the two input components, x 1 (t) = e −1 u(t) and x 2 (t) = e −2t u(−t).

If y 1 (t) and y 2 (t) are the system responses to x 1 (t) and x 2 (t), respectively, then

so that and

so that Therefore

[†] For instance, if x(t) exists for all t > 10, then x(−t), its time-inverted form, exists for t < −10.

4.12 SUMMARY This chapter discusses analysis of LTIC (linear, time-invariant, continuous-time) systems by the Laplace transform, which transforms integrodifferential equations of such systems into algebraic equations. Therefore solving these integro-differential equations reduces to solving algebraic equations. The Laplace transform method cannot be used for time-varying-parameter systems or for nonlinear systems in general. The transfer function H(s) of an LTIC system is the Laplace transform of its impulse response. It may also be defined as a ratio of the Laplace transform of the output to the Laplace transform of the input when all initial conditions are zero (system in zero state). If X(s) is the Laplace transform of the input x(t) and Y(s) is the Laplace transform of the corresponding output y(t) (when all initial conditions are zero), then Y(s) =

X(s)H(s). For an LTIC system described by an Nth-order differential equation Q(D)y(t) = P(D)x(t), the transfer function H(s) = P(s)/Q(s). Like the impulse response h(t), the transfer function H(s) is also an external description of the system. Electrical circuit analysis can also be carried out by using a transformed circuit method, in which all signals (voltages and currents) are represented by their Laplace transforms, all elements by their impedances (or admittances), and initial conditions by their equivalent sources (initial condition generators). In this method, a network can be analyzed as if it were a resistive circuit. Large systems can be depicted by suitably interconnected subsystems represented by blocks. Each subsystem, being a smaller system, can be readily analyzed and represented by its input-output relationship, such as its transfer function. Analysis of large systems can be carried out with the knowledge of input-output relationships of its subsystems and the nature of interconnection of various subsystems. LTIC systems can be realized by scalar multipliers, adders, and integrators. A given transfer function can be synthesized in many different ways, such as canonic, cascade, and parallel. Moreover, every realization has a transpose, which also has the same transfer function. In practice, all the building blocks (scalar multipliers, adders, and integrators) can be obtained from operational amplifiers. The system response to an everlasting exponential e st is also an everlasting exponential H(s)e st . Consequently, the system response to an

everlasting exponential e jωt is H(jω)e jωt . Hence, H(jω) is the frequency response of the system. For a sinusoidal input of unit amplitude and having frequency ω, the system response is also a sinusoid of the same frequency (ω) with amplitude |H(jω)|, and its phase is shifted by ∠H(jω) with respect to the input sinusoid. For this reason |H(jω)| is called the amplitude response (gain) and ∠H(jω) is called the phase response of the system. Amplitude and phase response of a system indicate the filtering characteristics of the system. The general nature of the filtering characteristics of a system can be quickly determined from a knowledge of the location of poles and zeros of the system transfer function. Most of the input signals and practical systems are causal. Consequently we are required most of the time to deal with causal signals. When all signals must be causal, the Laplace transform analysis is greatly simplified; the region of convergence of a signal becomes irrelevant to the analysis process. This special case of the Laplace transform (which is restricted to causal signals) is called the unilateral Laplace transform. Much of the chapter deals with this variety of Laplace transform. Section 4.11 discusses the general Laplace transform (the bilateral Laplace transform), which can handle causal and noncausal signals and systems. In the bilateral transform, the inverse transform of X(s) is not unique but depends on the region of convergence of X(s). Thus the region of convergence plays a very crucial role in the bilateral Laplace transform.

REFERENCES 1. Lathi, B. P. Signal Processing and Linear Systems, 1st ed. Oxford University Press, New York, 1998. 2. Doetsch, G. Introduction to the Theory and Applications of the Laplace Transformation with a Table of Laplace Transformations. Springer-Verlag, New York, 1974. 3. LePage, W. R. Complex Variables and the Laplace Transforms for Engineers. McGraw-Hill, New York, 1961. 4. Durant, Will, and Ariel Durant. The Age of Napoleon, Part XI in The Story of Civili ation Series. Simon & Schuster, New York, 1975. 5. Bell, E. T. Men of Mathematics. Simon & Schuster, New York, 1937. 6. Nahin, P. J. "Oliver Heaviside: Genius and Curmudgeon." IEEE Spectrum, vol. 20, pp. 63 -69, July 1983. 7. Berkey, D. Calculus, 2nd ed. Saunders, Philadelphia, 1988. 8. Encyclopaedia Britannica. Micropaedia IV, 15th ed., p. 981, Chicago, 1982. 9. Churchill, R. V. Operational Mathematics, 2nd ed. McGraw-Hill, New York, 1958. 10. Lathi, B. P. Signals, Systems, and Communication. Wiley, New York, 1965. 11. Truxal, J. G. The Age of Electronic Messages. McGraw-Hill, New York, 1990. 12. Van Valkenberg, M. Analog Filter Design. Oxford University Press, New York, 1982.

MATLAB SESSION 4: CONTINUOUS-TIME FILTERS Continuous-time filters are essential to many if not most engineering systems, and MATLAB is an excellent assistant for filter design and analysis. Although a comprehensive treatment of continuous-time filter techniques is outside the scope of this book, quality filters can be designed and realized with minimal additional theory. A simple yet practical example demonstrates basic filtering concepts. Telephone voice signals are often lowpass-filtered to eliminate frequencies above a cutoff of 3 kHz, or ωc = 3000(2π) ≈ 18.850 rad/s. Filtering maintains satisfactory speech quality and reduces signal bandwidth, thereby increasing the phone company 's call capacity. How, then, do we design and realize an acceptable 3 kHz lowpass filter?

M4.1 Frequency Response and Polynomial Evaluation Magnitude response plots help assess a filter 's performance and quality. The magnitude response of an ideal filter is a brick-wall function with unity passband gain and perfect stopband attenuation. For a lowpass filter with cutoff frequency ωc , the ideal magnitude response is

Unfortunately, ideal filters cannot be implemented in practice. Realizable filters require compromises, although good designs will closely approximate the desired brick-wall response. A realizable LTIC system often has a rational transfer function that is represented in the s-domain as

Frequency response H(jω) is obtained by letting s = jω, where frequency ω is in radians per second. MATLAB is ideally suited to evaluate frequency response functions. Defining a length-(N + 1) coefficient vector A = [a 0 , a 1 ,...,a N] and a length-(M + 1) coefficient vector B = [b N-M , b N-M+1 ,...,b N], program MS4P1 computes H(jω) for each frequency in the input vector ω. function [H] = MS4P1(B,A,omega); %MS4P1.m : MATLAB Session 4, Program 1 % Function M-file computers frequency response for LTIC system % INPUTS: B = vector of feedforward coefficients % A = vector of feedback coefficients % omega =vector of frequencies [rad/s]. % OUTPUTS: H = frequency response H = polyval (B,j*omega)./polyval(A,j*omega); The function polyval efficiently evaluates simple polynomials and makes the program nearly trivial. For example, when A is the vector of coefficients [a 0 ,a 1 ,...,a N), polyval (A, j * omega) computes

for each value of the frequency vector omega. It is also possible to compute frequency responses by using the signal processing toolbox function freqs.

M4.2 Design and Evaluation of a Simple RC Filter One of the simplest lowpass filters is realized by using the RC circuit shown in Fig. M4.1. This one-pole system has transfer function H RC(s) = (RCs + 1) −1 and magnitude response . Independent of component values R and C, this magnitude function possesses many desirable characteristics such as a gain that is unity at ω = 0 and that monotonically decreases to zero as ω → ∞.

Figure M4.1: An RC filter. Components R and C are chosen to set the desired 3 kHz cutoff frequency. For many filter types, the cutoff frequency corresponds to the half-power point, or |H RC (jωc ) | = 1/√2. Assigning C a realistic capacitance of 1 nF, the required resistance is computed by . >> omega_c = 2-pi*3000; >> C = 1e-9; >> R = 1/sqrt(C^2*omega_c^2) R = 5.3052e+004 The root of this first-order RC filter is directly related to the cutoff frequency, λ = −1/RC = −18,850 = −ωc . To >> >> >> >> >>

evaluate the RC filter performance, the magnitude response is plotted over the mostly audible frequency range (0 ≤ f 20 kHz). f = linspace(0,20000,200); B = 1; A = [R*C 1]; Hmag_RC = abs(MS4P1(B,A,f*2*pi)); plot(f,abs(f*2*pi)> R = sqrt(2^(1/10)-1)/(C*omega_c) R = 1.4213e+004 This cascaded filter has a 10th-order pole at λ = −1/RC and no finite zeros. To compute the magnitude response, polynomial coefficient vectors A and B are needed. Setting B = [1] ensures there are no finite zeros or, equivalently, that all zeros are at infinity. The poly command, which expands a vector of roots into a corresponding vector of polynomial coefficients, is used to obtain A. >> B = 1; A = poly(-1/(R*C)*ones(10,1));A = A/A(end); >> Hmag_cascade = abs (MS4P1(B,A,f*2*pi)); Notice that scaling a polynomial by a constant does not change its roots. Conversely, the roots of a polynomial specify a polynomial within a scale factor. The command A = A/A (end) properly scales the denominator polynomial to ensure unity gain at ω = 0. The magnitude response plot of the cascaded RC filter is included in Fig. M4.4. The passband remains relatively unchanged, but stopband attenuation is greatly improved to over 60 dB at 20 kHz.

Figure M4.4: Lowpass filter comparison.

M4.4 Butterworth Filters and the Find Command The pole location of a first-order lowpass filter is necessarily fixed by the cutoff frequency. There is little reason, however, to place all the poles of a 10th-order filter at one location. Better pole placement will improve our filter 's magnitude response. One strategy, discussed in Section 4.10, is to place a wall of poles opposite the passband frequencies. A semicircular wall of poles leads to the Butterworth family of filters, and a semielliptical shape leads to the Chebyshev family of filters. Butterworth filters are considered first. To begin, notice that a transfer function H(s) with real coefficients has a squared magnitude response given by |H(jω)|2 = H(jω)H*(jω) =

H(jω)H(−jω) = H(s)−s)|s=jω. Thus, half the poles of |H(jω)|2 correspond to the filter H(s) and the other half correspond to H(−s). Filters that are both stable and causal require H(s) to include only left-half-plane poles.

The squared magnitude response of a Butterworth filter is

This function has the same appealing characteristics as the first-order RC filter: a gain that is unity at ω = 0 and monotonically decreases to zero as ω → ∞. By construction, the half-power gain occurs at ωc . Perhaps most importantly, however, the first 2N − 1 derivatives of |H B (jω)| with respect to ω are zero at ω = 0. Put another way, the passband is constrained to be very flat for low frequencies. For this reason, Butterworth filters are sometimes called maximally flat filters. As discussed in MATLAB Session B, the roots of minus one must lie equally spaced on a circle centered at the origin. Thus, the 2N poles of

|H B (jω)|2 naturally lie equally spaced on a circle of radius ωc centered at the origin. Figure M4.5 displays the 20 poles corresponding to the case N

= 10 and ωc = 3000(2π) rad/s. An Nth-order Butterworth filter that is both causal and stable uses the N left-half-plane poles of |H B (jω)|2 .

Figure M4.5: Roots of |H B (jω)|2 for N = 10 and ωc = 3000(2π). To design a 10th-order Butterworth filter, we first compute the 20 poles of |H B (jω)|2 : >> N=10; >> poles = roots([(j*omega_c)^(-2*N), zeros(1,2*N-1),1]); The find command is an extremely powerful function that returns the indices of a vector 's nonzero elements. Combined with relational operators, the find command allows us to extract the 10 left-half-plane roots that correspond to the poles of our Butterworth filter. >> B_poles = poles (find(real(poles) > A = poly (B_poles); A = A/A (end); >> Hmag_B = abs (MS4P1 (B,A,f*2*pi)); The magnitude response plot of the Butterworth filter is included in Fig. M4.4. The Butterworth response closely approximates the brick-wall function and provides excellent filter characteristics: flat passband, rapid transition to the stopband, and excellent stopband attenuation (>40dB at 5kHz).

M4.5 Using Cascaded Second-Order Sections for Butterworth Filter Realization For our RC filters, realization preceded design. For our Butterworth filter, however, design has preceded realization. For our Butterworth filter to be useful, we must be able to implement it. Since the transfer function H B (s) is known, the differential equation is also known. Therefore, it is possible to try to implement the design by using op-amp integrators, summers, and scalar multipliers. Unfortunately, this approach will not work well. To understand why, consider the denominator

coefficients a 0 = 1.766 × 10 −43 and a 10 = 1. The smallest coefficient is 43 orders of magnitude smaller than the largest coefficient! It is practically impossible to accurately realize such a broad range in scale values. To understand this, skeptics should try to find realistic resistors such that R f /R =

1.766 × 10 −43. Additionally, small component variations will cause large changes in actual pole location.

A better approach is to cascade five second-order sections, where each section implements one complex conjugate pair of poles. By pairing poles in complex conjugate pairs, each of the resulting second-order sections have real coefficients. With this approach, the smallest coefficients are only about nine orders of magnitude smaller than the largest coefficients. Furthermore, pole placement is typically less sensitive to component variations for cascaded structures.

The Sallen-Key circuit shown in Fig. M4.6 provides a good way to realize a pair of complex-conjugate poles.[†] The transfer function of this circuit is

Figure M4.6: Sallen-Key filter stage. Geometrically, ω0 is the distance from the origin to the poles and Q = 1/2 cos ψ, where ψ is the angle between the negative real axis and the pole. Termed the "quality factor" of a circuit, Q provides a measure of the peakedness of the response. High-Q filters have poles close to the ω axis, which boost the magnitude response near those frequencies. Although many ways exist to determine suitable component values, a simple method is to assign R 1 a realistic value and then let R 2 = R 1 , C 1 = 2Q/ω0 R 1 and C 2 = 1/2Qω0 R 2 . Butter-worth poles are a distance ωc from the origin, so ω0 = ωc . For our 10th-order Butterworth filter, the angles ψ are regularly spaced at 9, 27, 45, 63, and 81 degrees. MATLAB program MS4P2 automates the task of computing component values and magnitude responses for each stage. % MS4P2.m : MATLAB Session 4, Program 2 % Script M-file computes Sallen---Key component values and magnitude % responses for each of the five cascaded second-order filter sections. omega_0 = 3000*2*pi; % Filter cut---off frequency psi = [9 27 45 63 81]*pi/180; % Butterworth pole angles f = linspace(0, 6000, 200); % Frequency range for magnitude response calculations Hmag_SK = zeros(5,200); % Pre-allocate array for magnitude responses for stage = 1:5, Q = 1/(2* cos(psi(stage))); % Compute Q for current stage % Compute and display filter components to the screen: disp([ 'Stage ',num2str(stage),... ' (Q = ',num2str(Q),... '): R1 = R2 = ',num2str(56000),... ', C1 = ' ,num2str (2*Q/(omega_0*56000) ), ... ', C2 = ' ,num2str (1/(2*Q*omega_0*56000) ) ] ) ; B = omega_0^2; A = [1 omega_0/Q omega_0^2] ; % Compute filter coefficients Hmag_SK(stage,:) = abs(MS4P1(B, A, 2*pi*f)); % Compute magnitude response end plot (f, Hmag_SK, 'k ', f, prod (Hmag_SK), 'k: ') xlabel ( 'f [Hz] '); ylabel ( 'Magnitude Response ') The disp command displays a character string to the screen. Character strings must be enclosed in single quotation marks. The num2str command converts numbers to character strings and facilitates the formatted display of information. The prod command multiplies along the columns of a matrix; it computes the total magnitude response as the product of the magnitude responses of the five stages. Executing the >> MS4P2 Stage 1 (Q Stage 2 (Q Stage 3 (Q Stage 4 (Q Stage 5 (Q

program produces the following output: = = = = =

0.50623): R1 = R2 = 56000, C1 = 9.5916e-010, C2 = 9.3569e-010 0.56116): R1 = R2 = 56000, C1 = 1.0632e-009, C2 = 8.441e-010 0.70711): R1 = R2 = 56000, C1 = 1.3398e-009, C2 = 6.6988e-010 1.1013): R1 = R2 = 56000, C1 = 2.0867e-009, C2 = 4.3009e-010 3.1962): R1 = R2 = 56000, C1 = 6.0559e-009, C2 = 1.482e-010

Since all the component values are practical, this filter is possible to implement. Figure M4.7 displays the magnitude responses for all five stages (solid lines). The total response (dotted line) confirms a 10th-order Butterworth response. Stage 5, which has the largest Q and implements the pair of conjugate poles nearest the ω axis, is the most peaked response. Stage 1, which has the smallest Q and implements the pair of conjugate poles furthest from the ω axis, is the least peaked response. In practice, it is best to order high-Q stages last; this reduces the risk of the high gains saturating the filter hardware.

Figure M4.7: Magnitude responses for Sallen-Key filter stages.

M4.6 Chebyshev Filters Like an order-N Butterworth lowpass filter (LPF), an order-N Chebyshev LPF is an all-pole filter that possesses many desirable characteristics. Compared with an equal-order Butterworth filter, the Chebyshev filter achieves better stopband attenuation and reduced transition band width by allowing an adjustable amount of ripple within the passband. The squared magnitude response of a Chebyshev filter is

where ∊ controls the passband ripple, C N(ω/ωc ) is a degree-N Chebyshev polynomial, and ωc is the radian cutoff frequency. Several characteristics of Chebyshev LPFs are noteworthy: An order-N Chebyshev LPF is equiripple in the passband (|ω| ≤ ωc ), has a total of N maxima and minima over (0 ≤ ω ≤ ωc ), and is monotonic decreasing in the stopband (|ω| > ωc ). In the passband, the maximum gain is 1 and the minimum gain is

. For oddvalued N, |H(j0)| = 1. For even-valued

. Ripple is controlled by setting , where R is the allowable passband ripple expressed in decibels. Reducing ∊ adversely affects filter performance (see Prob. 4.M-8). Unlike Butterworth filters, the cutoff frequency ωc rarely specifies the 3 dB point. For ∊ ≠ 1, |H(jωc )|2 = 1/(1 + ∊2 ) ≠ 0.5. The cutoff frequency ωc simply indicates the frequency after which

.

The Chebyshev polynomial C N(x) is defined as In this form, it is difficult to verify that C N(x) is a degree-N polynomial in x. A recursive form of C N(x) makes this fact more clear (see Prob. 4.M-11). With C 0 (x) = 1 and C 1 (x) = x, the recursive form shows that any C N is a linear combination of degree-N polynomials and is therefore a degree-N polynomial itself. For N ≥ 2, MATLAB program MS4P3 generates the (N + 1) coefficients of Chebyshev polynomial C N(x). function [C_N] = MS4P3 (N); % MS4P3 .m : MATLAB Session 4, Program 3 % Function M-file computes Chebyshev polynomial coefficients % using the recursion relation C_N(x) = 2xC_{N- 1} (x) - C_{N-2} (x) % INPUTS: N = degree of Chebyshev polynomial % OUTPUTS: C_N = vector of Chebyshev polynomial coefficients C_Nm2 = 1; C_Nm1 = [1 0]; % Initial polynomial coefficients: for t = 2:N; C_N =2*conv([1 0], C_Nm1) - [zeros (1, length (C_Nm1) - length(C_Nm2) + 1), C_Nm2]; C_Nm2 = C_Nm1; C_Nm1 = C_N; end As examples, consider C 2 (x) = 2xC1 (x) − C 0 (x) = 2x(x) − 1 = 2x 2 − 1 and C 3 (x) = 2xC2 (x) − C 1 (x) = 2x(2x 2 − 1) − x = 4x 3 = 3x. MS4P3 easily confirms these cases. >> MS4P3 (2) ans = 2 0 -1 >> MS4P3(3) ans = 4 0 -3 0

Since C N(ω/ωc ) is a degree-N polynomial, |H(jω)|2 is an all-pole rational function with 2N finite poles. Similar to the Butterworth case, the N poles

specifying a causal and stable Chebyshev filter can be found by selecting the N left-half plane roots of 1 + ∊2 C 2 N[s/(jωc )].

Root locations and dc gain are sufficient to specify a Chebyshev filter for a given N and ∊. To demonstrate, consider the design of an order-8 Chebyshev filter with cutoff frequency fc = 1 kHz and allowable passband ripple R = 1 dB. First, filter parameters are specified. >> omega_c = 2*pi*1000; R = 1; N = 8; >> epsilon = sqrt (10^(R/10)-1); The coefficients of C N (s/(jωc )) are obtained with the help of MS4P3, and then the coefficients of (1 + ∊2 C 2 N(s/(jωc )) are computed by using convolution to perform polynomial multiplication. >> CN = MS4P3 (N).* ((1/(j*omega_c)).^ [N:-1:0]); >> CP = epsilon^2*conv(CN, CN); CP(end) = CP (end) +1; Next, the polynomial roots are found, and the left-half-plane poles are retained and plotted. >> poles = roots(CP); i = find (real (poles) < 0); C_poles = poles(i); >> plot(real (C_poles),imag(C_poles), 'kx '); axis equal; >> axis(omega_c* [-1.1 1.1 -1.1 1.1]); >> xlabel ( ' \sigma '); ylabel ( '\omega '); As shown in Fig. M4.8, the roots of a Chebyshev filter lie on an ellipse[†] (see Prob. 4.M-12).

Figure M4.8: Pole-zero plot for an order-8 Chebyshev LPF with fc = 1 kHz and r = 1 dB. To compute the filter's magnitude response, the poles are expanded into a polynomial, the dc gain is set based on the even value of N, and MS4P1 is used. >> A = poly (C_poles); >> B = A (end)/sqrt (1+epsilon^2) ; >> omega = linspace(0,2*pi*2000,2001); >> H = MS4P1 (B, A, omega); >> plot (omega/2/pi,abs(H), 'k '); grid >> xlabel ( 'f [Hz] '); ylabel ( '|H (j2\pi f)| '); >> axis([0 2000 0 1.1]); As seen in Fig. M4.9, the magnitude response exhibits correct Chebyshev filter characteristics: passband ripples are equal in height and never exceed R = 1 dB; there are a total of N = 8 maxima and minima in the passband; and the gain rapidly and monotonically decreases after the cutoff frequency of fc = 1 kHz.

Figure M4.9: Magnitude responses for an order-8 Chebyshev LPF with fc = 1 kHz and r = 1 dB. For higher-order filters, polynomial rooting may not provide reliable results. Fortunately, Chebyshev roots can also be determined analytically. For

the Chebyshev poles are Continuing the same example, the poles are recomputed and again plotted. The result is identical to Fig. M4.8. >> k = [1:N]; xi = 1/N*asinh(1/epsilon); phi = (k*2-1)/(2*N)*pi; >> C_poles = omega_c*(-sinh(xi)*sin(phi)+j*cosh(xi)*cos(phi)); >> plot(real(C_poles),imag(C_poles), 'kx '); axis equal; >> axis(omega_c*[-1.1 1.1 -1.1 1.1]); >> xlabel( '\sigma '); ylabel( '\omega '); As in the case of high-order Butterworth filters, a cascade of second-order filter sections facilitates practical implementation of Chebyshev filters. Problems 4.M-3 and 4.M-6 use second-order Sallen-Key circuit stages to investigate such implementations. [†] A more general version of the Sallen-Key circuit has a resistor R from the negative terminal to ground and a resistor R between the negative a b

terminal and the output. In Fig. M4.6, R a = ∞ and R b = 0.

[†] E. A. Guillemin demonstrates a wonderful relationship between the Chebyshev ellipse and the Butterworth circle in his book, Synthesis of Passive Networks (Wiley, New York, 1957).

PROBLEMS 4.1.1

By direct integration [Eq. (4.1)] find the Laplace transforms and the region of convergence of the following functions: a. u(t) − u(t − 1) b. te−t u(t) c. t cos ω0 t u(t) d. (e 2t − 2e −t )u(t) e. cos ω1 t cos ω2 t u(t) f. cosh (at)u(t) g. sinh (at)u(t)

4.1.2

h. e −2t cos (5t + θ)u(t) By direct integration find the Laplace transforms of the signals shown in Fig. P4.1-2.

Figure P4.1-2

4.1.3

Find the inverse (unilateral) Laplace transforms of the following functions: a.

b.

c.

d.

e.

f.

g.

h.

i.

4.2.1

Find the Laplace transforms of the following functions using only Table 4.1 and the time-shifting property (if needed) of the unilateral Laplace transform: a. u(t) − u(t − 1) b. e −(t− τ)u(t − τ) c. e −(t− τ)u(t) d. e −t u(t − τ) e. te−t u(t − τ) f. sin [ω0 (t − τ)] u(t − τ) g. sin [ω0 (t − τ)] u(t)

4.2.2

4.2.3

h. sin ω0 t u(t − τ) Using only Table 4.1 and the time-shifting property, determine the Laplace transform of the signals in Fig. P4.1-2. [Hint: See Section 1.4 for discussion of expressing such signals analytically.] Find the inverse Laplace transforms of the following functions: a.

b.

c.

d.

4.2.4

The Laplace transform of a causal periodic signal can be determined from the knowledge of the Laplace transform of its first cycle (period). a. If the Laplace transform of x(t) in Fig. P4.2-4a is X (s), then show that G(s), the Laplace transform of g(t) (Fig. P4.2-4b), is

Figure P4.2-4

4.2.5

4.2.6

4.2.7

4.2.8

4.2.9

b. Use this result to find the Laplace transform of the signal p(t) illustrated in Fig. P4.2-4c. Starting only with the fact that δ(t)

1, build pairs 2 through 10b in Table 4.1, using various properties of the Laplace transform.

a. Find the Laplace transform of the pulses in Fig. 4.2 in the text by using only the time-differentiation property, the time1. shifting property, and the fact that δ(t) b. In Example 4.7, the Laplace transform of x(t) is found by finding the Laplace transform of d 2 x/dt2 . Find the Laplace transform of x(t) in that example by finding the Laplace transform of dx/dt and using Table 4.1, if necessary. Determine the inverse unilateral Laplace transform of

Since 13 is such a lucky number, determine the inverse Laplace transform of X(s) = 1/(s+1) 13 given region of convergence σ > − 1. [Hint: What is the nth derivative of 1/(s + a)?] It is difficult to compute the Laplace transform X(s) of signal

by using direct integration. Instead, properties provide a simpler method. a. Use Laplace transform properties to express the Laplace transform of tx(t) in terms of the unknown quantity X(s). b. Use the definition to determine the Laplace transform of y(t) = tx(t). c. Solve for X(s) by using the two pieces from a and b. Simplify your answer. 4.3.1

Using the Laplace transform, solve the following differential equations: a. and x(t) = u(t) b.

and x(t) = e −1 u(t)

c.

4.3.2

4.3.3

and x(t) = 25u(t) Solve the differential equations in Prob. 4.3-1 using the Laplace transform. In each case determine the zero-input and zero-state components of the solution. Solve the following simultaneous differential equations using the Laplace transform, assuming all initial conditions to be zero and the

input x(t) = u(t): a. (D + 3)y 1 (t) − 2y 2 (t)=x(t) − 2y 1 (t) + (2D + 4)y2(t) = 0 b. (D + 2)y 1 (t) − (D + 1)y2(t) = 0 − (D + 1)y 1 (t) + (2D + 1)y2(t)= x(t)

4.3.4

Determine the transfer functions relating outputs y 1 (t) and y 2 (t) to the input x(t). For the circuit in Fig. P4.3-4, the switch is in open position for a long time before t = 0, when it is closed instantaneously. a. Write loop equations (in time domain) for t ≥ 0.

4.3.5

b. Solve for y 1 (t) and y 2 (t) by taking the Laplace transform of loop equations found in part (a). For each of the systems described by the following differential equations, find the system transfer function: a.

b.

c.

d.

4.3.6

Figure P4.3-4 For each of the systems specified by the following transfer functions, find the differential equation relating the output y(t) to the input x(t) assuming that the systems are controllable and observable: a.

b.

c.

4.3.7

For a system with transfer function

a. Find the (zero-state) response for input x(t) of (i) 10u(t) and (ii) u(t − 5).

4.3.8

b. For this system write the differential equation relating the output y(t) to the input x(t) assuming that the systems are controllable and observable. For a system with transfer function

a. Find the (zero-state) response if the input x(t) = (1 −e −1 )u(t)

4.3.9

b. For this system write the differential equation relating the output y(t) to the input x(t) assuming that the systems are controllable and observable. For a system with transfer function

a. Find the (zero-state) response for the following values of input x(t): i. e −3t u(t) ii. e −4t u(t) iii. e −4(t−5)u(t − 5) iv. e −4(t−5)u(t) v. e −4t u(t − 5)

4.3.10

4.3.11

b. For this system write the differential equation relating the output y(t) to the input x(t) assuming that the systems are controllable and observable. An LTI system has a step response given by s(t) = e −1 u(t) − e −2 u(t). Determine the output of this system y(t) given an input x(t) = δ(t−π)−cos (√3)u(t). For an LTIC system with zero initial conditions (system initially in zero state), if an input x(t) produces an output y(t), then using the Laplace transform show the following. a. The input dx/dt produces an output dy/dt. b. The input ∫ t 0 x(τ) dτ produces an output ∫ t 0 y(τ) dτ. Hence, show that the unit step response of a system is an

4.3.12

integral of the impulse response; that is, ∫ t 0 h(τ) dτ.

a. Discuss asymptotic and BIBO stabilities for the systems described by the following transfer functions assuming that the systems are controllable and observable: i.

ii.

iii.

iv.

v.

b. Repeat part (a) for systems described by the following differential equations. Systems may be uncontrollable and/or unobservable. i. (D 2 + 3D + 2)y(t) = (D + 3)x(t) ii. (D 2 + 3D + 2)y(t) = (D + 1)x(t) iii. (D 2 + D − 2)y(t) = (D − 1)x(t) iv. (D 2 − 3D + 2)y(t) = (D − 3)x(t)

4.4.1

4.4.2

4.4.3

Find the zero-state response y(t) of the network in Fig. P4.4-1 if the input voltage x(t) = te−t u(t). Find the transfer function relating the output y(t) to the input x(t). From the transfer function, write the differential equation relating y(t) to x(t).

Figure P4.4-1 The switch in the circuit of Fig. P4.4-2 is closed for a long time and then opened instantaneously at t = 0. Find and sketch the current y(t).

Figure P4.4-2 Find the current y(t) for the parallel resonant circuit in Fig. P4.4-3 if the input is a. x(t) = A cos ω0 t u(t) b. x(t) = A sin ω0 t u(t) Assume all initial conditions to be zero and, in both cases, ω2 0 = 1/LC.

4.4.4

4.4.5

Figure P4.4-3 Find the loop currents y 1 (t) and y 2 (t) for t≥ 0 in the circuit of Fig. P4.4-4a for the input x(t) in Fig. P4.4-4b.

Figure P4.4-4 For the network in Fig. P4.4-5 the switch is in a closed position for a long time before t = 0, when it is opened instantaneously. Find y 1 (t) and v s (t) for t ≥ 0.

4.4.6

4.4.7

4.4.8

4.4.9

Figure P4.4-5 Find the output voltage v 0 (t) for t ≥ 0 for the circuit in Fig. P4.4-6, if the input x(t) = 100u(t). The system is in the zero state initially.

Figure P4.4-6 Find the output voltage y(t) for the network in Fig. P4.4-7 for the initial conditions iL (0) = 1 A and v c (0) = 3 V.

Figure P4.4-7 For the network in Fig. P4.4-8, the switch is in position a for a long time and then is moved to position b instantaneously at t = 0. Determine the current y(t) for t > 0.

Figure P4.4-8 Show that the transfer function that relates the output voltage y(t) to the input voltage x(t) for the op-amp circuit in Fig. P4.4-9a is given by

and that the transfer function for the circuit in Fig. P4.4-9b is given by

4.4.10

Figure P4.4-9 For the second-order op-amp circuit in Fig. P4.4-10, show that the transfer function H(s) relating the output voltage y(t) to the input

voltage x(t) is given by

4.4.11

Figure P4.4-10 a. Using the initial and final value theorems, find the initial and final value of the zero-state response of a system with the transfer function

and the input (i) u(t) and (ii) e −t u(t). b. Find y(0 + ) and y(∞) if Y(s) is given by i.

ii.

4.5.1

Figure P4.5-1a shows two resistive ladder segments. The transfer function of each segment (ratio of output to input voltage) is 1/2. Figure P4.5-1b shows these two segments connected in cascade. a. Is the transfer function (ratio of output to input voltage) of this cascaded network (1/2)(1/2) = 1/4? b. If your answer is affirmative, verify the answer by direct computation of the transfer function. Does this computation confirm the earlier value 1/4? If not, why? c. Repeat the problem with R 3 = R 4 = 20 kΩ. Does this result suggest the answer to the problem in part (b)?

4.5.2

Figure P4.5-1 In communication channels, transmitted signal is propagated simultaneously by several paths of varying lengths. This causes the signal to reach the destination with varying time delays and varying gains. Such a system generally distorts the received signal. For error-free communication, it is necessary to undo this distortion as much as possible by using the system that is inverse of the channel model. For simplicity, let us assume that a signal is propagated by two paths whose time delays differ by τ seconds. The channel over the intended path has a delay of T seconds and unity gain. The signal over the unintended path has a delay of T + τ seconds and gain a. Such a channel can be modeled, as shown in Fig. P4.5-2. Find the inverse system transfer function to correct the delay distortion and show that the inverse system can be realized by a feedback system. The inverse system should be causal to be realizable. [Hint: We want to correct only the distortion caused by the relative delay τ seconds. For distortionless transmission, the signal may be delayed. What is important is to maintain the shape of x(t). Thus a received signal of the form c x(t − T) is considered to be distortionless.]

Figure P4.5-2

4.5.3

Discuss BIBO stability of the feedback systems depicted in Fig. P4.5-3. For the case in Fig. P4.5-3b, consider three cases: i. K = 10 ii. K = 50 iii. K = 48

Figure P4.5-3 4.6.1

Realize

by canonic direct, series, and parallel forms.

4.6.2

Realize the transfer function in Prob. 4.6-1 by using the transposed form of the realizations found in Prob. 4.6-1.

4.6.3

Repeat Prob. 4.6-1 for

a.

b.

4.6.4

Realize the transfer functions in Prob. 4.6-3 by using the transposed form of the realizations found in Prob. 4.6-3.

4.6.5

Repeat Prob. 4.6-1 for

4.6.6

Realize the transfer function in Prob. 4.6-5 by using the transposed form of the realizations found in Prob. 4.6-5.

4.6.7

Repeat Prob. 4.6-1 for

4.6.8

Realize the transfer function in Prob. 4.6-7 by using the transposed form of the realizations found in Prob. 4.6-7.

4.6.9

Repeat Prob. 4.6-1 for

4.6.10

Realize the transfer function in Prob. 4.6-9 by using the transposed form of the realizations found in Prob. 4.6-9.

4.6.11

Repeat Prob. 4.6-1 for

4.6.12

Realize the transfer function in Prob. 4.6-11 by using the transposed form of the realizations found in Prob. 4.6-11.

4.6.13

In this problem we show how a pair of complex conjugate poles may be realized by using a cascade of two first-order transfer functions and feedback. Show that the transfer functions of the block diagrams in Fig. P4.6-13a and P4.6-13b are

a.

b.

Hence, show that the transfer function of the block diagram in Fig. P4.6-13c is c.

4.6.14

Figure P4.6-13 Show op-amp realizations of the following transfer functions: i.

ii.

iii.

4.6.15

4.6.16

4.6.17

4.7.1

Show two different op-amp circuit realizations of the transfer function

Show an op-amp canonic direct realization of the transfer function

Show an op-amp canonic direct realization of the transfer function

Feedback can be used to increase (or decrease) the system bandwidth. Consider the system in Fig. P4.7-1a with transfer function G(s) = ωc /(s + ωc ). a. Show that the 3 dB bandwidth of this system is ωc and the dc gain is unity, that is, |H(j0)| = 1. b. To increase the bandwidth of this system, we use negative feedback with H(s) = 9, as depicted in Fig. P4.7-1b. Show that the 3 dB bandwidth of this system is 10ωc . What is the dc gain? c. To decrease the bandwidth of this system, we use positive feedback with H(s) = −0.9, as illustrated in Fig. P4.7-1c. Show that the 3 dB bandwidth of this system is ωc /10. What is the dc gain? d. The system gain at dc times its 3 dB bandwidth is the gain-bandwidth product of a system. Show that this product is the same for all the three systems in Fig. P4.7-1. This result shows that if we increase the bandwidth, the gain decreases and vice versa.

Figure P4.7-1 4.8.1

For an LTIC system described by the transfer function

find the response to the following everlasting sinusoidal inputs: a. 5 cos (2t + 30°) b. 10 sin (2t + 45°) c. 10 cos (3t + 40°)

4.8.2

Observe that these are everlasting sinusoids. For an LTIC system described by the transfer function

find the steady-state system response to the following inputs: a. 10u(t) b. cos (2t + 60°)u(t) c. sin (3t − 45°)u(t)

4.8.3

d. e j 3 t u(t) For an allpass filter specified by the transfer function

find the system response to the following (everlasting) inputs: a. e jωt b. cos (ωt + θ) c. cos t d. sin 2t e. cos 10t f. cos 100t

4.8.4

Comment on the filter response. The pole-zero plot of a second-order system H(s) is shown in Fig. P4.8-4. The dc response of this system is minus one, H(j0) = −1. a. Letting H(s) = k(s 2 + b 1 s + b 2 )/(s 2 + a 1 s + a 2 ), determine the constants k, b 1 , b 2 , a 1 , and a 2 . b. What is the output y(t) of this system in response to the input x(t) = 4 + cos (t/2 + π/3)?

Figure P4.8-4: System pole-zero plot. 4.9.1

Sketch Bode plots for the following transfer functions: a.

b.

c.

4.9.2

Repeat Prob. 4.9-1 for a.

b.

c.

4.9.3

4.9.4

Using the lowest order possible, determine a system function H(s) with real-valued roots that matches the frequency response in Fig. P4.9-3 Verify your answer with MATLAB.

Figure P4.9-3: Bode plot and frequency response for H(s). A graduate student recently implemented an analog phase lock loop (PLL) as part of his thesis. His PLL consists of four basic components: a phase/frequency detector, a charge pump, a loop filter, and a voltage-controlled oscillator. This problem considers only the loop filter, which is shown in Fig. P4.9-4a. The loop filter input is the current x(t), and the output is the voltage y(t). a. Derive the loop filter 's transfer function H(s). Express H(s) in standard form. b. Figure P4.9-4b provides four possible frequency response plots, labeled A through D. Each log-log plot is drawn to the same scale, and line slopes are either 20 dB/decade, 0 dB/decade, or −20 dB/decade. Clearly identify which plot(s), if

any, could represent the loop filter. c. Holding the other components constant, what is the general effect of increasing the resistance R on the magnitude response for low-frequency inputs? d. Holding the other components constant, what is the general effect of increasing the resistance R on the magnitude response for high-frequency inputs?

Figure P4.9-4: (a) Circuit diagram for PLL loop filter. (b) Possible magnitude response plots for PLL loop filter. 4.10.1

4.10.2

Using the graphical method of Section 4.10-1, draw a rough sketch of the amplitude and phase response of an LTIC system described by the transfer function

What kind of filter is this? Using the graphical method of Section 4.10-1, draw a rough sketch of the amplitude and phase response of LTIC systems whose polezero plots are shown in Fig. P4.10-2.

4.10.3

4.10.4

4.10.5

4.10.6

Figure P4.10-2 Design a second-order bandpass filter with center frequency ω = 10. The gain should be zero at ω = 0 and at ω = ∞. Select poles at −a ± j10. Leave your answer in terms of a. Explain the influence of a on the frequency response. The LTIC system described by H(s) = (s − 1)/(s + 1) has unity magnitude response |H(jω)| = 1. Positive Pat claims that the output y(t) of this system is equal the input x(t) since the system is allpass. Cynical Cynthia doesn 't think so. "This is signals and systems class," she complains. "It has to be more complicated!" Who is correct, Pat or Cynthia? Justify your answer. Two students, Amy and Jeff, disagree about an analog system function given by H 1 (s) = s. Sensible Jeff claims the system has a zero at s = 0. Rebellious Amy, however, notes that the system function can be rewritten as H 1 (s) = 1/s −1 and claims that this implies a system pole at s = ∞. Who is correct? Why? What are the poles and zeros of the system H 2 (s) = 1/s? A rational transfer function H(s) is often used to represent an analog filter. Why must H(s) be strictly proper for lowpass and bandpass filters? Why must H(s) be proper for highpass and bandstop filters?

4.10.7

For a given filter order N, why is the stopband attenuation rate of an all-pole lowpass filter better than filters with finite zeros?

4.10.8

Is it possible, with real coefficients (

4.10.9

4.10.10

), for a system

to function as a lowpass filter? Explain your answer. Nick recently built a simple second-order But-terworth lowpass filter for his home stereo. Although the system performs pretty well, Nick is an overachiever and hopes to improve the system performance. Unfortunately, Nick is pretty lazy and doesn 't want to design another filter. Thinking "twice the filtering gives twice the performance," he suggests filtering the audio signal not once but twice with a cascade of two identical filters. His overworked, underpaid signals professor is skeptical and states, "If you are using identical filters, it makes no difference whether you filter once or twice!" Who is correct? Why? An LTIC system impulse response is given by h(t) = u(t)-u(t − 1). a. Determine the transfer function H(s). Using H(s), determine and plot the magnitude response |H(jω)|. Which type of filter most accurately describes the behavior of this system: lowpass, highpass, bandpass, or bandstop? b. What are the poles and zeros of H(s)? Explain your answer.

4.10.11

4.10.12

c. Can you determine the impulse response of the inverse system? If so, provide it. If not, suggest a method that could be used to approximate the impulse response of the inverse system. An ideal lowpass filter H LP (s) has magnitude response that is unity for low frequencies and zero for high frequencies. An ideal highpass filter H HP (s) has an opposite magnitude response: zero for low frequencies and unity for high frequencies. A student suggests a possible lowpass-to-highpass filter transformation: H HP (s) = 1 − H LP (s). In general, will this transformation work? Explain your answer. An LTIC system has a rational transfer function H(s). When appropriate, assume that all initial conditions are zero. a. Is is possible for this system to output y(t) = sin (100πt) u(t) in response to an input x(t) = cos (100πt)u(t)? Explain. b. Is is possible for this system to output y(t) = sin (100πt)u(t) in response to an input x(t) = sin (50πt)u(t)? Explain. c. Is is possible for this system to output y(t) = sin (100πt) in response to an input x(t) = cos (100πt)? Explain. d. Is is possible for this system to output y(t) = sin (100πt) in response to an input x(t) = sin (50πt)? Explain.

4.11.1

Find the ROC, if it exists, of the (bilateral) Laplace transform of the following signals: a. etu(t) b. e−tu(t) c.

d.

4.11.2

e. e −kt

2

Find the (bilateral) Laplace transform and the corresponding region of convergence for the following signals: a. e −|t|

b. e −|t| cos t c. e tu(t) + e 2t u(−t) d. e− tu(t) e. e− tu(−t)

4.11.3

f. cos ω0 t u(t) + e t u(−t) Find the inverse (bilateral) Laplace transforms of the following functions:

a.

b.

c.

d.

e.

4.11.4

Find

if the ROC is a. Re s > 1 b. Re s < −2 c. −1 < Re s < 1

4.11.5

d. −2 < Re s < −1 For a causal LTIC system having a transfer function H(s) = 1/(s + 1), find the output y(t) if the input x(t) is given by a. e −|t|/2 b. e t u(t) + e 2t u(−t) c. e −t/2 u(t) + e −t/4 u(−t) d. e 2t u(t) + e t u(−t) e. e −t/4 u(t) + e −t/2 u(−t)

4.11.6

4.11.7

4.11.8

f. e −3t u(t) + e −2t u(−t) The autocorrelation function r xx(t) of a signal x(t) is given by

Derive an expression for

in terms of X(s), where

.

Determine the inverse Laplace transform of

given that the region of convergence is σ < 0. An absolutely integrable signal x(t) has a pole at s = π. It is possible that other poles may be present. Recall that an absolutely integrable signal satisfies

a. Can x(t) be left sided? Explain. b. Can x(t) be right sided? Explain. c. Can x(t) be two sided? Explain.

4.11.9

d. Can x(t) be of finite duration? Explain. Using the definition, compute the bilateral Laplace transform, including the region of convergence (ROC), of the following complexvalued functions: a. x 1 (t) = (j + e jt )u(t) b. x 2 (t) = j cosh (t)u(−1) c.

4.11.10

d. x 4 (t) = jt u(−t) + δ(t − π) A bounded-amplitude signal x(t) has bilateral Laplace transform X(s) given by

a. Determine the corresponding region of convergence. b. Determine the time-domain signal x(t). 4.m.1

4.m.2

Express the polynomial C 20 (x) in standard form. That is, determine the coefficients a k of C 20 (x) = ∑ 20 k=0 a k x 20−k . Design an order-12 Butterworth lowpass filter with a cutoff frequency of ωc = 2π5000 by completing the following. a. Locate and plot the filter 's poles and zeros in the complex plane. Plot the corresponding magnitude response |H LP (jω)| to verify proper design. b. Setting all resistor values to 100,000, determine the capacitor values to implement the filter using a cascade of six secondorder Sallen-Key circuit sections. The form of a Sallen-Key stage is shown in Fig. P4.M-2. On a single plot, plot the magnitude response of each section as well as the overall magnitude response. Identify the poles that correspond to each section 's magnitude response curve. Are the capacitor values realistic?

Figure P4.M-2: Sallen-Key filter stage. c. Rather than a Butterworth filter, repeat Prob. P4.M-2 for a Chebyshev LPF with R = 3 dB of passband ripple. Since each Sallen-Key stage is constrained to have unity gain at dc, an overall gain error of 1/√1 + ∊2 is acceptable.

d. An analog lowpass filter with cutoff frequency ωc can be transformed into a highpass filter with cutoff frequency ωc by using an RCCR transformation rule: each resistor R i is replaced by a capacitor C ' i = 1/R i ωc and each capacitor C i ′ = 1/R i ωc and each capacitor C i is replaced by a resistor R i ′ = 1/C i ωc . Use this rule to design an order-8 Butterworth highpass filter with ωc = 2π4000 by completing the following. a. Design an order-8 Butterworth lowpass filter with ωc = 2π4000 by using four second-order Sallen-Key circuit stages, the form of which is shown in Fig. P4.M-2. Give resistor and capacitor values for each stage. Choose the resistors so that the RC-CR transformation will result in 1 nF capacitors. At this point, are the component values realistic? b. Draw an RC-CR transformed Sallen-Key circuit stage. Determine the transfer function H(s) of the transformed stage in terms of the variables R′ 1 , R′ 2 , C′ 1 , and C′ 2 . c. Transform the LPF designed in part a by using an RC-CR transformation. Give the resistor and capacitor values for each stage. Are the component values realistic?

Using H(s) derived in part b, plot the magnitude response of each section as well as the overall magnitude response. Does the overall response look like a highpass Butterworth filter? Plot the HPF system poles and zeros in the complex s plane. How do these locations compare with those of the Butterworth LPF? e. Repeat Prob. P4.M-4, using ωc = 2π1500 and an order-16 filter. That is, eight second-order stages need to be designed. f. Rather than a Butterworth filter, repeat Prob. P4.M-4 for a Chebyshev LPF with R = 3 dB of passband ripple. Since each transformed Sallen-Key stage is constrained to have unity gain at ω = ∞, an overall gain error of acceptable.

is

g. The MATLAB signal processing toolbox function butter helps design analog Butter-worth filters. Use MATLAB help to learn how butter works. For each of the following cases, design the filter, plot the filter's poles and zeros in the complex s plane, and plot the decibel magnitude response 20 log 10 |H(jω)|. a. Design a sixth-order analog lowpass filter with ωc = 2π3500. b. Design a sixth-order analog highpass filter with ωc = 2π3500. c. Design a sixth-order analog bandpass filter with a passband between 2 and 4 kHz. d. Design a sixth-order analog bandstop filter with a stopband between 2 and 4 kHz. h. The MATLAB signal processing toolbox function cheby1 helps design analog Chebyshev type I filters. A Chebyshev type I filter has a passband ripple and a smooth stopband. Setting the passband ripple to R p = 3 dB, repeat Prob. P4.M7 using the cheby1 command. With all other parameters held constant, what is the general effect of reducing R p , the allowable passband ripple? i. The MATLAB signal processing toolbox function cheby2 helps design analog Chebyshev type II filters. A Chebyshev type II filter has a smooth passband and ripple in the stopband. Setting the stopband ripple R s = 20 dB down, repeat Prob. P4.M-7 using the cheby2 command. With all other parameters held constant, what is the general effect of increasing R s , the minimum stopband attenuation? j. The MATLAB signal processing toolbox function ellip helps design analog elliptic filters. An elliptic filter has ripple in both the passband and the stopband. Setting the passband ripple to R p = 3 dB and the stopband ripple R s = 20 dB down, repeat Prob. P4.M-7 using the ellip command. k. Using the definition C N(x) = cosh(N cosh −1 (x)), prove the recursive relation C N(x) = 2xCN−1 (x) − C N−2 (x). l. Prove that the poles of a Chebyshev filter, which are located at p k = ωc sinh (ξ) sin (φ k ) + jωc cosh(ξ) cos(φ k ), lie on an ellipse. [Hint: The equation of an ellipse in the x−y plane is (x/a)2 + (y/b) 2 = 1, where constants a and b define the major and minor axes of the ellipse.]

Chapter 5: Discrete-Time System Analysis Using the z-Transform OVERVIEW The counterpart of the Laplace transform for discrete-time systems is the z-transform. The Laplace transform converts integrodifferential equations into algebraic equations. In the same way, the z-transforms changes difference equations into algebraic equations, thereby simplifying the analysis of discrete-time systems. The z-transform method of analysis of discrete-time systems parallels the Laplace transform method of analysis of continuous-time systems, with some minor differences. In fact, we shall see that the ztransform is the Laplace transform in disguise. The behavior of discrete-time systems is similar to that of continuous-time systems (with some differences). The frequency-domain analysis of discrete-time systems is based on the fact (proved in Section 3.8-3) that the response of a linear, time-invariant, discrete-

time (LTID) system to an everlasting exponential z n is the same exponential (within a multiplicative constant) given by H [z]z n . We then

express an input x [n] as a sum of (everlasting) exponentials of the form z n . The system response to x [n] is then found as a sum of the system's responses to all these exponential components. The tool that allows us to represent an arbitrary input x [n] as a sum of

(everlasting) exponentials of the form z n is the z-transform.

5.1 THE z-TRANSFORM We define X[z], the direct z-transform of x[n], as

where z is a complex variable. The signal x [n], which is the inverse z-transform of X [z], can be obtained from X[z] by using the following inverse z-transformation:

The symbol ∮ indicates an integration in counterclockwise direction around a closed path in the complex plane (see Fig. 5.1). We derive this z-transform pair later, in Chapter 9, as an extension of the discrete-time Fourier transform pair.

Figure 5.1: γ n u[n] and the region of convergence of its z-transform. As in the case of the Laplace transform, we need not worry about this integral at this point because inverse z-transforms of many signals of engineering interest can be found in a z-transform table. The direct and inverse z-transforms can be expressed symbolically as or simply as Note that LINEARITY OF THE z-TRANSFORM Like the Laplace transform, the z-transform is a linear operator. If then

The proof is trivial and follows from the definition of the z-transform. This result can be extended to finite sums. THE UNILATERAL z-TRANSFORM For the same reasons discussed in Chapter 4, we find it convenient to consider the unilateral z-transform. As seen for the Laplace case, the bilateral transform has some complications because of nonuniqueness of the inverse transform. In contrast, the unilateral transform has a unique inverse. This fact simplifies the analysis problem considerably, but at a price: the unilateral version can handle only causal signals and systems. Fortunately, most of the practical cases are causal. The more general bilateral z-transform is discussed later, in Section 5.9. In practice, the term z-transform generally means the unilateral z-transform. In a basic sense, there is no difference between the unilateral and the bilateral z-transform. The unilateral transform is the bilateral transform that deals with a subclass of signals starting at n = 0 (causal signals). Hence, the definition of the unilateral transform is the same as that of the bilateral [Eq. (5.1)], except that the limits of the sum are from 0 to ∞

The expression for the inverse z-transform in Eq. (5.2) remains valid for the unilateral case also. THE REGION OF CONVERGENCE (ROC) OF X[z] The sum in Eq. (5.1) [or (5.4)] defining the direct z-transform X [z] may not converge (exist) for all values of z. The values of z (the region in the complex plane) for which the sum in Eq. (5.1) converges (or exists) is called the region of existence, or more commonly the region of convergence (ROC), for X[z]. This concept will become clear in the following example. EXAMPLE 5.1 Find the z-transform and the corresponding ROC for the signal γ n u[n]. By definition

Since u[n] = 1 for all n ≥ 0,

It is helpful to remember the following well-known geometric progression and its sum:

Use of Eq. (5.6) in Eq. (5.5) yields

Observe that X [z] exists only for |z| > |γ|. For |z| < |γ|, the sum in Eq. (5.5) may not converge; it goes to infinity. Therefore, the ROC of X [z] is the shaded region outside the circle of radius |γ|, centered at the origin, in the z-plane, as depicted in Fig. 5.1b. Later in Eq. (5.85), we show that the z-transform of another signal −γ n u[−(n + 1)] is also z/(z − γ). However, the ROC in this case is |z| < |γ|. Clearly, the inverse z-transform of z/(z − γ) is not unique. However, if we restrict the inverse transform to be causal, then the inverse transform is unique, namely, γ n u [n].

The ROC is required for evaluating x [n] from X[z], according to Eq. (5.2). The integral in Eq. (5.2) is a contour integral, implying integration in a counterclockwise direction along a closed path centered at the origin and satisfying the condition |z| > |γ|. Thus, any circular path centered at the origin and with a radius greater than |γ| (Fig. 5.1b) will suffice. We can show that the integral in Eq. (5.2)

along any such path (with a radius greater than |γ|) yields the same result, namely x[n]. [†] Such integration in the complex plane requires a background in the theory of functions of complex variables. We can avoid this integration by compiling a table of z-transforms (Table 5.1), where z-transform pairs are tabulated for a variety of signals. To find the inverse z-transform of say, z/(z − γ), instead of

using the complex integration in Eq. (5.2), we consult the table and find the inverse z-transform of z/(z − γ) as γ n u[n]. Because of uniqueness property of the unilateral z-transform, there is only one inverse for each X[z]. Although the table given here is rather short, it comprises the functions of most practical interest. Table 5.1: (Unilateral) z-Transform Pairs Open table as spreadsheet No.

X[n]

X[z]

1

delta[n−n]

z −k

2

u[n]

3

nu[n]

4

n 2 u[n]

5

n 3 u[n]

6

y n u[n]

7

y n−1 u[n − 1]

8

nyn u[n]

9

n 2 y n u[n]

10

11a

|γ n | cosβn u[n]

11b

|γ| n sinβn u[n]

12a

r|γ| n cos(βn+ θ)u[n]

12b

r|γ| n cos(γn+ θ)u[n] γ=|γ|e jγ

12c

r|γ| n cos(γn+θ)u[n]

The situation of the z-transform regarding the uniqueness of the inverse transform is parallel to that of the Laplace transform. For the bilateral case, the inverse z-transform is not unique unless the ROC is specified. For the unilateral case, the inverse transform is

unique; the region of convergence need not be specified to determine the inverse z-transform. For this reason, we shall ignore the ROC in the unilateral z-transform Table 5.1. EXISTENCE OF THE z-TRANSFORM By definition

The existence of the z-transform is guaranteed if

for some |z|. Any signal x[n] that grows no faster than an exponential signal r n 0 , for some r 0 , satisfies this condition. Thus, if

then

Therefore, X[z] exists for |z| > r 0 . Almost all practical signals satisfy condition (5.8) and are therefore z-transformable. Some signal 2

models (e.g., γ n ) grow faster than the exponential signal r n 0 (for any r 0 ) and do not satisfy Eq. (5.8) and therefore are not ztransformable. Fortunately, such signals are of little practical or theoretical interest. Even such signals over a finite interval are ztransformable. EXAMPLE 5.2 Find the z-transforms of a. δ[n] b. u[n] c. cos βn u[n] d. The signal shown in Fig. 5.2

Figure 5.2 Recall that by definition

a. For x[n] = δ[n], x[0] = 1 and x[2] = x[3] = x[4] = ... = 0. Therefore

b. For x[n] = u[n], x[0] = x[1] = x[3] = ... = 1. Therefore

From Eq. (5.6) it follows that

Therefore

c. Recall that cos βn = (e jβn + e −jβn )/2. Moreover, according to Eq. (5.7),

Therefore

d. Here x[0] = x[1] = x[2] = x[3] = x[4] = 1 and x[5] = x[6] = ... = 0. Therefore, according to Eq. (5.9)

We can also express this result in a more compact form by summing the geometric progression on the right-hand side of the foregoing equation. From the result in Section B.7-4 with r = 1/z, m = 0, and n = 4, we obtain

EXERCISE E5.1 1. Find the z-transform of a signal shown in Fig. 5.3.

Figure 5.3

2. Use pair 12a (Table 5.1) to find the z-transform of x[n] = 20.65(√2) n cos ((π/4)n − 1.415)u[n]. Answers 1. 2.

5.1-1 Finding the Inverse Transform As in the Laplace transform, we shall avoid the integration in the complex plane required to find the inverse z-transform [Eq. (5.2)] by using the (unilateral) transform table (Table 5.1). Many of the transforms X[z] of practical interest are rational functions (ratio of polynomials in z), which can be expressed as a sum of partial fractions, whose inverse transforms can be readily found in a table of transform. The partial fraction method works because for every transformable x[n] defined for n ≥ 0, there is a corresponding unique X[z] defined for |z| > r 0 (where r 0 is some constant), and vice versa. EXAMPLE 5.3 Find the inverse z-transform of

a.

b.

c. a. Expanding X[z] into partial fractions yields

From Table 5.1, pair 7, we obtain

If we expand rational X[z] into partial fractions directly, we shall always obtain an answer that is multiplied by u[n − 1] because of the nature of pair 7 in Table 5.1. This form is rather awkward as well as inconvenient. We prefer the form that contains u[n] rather than u[n − 1]. A glance at Table 5.1 shows that the z-transform of every signal that is multiplied by u[n] has a factor z in the numerator. This observation suggests that we expand X[z] into modified partial fractions, where each term has a factor z in the numerator. This goal can be accomplished by expanding X[z]/z into partial fractions and then multiplying both sides by z. We shall demonstrate this procedure by reworking part (a). For this case

Multiplying both sides by z yields

From pairs 1 and 6 in Table 5.1, it follows that

The reader can verify that this answer is equivalent to that in Eq. (5.12a) by computing x[n] in both cases for n = 0, 1, 2, 3, ..., and comparing the results. The form in Eq. (5.12b) is more convenient than that in Eq. (5.12a). For this reason, we shall always expand X[z]/z rather than X[z] into partial fractions and then multiply both sides by z to obtain modified partial fractions of X[z], which have a factor z in the numerator.

b. and

where

Therefore

We can determine a 1 and a 2 by clearing fractions. Or we may use a shortcut. For example, to determine a 2 , we multiply both sides of Eq. (5.13) by z and let z → ∞. This yields This result leaves only one unknown, a 1 , which is readily determined by letting z take any convenient value, say z = 0, on both sides of Eq. (5.13). This step yields

which yields a 1 = −1. Therefore

and

Now the use of Table 5.1, pairs 6 and 10, yields

c. Complex Poles.

Poles of X[z] are 1,3 + j4, and 3 − j4. Whenever there are complex conjugate poles, the problem can be worked out in two ways. In the first method we expand X[z] into (modified) first-order partial fractions. In the second method, rather than obtain one factor corresponding to each complex conjugate pole, we obtain quadratic factors corresponding to each pair of complex conjugate poles. This procedure is explained next. METHOD OF FIRST-ORDER FACTORS

We find the partial fraction of X[z]/z using the Heaviside "cover-up" method:

and

The inverse transform of the first term on the right-hand side is 2u[n]. The inverse transform of the remaining two terms (complex conjugate poles) can be obtained from pair 12b (Table 5.1) by identifying r/2 = 1.6, θ = −2.246 rad, γ = 3 + j4 =

5e j0.927 , so that |γ| = 5, β = 0.927. Therefore METHOD OF QUADRATIC FACTORS

Multiplying both sides by z and letting z → ∞, we find and

To find B, we let z take any convenient value, say z = 0. This step yields

Therefore

and

We now use pair 12c, where we identify A = −2, B = 16, |γ| = 5, and a = −3. Therefore

and so that EXERCISE E5.2 Find the inverse z-transform of the following functions: 1. 2. 3. 4. [Hint: √0.8 = 2/√5.] Answers 1. 2. 3. 18δ[n] − [0.72(−2) n + 17.28(0.5) n − 14.4n(0.5)n ]u[n] 4.

INVERSE TRANSFORM BY EXPANSION OF X[z] IN POWER SERIES OF z −1 By definition

This result is a power series in z −1 . Therefore, if we can expand X[z] into the power series in z −1 , the coefficients of this power series

can be identified as x[0], x[1], x[2], x[3],.... A rational X[z] can be expanded into a power series of z −1 by dividing its numerator by the denominator. Consider, for example,

To obtain a series expansion in powers of z −1 , we divide the numerator by the denominator as follows:

Thus

Therefore Although this procedure yields x[n] directly, it does not provide a closed-form solution. For this reason, it is not very useful unless we want to know only the first few terms of the sequence x[n]. EXERCISE E5.3 Using long division to find the power series in z −1 , show that the inverse z-transform of z/(z − 0.5) is (0.5)n u[n] or (2)−n u[n].

RELATIONSHIP BETWEEN h[n] AND H[z] For an LTID system, if h[n] is its unit impulse response, then from Eq. (3.71b), where we defined H[z], the system transfer function, we write

For causal systems, the limits on the sum are from n = 0 to ∞. This equation shows that the transfer function H[z] is the z-transform of the impulse response h[n] of an LTID system; that is,

This important result relates the time-domain specification h[n] of a system to H[z], the frequency-domain specification of a system. The result is parallel to that for LTIC systems. EXERCISE E5.4

Redo Exercise E3.14 by taking the inverse z-transform of H[z], as given by Eq. (3.73). [†] Indeed, the path need not even be circular. It can have any odd shape, as long as it encloses the pole(s) of X[z] and the path of integration is counterclockwise.

5.2 SOME PROPERTIES OF THE z-TRANSFORM The z-transform properties are useful in the derivation of z-transforms of many functions and also in the solution of linear difference equations with constant coefficients. Here we consider a few important properties of the z-transform. In our discussion, the variable n appearing in signals, such as x[n] and y[n], may or may not stand for time. However, in most applications of our interest, n is proportional to time. For this reason, we shall loosely refer to the variable n as time. In the following discussion of the shift property, we deal with shifted signals x[n]u[n], x[n − k]u[n − k], x[n − k]u[n], and x[n + k]u[n]. Unless we physically understand the meaning of such shifts, our understanding of the shift property remains mechanical rather than intuitive or heuristic. For this reason using a hypothetical signal x[n], we have illustrated various shifted signals for k = 1 in Fig. 5.4.

Figure 5.4: A signal x[n] and its shifted versions. RIGHT SHIFT (DELAY) If then

In general,

Moreover,

Repeated application of this property yields

In general, for integer value of m

A look at Eqs. (5.15a) and (5.16a) shows that they are identical except for the extra term x[−1] in Eq. (5.16a). We see from Fig. 5.4c and 5.4d that x[n − 1]u[n] is the same as x[n − 1]u[n − 1] plus x[−1]δ[n]. Hence, the difference between their transforms is x[−1]. Proof. For integer value of m

Recall that x[n − m]u[n − m] = 0 for n < m, so that the limits on the summation on the right-hand side can be taken from n = m to ∞. Therefore

To prove Eq. (5.16c), we have

LEFT SHIFT (ADVANCE) If then

Repeated application of this property yields

and for integer value of m

Proof. By definition

EXAMPLE 5.4 Find the z-transform of the signal x[n] depicted in Fig. 5.5.

Figure 5.5 The signal x[n] can be expressed as a product of n and a gate pulse u[n] - u[n − 6]. Therefore

We cannot find the z-transform of nu[n − 6] directly by using the right-shift property [Eq. (5.15b)]. So we rearrange it in terms of (n − 6)u[n − 6] as follows:

We can now find the z-transform of the bracketed term by using the right-shift property [Eq. (5.15b)]. Because u[n]

Also, because nu[n]

Therefore

z/(z − 1) 2

z/(z − 1)

EXERCISE E5.5

Using only the fact that u[n] z/(z − 1) and the right-shift property [Eq. (5.15)], find the z-transforms of the signals in Figs. 5.2 and 5.3.

Answers See Example 5.2d and Exercise E5.1a. CONVOLUTION The time-convolution property states that if [†] then (time convolution)

Proof. This property applies to causal as well as noncausal sequences. We shall prove it for the more general case of noncausal sequences, where the convolution sum ranges from −∞ to ∞. We have

Interchanging the order of summation, we have

LTID SYSTEM RESPONSE It is interesting to apply the time-convolution property to the LTID input-output equation y[n] = x[n] * h[n]. Since from Eq. (5.14b), we H[z], it follows from Eq. (5.18) that know that h[n]

EXERCISE E5.6 Use the time-convolution property and appropriate pairs in Table 5.1 to show that u[n] * u[n − 1] = nu[n]. MULTIPLICATION BY γ n (SCALING IN THE z-DOMAIN) If then

Proof.

EXERCISE E5.7 Use Eq. (5.20) to derive pairs 6 and 8 in Table 5.1 from pairs 2 and 3, respectively. MULTIPLICATION BY n If then

Proof.

EXERCISE E5.8 Use Eq. (5.21) to derive pairs 3 and 4 in Table 5.1 from pair 2. Similarly, derive pairs 8 and 9 from pair 6. TIME REVERSAL If then [†]

Proof.

Changing the sign of the dummy variable n yields

The region of convergence is also inverted, that is, if ROC of x[n] is |z| > |γ|, then, the ROC of x[−n] is |z| < 1/|γ|. EXERCISE E5.9 Use the time-reversal property and pair 2 in Table 5.1 to show that u[−n] INITIAL AND FINAL VALUES For a causal x[n],

−1/(z − 1) with the ROC |z| < 1.

This result follows immediately from Eq. (5.9). We can also show that if (z − 1) X (z) has no poles outside the unit circle, then [†]

All these properties of the z-transform are listed in Table 5.2. Table 5.2: z-Transform Operations Open table as spreadsheet Operation

x[n]

X[z]

Addition

x 1 [n] + x 2 [n]

X1 [z] + X2 [z]

Scalar multiplication

ax[n]

aX[z]

Right-shifting

x[n − m]u[n − m]

x[n − m]u[n]

x[n − 1]u[n]

x[n − 2]u[n]

x[n − 3]u[n]

Left-shifting

x[n + m]u[n]

x[n + 1]u[n]

z m X[z] − zx[0]

x[n + 2]u[n]

z m X[z] − zx[0] − zx[1]

x[n + 2]u[n]

z m X[z] − zx[0] − zx[1] − zx[2]

Multiplication by γ n

γ n x[n]u[n]

Multiplication by n

nx[n]u[n]

Time convolution

x 1 [n]*x 2 [n]

X1 [z] X2 [z]

Time reversal

x[ − n]

X[1/z]

Initial value

x[0]

Final value

[†] There is also the frequency-convolution property, which states that if

[†] For complex signal x[n], the time-reversal property is modified as follows:

[†] This can be shown from the fact that

and

and

5.3 z-TRANSFORM SOLUTION OF LINEAR DIFFERENCE EQUATIONS The time-shifting (left-shift or right-shift) property has set the stage for solving linear difference equations with constant coefficients. As in the case of the Laplace transform with differential equations, the z-transform converts difference equations into algebraic equations that are readily solved to find the solution in the z domain. Taking the inverse z-transform of the z-domain solution yields the desired time-domain-solution. The following examples demonstrate the procedure. EXAMPLE 5.5 Solve

if the initial conditions are y[−1] = 11/6, y[−2] = 37/36, and the input x[n] = (2)−n u[n]. As we shall see, difference equations can be solved by using the right-shift or the left-shift property. Because the difference equation, Eq. (5.24), is in advance operator form, the use of the left-shift property in Eqs. (5.17a) and (5.17b) may seem appropriate for its solution. Unfortunately, as seen from Eqs. (5.17a) and (5.17b), these properties require a knowledge of auxiliary conditions y[0], y[1],..., y[N − 1] rather than of the initial conditions y[-1], y[-2],..., y[−n], which are generally given. This difficulty can be overcome by expressing the difference equation (5.24) in delay operator form (obtained by replacing n with n − 2) and then using the right-shift

property. [†] Equation (5.24) in delay operator form is

We now use the right-shift property to take the z-transform of this equation. But before proceeding, we must be clear about the meaning of a term like y[n − 1] here. Does it mean y[n − 1]u[n − 1] or y[n − 1]u[n]? In any equation, we must have some time reference n = 0, and every term is referenced from this instant. Hence, y[n − k] means y[n − k]u[n]. Remember also that although we are considering the situation for n ≥ 0, y[n] is present even before n = 0 (in the form of initial conditions). Now

Noting that for causal input x[n], We obtain

In general

Taking the z-transform of Eq. (5.25) and substituting the foregoing results, we obtain

or

from which we obtain

so that

and

Therefore

and

This example demonstrates the ease with which linear difference equations with constant coefficients can be solved by z-transform. This method is general; it can be used to solve a single difference equation or a set of simultaneous difference equations of any order as long as the equations are linear with constant coefficients. Comment. Sometimes, instead of initial conditions y[- 1], y[-2],..., y[−n], auxiliary conditions y[0], y[1],..., y[N − 1] are given to solve a difference equation. In this case, the equation can be solved by expressing it in the advance operator form and then using the left-shift property (see later: Exercise E5.11). EXERCISE E5.10 Solve the following equation if the initial conditions y[−1] = 2, y[−2] = 0, and the input x[n] = u[n]:

Answers

EXERCISE E5.11 Solve the following equation if the auxiliary conditions are y[0] = 1, y[1] = 2, and the input x[n] = u[n]: Answers

ZERO-INPUT AND ZERO-STATE COMPONENTS In Example 5.5 we found the total solution of the difference equation. It is relatively easy to separate the solution into zero-input and zero-state components. All we have to do is to separate the response into terms arising from the input and terms arising from initial conditions. We can separate the response in Eq. (5.26b) as follows:

Therefore

Multiplying both sides by z 2 yields

and

We expand both terms on the right-hand side into modified partial fractions to yield

and

which agrees with the result in Eq. (5.28). EXERCISE E5.12

Solve if the initial conditions are y[−1] = 2, y[−2] = 0, and the input x[n] = u[n]. Separate the response into zeroinput and zero-state components.

Answers

5.3-1 Zero-State Response of LTID Systems: The Transfer Function Consider an Nth-order LTID system specified by the difference equation

or

or

We now derive the general expression for the zero-state response: that is, the system response to input x[n] when all the initial conditions y[-1] = y[-2] = ... = y[−N] = 0 (zero state). The input x[n] is assumed to be causal so that x[−1] = x[-2] = ... = x[−N] = 0. Equation (5.31c) can be expressed in the delay operator form as

Because y[−r] = x[−r] = 0 for r = 1, 2, ..., N

Now the z-transform of Eq. (5.31d) is given by

Multiplication of both sides by z N yields

Therefore

We have shown in Eq. (5.19) that Y[z] = X[z]H[z]. Hence, it follows that

As in the case of LTIC systems, this result leads to an alternative definition of the LTID system transfer function as the ratio of Y[z] to X[z] (assuming all initial conditions zero).

ALTERNATE INTERPRETATION OF THE z-TRANSFORM So far we have treated the z-transform as a machine, which converts linear difference equations into algebraic equations. There is no physical understanding of how this is accomplished or what it means. We now discuss more intuitive interpretation and meaning of the z-transform. In Chapter 3, Eq. (3.71a), we showed that LTID system response to an everlasting exponential z n is H[z]z n . If we could express every

discrete-time signal as a linear combination of everlasting exponentials of the form z n , we could readily obtain the system response to any input. For example, if

the response of an LTID system to this input is given by

Unfortunately, a very small class of signals can be expressed in the form of Eq. (5.36a). However, we can express almost all signals of practical utility as a sum of everlasting exponentials over a continuum of values of z. This is precisely what the z-transform in Eq. (5.2) does.

Figure 5.6: The transformed representation of an LTID system. Invoking the linearity property of the z-transform, we can find the system response y[n] to input x[n] in the Eq. (5.37) as[†]

Clearly This viewpoint of finding the response of LTID system is illustrated in Fig. 5.6a. Just as in continuous-time systems, we can model discrete-time systems in the transformed manner by representing all signals by their z-transforms and all system components (or elements) by their transfer functions, as shown in Fig. 5.6b. The result Y[z]=H[z]X[z] greatly facilitates derivation of the system response to a given input. We shall demonstrate this assertion by an example. EXAMPLE 5.6 Find the response y[n] of an LTID system described by the difference equation or for the input x [n]=(−2) −n u[n] and with all the initial conditions zero (system in the zero state). From the difference equation we find

For the input x[n]=(−2) −n u[n]=[(−2) −1 ]n u(n)=(−0.5) n u[n]

and

Therefore

so that

and

EXAMPLE 5.7: (The Transfer Function of a Unit Delay) Show that the transfer function of a unit delay is 1/z. If the input to the unit delay is x[n]u[n], then its output (Fig. 5.7) is given by

Figure 5.7: Ideal unit delay and its transfer function. The z-transform of this equation yields [see Eq. (5.15a)]

It follows that the transfer function of the unit delay is

EXERCISE E5.13 A discrete-time system is described by the following transfer function:

a. Find the system response to input x [n]=3 -(n+1) u[n] if all initial conditions are zero. b. Write the difference equation relating the output y[n] to input x[n] for this system. Answers a. b.

5.3-2 Stability Equation (5.34) shows that the denominator of H[z] is Q[z], which is apparently identical to the characteristic polynomial Q[γ] defined in Chapter 3. Does this mean that the denominator of H[z] is the characteristic polynomial of the system? This may or may not be the case: if P[z] and Q[z] in Eq. (5.34) have any common factors, they cancel out, and the effective denominator of H[z] is not necessarily equal to Q[z]. Recall also that the system transfer function H[z], like h[n], is defined in terms of measurements at the external terminals. Consequently, H[z] and h[n] are both external descriptions of the system. In contrast, the characteristic polynomial Q[z] is an internal description. Clearly, we can determine only external stability, that is, BIBO stability, from H[z]. If all the poles of H[z] are within

the unit circle, all the terms in h[z] are decaying exponentials, and as shown in Section 3.10, h[n] is absolutely summable. Consequently, the system is BIBO stable. Otherwise the system is BIBO unstable. If P[z] and Q[z] do not have common factors, then the denominator of H[z] is identical to Q[z]. [†] The poles of H[z] are the characteristic roots of the system. We can now determine internal stability. The internal stability criterion in Section 3.10-1 can be restated in terms of the poles of H[z], as follows. 1. An LTID system is asymptotically stable if and only if all the poles of its transfer function H[z] are within the unit circle. The poles may be repeated or simple. 2. An LTID system is unstable if and only if either one or both of the following conditions exist: (i) at least one pole of H[z] is outside the unit circle; (ii) there are repeated poles of H[z] on the unit circle. 3. An LTID system is marginally stable if and only if there are no poles of H[z] outside the unit circle, and there are some simple poles on the unit circle. EXERCISE E5.14 Show that an accumulator whose impulse response is h[n]=u[n] is marginally stable but BIBO unstable.

5.3-3 Inverse Systems If H[z] is the transfer function of a system S, then Si , its inverse system has a transfer function H i [z] given by

This follows from the fact the inverse system Si undoes the operation of S. Hence, if H[z] is placed in cascade with H i [z], the transfer function of the composite system (identity system) is unity. For example, an accumulator, whose transfer function is H[z]=z/(z − 1) and a backward difference system whose transfer function is H i [z]=(z − 1)/z are inverse of each other. Similarly if

its inverse system transfer function is

as required by the property H[z]H i [z]=1. Hence, it follows that EXERCISE E5.15 Find the impulse response of an accumulator and the backward difference system. Show that the convolution of the two impulse responses yields δ[n]. [†] Another approach is to find y[0], y[1], y[2],..., y[N − 1] from y[−1], y[-2],..., y[−n] iteratively, as in Section 3.5-1, and then apply the left-shift property to Eq. (5.24). [†] In computing y[n], the contour along which the integration is performed is modified to consider the ROC of X[z] as well as H[z]. We

ignore this consideration in this intuitive discussion.

[†] There is no way of determining whether there were common factors in P[z] and Q[z] that were canceled out because in our

derivation of H[z], we generally get the final result after the cancellations are already effected. When we use internal description of the system to derive Q[z], however, we find pure Q[z] unaffected by any common factor in P[z].

5.4 SYSTEM REALIZATION Because of the similarity between LTIC and LTID systems, conventions for block diagrams and rules of interconnection for LTID are identical to those for continuous-time (LTIC) systems. It is not necessary to rederive these relationships. We shall merely restate them to refresh the reader's memory. The block diagram representation of the basic operations such as an adder a scalar multiplier, unit delay, and pick off points were shown in Fig. 3.11. In our development, the unit delay, which was represented by a box marked D in Fig. 3.11, will be represented by its transfer function 1/z. All the signals will also be represented in terms of their z-transforms. Thus, the input and the output will be labeled X[z] and Y[z], respectively.

When two systems with transfer functions H 1 [z] and H 2 [z] are connected in cascade (as in Fig. 4.18b), the transfer function of the composite system is H 1 [z]H 2 [z]. If the same two systems are connected in parallel (as in Fig. 4.18c), the transfer function of the composite system is H 1 [z]H 2 [z]. For a feedback system (as in Fig. 4.18d), the transfer function is G[z]/(1 + G[z]H[z]). We now consider a systematic method for realization (or simulation) of an arbitrary Nth-order LTID transfer function. Since realization is basically a synthesis problem, there is no unique way of realizing a system. A given transfer function can be realized in many different ways. We present here the two forms of direct realization. Each of these forms can be executed in several other ways, such as cascade and parallel. Furthermore, a system can be realized by the transposed version of any known realization of that system. This artifice doubles the number of system realizations. A transfer function H[z] can be realized by using time delays along with adders and multipliers. We shall consider a realization of a general Nth-order causal LTID system, whose transfer function is given by

This equation is identical to the transfer function of a general Nth-order proper LTIC system given in Eq. (4.60). The only difference is that the variable z in the former is replaced by the variable s in the latter. Hence, the procedure for realizing an LTID transfer function is identical to that for the LTIC transfer function with the basic element 1/s (integrator) replaced by the element 1/z (unit delay). The reader is encouraged to follow the steps in Section 4.6 and rederive the results for the LTID transfer function in Eq. (5.41). Here we shall merely reproduce the realizations from Section 4.6 with integrators (1/s) replaced by unit delays (1/z). The direct form I (DFI) is shown in Fig. 5.8a, the canonic direct form (DFII) is shown in Fig. 5.8b and the transpose of canonic direct is shown in Fig. 5.8c. The DFII and its transpose are canonic because they require N delays, which is the minimum number needed to implement an Nth-order LTID transfer function in Eq. (5.41). In contrast, the form DFI is a noncanonic because it generally requires 2N delays. The DFII realization in Fig. 5.8b is also called a canonic direct form.

Figure 5.8: Realization of an Nth-order causal LTID system transfer function by using (a) DFI, (b) canonic direct (DFII), and (c) the transpose form of DFII. EXAMPLE 5.8 Find the canonic direct and the transposed canonic direct realizations of the following transfer functions.

i.

ii.

iii.

iv. All four of these transfer functions are special cases of H[z] in Eq. (5.41).

i. For this case, the transfer function is of the first order (N=1); therefore, we need only one delay for its realization. The feedback and feedforward coefficients are We use Fig. 5.8 as our model and reduce it to the case of N=1. Figure 5.9a shows the canonic direct (DFII) form, and Fig. 5.9b its transpose. The two realizations are almost the same. The minor difference is that in the DFII form, the gain 2 is provided at the output, and in the transpose, the same gain is provided at the input.

Figure 5.9: Realization of transfer function 2/(z + 5): (a) canonic direct form and (b) its transpose. In a similar way, we realize the remaining transfer functions.

ii. In this case also, the transfer function is of the first order (N=1); therefore, we need only one delay for its realization. The feedback and feedforward coefficients are Figure 5.10 illustrates the canonic direct and its transpose for this case. [†]

Figure 5.10: Realization of (4z + 28)/(z + 1): (a) canonic direct form and (b) its transpose. iii. Here N=1 and b 0 =1, b 1 =0 and a 1 =7. Figure 5.11 shows the direct and the transposed realizations. Observe that the realizations are almost alike.

Figure 5.11: Realization of z/(z + 7): (a) canonic direct form and (b) its transpose.

iv. This is a second-order system (N = 2) with b 0 = 0, b 1 = 4, b 2 = 28, a 1 = 6, a 2 = 5. Figure 5.12 shows the canonic direct and transposed canonic direct realizations.

Figure 5.12: Realization of (4z + 28)/(z 2 + 6z + 5): (a) canonic direct form and (b) its transpose. EXERCISE E5.16 Realize the transfer function

CASCADE AND PARALLEL REALIZATIONS, COMPLEX AND REPEATED POLES The considerations and observations for cascade and parallel realizations as well as complex and multiple poles are identical to those discussed for LTIC systems in Section 4.6-3. EXERCISE E5.17 Find canonic direct realizations of the following transfer function by using the cascade and parallel forms. The specific cascade decomposition is as follows:

REALIZATION OF FINITE IMPULSE RESPONSE (FIR) FILTERS So far we have been quite general in our development of realization techniques. They can be applied to infinite impulse response (IIR) or FIR filters. For FIR filters, the coefficients a i = 0 for all i ≠ 0.[†] Hence, FIR filters can be readily implemented by means of the schemes developed so far by eliminating all branches with a i coefficients. The condition a i = 0 implies that all the poles of a FIR filter are at z = 0. EXAMPLE 5.9 Realize H [z] = (z 3 + 4z 2 + 5z + 2)/z 3 using canonic direct and transposed forms. We can express H[z] as

For H[z], b 0 = 1, b 1 = 4, b 2 = 5, and b 3 = 2. Hence, we obtain the canonic direct realization, shown in Fig. 5.13a. We have shown the horizontal orientation because it is easier to see that this filter is basically a tapped delay line. That is why this structure is also known as a tapped delay line or transversal filter. Figure 5.13b shows the corresponding transposed implementation.

Figure 5.13: Realization of (z 3 + 4z 2 + 5z + 2)/z 3 . DO ALL REALIZATIONS LEAD TO THE SAME PEREORMANCE? For a given transfer function, we have presented here several possible different realizations (DFI, canonic form DFII, and its transpose). There are also cascade and parallel versions, and there are many possible grouping of the factors in the numerator and the denominator of H[z], leading to different realizations. We can also use various combinations of these forms in implementing different subsections of a system. Moreover, the transpose of each version doubles the number. However, this discussion by no means exhausts all the possibilities. Transforming variables affords limitless potential realizations of the same transfer function. Theoretically, all these realizations are equivalent; that is, they lead to the same transfer function. This, however, is true only when we implement them with infinite precision. In practice, finite wordlength restriction causes each realization to behave differently in terms of sensitivity to parameter variation, stability, frequency response distortion error, and so on. These effects are serious for higher-order transfer functions, which require correspondingly higher numbers of delay elements. The finite wordlength errors that plague these implementations are coefficient quantization, overflow errors, and round-off errors. From a practical viewpoint, parallel and cascade forms using low-order filters minimize the effects of finite wordlength. Parallel and certain cascade forms are numerically less sensitive than the canonic direct form to small parameter variations in the system. In the canonic direct form structure with large N, a small change in a filter coefficient due to parameter quantization results in a large change in the location of the poles and the zeros of the system. Qualitatively, this difference can be explained by the fact that in a direct form (or its transpose), all the coefficients interact with each other, and a change in any coefficient will be magnified through its repeated influence from feedback and feedforward connections. In a parallel realization, in contrast, a change in a coefficient will affect only a localized segment; the case of a cascade realization is similar. For this reason, the most popular technique for minimizing finite wordlength effects is to design filters by using cascade or parallel forms employing low-order filters. In practice, high-order filters are realized by using multiple second-order sections in cascade, because second-order filters are not only easier to design but are less susceptible to coefficient quantization and round-off errors and their implementations allow easier data word scaling to reduce the potential overflow effects of data word size growth. A cascaded system using second-order building blocks usually requires fewer multiplications for a given filter frequency response. [1]

There are several ways to pair the poles and zeros of an Nth-order H[z] into a cascade of second-order sections, and several ways to order the resulting sections. Quantizing error will be different for each combination. Although several papers published provide guidelines in predicting and minimizing finite wordlength errors, it is advisable to resort to computer simulation of the filter design. This way, one can vary filter hardware characteristic, such as coefficient wordlengths, accumulator register sizes, sequencing of cascaded sections, and input signal sets. Such an approach is both reliable and economical. [1]

[†] Transfer functions with N=M may also be expressed as a sum of a constant and a strictly proper transfer function. For example,

Hence, this transfer function can also be realized as two transfer functions in parallel. [†] This statement is true for all i ≠ 0 because a is assumed to be unity. 0 [1] Lyons, R. G. Understanding Digital Signal Processing. Addison-Wesley, Reading, MA, 1997.

5.5 FREQUENCY RESPONSE OF DISCRETE-TIME SYSTEMS For (asymptotically or BIBO-stable) continuous-time systems, we showed that the system response to an input e jωt is H(jω)e jωt and

that the response to an input cos ωt is |H(jω)| cos [ωt + ∠H(jω)]. Similar results hold for discrete-time systems. We now show that for an (asymptotically or BIBO-stable) LTID system, the system response to an input e jΩn is H[e jΩ]e jΩn and the response to an input cos Ωn is |H[e jΩ]| cos (Ωn + ∠H[e jΩ]).

The proof is similar to the one used for continuous-time systems. In Section 3.8-3, we showed that an LTID system response to an

(everlasting) exponential z n is also an (everlasting) exponential H[z]z n. This result is valid only for values of z for which H[z], as defined in Eq. (5.14a), exists (converges). As usual, we represent this input-output relationship by a directed arrow notation as

Setting z = e jΩ in this relationship yields

Noting that cos Ωn is the real part of e jΩn , use of Eq. (3.66b) yields

Expressing H[e jΩ] in the polar form

Eq. (5.44) can be expressed as In other words, the system response y[n] to a sinusoidal input cos Ωn is given by

Following the same argument, the system response to a sinusoid cos (Ωn + θ) is

This result is valid only for BIBO-stable or asymptotically stable systems. The frequency response is meaningless for BIBO-unstable systems (which include marginally stable and asymptotically unstable systems). This follows from the fact that the frequency response in Eq. (5.43) is obtained by setting z = e jΩ in Eq. (5.42). But, as shown in Section 3.8-3 [Eqs. (3.71)], the relationship (5.42) applies only

for values of z for which H[z] exists. For BIBO unstable systems, the ROC for H[z] does not include the unit circle where z = e jΩ. This means, for BIBO-unstable systems, that H[z] is meaningless when z = e jΩ[†]

This important result shows that the response of an asymptotically or BIBO-stable LTID system to a discrete-time sinusoidal input of frequency Ω is also a discrete-time sinusoid of the same frequency. The amplitude of the output sinusoid is |H[e jΩ]| times the input

amplitude, and the phase of the output sinusoid is shifted by ∠H[e jΩ] with respect to the input phase. Clearly |H[e jΩ]| is the amplitude

gain, and a plot of |H[e jΩ]| versus Ω is the amplitude response of the discrete-time system. Similarly, ∠H[e jΩ] is the phase response of

the system, and a plot of ∠H[e jΩ] versus Ω shows how the system modifies or shifts the phase of the input sinusoid. Note that H[e jΩ] incorporates the information of both amplitude and phase responses and therefore is called the frequency responses of the system. STEADY-STATE RESPONSE TO CAUSAL SINUSOIDAL INPUT

As in the case of continuous-time systems, we can show that the response of an LTID system to a causal sinusoidal input cos Ωn u[n] is y[n] in Eq. (5.46a), plus a natural component consisting of the characteristic modes (see Prob. 5.5-6). For a stable system, all the modes decay exponentially, and only the sinusoidal component in Eq. (5.46a) persists. For this reason, this component is called the sinusoidal steady-state response of the system. Thus, y ss[n], the steady-state response of a system to a causal sinusoidal input cos Ωn u[n], is SYSTEM RESPONSE TO SAMPLED CONTINUOUS-TIME SINUSOIDS So far we have considered the response of a discrete-time system to a discrete-time sinusoid cos Ωn (or exponential e jΩn ). In practice,

the input may be a sampled continuous-time sinusoid cos ωt (or an exponential e jωt ). When a sinusoid cos ωt is sampled with sampling interval T, the resulting signal is a discrete-time sinusoid cos ωnT, obtained by setting t = nT in cos ωt. Therefore, all the results developed in this section apply if we substitute ωT for Ω:

EXAMPLE 5.10

For a system specified by the equation find the system response to the input a. 1 n = 1 b. c. a sampled sinusoid cos 1500t with sampling interval T = 0.001 The system equation can be expressed as Therefore, the transfer function of the system is

The frequency response is

Therefore

and

The amplitude response |H[e jΩ]| can also be obtained by observing that |H| 2 =HH*. Therefore

From Eq. (5.48) it follows that

which yields the result found earlier in Eq. (5.49a) Figure 5.14 shows plots of amplitude and phase response as functions of Ω. We now compute the amplitude and the phase response for the various inputs. a. x[n] = 1 n = 1 Since 1 n =(e jΩ) n with Ω = 0, the amplitude response is H[e j0 ]. From Eq. (5.49a) we obtain

Therefore

These values also can be read directly from Fig. 5.14a and 5.14b, respectively, corresponding to Ω = 0. Therefore, the system response to input 1 is

b. x[n] = cos[(π/6)n −0.2] Here Ω = π/6. According to Eqs. (5.49)

These values also can be read directly from Fig. 5.14a and 5.14b, respectively, corresponding to Ω=π/6. Therefore

Figure 5.15 shows the input x[n] and the corresponding system response.

Figure 5.15: Sinusoidal input and the corresponding output of the LTID system. c. A sinusoid cos 1500t sampled every T seconds (t = nT) results in a discrete-time sinusoid

For T = 0.001, the input is In this case, Ω =1.5. According to Eqs. (5.49a) and (5.49b),

These values also could be read directly from Fig. 5.14 corresponding to Ω =1.5. Therefore

Figure 5.14: Frequency response of the LTID system. COMPUTER EXAMPLE C5.1 Using MATLAB, find the frequency response of the system in Example 5.10. >> Omega = linspace(-pi,pi,400); >> H = tf ( [1 0], [1 -0.8],-1); >> H_Omega = squeeze (freqresp (H,Omega)); >> subplot (2,1,1); plot (Omega, abs(H_Omega), 'k'); axis tight; >> xlabel ('\Omega'); ylabel('|H[e^{j \Omega}]|'); >> subplot (2,1,2); plot (Omega, angle (H_Omega) * 180/pi, 'k'); axis tight; >> xlabel ('\Omega'); ylabel ('\angle H[e^{j \Omega}] [deg]');

Figure C5.1 Comment. Figure 5.14 shows plots of amplitude and phase response as functions of Ω. These plots as well as Eqs. (5.49) indicate that the frequency response of a discrete-time system is a continuous (rather than discrete) function of frequency Ω. There is no contradiction here. This behavior is merely an indication of the fact that the frequency variable Ω is continuous (takes on all possible values) and therefore the system response exists at every value of Ω. EXERCISE E5.18

For a system specified by the equation find the amplitude and the phase response. Find the system response to sinusoidal input cos (100t − (π/3)) sampled every T = 0.5 ms.

Answers

EXERCISE E5.19 Show that for an ideal delay (H[z]=1/z), the amplitude response |H[e jπ ]|=1, and the phase response ∠H[e jΩ]= −Ω. Thus, a pure time delay does not affect the amplitude gain of sinusoidal input, but it causes a phase shift (delay) of Ω radians in a discrete sinusoid of frequency Ω. Thus, for an ideal delay, the phase shift of the output sinusoid is proportional to the frequency of the input sinusoid (linear phase shift).

5.5-1 The Periodic Nature of the Frequency Response In Example 5.10 and Fig. 5.14, we saw that the frequency response H[e jΩ] is a periodic function of Ω. This is not a coincidence. Unlike continuous-time systems, all LTID systems have periodic frequency response. This is seen clearly from the nature of the expression of the frequency response of an LTID system. Because e ±j2πm =1 for all integer values of m [see Eq. (B.12)],

Therefore the frequency response H[e jΩ] is a periodic function of Ω with a period 2π. This is the mathematical explanation of the periodic behavior. The physical explanation that follows provides a much better insight into the periodic behavior. NONUNIQUENESS OF DISCRETE-TIME SINUSOID WAVEFORMS A continuous-time sinusoid cos ωt has a unique waveform for every real value of ω in the range 0 to ∞. Increasing ω results in a sinusoid of ever increasing frequency. Such is not the case for the discrete-time sinusoid cos Ωn because

and

This shows that the discrete-time sinusoids cos Ωn (and exponentials e jΩn ) separated by values of Ω in integral multiples of 2π are identical. The reason for the periodic nature of the frequency response of an LTID system is now clear. Since the sinusoids (or exponentials) with frequencies separated by interval 2π are identical, the system response to such sinusoids is also identical and, hence, is periodic with period 2π. This discussion shows that the discrete-time sinusoid cos Ωn has a unique waveform only for the values of Ω in the range −π to π. This band is called the fundamental band. Every frequency Ω, no matter how large, is identical to some frequency, Ω a , in the fundamental band (− π ≤ Ω a < π), where

The integer m can be positive or negative. We use Eq. (5.58) to plot the fundamental band frequency Ω a versus the frequency Ω of a sinusoid (Fig. 5.16a). The frequency Ω a is modulo 2π value of Ω. All these conclusions are also valid for exponential e jΩn . ALL DISCRETE-TIME SIGNALS ARE INHERENTLY BANDLIMITED This discussion leads to the surprising conclusion that all discrete-time signals are inherently bandlimited, with frequencies lying in the where is in cycles per sample, all frequencies separated range −π to π radians per sample. In terms of frequency by an integer number are identical. For instance, all discrete-time sinusoids of frequencies 0.3, 1.3, 2.3, ...cycles per sample are identical. The fundamental range of frequencies is −0.5 to 0.5 cycles per sample. Any discrete-time sinusoid of frequency beyond the fundamental band, when plotted, appears and behaves, in every way, like a sinusoid having its frequency in the fundamental band. It is impossible to distinguish between the two signals. Thus, in a basic sense, do not exist. Yet, in a "mathematical" sense, we must admit the existence of discrete-time frequencies beyond |Ω| = π or sinusoids of frequencies beyond Ω = π. What does this mean?

A MAN NAMED ROBERT To give an analogy, consider a fictitious person Mr. Robert Thompson. His mother calls him Robby; his acquaintances call him Bob, his close friends call him by his nickname, Shorty. Yet, Robert, Robby, Bob, and Shorty are one and the same person. However, we cannot say that only Mr. Robert Thompson exists, or only Robby exists, or only Shorty exists, or only Bob exists. All these four persons exist, although they are one and the same individual. In a same way, we cannot say that the frequency π/2 exists and frequency 5π/2 does not exist; they are both the same entity, called by different names. It is in this sense that we have to admit the existence of frequencies beyond the fundamental band. Indeed, mathematical expressions in frequency-domain automatically cater to this need by their built-in periodicity. As seen earlier, the very structure of the frequency response is 2π periodic. We shall also see later, in Chapter 9, that discrete-time signal spectra are also 2π periodic. Admitting the existence of frequencies beyond π also serves mathematical and computational convenience in digital signal processing applications. Values of frequencies beyond π may also originate naturally in the process of sampling continuous-time sinusoids. Because there is no upper limit on the value of ω, there is no upper limit on the value of the resulting discrete-time frequency Ω = ωT

either. [†]

The highest possible frequency is π and the lowest frequency is 0 (dc or constant). Clearly, the high frequencies are those in the vicinity of Ω = (2m + 1)π and the low frequencies are those in the vicinity of Ω = 2πm for all positive or negative integer values of m. FURTHER REDUCTION IN THE FREQUENCY RANGE Because cos (−Ωn + θ) = cos (Ωn − θ), a frequency in the range −π to 0 is identical to the frequency (of the same magnitude) in the range 0 to π (but with a change in phase sign). Consequently the apparent frequency for a discrete-time sinusoid of any frequency is equal to some value in the range 0 to π. Thus, cos (8.7πn + θ) = cos (0.7πn + θ), and the apparent frequency is 0.7π. Similarly, Hence, the frequency 9.6π is identical (in every respect) to frequency −0.4π, which, in turn, is equal (within the sign of its phase) to frequency 0.4π. In this case, the apparent frequency reduces to |Πa |=0.4π. We can generalize the result to say that the apparent frequency of a discrete-time sinusoid Ω is |Ω a |, as found from Eq. (5.58), and if Ω a < 0, there is a phase reversal. Figure 5.16b plots Ω versus the apparent frequency |Ω a |. The shaded bands represent the ranges of Ω for which there is a phase reversal, when represented in terms of |Ω a |. For example, the apparent frequency for both the sinusoids cos (2.4π + θ) and cos (3.6π + θ) is |Ω a | = 0.4π, as seen from Fig. 5.16b. But 2.4π is in a clear band and 3.6π is in a shaded band. Hence, these sinusoids appear as cos (0.4π + θ) and cos (0.4π − θ), respectively.

Figure 5.16: (a) Actual frequency versus (b) apparent frequency. Although every discrete-time sinusoid can be expressed as having frequency in the range from 0 to π, we generally use the frequency range from −π to π instead of 0 to π for two reasons. First, exponential representation of sinusoids with frequencies in the range 0 to π requires a frequency range −π to π. Second, even when we are using trigonometric representation, we generally need the frequency range −π to π to have exact identity (without phase reversal) of a higher-frequency sinusoid. For certain practical advantages, in place of the range −π to π, we often use other contiguous ranges of width 2π. The range 0 to 2π, for instance, is used in many applications. It is left as an exercise for the reader to show that the frequencies in the range from π to 2π are identical to those in the range from −π to 0. EXAMPLE 5.11 Express the following signals in terms of their apparent frequencies. a. cos (0.5πn + θ) b. cos (1.6πn + θ) c. sin (1.6πn + θ)

d. cos (2.3πn + θ) e. cos (34.699n + θ) a. Ω = 0.5π is in the reduced range already. This is also apparent from Fig. 5.16a or 5.16b. Because Ω a = 0.5π, and there is no phase reversal, and the apparent sinusoid is cos (0.5πn + θ). b. We express 1.6π = −0.4π + 2π so that Ω a = −0.4 and |Ω a | = 0.4. Also, Ω a is negative, implying sign change for the phase. Hence, the apparent sinusoid is cos (0.4πn − ΰ). This fact is also apparent from Fig. 5.16b. c. We first convert the sine form to cosine form as sin (1.6πn + θ) = cos (1.6πn − (π/2) θ). In part (b) we found Ω a = −0.4π. Hence, the apparent sinusoid is cos (0.4πn + (π/2) + θ) = −sin (0.4πn − θ). In this case, both the phase and the amplitude change signs. d. 2.3π = 0.3π + 2π so that Ω a = 0.3π. Hence, the apparent sinusoid is cos (0.3π n + θ). e. We have 34.699 = -3 + 6(2π). Hence, Ω a = −3, and the apparent frequency |Ω a | = 3 rad/sample. Because Ω a is negative, there is a sign change of the phase. Hence, the apparent sinusoid is cos (3n − θ). EXERCISE E5.20 Show that the sinusoids having frequencies Ω of a. 2π b. 3π c. 5π d. 3.2π e. 22.1327 f. π + 2 can be expressed, respectively, as sinusoids of frequencies a. 0 b. π c. π d. 0.8π e. 3 f. π - 2 Show that in cases (d), (e), and (f), phase changes sign.

5.5-2 Aliasing and Sampling Rate The nonuniqueness of discrete-time sinusoids and the periodic repetition of the same waveforms at intervals of 2π may seem innocuous, but in reality it leads to a serious problem for processing continuous-time signals by digital filters. A continuous-time sinusoid cos ωt sampled every T seconds (t=nT) results in a discrete-time sinusoid cos ωnT, which is cos Ωn with Ω=ωT. The discrete-time sinusoids cos Ωn have unique waveforms only for the values of frequencies in the range ω < π or ωT < π. Therefore samples of continuous-time sinusoids of two (or more) different frequencies can generate the same discrete-time signal, as shown in Fig. 5.17. This phenomenon is known as aliasing because through sampling, two entirely different analog sinusoids take on the same "discrete-time" identity.[†]

Figure 5.17: Demonstration of aliasing effect.

Aliasing causes ambiguity in digital signal processing, which makes it impossible to determine the true frequency of the sampled signal. Consider, for instance, digitally processing a continuous-time signal that contains two distinct components of frequencies ω1 and ω2 . The samples of these components appear as discrete-time sinusoids of frequencies Ω 1 = ω1 T and Ω 2 = π 2 T. If Ω 1 and ω2 happen to differ by an integer multiple of 2π (if ω2 − ω1 =2kπT), the two frequencies will be read as the same (lower of the two) frequency by the digital processor.[†] As a result, the higher-frequency component ω2 not only is lost for good (by losing its identity to ω1 ), but it reincarnates as a component of frequency ω1 , thus distorting the true amplitude of the original component of frequency ω1 . Hence, the resulting processed signal will be distorted. Clearly, aliasing is highly undesirable and should be avoided. To avoid aliasing, the frequencies of the continuous-time sinusoids to be processed should be kept within the fundamental band ωT ≤ π or ω ≤ π/T. Under this condition the question of ambiguity or aliasing does not arise because any continuous-time sinusoid of frequency in this range has a unique waveform when it is sampled. Therefore if ωh is the highest frequency to be processed, then, to avoid aliasing,

If fh is the highest frequency in hertz, fh = ωh /2π, and, according to Eq. (5.59),

or

This shows that discrete-time signal processing places the limit on the highest frequency fh that can be processed for a given value of the sampling interval T according to Eq. (5.60a). But we can process a signal of any frequency (without aliasing) by choosing a suitable value of T according to Eq. (5.60b). The sampling rate or sampling frequency fs is the reciprocal of the sampling interval T, and, according to Eq. (5.60b),

so that

This result is a special case of the well-known sampling theorem (to be proved in Chapter 8). It states that to process a continuoustime sinusoid by a discrete-time system, the sampling rate must be greater than twice the frequency (in hertz) of the sinusoid. In short,

a sampled sinusoid must have a minimum of two samples per cycle. [†] For sampling rate below this minimum value, the output signal will be aliased, which means it will be mistaken for a sinusoid of lower frequency.

ANTIALIASING FILTER If the sampling rate fails to satisfy condition (5.61), aliasing occurs, causing the frequencies beyond fs /2 Hz to masquerade as lower frequencies to corrupt the spectrum at frequencies below fs /2. To avoid such a corruption, a signal to be sampled is passed through an antialiasing filter of bandwidth fs /2 prior to sampling. This operation ensures the condition (5.61). The drawback of such a filter is that we lose the spectral components of the signal beyond frequency fs /2, which is a preferable alternative to the aliasing corruption of the signal at frequencies below fs /2. Chapter 8 presents a detailed analysis of the aliasing problem. EXAMPLE 5.12 Determine the maximum sampling interval T that can be used in a discrete-time oscillator which generates a sinusoid of 50 kHz. Here the highest significant frequency fh =50 kHz. Therefore from Eq. (5.60b)

The sampling interval must be less than 10μs. The sampling frequency is fs =1/T > 100 kHz. EXAMPLE 5.13 A discrete-time amplifier uses a sampling interval T=25 μs. What is the highest frequency of a signal that can be processed with this amplifier without aliasing?

From Eq. (5.60a)

[†] This may also be argued as follows. For BIBO-unstable systems, the zero-input response contains nondecaying natural mode terms of the form cos Ωn or γ n cos Ωn (γ > 1). Hence, the response of such a system to a sinusoid cos Ωn will contain not just the sinusoid

of frequency Ω but also nondecaying natural modes, rendering the concept of frequency response meaningless. Alternately, we can argue that when z = e jΩ, a BIBO-unstable system violates the dominance condition |γ i | < |e jΩ| for all i, where γi represents ith characteristic root of the system (see Section 4.3). [†] However, if Ω goes beyond π, the resulting aliasing reduces the apparent frequency to Ω < π. a [†] Figure 5.17 shows samples of two sinusoids cos 12πt and cos 2πt taken every 0.2 second. The corresponding discrete-time

frequencies (Ω=ωT=0.2ω) are cos 2.4π and cos 0.4π. The apparent frequency of 2.4π is 0.4π, identical to the discrete-time frequency corresponding to the lower sinusoid. This shows that the samples of both these continuous-time sinusoids at 0.2-second intervals are identical, as verified from Fig. 5.17. [†] In the case shown in Fig. 5.17, ω =12π, ω =2π, and T=0.2. Hence, ω − ω =10πT=2π, and the two frequencies are read as the 1 2 2 1

same frequency Ω=0.4π by the digital processor.

[†] Strictly speaking, we must have more than two samples per cycle.

5.6 FREQUENCY RESPONSE FROM POLE-ZERO LOCATION The frequency responses (amplitude and phase responses) of a system are determined by pole-zero locations of the transfer function H[z]. Just as in continuous-time systems, it is possible to determine quickly the amplitude and the phase response and to obtain physical insight into the filter characteristics of a discrete-time system by using a graphical technique. The general Nth-order transfer function H[z] in Eq. (5.34) can be expressed in factored form as

We can compute H[z] graphically by using the concepts discussed in Section 4.10. The directed line segment from z i to z in the complex plane (Fig. 5.18a) represents the complex number z − z i . The length of this segment is |z − z i | and its angle with the horizontal axis is ∠(z − z i ).

Figure 5.18: Vector representations of (a) complex numbers and (b) factors of H[z]. To compute the frequency response H[e jΩ] we evaluate H[z] at z = e jΩ. But for z = e jΩ, |z| = 1 and ∠z = Ω so that z = e jΩ represents a point on the unit circle at an angle Ω with the horizontal. We now connect all zeros (z 1 , z 2 , ..., z N) and all poles (y 1 , y 2 , ..., y N) to

the point e jΩ, as indicated in Fig. 5.18b. Let r 1 ,r 2 ,...,r N be the lengths and f1 f2 , ..., φ N be the angles, respectively, of the straight lines

connecting z 1 , z 2 , ..., z N to the point e jΩ. Similarly, let d 1 , d 2 ,..., d N be the lengths and ? 1 , ? 2 ,..., θN be the angles, respectively, of the

lines connecting y 1 , y 2 ,...,y N to e jΩ. Then

Therefore (assuming b 0 < 0)

and

In this manner, we can compute the frequency response H[e jΩ] for any value of Ω by selecting the point on the unit circle at an angle

Ω. This point is e jΩ. To compute the frequency response H[e jΩ], we connect all poles and zeros to this point and use the foregoing

equations to determine |H[e jΩ]| and ∠H[e jΩ]. We repeat this procedure for all values of Ω from 0 to π to obtain the frequency response.

CONTROLLING GAIN BY PLACEMENT OF POLES AND ZEROS The nature of the influence of pole and zero locations on the frequency response is similar to that observed in continuous-time systems, with minor differences. In place of the imaginary axis of the continuous-time systems, we have the unit circle in the discrete-time case. The nearer the pole (or zero) is to a point e jΩ (on the unit circle) representing some frequency Ω, the more influence that pole (or zero) wields on the amplitude response at that frequency because the length of the vector joining that pole (or zero) to the point e jΩ is small. The proximity of a pole (or a zero) has similar effect on the phase response. From Eq. (5.65a), it is clear that to enhance the amplitude response at a frequency Ω, we should place a pole as close as possible to the point e jΩ (which is on the unit circle). [†] Similarly, to suppress the amplitude response at a frequency Ω, we should place a zero as close as possible to the point e jΩ on the unit circle Placing repeated poles or zeros will further enhance their influence.

Total suppression of signal transmission at any frequency can be achieved by placing a zero on the unit circle at a point corresponding to that frequency. This observation is used in the notch (bandstop) filter design. Placing a pole or a zero at the origin does not influence the amplitude response because the length of the vector connecting the origin

to any point on the unit circle is unity. However, a pole (or a zero) at the origin adds angle −Ω (or Ω) to ∠H[e jΩ]. Hence, the phase spectrum −Ω (or Ω) is a linear function of frequency and therefore represents a pure time delay (or time advance) of T seconds (see Exercise E5.19). Therefore, a pole (a zero) at the origin causes a time delay (or a time advance) of T seconds in the response. There is no change in the amplitude response. For a stable system, all the poles must be located inside the unit circle. The zeros may lie anywhere. Also, for a physically realizable system, H[z] must be a proper fraction, that is, N ≥ M. If, to achieve a certain amplitude response, we require M > N, we can still make the system realizable by placing a sufficient number of poles at the origin to make N = M. This will not change the amplitude response, but it will increase the time delay of the response. In general, a pole at a point has the opposite effect of a zero at that point. Placing a zero closer to a pole tends to cancel the effect of that pole on the frequency response. LOWPASS FILTERS

A lowpass filter generally has a maximum gain at or near Ω = 0, which corresponds to point e j0 = 1 on the unit circle. Clearly, placing a

pole inside the unit circle near the point z = 1 (Fig. 5.19a) would result in a lowpass response. [†] The corresponding amplitude and

phase response appear in Fig. 5.19a. For smaller values of Ω, the point e jΩ (a point on the unit circle at an angle Ω) is closer to the

pole, and consequently the gain is higher. As Ω increases, the distance of the point e jω from the pole increases. Consequently the gain decreases, resulting in a lowpass characteristic. Placing a zero at the origin does not change the amplitude response but it does modify the phase response, as illustrated in Fig. 5.19b. Placing a zero at z = −1, however, changes both the amplitude and the phase

response (Fig. 5.19c). The point z = −1 corresponds to frequency Ω = π(z = e jΩ = e jπ = 1). Consequently, the amplitude response now becomes more attenuated at higher frequencies, with a zero gain at Ω = π. We can approach ideal lowpass characteristics by using more poles staggered near z = 1 (but within the unit circle). Figure 5.19d shows a third-order lowpass filter with three poles near z = 1 and a third-order zero at z = −1, with corresponding amplitude and phase response. For an ideal lowpass filter we need an enhanced gain at every frequency in the band (0, Ωc). This can be achieved by placing a continuous wall of poles (requiring an infinite number of poles) opposite this band.

Figure 5.19: Various pole-zero configurations and the corresponding frequency responses. HIGHPASS FILTERS A highpass filter has a small gain at lower frequencies and a high gain at higher frequencies. Such a characteristic can be realized by placing a pole or poles near z = −1 because we want the gain at Ω = π to be the highest. Placing a zero at z = 1 further enhances suppression of gain at lower frequencies. Figure 5.19e shows a possible pole-zero configuration of the third-order highpass filter with corresponding amplitude and phase responses. In the following two examples, we shall realize analog filters by using digital processors and suitable interface devices (C/D and D/C), as shown in Fig. 3.2. At this point we shall examine the design of a digital processor with the transfer function H[z] for the purpose of realizing bandpass and bandstop filters in the following examples. As Fig. 3.2 showed, the C/D device samples the continuous-time input x(t) to yield a discrete-time signal x[n], which serves as the input to H[z]. The output y[n] of H[z] is converted to a continuous-time signal y(t) by a D/C device. We also saw in Eq. (5.47) that a continuous-time sinusoid of frequency Ω, when sampled, results in a discrete-time sinusoid Ω = ωT. EXAMPLE 5.14: (Bandpass Filter) By trial and error, design a tuned (bandpass) analog filter with zero transmission at 0 Hz and also at the highest frequency fh = 500 Hz. The resonant frequency is required to be 125 Hz. Because fh = 500, we require T < 1/1000 [see Eq. (5.60b)]. Let us select T = 10 −3 .[†] Recall that the analog frequencies ω corresponds to digital frequencies Ω = ωt. Hence, analog frequencies ω = 0 and 1000π correspond to Ω = 0 and π, respectively. The

gain is required to be zero at these frequencies. Hence, we need to place zeros at e jΩ corresponding to Ω = 0 and Ω = π. For Ω = 0, z

= e jΩ = 1; for Ω = π, e jΩ = −1. Hence, there must be zeros at z = ± 1. Moreover, we need enhanced response at the resonant frequency ω = 250π, which corresponds to Ω = π /4, which, in turn, corresponds to z = e jΩ = e jπ/4 . Therefore, to enhance the

frequency response at ω = 250π, we place a pole in the vicinity of e jπ/4 . Because this is a complex pole, we also need its conjugate near e −jπ/4 , as indicated in Fig. 5.20a. Let us choose these poles γ 1 and γ 2 as

where |γ| < 1 for stability. The closer the γ is to the unit circle, the more sharply peaked is the response around ω = 250π. We also have zeros at ± 1. Hence

For convenience we shall choose K = 1. The amplitude response is given by

Now, by using Eq. (5.50), we obtain

Figure 5.20b shows the amplitude response as a function of ω, as well as Ω = ωT = 10 −3 ω for values of |γ| = 0.83, 0.96, and 1. As expected, the gain is zero at ω = 0 and at 500 Hz (ω =1000π). The gain peaks at about 125 Hz (ω =250π). The resonance (peaking) becomes pronounced as |γ| approaches 1. Figure 5.20c shows a canonical realization of this filter [see Eq. (5.66)].

Figure 5.20: Designing a bandpass filter. COMPUTER EXAMPLE C5.2 Use MATLAB to compute and plot the frequency response of the bandpass filter in Example 5.14 for the following cases: a. |γ| = 0.83 b. |γ| = 0.96 >> >> >> >> >> >> >> >> >> >> >> >> >>

c. |γ| = 0.99 Omega = linspace(-pi,pi,4097); g_mag = [0.83 0.96 0.99]; H = zeros(length(g_mag),length(Omega)); for m = 1:length(g_mag), H(m,:) = freqz ( [1 0 -1], [1 -sqrt (2) *g_mag (m) g_mag (m) ^2], Omega); end subplot(2,1,1); plot(Omega,abs(H(1,:)),'k-',... Omega,abs(H(2,:)),'k--',Omega,abs(H(3,:)),'k-.'); axis tight; xlabel('\Omega'); ylabel('|H[e^(j \Omega)]|'); legend('(a) | \gammal| = 0.83','(b) | \gammal| = 0.96','(c) |\gammal| = 0.99',0) subplot(2,1,2); plot(Omega,angle(H(1,:)),'k-',... Omega,angle(H(2,:)),'k--',Omega,angle(H(3,:)),'k-.'); axis tight; xlabel('\Omega'); ylabel('\angle H[e^(j \Omega)] [rad]'); legend('(a) |\gamma| = 0.83','(b) |\gamma| = 0.96','(c) |\gamma | = 0.99',0)

Figure C5.2 EXAMPLE 5.15: [Notch (Bandstop) Filter] Design a second-order notch filter to have zero transmission at 250 Hz and a sharp recovery of gain to unity on both sides of 250 Hz. The highest significant frequency to be processed is fh = 400 Hz. In this case, T < 1/2fh = 1.25 × 10 −3 . Let us choose T = 10 −3 . For the frequency 250 Hz, Ω = 2π(250)T = π/2. Thus, the frequency 250 Hz is represented by a point e jΩ = e jπ/2 = j on the unit circle, as depicted in Fig. 5.21a. Since we need zero transmission at this

frequency, we must place a zero at z = e jπ/2 = j and its conjugate at z = e −jπ/2 = −j. We also require a sharp recovery of gain on both sides of frequency 250 Hz. To accomplish this goal, we place two poles close to the two zeros, to cancel out the effect of the two zeros as we move away from the point j (corresponding to frequency 250 Hz). For this reason, let us use poles at ±ja with a < 1 for stability. The closer the poles are to zeros (the closer the a to 1), the faster is the gain recovery on either side of 250 Hz. The resulting transfer function is

The dc gain (gain at Ω = 0, or z = 1) of this filter is

Because we require a dc gain of unity, we must select K = (1 + a 2 )/2. The transfer function is therefore

and according to Eq. (5.50)

Figure 5.21b shows |H[e jΩ]| for values of a = 0.3, 0.6, and 0.95. Figure 5.21c shows a realization of this filter.

Figure 5.21: Designing a notch (bandstop) filter. EXERCISE E5.21 Use the graphical argument to show that a filter with transfer function

acts like a highpass filter. Make a rough sketch of the amplitude response. [†] The closest we can place a pole is on the unit circle at the point representing Ω. This choice would lead to infinite gain, but should

be avoided because it will render the system marginally stable (BIBO unstable). The closer the point to the unit circle, the more sensitive the system gain to parameter variations.

[†] Placing the pole at z = 1 results in maximum (infinite) gain, but renders the system BIBO unstable and hence should be avoided. [†] Strictly speaking, we need T < 0.001. However, we shall show in Chapter 8 that if the input does not contain a finite amplitude

component of 500 Hz, T = 0.001 is adequate. Generally practical signals satisfy this condition.

5.7 DIGITAL PROCESSING OF ANALOG SIGNALS An analog (meaning continuous-time) signal can be processed digitally by sampling the analog signal and processing the samples by a digital (meaning discrete-time) processor. The output of the processor is then converted back to analog signal, as shown in Fig. 5.22a. We saw some simple cases of such processing in Examples 3.6, 3.7, 5.14, and 5.15. In this section, we shall derive a criterion for designing such a digital processor for a general LTIC system. Suppose that we wish to realize an equivalent of an analog system with transfer function H a (s), shown in Fig. 5.22b. Let the digital processor transfer function in Fig. 5.22a that realizes this desired H a (s) be H[z]. In other words, we wish to make the two systems in Fig. 5.22 equivalent (at least approximately). By "equivalence" we mean that for a given input x(t), the systems in Fig. 5.22 yield the same output y(t). Therefore y(nT), the samples

of the output in Fig. 5.22b, are identical to y[n], the output of H[z] in Fig. 5.22a.

Figure 5.22: Analog filter realization with a digital filter. For the sake of generality, we are assuming a noncausal system. The argument and the results are also valid for causal systems. The output y(t) of the system in Fig. 5.22b is

For our purpose, it is convenient to use the notation T for δ τ in Eq. (5.69a). Assuming T (the sampling interval) to be small enough, such a change of notation yields

The response at the nth sampling instant is y(nT) obtained by setting t = nT in the equation is

In Fig. 5.22a, the input to H[z] is x(nT) = x[n]. If h[n] is the unit impulse response of H[z], then y[n], the output of H[z], is given by

If the two systems are to be equivalent, y(nT) in Eq. (5.69c) must be equal to y[n] in Eq. (5.70). Therefore

This is the time-domain criterion for equivalence of the two systems. [†] According to this criterion, h[n], the unit impulse response of H[z] in Fig. 5.22a, should be T times the samples of h a (t), the unit impulse response of the system in Fig. 5.22b. This is known as the impulse invariance criterion of filter design. Strictly speaking, this realization guarantees the output equivalence only at the sampling instants, that is, y(nT) = y[n], and that also requires the assumption that T → 0. Clearly, this criterion leads to an approximate realization of H a (s). However, it can be shown that

when the frequency response of |H a (jω)| is bandlimited, the realization is exact,[2] provided the sampling rate is high enough to avoid any aliasing (T < 1/2f h ). REALIZATION OF RATIONAL H(S) If we wish to realize an analog filter with transfer function

The impulse response h(t), given by the inverse Laplace transform of H a (s), is

The corresponding digital filter unit impulse response h[n], per Eq. (5.71), is

Figure 5.23 shows h a (t) and h[n] The corresponding H[z], the z-transform of h[n], as found from Table 5.1, is

Figure 5.23: Impulse response for analog and digital systems in the impulse invariance method of filter design. The procedure of finding H[z] can be systematized for any Nth-order system. First we express an Nth-order analog transfer function H a (s) as a sum of partial fractions as[†]

Then the corresponding H[z] is given by

This transfer function can be readily realized as explained in Section 5.4. Table 5.3 lists several pairs of H a (s) and their corresponding H[z]. For instance, to realize a digital integrator, we examine its H a (s) = 1/s. From Table 5.3, corresponding to H a (s) = 1/s (pair 2), we find H[z] = Tz/(z − 1). This is exactly the result we obtained in Example 3.7 using another approach. Note that H a (jω) in Eq. (5.72a) [or (5.74)] is not bandlimited. Consequently, all these realizations are approximate. CHOOSING THE SAMPLING INTERVAL T The impulse invariance criterion (5.71) was derived under the assumption that T → 0. Such an assumption is neither practical nor necessary for satisfactory design. Avoiding of aliasing is the most important consideration for the choice of T. In Eq. (5.60a), we showed that for a sampling interval T seconds, the highest frequency that can be sampled without aliasing is 1/2T Hz or π/T radians per second. This implies that H a (jω), the frequency response of the analog filter in Fig. 5.22b should not have spectral components beyond frequency π/T radians per second. In other words, to avoid aliasing, the frequency response of the system H a (s) must be bandlimited to π/T radians per second. We shall see later in Chapter 7 that frequency response of a realizable LTIC system cannot be bandlimited; that is, the response generally exists for all frequencies up to ∞. Therefore, it is impossible to digitally realize an LTIC system exactly without aliasing. The saving grace is that the frequency response of every realizable LTIC system decays with frequency. This allows for a compromise in digitally realizing an LTIC system with an acceptable level of aliasing. The smaller the value of T, the smaller the aliasing, and the better the approximation. Since it is impossible to make |H a (jω)| zero, we are satisfied with making it negligible beyond

the frequency π/T. As a rule of thumb,[3] we choose T such that |H a (jω)| at the frequency ω = π/T is less than a certain fraction (often taken as 1%) of the peak value of |H a (jω)|. This ensures that aliasing is negligible. The peak |H a (jω)| usually occurs at ω = 0 for lowpass filters and at the band center frequency ωc for bandpass filters. Table 5.3: (Unilateral) z-Transform Pairs Open table as spreadsheet No.

ha (t)

h[n]

H[z]

H a (s)

1

K

Kδ(t)

TKδ[n]

TK

2

u(t)

Tu[n]

3

t

nT 2

4

5

λt

λnT

e

Te

6

teλt

e nT 2 λ nT

7

Tre −at cos(bt + θ)

Tre −anT cos(bnT + θ)

EXAMPLE 5.16 Design a digital filter to realize a first-order lowpass Butterworth filter with the transfer function

For this filter, we find the corresponding H[z] according to Eq. (5.73)(or pair 5 in Table 5.3) as

Next, we select the value of T by means of the criterion according to which the gain at ω =/T drops to 1% of the maximum filter gain. However, this choice results in such a good design that aliasing is imperceptible. The resulting amplitude response is so close to the desired response that we can hardly notice the aliasing effect in our plot. For the sake of demonstrating the aliasing effect, we shall deliberately select a 10% criterion (instead of 1%). We have

In this case |H a (jω)|max = 1, which occurs at ω = 0. Use of 10% criterion leads to |H a (π/T)| = 0.1. Observe that

Hence,

Thus, the 10% criterion yields T = 10 −6 π. The 1% criterion would have given T = 10 −7 π. Substitution of T = 10 −6 π in Eq. (5.76) yields

A canonical realization of this filter is shown in Fig. 5.24a. To find the frequency response of this digital filter, we rewrite H[z] as

Therefore

Consequently

Figure 5.24: An example of filter design by the impulse invariance method: (a) filter realization, (b) amplitude response, and (c) phase response. This frequency response differs from the desired response H a (jω) because aliasing causes frequencies above π/T to appear as frequencies below π/T. This generally results in increased gain for frequencies below π/T. For instance, the realized filter gain at ω=0 is H[e j0 ]=H[1]. This value, as obtained from Eq. (5.77), is 1.1654 instead of the desired value 1. We can partly compensate for this

distortion by multiplying H[z] or H[e jωt ] by a normalizing constant K=H a (0)/H[1] = 1/1.1654 = 0.858. This forces the resulting gain of H[e jωt ] to be equal to 1 at ω = 0. The normalized H n [z] = 0.858H[z] = 0.858(0.1πz/(z − 0.7304)). The amplitude response in Eq.

(5.78a) is multiplied by K = 0.858 and plotted in Fig. 5.24b over the frequency range 0 ≤ ω ≤ π/T = 10 6 . The multiplying constant K has no effect on the phase response in Eq. (5.78b), which is shown in Fig. 5.24c. Also, the desired frequency response, according to Eq. (5.75) with ωc = 10 5 , is

Therefore

This desired amplitude and phase response are plotted (dotted) in Fig. 5.24b and 5.24c for comparison with realized digital filter

response. Observe that the amplitude response behavior of the analog and the digital filter is very close over the range ω ≤ ωc = 10 5 . However, for higher frequencies, there is considerable aliasing, especially in the phase spectrum. Had we used the 1% rule, the realized frequency response would have been closer over another decade of the frequency range. COMPUTER EXAMPLE C5.3 Using the MATLAB impinvar command, find the impulse invariance digital filter to realize the first-order analog Butterworth filter presented in Example 5.16. The analog filter transfer function is 10 5 /(s + 10 5 ) and the sampling interval is T = 10 −6 π. >> num=[0 10^5]; den=[1 10^5];

>> T = pi/10^6; Fs = 1/T; >> [b,a] = impinvar(num,den,Fs); >> tf(b,a,T) Transfer function: 0.3142 z --------z - 0.7304 Sampling time: 3.1416e-006 EXERCISE E5.22 Design a digital filter to realize an analog transfer function

Answers

[†] Because T is a constant, some authors ignore the factor T, which yields a simplified criterion h[n]=h (nT). Ignoring T merely scales a

the amplitude response of the resulting filter.

[2] Oppenheim, A. V., and R. W. Schafer. Discrete-Time Signal Processing, 2nd ed. Prentice-Hall, Upper Saddle River, NJ, 1999. [†] Assuming H (s) has simple poles. For repeated poles, the form changes accordingly. Entry 6 in Table 5.3 is suitable for repeated a

poles.

[3] Mitra, S. K. Digital Signal Processing, 2nd ed. McGraw-Hill, New York, 2001.

5.8 CONNECTION BETWEEN THE LAPLACE TRANSFORM AND THE z-TRANSFORM We now show that discrete-time systems also can be analyzed by means of the Laplace transform. In fact, we shall see that the ztransform is the Laplace transform in disguise and that discretetime systems can be analyzed as if they were continuous-time systems. So far we have considered the discrete-time signal as a sequence of numbers and not as an electrical signal (voltage or current). Similarly, we considered a discrete-time system as a mechanism that processes a sequence of numbers (input) to yield another sequence of numbers (output). The system was built by using delays (along with adders and multipliers) that delay sequences of numbers. A digital computer is a perfect example: every signal is a sequence of numbers, and the processing involves delaying sequences of numbers (along with addition and multiplication). Now suppose we have a discrete-time system with transfer function H[z] and input x[n]. Consider a continuous-time signal x(t) such

that its nth sample value is x[n], as shown in Fig. 5.25. [†] Let the sampled signal be x (t), consisting of impulses spaced T seconds apart with the nth impulse of strength x[n]. Thus

Figure 5.25 shows x[n] and the corresponding x (t). The signal x[n] is applied to the input of a discrete-time system with transfer function H[z], which is generally made up of delays, adders, and scalar multipliers. Hence, processing x[n] through H[z] amounts to operating on the sequence x[n] by means of delays, adders, and scalar multipliers. Suppose for x (t) samples, we perform operations identical to those performed on the samples of x[n] by H[z]. For this purpose, we need a continuous-time system with transfer function H(s) that is identical in structure to the discrete-time system H[z] except that the delays in H[z] are replaced by elements that delay continuous-time signals (such as voltages or currents). There is no other difference between realizations of H[z] and H(s). If a continuous-time impulse δ(t) is applied to such a delay of T seconds, the output will be δ(t − T). The continuous-time transfer function of such a delay is e −sT [see Eq. (4.46)]. Hence the delay elements with transfer function 1/z in the realization of H[z] will be replaced

by the delay elements with transfer function e sT in the realization of the corresponding H(s). This is same as z being replaced by e sT . Therefore H(s)=H[e sT ]. Let us now apply x[n] to the input of H[z] and apply x (t) at the input of H[e sT ]. Whatever operations are

performed by the discrete-time system H[z] on x[n] (Fig. 5.25a) are also performed by the corresponding continuous-time system

H[e sT ] on the impulse sequence x (t) (Fig. 5.25b). The delaying of a sequence in H[z] would amount to delaying of an impulse train in H[e sT ]. Adding and multiplying operations are the same in both cases. In other words, one-to-one correspondence of the two systems is preserved in every aspect. Therefore if y[n] is the output of the discrete-time system in Fig. 5.25a, then y (t), the output of the continuous-time system in Fig. 5.25b, would be a sequence of impulse whose nth impulse strength is y[n]. Thus

Figure 5.25: Connection between the Laplace transform and the z-transform. The system in Fig. 5.25b, being a continuous-time system, can be analyzed via the Laplace transform. If then

Also

Now because the Laplace transform of δ(t − nT) is e −snT

and

Substitution of Eqs. (5.82) and (5.83) in Eq. (5.81) yields

By introducing a new variable z=e sT , this equation can be expressed as

or

where

It is clear from this discussion that the z-transform can be considered to be the Laplace transform with a change of variable z=e sT or s=(1/T) In z. Note that the transformation z=e sT transforms the imaginary axis in the s plane (s=jω) into a unit circle in the z plane

(z=e sT =e jωT, or |z|=1) The LHP and RHP in the s plane map into the inside and the outside, respectively, of the unit circle in the z plane. [†] We can construct such x(t) from the sample values, as explained in Chapter 8.

5.9 THE BILATERAL z-TRANSFORM Situations involving noncausal signals or systems cannot be handled by the (unilateral) z-transform discussed so far. Such cases can be analyzed by the bilateral (or two-sided) z-transform defined in Eq. (5.1), as

As in Eq. (5.2), the inverse z-transform is given by

These equations define the bilateral z-transform. Earlier, we showed that

In contrast, the z-transform of the signal − γ n u[−(n + 1)], illustrated in Fig. 5.26a, is

Figure 5.26: (a) −γ n u[ −(n + 1)] and (b) the region of convergence (ROC) of its z-transform. Therefore

A comparison of Eqs. (5.84) and (5.85) shows that the z-transform of γ n u[n] is identical to that of −γ n u[−(n + 1)]. The regions of convergence, however, are different. In the former case, X[z] converges for |z| > |γ|;in the latter, X[z] converges for |z| < |γ|(see Fig. 5.26b). Clearly, the inverse transform of X[z] is not unique unless the region of convergence is specified. If we add the restriction that

all our signals be causal, however, this ambiguity does not arise. The inverse transform of z/(z − γ) is γ n u[n] even without specifying the ROC. Thus, in the unilateral transform, we can ignore the ROC in determining the inverse z-transform of X[z]. As in the case the bilateral Laplace transform, if x[n]=Σk i=1 x i [n], then the ROC for X[z] is the intersection of the ROCs (region common to all ROCs) for the transforms X1 [z], X2 [z],...,Xk [z]. The preceding results lead to the conclusion (similar to that for the Laplace transform) that if z=β is the largest magnitude pole for a causal sequence, its ROC is |z| > |β|. If z=α is the smallest magnitude nonzero pole for an anticausal sequence, its ROC is |z| < |α|. REGION OF CONVERGENCE FOR LEFT-SIDED AND RIGHT-SIDED SEQUENCES Let us first consider a finite duration sequence x f [n], defined as a sequence that is nonzero for N 1 ≤ n ≤ N 2 , where both N 1 and N 2 are finite numbers and N 2 > N 1 . Also

For example, if N 1 =−2 and N 2 =1, then

Assuming all the elements in x f [n] are finite, we observe that Xf [z] has two poles at z=∞ because of terms x f [−2]z 2 + x f [−1]z and one pole at z=0 because of term x f [1]/z. Thus, a finite duration sequence could have poles at z=0 and z=∞. Observe that Xf [z] converges for all values of z except possibly z=0 and z = ∞. This means that the ROC of a general signal x[n] + x f [n] is the same as the ROC of x[n] with the possible exception of z=0 and z=∞. A right-sided sequence is zero for n < N 2 < ∞ and a left-sided sequence is zero for n > N 1 > − ∞. A causal sequence is always a right-sided sequence, but the converse is not necessarily true. An anticausal sequence is always a left-sided sequence, but the converse is not necessarily true. A two-sided sequence is of infinite duration and is neither right sided nor left sided. A right-sided sequence x r[n] can be expressed as x r[n]=x c [n] + x f [n], where x c [n] is a causal signal and x f [n] is a finite duration signal. Therefore, the ROC for x r[n] is the same as the ROC for x c [n] except possibly z=∞. If z=β is the largest magnitude pole for a rightsided sequence x r[n], its ROC is |β| < |z| ≤ ∞. Similarly, a left-sided sequence can be expressed as x 1 [n]=x a [n] + x f [n], where x a [n] is an anticausal sequence and x f [n] is a finite duration signal. Therefore, the ROC for x 1 [n] is the same as the ROC for x a [n] except possibly z=0. Thus, if z=α is the smallest magnitude nonzero pole for a left-sided sequence, its ROC is 0 ≤ |z| 2 b. |z| < 0.8 c. 0.8 < |z| < 2 (a)

and

Since the ROC is |z| > 2, both terms correspond to causal sequences and This sequence appears in Fig. 5.28a.

Figure 5.28: Three possible inverse transforms of X[z]. (b) In this case, |z| < 0.8, which is less than the magnitudes of both poles. Hence, both terms correspond to anticausal sequences, and This sequence appears in Fig. 5.28b. (c) In this case, 0.8 < |z| < 2; the part of X[z] corresponding to the pole at 0.8 is a causal sequence, and the part corresponding to the pole at 2 is an anticausal sequence: This sequence appears in Fig. 5.28c. EXERCISE E5.23 Find the inverse z-transform of

Answers INVERSE TRANSFORM BY EXPANSION OF X[Z] IN POWER SERIES OF Z We have

For an anticausal sequence, which exists only for n ≤ −1, this equation becomes We can find the inverse z-transform of X[z] by dividing the numerator polynomial by the denominator polynomial, both in ascending powers of z, to obtain a polynomial in ascending powers of z. Thus, to find the inverse transform of z/(z − 0.5) (when the ROC is |z| < 0.5), we divide z by −0.5 + z to obtain −2z - 4z 2 - 8z 3 - ... Hence, x[−1]=−2, x[−2]=−4, x[−3]=−8, and so on.

5.9-1 Properties of the Bilateral z-Transform Properties of the bilateral z-transform are similar to those of the unilateral transform. We shall merely state the properties here, without Xi [z] proofs, for x i [n] LINEARITY The ROC for a 1 X1 [z] + a 2 X2 [z] is the region common to (intersection of) the ROCs for X1 [z] and X2 [z]

SHIFT

The ROC for X[z]/z m is the ROC for X[z] (except for the addition or deletion of z=0 or z=∞ caused by the factor 1/z m . CONVOLUTION The ROC for X1 [z]X2 [z] is the region common to (intersection of) the ROCs for X1 [z] and X2 [z]. MULTIPLICATION BY γ n

If the ROC for X[z] is |γ 1 | < |z| < |γ 2 |, then the ROC for X[z/γ] is |γγ 1 | < |z| < |γγ 2 |, indicating that the ROC is scaled by the factor |γ|. MULTIPLICATION BY n

The ROC for −z(dX/dz) is the same as the ROC for X[z]. TIME REVERSAL[†] If the ROC for X[z]is |γ| < |z| < |γ| 2 | then the ROC for X[1/z] is 1/γ 1 > |z| > |1/γ 2 |

5.9-2 Using the Bilateral z-Transform for Analysis of LTID Systems Because the bilateral z-transform can handle noncausal signals, we can use this transform to analyze noncausal linear systems. The zero-state response y[n] is given by provided X[z]H[z] exists. The ROC of X[z]H[z] is the region in which both X[z] and H[z] exist, which means that the region is the common part of the ROC of both X[z] and H[z]. EXAMPLE 5.19 For a causal system specified by the transfer function

find the zero-state response to input

The ROC corresponding to the causal term is |z| > 0.8, and that corresponding to the anticausal term is |z| < 2. Hence, the ROC for X[z] is the common region, given by 0.8 < |z| < 2. Hence

Therefore

Since the system is causal, the ROC of H[z] is |z| > 0.5. The ROC of X[z] is 0.8 < |z| < 2. The common region of convergence for X[z] and H[z] is 0.8 < |z| < 2. Therefore

Expanding Y[z] into modified partial fractions yields

Since the ROC extends outward from the pole at 0.8, both poles at 0.5 and 0.8 correspond to causal sequence. The ROC extends in ward from the pole at 2. Hence, the pole at 2 corresponds to anticausal sequence. Therefore

EXAMPLE 5.20 For the system in Example 5.19, find the zero-state response to input

The z-transforms of the causal and anticausal components x 1 [n] and x 2 [n] of the output are

Observe that a common ROC for X1 [z] and X2 [z] does not exist. Therefore X[z] does not exist. In such a case we take advantage of the superposition principle and find y 1 [n] and y 2 [n], the system responses to x 1 [n] and x 2 [n], separately. The desired response y[n] is the sum of y 1 [n] and y 2 [n]. Now

Expanding Y1 [z] and Y2 [z] into modified partial fractions yields

Therefore

and

EXERCISE E5.24 For a causal system in Example 5.19, find the zero-state response to input

Answers

[†] For complex signal x[n], the property is modified, as follows:

5.10 SUMMARY In this chapter we discussed the analysis of linear, time-invariant, discrete-time (LTID) systems by means of the z-transform. The ztransform changes the difference equations of LTID systems into algebraic equations. Therefore, solving these difference equations reduces to solving algebraic equations. The transfer function H[z] of an LTID system is equal to the ratio of the z-transform of the output to the z-transform of the input when all initial conditions are zero. Therefore, if X[z] is the z-transform of the input x[n] and Y[z] is the z-transform of the corresponding output y[n] (when all initial conditions are zero), then Y[z]=H[z]X[z]. For an LTID system specified by the difference equation Q[E]y[n]=P[E]x[n], the transfer function H[z]=P[z]/Q[z]. Moreover, H[z] is the z-transform of the system impulse response h[n]. We

showed in Chapter 3 that the system response to an everlasting exponential z n is H[z]z n .

We may also view the z-transform as a tool that expresses a signal x[n] as a sum of exponentials of the form z n over a continuum of the values of z. Using the fact that an LTID system response to z n is H[z]z n , we find the system response to x[n] as a sum of the

system's responses to all the components of the form z n over the continuum of values of z.

LTID systems can be realized by scalar multipliers, adders, and time delays. A given transfer function can be synthesized in many different ways. We discussed canonical, transposed canonical, cascade, and parallel forms of realization. The realization procedure is identical to that for continuous-time systems with 1/s (integrator) replaced by 1/z (unit delay). In Section 5.8, we showed that discrete-time systems can be analyzed by the Laplace transform as if they were continuous-time systems. In fact, we showed that the z-transform is the Laplace transform with a change in variable. The majority of the input signals and practical systems are causal. Consequently, we are required to deal with causal signals most of the time. Restricting all signals to the causal type greatly simplifies z-transform analysis; the ROC of a signal becomes irrelevant to the analysis process. This special case of z-transform (which is restricted to causal signals) is called the unilateral z-transform. Much of the chapter deals with this transform. Section 5.9 discusses the general variety of the z-transform (bilateral z-transform), which can handle causal and noncausal signals and systems. In the bilateral transform, the inverse transform of X[z] is not unique, but depends on the ROC of X[z]. Thus, the ROC plays a crucial role in the bilateral z-transform.

REFERENCES 1. Lyons, R. G. Understanding Digital Signal Processing. Addison-Wesley, Reading, MA, 1997. 2. Oppenheim, A. V., and R. W. Schafer. Discrete-Time Signal Processing, 2nd ed. Prentice-Hall, Upper Saddle River, NJ, 1999. 3. Mitra, S. K. Digital Signal Processing, 2nd ed. McGraw-Hill, New York, 2001.

MATLAB SESSION 5: DISCRETE-TIME IIR FILTERS Recent technological advancements have dramatically increased the popularity of discrete-time filters. Unlike their continuous-time counterparts, the performance of discrete-time filters is not affected by component variations, temperature, humidity, or age. Furthermore, digital hardware is easily reprogrammed, which allows convenient change of device function. For example, certain digital hearing aids are individually programmed to match the required response of a user. Typically, discrete-time filters are categorized as infinite-impulse response (IIR) or finiteimpulse response (FIR). A popular method to obtain a discrete-time IIR filter is by transformation of a corresponding continuous-time filter design. MATLAB greatly assists this process. Although discrete-time IIR filter design is the emphasis of this session, methods for discrete-time FIR filter design are considered in MATLAB Session 9.

M5.1 Frequency Response and Pole-Zero Plots Frequency response and pole-zero plots help characterize filter behavior. Similar to continuoustime systems, rational transfer functions for realizable LTID systems are represented in the z-domain as

When only the first (N 1 + 1) numerator coefficients are nonzero and only the first (N 2 + 1) denominator coefficients are nonzero, Eq. (M5.1) simplifies to

The form of Eq. (M5.2) has many advantages. It can be more efficient than Eq. (M5.1); it still works when N 1 =N 2 =N; and it more closely conforms to the notation of built-in MATLAB discrete-time signal processing functions. The right-hand side of Eq. (M5.2) is a form that is convenient for MATLAB computations. The frequency response H(e jΩ) is obtained by

letting z=e jΩ, where Ω. has units of radians. Often, Ω=ωT, where ω is the continuous-time frequency in radians per second and T is the sampling period in seconds. Defining length-(N 2 + 1) coefficient vector A=[a 0 , a 1 ,...,a N2 ] and length-(N 1 + 1) coefficient vector B=[b 0 , b 1 ,..., b N1 ], program MS 5P1 computes H(e jΩ) by using Eq. (M5.2) for each frequency in the input vector Ω. function [H]=MS5P1 (B,A,Omega); % MS5P1.m : MATLAB Session 5, Program 1 % Function M-file computes frequency response for LTID systems % INPUTS: B=vector of feedforward coefficients % A=vector of feedback coefficients % Omega=vector of frequencies [rad], typically - pi=pi % OUTPUTS: H=frequency response N_1=length(B)-1; N_2=length(A)-1; H=polyval(B,exp(j*Omega))./polyval(A,exp(j*Omega)).*exp(j*Omega*(N 2-N 1)); Note that owing to MATLAB's indexing scheme, A(k) corresponds to coefficient a k−1 and B(k) corresponds to coefficient b k−1 . It is also possible to use the signal processing toolbox function freqz to evaluate the frequency response of a system described by Eq. (M5.2). Under special circumstances, the control system toolbox function bode can also be used. Program MS5P2 computes and plots the poles and zeros of an LTID system described by Eq. (M5.2) again using vectors B and A. function [p,z]=MS5P2(B,A); % MS5P2.m : MATLAB Session 5, Program 2 % Function M-file computes and plots poles and zeros for LTID systems % INPUTS: B=vector of feedforward coefficients % A=vector of feedback coefficients N_1=length(B)-1; N_2=length(A)-1; p=roots ([A, zeros (1,N_1-N_2)]); z=roots([B, zeros(1,N_2-N_1)]); ucirc=exp(j*linspace(0,2*pi,200)); % Compute unit circle for pole-zero plot plot(real(p),imag(p), 'xk',real (z),imag(z), 'ok',real(ucirc), imag(ucirc),'k:'); xlabel('Real'); ylabel('Imaginary'); ax=axis; dx=0.05*(ax(2)-ax(1)); dy=0.05 * (ax(4)-ax (3)); axis(ax+[-dx,dx,-dy,dy]);

The right-hand side of Eq. (M5.2) helps explain how the roots are computed. When N 1 ≠ N 2 , the term z N2 −N1 implies additional roots at the origin. If N 1 > N 2 , the roots are poles, which are added by concatenating A with zeros (N_1-N_2, 1); since N 2 − N 2 N 1 ≤ 0, zeros (N_2-N_1,1) produces the empty set and B is unchanged. If N 2 > N 1 , the roots are zeros, which are added by concatenating B with zeros (N_2-N_1,1); since N 1 − N 2 ≤ 0, zeros (N_1-N_2,1) produces the empty set and A is unchanged. Poles and zeros are indicated with black x's and o's, respectively. For visual reference, the unit circle is also plotted. The last line in MS5P2 expands the plot axis box so that root locations are not obscured.

M5.2 Transformation Basics Transformation of a continuous-time filter to a discrete-time filter begins with the desired continuous-time transfer function

As a matter of convenience, H(s) is represented in factored form as

where z k and p k are the system poles and zeros, respectively. A mapping rule converts the rational function H(s) to a rational function H[z]. Requiring that the result be rational ensures that the system realization can proceed with only delay, sum, and multiplier blocks. There are many possible mapping rules. For obvious reasons, good transformations tend to map the ω axis to the unit circle, ω=0 to z=1, ω=∞ to z=−1, and the left half-plane to the interior of the unit circle. Put another way, sinusoids map to sinusoids, zero frequency maps to zero frequency, high frequency maps to high frequency, and stable systems map to stable systems. Section 5.8 suggests that the z-transform can be considered to be a Laplace transform with a change of variable z=e sT or s=(1/T) In z, where T is the sampling interval. It is tempting, therefore, to convert a continuous-time filter to a discrete-time filter by substituting

s=(1/T) In z into H(s), or H[z]=H(s)| s=1/T)ln z . Unfortunately, this approach is impractical since the resulting H[z] is not rational and therefore cannot be implemented by using standard blocks. Although not considered here, the so-called matched-z transformation relies on the relationship z=e sT to transform system poles and zeros, so the connection is not completely without merit.

M5.3 Transformation by First-Order Backward Difference Consider the transfer function H(s)=Y(s)/X(s)=s, which corresponds to the first-order continuous-time differentiator

An approximation that resembles the fundamental theorem of calculus is the first-order backward difference

For sampling interval T and t=nT, the corresponding discrete-time approximation is

which has transfer function

This implies a transformation rule that uses the change of variable s=(1 − z −1 )/T or z=1/(1 − sT). This transformation rule is appealing since the resulting H[z] is rational and has the same number of poles and zeros as H(s). Section 3.4 discusses this transformation strategy in a different way in describing the kinship of difference equations to differential equations. After some algebra, substituting s=(1 − z −1 )/T into Eq. (M5.3) yields

The discrete-time system has M zeros at 1/(1 − Tz k ) and N poles at 1/(1 − Tp k ). This transformation rule preserves system stability but does not map the ω axis to the unit circle (see Prob. 5.7-9). MATLAB program MS5P3 uses the first-order backward difference method of Eq. (M5.4) to convert a continuous-time filter described by coefficient vectors A=[a 0 , a 1 ,...,a N] and B=[b N-M , b N-M+ 1 ,...,b N] into a discrete-time filter. The form of the discrete-time filter follows Eq. (M5.2). function [Bd,Ad]=MS5P3(B,A,T); % MS5P3.m : MATLAB Session 5, Program 3 % Function M-file first-order backward difference transformation % of a continuous-time filter described by B and A into a discrete-time filter. % INPUTS: B=vector of continuous-time filter feedforward coefficients % A=vector of continuous-time filter feedback coefficients % T=sampling interval % OUTPUTS: Bd=vector of discrete-time filter feedforward coefficients % Ad=vector of discrete-time filter feedback coefficients z=roots(B); p=roots(A); % s-domain roots gain=B(1)/A(1)*prod(1/T-z)/prod(1/T-p); zd=1./(1-T*z); pd=1./(1-T*p); % z-domain roots Bd=gain * poly(zd); Ad=poly(pd);

M5.4 Bilinear Transformation The Bilinear transformation is based on a better approximation than first-order backward differences. Again, consider the continuoustime integrator

Represent signal x(t) as

Letting t=nT and replacing the integral with a trapezoidal approximation yields

Substituting y(t) for (d/dt)x(t), the equivalent discrete-time system is

From z-transforms, the transfer function is

The implied change of variable s=2(1 − z −1 )/T(1 + z −1 ) or z=(1 + sT/2)/(1 − sT/2) is called the bilinear transformation. Not only does the bilinear transformation result in a rational function H[z], the ω-axis is correctly mapped to the unit circle (see Prob. 5.6-11a). After some algebra, substituting s=2(1 − z −1 )/T(1 + z −1 ) into Eq. (M5.3) yields

In addition to the M zeros at (1 + z k T/2)/(1 − z k T/2) and N poles at (1 + p k T/2)/(1 − p k T/2), there are N − M zeros at minus one. Since practical continuous-time filters require M ≤ N for stability, the number of added zeros is thankfully always nonnegative. MATLAB program MS5P4 converts a continuous-time filter described by coefficient vectors A=[a 0 , a 1 ,...,a N] and B=[b N-M b N-M+1,...,b N] into a discrete-time filter by using the bilinear transformation of Eq. (M5.5). The form of the discrete-time filter follows Eq. (M5.2). If available, it is also possible use the signal processing toolbox function bilinear to perform the bilinear transformation. function [Bd,Ad]=MS5P4(B,A,T); % MS5P4.m : MATLAB Session 5, Program 4 % Function M-file bilinear transformation of a continuous-time filter % described by vectors B and A into a discrete-time filter. % Length of B must not exceed A. % INPUTS: B=vector of continuous-time filter feedforward coefficients % A=vector of continuous-time filter feedback coefficients % T=sampling interval % OUTPUTS: Bd=vector of discrete-time filter feedforward coefficients % Ad=vector of discrete-time filter feedback coefficients if (length(B) > length(A)), disp ('Numerator order must not exceed denominator order.); return end z=roots(B); p=roots(A); % s-domain roots gain=real (B(1)/A(1)*prod(2/T-z)/prod(2/T-p)); zd=(1+z*T/2)./(1-z*T/2); pd=(1+p*T/2)./(1-p*T/2); % z-domain roots Bd=gain*poly([zd;-ones(length(A)-length(B),1)]); Ad=poly(pd); As with most high-level languages, MATLAB supports general if-structures: if expression, statements; elseif expression, statements; else, statements; end In this program, the if statement tests M > N. When true, an error message is displayed and the return command terminates program execution to prevent errors.

M5.5 Bilinear Transformation with Prewarping The bilinear transformation maps the entire infinite-length ω axis onto the finite-length unit circle (z=e iΩ) according to ω=(2/T) tan (Ω/2) (see Prob. 5.6-11b). Equivalently, Ω=2 arctan (ωT/2). The nonlinearity of the tangent function causes a frequency compression, commonly called frequency warping, that distorts the transformation. To illustrate the warping effect, consider the bilinear transformation of a continuous-time lowpass filter with cutoff frequency ωc =2π3000 rad/s. If the target digital system uses a sampling rate of 10kHz, then T=1/(10,000) and ωc maps to Ω c =2 arctan (ωc T/2)=1.5116. Thus, the transformed cutoff frequency is short of the desired Ω c =ωc T=0.6π=1.8850. Cutoff frequencies are important and need to be as accurate as possible. By adjusting the parameter T used in the bilinear transform, one continuous-time frequency can be exactly mapped to one discrete-time frequency; the process is called prewarping. Continuing the

last example, adjusting T=(2/ωc ) tan (Ω c /2) ≈ 1/6848 achieves the appropriate prewarping to ensure ωc =2π3000 maps to Ω c =0.6π.

M5.6 Example: Butterworth Filter Transformation To illustrate the transformation techniques, consider a continuous-time 10th-order Butterworth lowpass filter with cutoff frequency ωc =2π3000, as designed in MATLAB Session 4. First, we determine continuous-time coefficient vectors A and B. >> >> >> >>

omega.c=2*pi*3000; N=10; poles=roots([(j*omega.c)^(-2*N), zeros(1,2*N-1),1]); poles=poles(find(poles> Omega=linspace(0,pi,200); T=1/10000; Omega.c=omega=c*T; >> [B1,A1]=MS5P3(B,A,T); % First-order backward difference transformation >> [B2,A2]=MS5P4(B,A,T); % Bilinear transformation >> [B3,A3]=MS5P4 (B,A,2/omega=c*tan (Omega=c/2)) ; % Bilinear with prewarping Magnitude responses are computed by using MS5P1 and then plotted. >> Hlmag=abs(MS5P1(B1,A1,Omega)); >> H2mag=abs(MS5P1(B2,A2,Omega)); >> H3mag=abs(MS5P1(B3,A3,Omega)); >> plot(Omega,(Omega> axis([0 pi -.05 1.5]); >> xlabel('/Omega [rad]'); ylabel('Magnitude Response'); >> legend('Ideal','First-Order Backward Difference',... 'Bilinear','Bilinear with Prewarping'); The result of each transformation method is shown in Fig. M5.1.

Figure M5.1: Comparison of various transformation techniques. Although the first-order backward difference results in a lowpass filter, the method causes significant distortion that makes the resulting filter unacceptable with regard to cutoff frequency. The bilinear transformation is better, but, as predicted, the cutoff frequency falls short of the desired value. Bilinear transformation with prewarping properly locates the cutoff frequency and produces a very acceptable filter response.

M5.7 Problems Finding Polynomial Roots Numerically, it is difficult to accurately determine the roots of a polynomial. Consider, for example, a simple polynomial that has a root at minus one repeated four times, (s + 1) 4 =s 4 + 4s 3 + 6s 2 + 4s + 1. The MATLAB roots command returns a surprising result: >> roots ([1 4 6 4 1]) ans= -1.0002 -1.0000 -0.0002i -1.0000 + 0.0002i -0.9998 Even for this low-degree polynomial, MATLAB does not return the true roots. The problem worsens as polynomial degree increases. The bilinear transformation of the 10th-order Butterworth filter, for example, should have 10 zeros at minus one. Figure M5.2 shows that the zeros, computed by MS5P2 with the roots command, are not correctly located.

Figure M5.2: Pole-zero plot computed by using roots. When possible, programs should avoid root computations that may limit accuracy. For example, results from the transformation programs MS5P3 and MS5P4 are more accurate if the true transfer function poles and zeros are passed directly as inputs rather than the polynomial coefficient vectors. When roots must be computed, result accuracy should always be verified.

M5.8 Using Cascaded Second-Order Sections to Improve Design The dynamic range of high-degree polynomial coefficients is often large. Adding the difficulties associated with factoring a high-degree polynomial, it is little surprise that high-order designs are difficult. As with continuous-time filters, performance is improved by using a cascade of second-order sections to design and realize a discretetime filter. Cascades of second-order sections are also more robust to the coefficient quantization that occurs when discrete-time filters are implemented on fixed-point digital hardware. To illustrate the performance possible with a cascade of second-order sections, consider a 180th-order transformed Butterworth discrete-time filter with cutoff frequency Ω c =0.6 π ≈ 1.8850. Program MS5P5 completes this design, taking care to initially locate poles and zeros without root computations. % MS5P5.m : MATLAB Session 5, Program 5 % Script M-file designs a 180th-order Butterworth lowpass discrete-time filter % with cutoff Omega.c=0.6*pi using 90 cascaded second-order filter sections. omega_0=1; % Use normalized cutoff frequency for analog prototype psi=[0.5:1:90]*pi/180; % Butterworth pole angles Omega.c=0.6*pi; % Discrete-time cutoff frequency Omega=linspace(0,pi,1000); % Frequency range for magnitude response Hmag=zeros(90,1000); p=zeros(1,180); z=zeros(1,180); % Pre-allocation for stage=1:90, Q=1/(2*cos (psi (stage))); % Compute Q for stage B = omega_0^2; A=[1 omega_0/Q omega_0^2]; % Compute stage coefficients [B1,A1]=MS5P4 (B,A, 2/omega_0*tan(0.6*pi/2)); % Transform stage to DT p(stage*2-1:stage*2)=roots(A1); % Compute z-domain poles for stage z(stage*2-1:stage*2)=roots(B1); % Compute z-domain zeros for stage Hmag(stage,:)=abs(MS5P1(B1,A1,Omega)); % Compute stage mag response end ucirc=exp(j*linspace(0,2*pi,200)); % Compute unit circle for pole-zero plot figure; plot(real(p),imag(p),'kx',real(z),imag(z),'ok',real(ucirc),imag(ucirc), 'k:'); axis equal; xlabel('Real'); ylabel('Imaginary'); figure; plot(Omega,Hmag,'k'); axis tight xlabel('\Omega [rad]'); ylabel('Magnitude Response'); figure; plot(Omega,prod(Hmag),'k'); axis([0 pi -0.05 1.05]); xlabel('\Omega [rad]'); ylabel('Magnitude Response'); The figure command preceding each plot command opens a separate window for each plot. The filter's pole-zero plot is shown in Fig. M5.3, along with the unit circle, for reference. All 180 zeros of the cascaded design are properly located at minus one. The wall of poles provides an amazing approximation to the desired brick-wall response, as shown by the magnitude response in Fig. M5.4. It is virtually impossible to realize such high-order designs with continuous-time filters, which adds another reason for the popularity of discrete-time filters. Still, the design is not trivial; even functions from the MATLAB signal processing toolbox fail to properly design such a high-order discrete-time Butterworth filter!

Figure M5.3: Pole-zero plot for 180th-order discrete-time Butterworth filter.

Figure M5.4: Magnitude response for a 180th-order discrete-time Butterworth filter.

PROBLEMS 5.1.1

5.1.2

Using the definition, compute the z-transform of x[n] = (−1) n (u[n] − u[n − 8]). Sketch the poles and zeros of X(z) in the z plane. No calculator is needed to do this problem! Using the definition of the z-transform, find the z-transform and the ROC for each of the following signals. a. u[n − m] b. γ n sin π nu[n] c. γ n cos π nu[n] d. e.

f. g. γ n−1 u[n−1] h. nγ n u[n]

i. nu[n] j. k. [2n−1 − (−2) n−1 ]u[n] l.

5.1.3

5.1.4

Showing all work, evaluate Σ∞n=0 n(3/2)−n Using only the z-transforms of Table 5.1, determine the z-transform of each of the following signals. a. u[n] − u[n − 2] b. γ n−2 u[n−2] c. 2 n+1 u[n − 1] + e n−1 u[n] d. e. nγ n u[n − 1] f. n(n − 1)(n − 2) 2 n −3 u[n − m] for m = 0,1,2,3 g. (− 1) n nu[n]

5.1.5

h. Find the inverse z-transform of the following: a.

b.

c.

d.

e.

f.

g.

h.

i.

j.

k.

l.

5.1.6

a. Expanding X[z] as a power series in z −1 , find the first three terms of x[n] if

b. Extend the procedure used in part (a) to find the first four terms of x[n] if

5.1.7

5.1.8

Find x[n] by expanding

as a power series in z −1 . a. In Table 5.1, if the numerator and the denominator powers of X[z] are M and N, respectively, explain why in some cases N − M = 0, while in others N − M − 1 or N − M = m (m any positive integer). b. Without actually finding the z-transform, state what is N − M for X[z] corresponding to x[n] = y n u[n − 4]

5.2.1

For a discrete-time signal shown in Fig. P5.2-1 show that

Figure P5.2-1

5.2.2

Find your answer by using the definition in Eq. (5.1) and by using Table 5.1 and an appropriate property of the ztransform. Find the z-transform of the signal illustrated in Fig. P5.2-2. Solve this problem in two ways, as in Examples 5.2d and 5.4. Verify that the two answers are equivalent.

Figure P5.2-2

5.2.3

Using only the fact that y n u[n] following:

z/(z − y) and properties of the z-transform, find the z-transform of each of the

a. n 2 u[n] b. n 2 y n u[n] c. n 3 u[n] d. a n [u[n] − u[n − m]] e. ne −2n u[n − m]

5.2.4

5.2.5

5.2.6

5.2.7

f. (n − 2) (0.5)n−3 u[n − 4] Using only pair 1 in Table 5.1 and appropriate properties of the z-transform, derive iteratively pairs 2 through 9. In other words, first derive pair 2. Then use pair 2 (and pair 1, if needed) to derive pair 3, and so on. Find the z-transform of cos (πn/4) u[n] using only pairs 1 and 1 lb in Table 5.1 and a suitable property of the ztransform. Apply the time-reversal property to pair 6 of Table 5.1 to show that y n u[/(n + 1)] |z| < |y|. a. If x[n]

X[z], then show that (−1) n x[n]

b. Use this result to show that (−y) n u[n]

−z/(z-y) and the ROC is given by

X[ − z]. z/(z + y).

c. Use these results to find the z-transform of i. [2n−1 − (−2) n−1 ]u[n] ii. y n cos πnu[n]

5.2.8

5.2.9

a. If x[n]

X[z], then show that

b. Use this result to derive pair 2 from pair 1 in Table 5.1. A number of causal time-domain functions are shown in Fig. P5.2-9.

Figure P5.2-9: Various causal time-domain functions. List the function of time that corresponds to each of the following functions of z. Few or no calculations are necessary! Be careful, the graphs may be scaled differently.

a.

b.

c.

d.

e.

f.

g.

h. i.

j. 5.3.1

5.3.2

Solve Prob. 3.8-16 by the z-transform method. a. Solve when y[0] = 1 and x[n] = e −(n−1)u[n]

5.3.3

b. Find the zero-input and the zero-state components of the response. a. Find the output y[n] of an LTID system specified by the equation

if the initial conditions are y[−1] = 0, y[−2] = 1, and the input x[n] = (4)−n =u[n]. b. Find the zero-input and the zero-state components of the response.

5.3.4

5.3.5

c. Find the transient and the steady-state components of the response. Solve Prob. 5.3-3 if instead of initial conditions y[−1], y[−2] you are given the auxiliary conditions y[0] = 3/2 and y[1] = 35/4. a. Solve with y[−1] = 0, y[−2] = 1, and x[n] = u[n]. b. Find the zero-input and the zero-state components of the response.

5.3.6

5.3.7

5.3.8

5.3.9

5.3.10

5.3.11

c. Find the transient and the steady-state components of the response. Solve if y[−1] = 2y[−2] = 3, and x[n] = (3)n u[n]. Solve with y[−1] = 1, y[−2] = 0, and x[n] = u[n]. Solve

with y[0] = 0, y[1] = 1, and x[n] = e n u[n]. A system with impulse response h[n] = 2(⅓) n u[n − 1] produces an output y[n] = (−2) n u[n − 1]. Determine the corresponding input x[n]. Sally deposits $100 into her savings account on the first day of every month except for each December, when she uses her money to buy holiday gifts. Define b[m] as the balance in Sally's account on the first day of month m. Assume Sally opens her account in January (m = 0), continues making monthly payments forever (except each December!), and that her monthly interest rate is 1%. Sally's account balance satisfies a simple difference equation b[m] = (1.01)b[m − 1] + p[m], where p[m] designates Sally's monthly deposits. Determine a closed-form expression for b[m] that is only a function of the month m. For each impulse response, determine the number of system poles, whether the poles are real or complex, and whether the system is BIBO stable. a. h 1 [n] = (−1 + (0.5)n )u[n]

5.3.12

5.3.13

5.3.14

b. h 2 [n] = (j) n (u[n] − u[n−10]) Find the following sums:

[Hint: Consider a system whose output y[n] is the desired sum. Examine the relationship between y[n] and y[n - 1]. Note also that y[0] = 0.] Find the following sum:

[Hint: See the hint for Prob. 5.3-12.] Find the following sum:

[Hint: See the hint for Prob. 5.3-12.]

5.3.15

Redo Prob. 5.3-12 using the result in Prob. 5.2-8a.

5.3.16

Redo Prob. 5.3-13 using the result in Prob. 5.2-8a.

5.3.17

Redo Prob. 5.3-14 using the result in Prob. 5.2-8a.

5.3.18

a. Find the zero-state response of an LTID system with transfer function

and the input x[n] = e (n+1)u[n].

5.3.19

5.3.20

b. Write the difference equation relating the output y[n] to input x[n]. Repeat Prob. 5.3-18 for x[n] = u[n] and

Repeat Prob. 5.3-18 for

and the input x[n] is a. (4)−n [n] b. (4)−(n−2)u[n−2] c. (4)−(n−2)u[n]

5.3.21

5.3.22

5.3.23

d. (4)−n u[n−2] Repeat Prob. 5.3-18 for x[n] = u[n] and

Find the transfer functions corresponding to each of the systems specified by difference equations in Probs. 5.3-2, 5.33, 5.3-5, and 5.3-8. Find h[n], the unit impulse response of the systems described by the following equations: a. y[n] + 3y[n − 1] + 2y[n − 2] = x[n] + 3x[n − 1] + 3x[n − 2] b. y[n + 2] + 2y[n + 1] + y[n] = 2x[n + 2] − x[n + 1]

c. y[n] − y[n − 1] + 0.5y[n − 2] = x[n] + 2x[n − 1]

5.3.24

Find h[n], the unit impulse response of the systems in Probs. 5.3-18, 5.3-19, and 5.3-21.

5.3.25

A system has impulse response h[n] = u[n − 3].

a. Determine the impulse response of the inverse system h −1 [n]. b. Is the inverse stable? Is the inverse causal? c. Your boss asks you to implement h −1 [n] to the best of your ability. Describe your realizable design, taking care to identify any deficiencies. 5.4.1

A system has impulse response given by

This system can be implemented according to Fig. P5.4-1. a. Determine the coefficients A1 and A2 to implement h[n] using the structure shown in Fig. P5.4-1. b. What is the zero-state response y 0 [n] of this system, given a shifted unit step input x[n] = u[n + 3]?

5.4.2

5.4.3

5.4.4

5.4.5

5.4.6

5.4.7

5.4.8

5.4.9

5.5.1

Figure P5.4-1: Structure to implement h[n]. a. Show the canonic direct form, a cascade and, a parallel realization of

b. Find the transpose of the realizations obtained in part (a). Repeat Prob. 5.4-2 for

Repeat Prob. 5.4-2 for

Repeat Prob. 5.4-2 for

Repeat Prob. 5.4-2 for

Realize a system whose transfer function is

Realize a system whose transfer function is given by

This problem demonstrates the enormous number of ways of implementing even a relatively low-order transfer function. A second-order transfer function has two real zeros and two real poles. Discuss various ways of realizing such a transfer function. Consider canonic direct, cascade, parallel, and the corresponding transposed forms. Note also that interchange of cascaded sections yields a different realization. Find the amplitude and phase response of the digital filters depicted in Fig. P5.5-1.

5.5.2

Figure P5.5-1 Find the amplitude and the phase response of the filters shown in Fig. P5.5-2. [Hint: Express H[e jΩ] as e −j2.5Ω

H a [e jΩ].]

5.5.3

Figure P5.5-2 Find the frequency response for the moving-average system in Prob. 3.4-3. The input-output equation of this system is given by

5.5.4

a. Input-output relationships of two filters are described by i. y[n] = −0.9y[n − 1] + x[n] ii. y[n] = 0.9y[n − 1] + x[n] For each case, find the transfer function, the amplitude response, and the phase response. Sketch the amplitude response, and state the type (highpass, lowpass, etc.) of each filter.

5.5.5

b. Find the response of each of these filters to a sinusoid x[n] = cosΩn for Ω = 0.01π and 0.99π. In general show that the gain (amplitude response) of the filter (i) at frequency Ω 0 is the same as the gain of the filter (ii) at frequency π − Ω 0 For an LTID system specified by the equation a. Find the amplitude and the phase response.

5.5.6

b. Find the system response y[n] for the input x[n] = cos (0.5k − (π/3)). For an asymptotically stable LTID system, show that the steady-state response to input e jΩn u[n] is H[e j Ω]e jΩnu[n]. The steady-state response is that part of the response which does not decay with time and persists forever.

5.5.7

Express the following signals in terms of apparent frequencies. a. cos(0.8πn + θ) b. sin(1.2πn + θ) c. cos(6.9n + θ) d. cos(2.8πn + θ) + 2 sin (3.7πn + θ) e. sinc(πn/2) f. sinc(3πn/2)

5.5.8

5.5.9

5.5.10

g. sinc(2πn) Show that cos (0.6πn + (π/6)) + √3 cos (1.4πn + (π/3)) = 2 cos (0.6πn − (π/6)). a. A digital filter has the sampling interval T = 50 μs. Determine the highest frequency that can be processed by this filter without aliasing. b. If the highest frequency to be processed is 50 kHz, determine the minimum value of the sampling and the maximum value of the sampling interval T that can be used. frequency Consider the discrete-time system represented by

a. Determine and plot the magnitude response |H(e j Ω)| of the system. b. Determine and plot the phase response ∠H(e j Ω) of the system. c. Find an efficient block representation that implements this system. 5.6.1

Pole-zero configurations of certain filters are shown in Fig. P5.6-1. Sketch roughly the amplitude response of these filters.

Figure P5.6-1

5.6.2

5.6.3

The system y[n] − y[n − 1] = x[n] − x[n − 1] is an all-pass system that has zero phase response. Is there any difference between this system and the system y[n] = x[n]? Justify your answer. The magnitude and phase responses of a real, stable, LTI system are shown in Fig. P5.6-3. a. What type of system is this: lowpass, high-pass, bandpass, or bandstop? b. What is the output of this system in response to

c. What is the output of this system in response to

Figure P5.6-3: Frequency response of a real, stable, LTI system.

5.6.4

Do Prob. 5.M-1 by graphical procedure. Do the sketches approximately, without using MATLAB.

5.6.5

Do Prob. 5.M-4 by graphical procedure. Do the sketches approximately, without using MATLAB.

5.6.6

a. Realize a digital filter whose transfer function is given by

b. Sketch the amplitude response of this filter, assuming |a| < 1.

5.6.7

c. The amplitude response of this lowpass filter is maximum at Ω = 0. The 3 dB bandwidth is the frequency at which the amplitude response drops to 0.707 (or 1 /√2) times its maximum value. Determine the 3 dB bandwidth of this filter when a = 0.2. Design a digital notch filter to reject frequency 5000 Hz completely and to have a sharp recovery on either side of 5000 Hz to a gain of unity. The highest frequency to be processed is 20 kHz

. [Hint: See Example 5.15.

The zeros should be at e ±j ωT for ω corresponding to 5000 Hz, and the poles are at ae ±j ωT with a < 1. Leave your

5.6.8

answer in terms of a. Realize this filter using the canonical form. Find the amplitude response of the filter.]

Show that a first-order LTID system with a pole at z = r and a zero at z = 1/r (r ≤ 1) is an allpass filter. In other words,

show that the amplitude response |H[e j Ω]| of a system with the transfer function

is constant with frequency. This is a first-order allpass filter. [Hint: Show that the ratio of the distances of any point on the unit circle from the zero (at z = 1/r) and the pole (at z = r) is a constant 1/r.] Generalize this result to show that an LTID system with two poles at z = re ±jθ and two zeros at z = (1/r)e ±jθ (r ≤ 1) is an allpass filter. In other words, show that the amplitude response of a system with the transfer function

5.6.9

is constant with frequency. a. If h 1 [n] and h 2 [n], the impulse responses of two LTID systems are related by h 2 [n] = (−1) n h 1 ,[n], then show that

How are the frequency response spectrum H 2 [e jΩ] related to the H 1 [e jΩ]. b. If H 1 [z] represents an ideal lowpass filter with cutoff frequency Ω c , sketch H 2 [e jΩ]. What type of filter is

5.6.10

H 2 [e jΩ]?

Mappings such as the bilinear transformation are useful in the conversion of continuous-time filters to discrete-time filters. Another useful type of transformation is one that converts a discrete-time filter into a different type of discretetime filter. Consider a transformation that replaces z with −z. a. Show that this transformation converts lowpass filters into highpass filters and highpass filters into lowpass filters.

5.6.11

b. If the original filter is an FIR filter with impulse response h[n], what is the impulse response of the transformed filter? The bilinear transformation is defined by the rules s = 2(1 -z − )T(1+z -1 ). a. Show that this transformation maps the ω axis in the s plane to the unit circle z = e jΩ in the z plane. b. Show that this transformation maps Ω to 2 arctan(ωT/2).

5.7.1

5.7.2

5.7.3

5.7.4

5.7.5

In Chapter 3, we used another approximation to find a digital system to realize an analog system. We showed that an analog system specified by Eq. (3.15a) can be realized by using the digital system specified by Eq. (3.15c). Compare that solution with the one resulting from the impulse invariance method. Show that one result is a close approximation of the other and that the approximation improves as T → 0. a. Using the impulse invariance criterion, design a digital filter to realize an analog filter with transfer function

b. Show a canonical and a parallel realization of the filter. Use the 1% criterion for the choice of T. Use the impulse invariance criterion to design a digital filter to realize the second-order analog Butterworth filter with transfer function

Use the 1% criterion for the choice of T. Design a digital integrator using the impulse invariance method. Find and give a rough sketch of the amplitude response, and compare it with that of the ideal integrator. If this integrator is used primarily for integrating audio signals (whose bandwidth is 20 kHz), determine a suitable value for T. An oscillator by definition is a source (no input) that generates a sinusoid of a certain frequency ω0 . Therefore an oscillator is a system whose zero-input response is a sinusoid of the desired frequency. Find the transfer function of a digital oscillator to oscillate at 10 kHz by the methods described in parts a and b. In both methods select T so that there are 10 samples in each cycle of the sinusoid. a. Choose H [z] directly so that its zero-input response is a discrete-time sinusoid of frequency Ω = ωT corresponding to 10 kHz. b. Choose H a (s) whose zero-input response is an analog sinusoid of 10 kHz. Now use the impulse invariance method to determine H[z].

5.7.6

c. Show a canonical realization of the oscillator. A variant of the impulse invariance method is the step invariance method of digital filter synthesis. In this method, for a given H a (s), we design H[z] in Fig. 5.22a such that y(nT) in Fig. 5.22b is identical to y[n] in Fig. 5.22a when x(t) = u(t). a. Show that in general

b. Use this method to design H[z] for

c. Use the step invariant method to synthesize a discrete-time integrator and compare its amplitude response with that of the ideal integrator.

5.7.7

Use the ramp-invariance method to synthesize a discrete-time differentiator and integrator. In this method, for a given H a (s), we design H[z] such that y(nT) in Fig. 5.22b is identical to y[n] in Fig. 5.22a when x(t) = tu(t).

5.7.8

In an impulse invariance design, show that if H a (s) is a transfer function of a stable system, the corresponding H[z] is also a transfer function of a stable system.

5.7.9

First-order backward differences provide the transformation rule s = (1− z −1 )/T a. Show that this transformation maps the ω axis in the s plane to a circle of radius 1/2 centered at (1/2, 0) in the z plane. b. Show that this transformation maps the left-half s plane to the interior of the unit circle in the z plane, which ensures that stability is preserved.

5.9.1

Find the z-transform (if it exists) and the corresponding ROC for each of the following signals: a. (0.8)n u[n] + 2 n u[− (n + 1)] b. 2 n u[n]−3 n u[−(n + 1)] c. (0.8)n u[n] + (0.9)n u[− (n + 1)] d. [(0.8) n + 3(0.4)n u[− (n + 1)] e. [(0.8) n + 3(0.4)n ]u[n] f. (0.8)n u[n] + 3(0.4)n u[− n + 1)] g. (0.5)|n|

5.9.2

h. n u[-(n + 1)] Find the inverse z-transform of

when the ROC is a. |z > 2 b. e −2 < |z| < 2

5.9.3

5.9.4

c. |z| < e -2 Use partial fraction expansions, z-transform tables, and a region of convergence (|z| < 1/2) to determine the inverse ztransform of

Consider the system

a. Draw the pole-zero diagram for H(z) and identify all possible regions of convergence.

5.9.5

b. Draw the pole-zero diagram for H −1 (z) and identify all possible regions of convergence. A discrete-time signal x[n] has a rational z-transform that contains a pole at z = 0.5. Given x 1 [n] = (⅓) n x[n] is absolutely

summable and x 2 [n] = (1/4)n x[n] is NOT absolutely summable, determine whether x[n] is left sided, right sided, or two sided. Justify your answer!

5.9.6

Let x[n] be an absolutely summable signal with rational z-transform X(z). X(z) is known to have a pole at z = (0.75 + 0.75j), and other poles may be present. Recall that an absolutely summable signal satisfies Σ∞−∞ |x[n]| < ∞. a. Can x[n] be left sided? Explain. b. Can x[n] be right sided? Explain. c. Can x[n] be two sided? Explain.

5.9.7

d. Can x[n] be of finite duration? Explain. Consider a causal system that has transfer function

When appropriate, assume initial conditions of zero. a. Determine the output y 1 [n] of this system in response to x 1 [n]=(3/4)n u[n].

5.9.8

5.9.9

b. Determine the output y 2 [n] of this system in response to x 2 =(3/4) n . Letx[n]=(−1) n u[n−n 0 ]+α n u[−n]. Determine the constraints on the complex number α and the integer n 0 so that the ztransform X(z) exists with region of convergence 1 < |z| < 2. Using the definition, compute the bilateral z-transform, including the region of convergence (ROC), of the following complex-valued functions: a. x 1 [n] = (− j) − n u[−n] + δ[−n] b. x 2 [n] = (j) n cos (n + 1)u[n] c. x 3 [n] = j sinh[n] u[−n+1]

5.9.10

d. x 4 [n] = Σ0 k=−∞ (2j)n δ[n −2k] Use partial fraction expansions, z-transform tables, and a region of convergence (0.5 < |z| < 2) to determine the inverse z-transform of

a.

b.

5.9.11

Use partial fraction expansions, z-transform tables, and the fact that the systems are stable to determine the inverse ztransform of

a.

b.

5.9.12

5.9.13

By inserting N zeros between every sample of a unit step, we obtain a signal

Determine H(z), the bilateral z-transform of h[n]. Identify the number and location(s) of the poles of H(z). Determine the zero-state response of a system having a transfer function

and an input x[n] given by a. xn[n]= e n u[n] b. xn[n]= 2 n u[− (n+1)]

5.9.14

c. xn[n]=e n u[n]+2 n [− (n+1)]] For the system in Prob. 5.9-13, determine the zero-state response for the input

5.9.15

For the system in Prob. 5.9-13, determine the zero-state response for the input

5.m.1

Consider an LTID system described by the difference equation 4y[n + 2] − y[n] = x[n + 2]+x[n]. a. Plot the pole-zero diagram for this system. b. Plot the system's magnitude response |H(e jΩ)|over-π≤Ω≤π. c. What type of system is this: lowpass, high-pass, bandpass, or bandstop? d. Is this system stable? Justify your answer. e. Is this system real? Justify your answer. f. If the system input is of the form x[n]=cos (Ωn), what is the greatest possible amplitude of the output? Justify your answer.

5.m.2

g. Draw an efficient, causal implementation of this system using only add, scale, and delay blocks. One interesting and useful application of discrete systems is the implementation of complex (rather than real) systems. A complex system is one in which a real-valued input can produce a complex-valued output. Complex systems that are described by constant coefficient difference equations require at least one complex-valued coefficient, and they are capable of operating on complex-valued inputs. Consider the complex discrete time system

a. Determine and plot the system zeros and poles.

5.m.3

b. Sketch the magnitude response |H(e jω )| of this system over −2π ≤ ω ≤ 2π. Comment on the system's behavior. Consider the complex system

Refer to Prob. 5.M-2 for an introduction to complex systems. a. Plot the pole-zero diagram for H(z). b. Plot the system's magnitude response |H(e jΩ)|over-π≤Ω≤π. c. Explain why H(z) is a noncausal system. Do not give a general definition of causality; specifically identify what makes this system noncausal. d. One way to make this system causal is to add two poles to H(z). That is,

Find poles a and b such that |H casual(e jΩ)|=|H(e jΩ)|. e. Draw an efficient block implementation of H causal(z).

5.m.4

A discrete-time LTI system is shown in Fig. P5.M-4. a. Determine the difference equation that describes this system. b. Determine the magnitude response |H(e jΩ)| for this system and simplify your answer. Plot the magnitude response over − π ≤ Ω ≤ π. What type of standard filter (lowpass, highpass, bandpass, or bandstop) best describes this system? c. Determine the impulse response h[n] of this system.

5.m.5

5.m.6

5.m.7

Figure P5.M-4: Second-order discrete-time system. Determine the impulse response h[n] for the system shown in Fig. P5.M-5. Is the system stable? Is the system causal?

Figure P5.M-5: Third-order discrete-time system. An LTID filter has an impulse response function given by h[n]=δ[n − 1] + δ[n + 1]. Determine and carefully sketch the magnitude response |H(e jΩ)| over the range −π ≤ Ω ≤ π. For this range of frequencies, is this filter lowpass, highpass, bandpass, or bandstop? A causal, stable discrete system has the rather strange transfer function H(z)=cos(z −1 ). a. Write MATLAB code that will compute and plot the magnitude response of this system over an appropriate range of digital frequencies Ω. Comment on the system. b. Determine the impulse response h[n]. Plot h[n] over (0 ≤ n ≤ 10). c. Determine a difference equation description for an FIR filter that closely approximates the system

5.m.8

H(z)=cos(z -1 ). To verify proper behavior, plot the FIR filter's magnitude response and compare it with the magnitude response computed in Prob. 5.M-7a.

The MATLAB signal processing toolbox function butter helps design digital Butterworth filters. Use MATLAB help to learn how butter works. For each of the following cases, design the filter, plot the filter's poles and zeros in the complex z plane, and plot the decibel magnitude response 20 log 10 |H(e Ω )|. a. Design an eighth-order digital lowpass filter with Ω c = π/3. b. Design an eighth-order digital highpass filter with Ω c = π/3. c. Design an eighth-order digital bandpass filter with passband between 5π/24 and 11π/24.

5.m.9

5.m.10

5.m.11

d. Design an eighth-order digital bandstop filter with stopband between 5π/24 and 11π/24. The MATLAB signal processing toolbox function cheby1 helps design digital Chebyshev type I filters. A Chebyshev type I filter has passband ripple and smooth stopband. Setting the passband ripple to R p =3 dB, repeat Prob. 5.M-8 using the cheby1 command. With all other parameters held constant, what is the general effect of reducing R p , the allowable passband ripple? The MATLAB signal processing toolbox function cheby2 helps design digital Chebyshev type II filters. A Chebyshev type II filter has smooth passband and ripple in the stopband. Setting the stopband ripple R s =20 dB down, repeat Prob. 5.M-8 using the cheby2 command. With all other parameters held constant, what is the general effect of increasing R s , the minimum stopband attenuation? The MATLAB signal processing toolbox function ellip helps design digital elliptic filters. An elliptic filter has ripple in

both the passband and the stopband. Setting the passband ripple to R p =3 dB and the stopband ripple R s =20 dB down, repeat Prob. 5.M-8 using the ellip command.

Chapter 6: Continuous-Time Signal Analysis-The Fourier Series OVERVIEW Electrical engineers instinctively think of signals in terms of their frequency spectra and think of systems in terms of their frequency response. Even teenagers know about audible portion of audio signals having a bandwidth of about 20 kHz and the need for goodquality speakers to respond up to 20 kHz. This is basically thinking in frequency domain. In Chapters 4 and 5 we discussed extensively the frequency-domain representation of systems and their spectral response (system response to signals of various frequencies). In Chapters 6, 7, 8, and 9 we discuss spectral representation of signals, where signals are expressed as a sum of sinusoids or exponentials. Actually, we touched on this topic in Chapters 4 and 5. Recall that the Laplace transform of a continuous-time signal is its spectral representation in terms of exponentials (or sinusoids) of complex frequencies. Similarly the z-transform of a discrete-time signal is its spectral representation in terms of discrete-time exponentials. However, in the earlier chapters we were concerned mainly with system representation, and the spectral representation of signals was incidental to the system analysis. Spectral analysis of signals is an important topic in its own right, and now we turn to this subject. In this chapter we show that a periodic signal can be represented as a sum of sinusoids (or exponentials) of various frequencies. These results are extended to aperiodic signals in Chapter 7 and to discrete-time signals in Chapter 9. The fascinating subject of sampling of continuous-time signals is discussed in Chapter 8, leading to A/D (analog-to-digital) and D/A conversion. Chapter 8 forms the bridge between the continuous-time and the discrete-time worlds.

6.1 PERIODIC SIGNAL REPRESENTATION BY TRIGONOMETRIC FOURIER SERIES As seen in Section 1.3-3 [Eq. (1.17)], a periodic signal x(t) with period T0 (Fig. 6.1) has the property

Figure 6.1: A periodic signal of period T0 . The smallest value of T0 that satisfies the periodicity condition (6.1) is the fundamental period of x(t). As argued in Section 1.3-3, this equation implies that x(t) starts at −∞ and continues to ∞. Moreover, the area under a periodic signal x(t) over any interval of duration T0 is the same; that is, for any real numbers a and b

This result follows from the fact that a periodic signal takes the same values at the intervals of T0 . Hence, the values over any segment of duration T0 are repeated in any other interval of the same duration. For convenience, the area under x(t) over any interval of duration T0 will be denoted by

The frequency of a sinusoid cos 2πf0 t or sin 2πf0 t is f0 and the period is T0 = 1/f0 . These sinusoids can also be expressed as cos ω0 t or sin ω0 t where ω0 = 2πf 0 is the radian frequency, although for brevity, it is often referred to as frequency (see Section B.2). A sinusoid of frequency nf0 is said to be the nth harmonic of the sinusoid of frequency f0 . Let us consider a signal x(t) made up of a sines and cosines of frequency ω0 and all of its harmonics (including the zeroth harmonic; i.e., dc) with arbitrary amplitudes: [†]

The frequency ω0 is called the fundamental frequency. We now prove an extremely important property: x(t) in Eq. (6.3) is a periodic signal with the same period as that of the fundamental, regardless of the values of the amplitudes a n and b n . Note that the period T0 of the fundamental is

and

To prove the periodicity of x(t), all we need is to show that x(t) = x(t + T0 ). From Eq. (6.3)

From Eq. (6.5), we have n ω0 T0 = 2π n, and

We could also infer this result intuitively. In one fundamental period T0 , the nth harmonic executes n complete cycles. Hence, every sinusoid on the right-hand side of Eq. (6.3) executes a complete number of cycles in one fundamental period T0 . Therefore, at t = T0 , every sinusoid starts as if it were the origin and repeats the same drama over the next T0 seconds, and so on ad infinitum. Hence, the sum of such harmonics results in a periodic signal of period T0 . This result shows that any combination of sinusoids of frequencies 0, f0 , 2f0 ,..., kf 0 is a periodic signal of period T0 = 1/f0 regardless of the values of amplitudes a k and b k of these sinusoids. By changing the values of a k and b k in Eq. (6.3), we can construct a variety of periodic signals, all of the same period T0 (T0 = 1/f0 or 2π/ω0 ). The converse of this result is also true. We shall show in Section 6.5-4 that a periodic signal x(t) with a period T0 can be expressed as a sum of a sinusoid of frequency f0 (f0 = 1/T0 ) and all its harmonics, as shown in Eq. (6.3). [†] The infinite series on the right-hand side of Eq. (6.3) is known as the trigonometric Fourier series of a periodic signal x(t). COMPUTING THE COEFFICIENTS OF A FOURIER SERIES To determine the coefficients of a Fourier series, consider an integral I defined by

where ∫ T0 stands for integration over any contiguous interval of T0 seconds. By using a trigonometric identity (see Section B.7-6), Eq. (6.6a) can be expressed as

Because cos ω0 t executes one complete cycle during any interval of duration T0 , cos(n + m)ω0 t executes (n + m) complete cycles during any interval of duration T0 . Therefore the first integral in Eq. (6.6b), which represents the area under n + m complete cycles of a sinusoid, equals zero. The same argument shows that the second integral in Eq. (6.6b) is also zero, except when n = m. Hence I in Eq. (6.6) is zero for all n ≠ m. When n = m, the first integral in Eq. (6.6b) is still zero, but the second integral yields

Thus

Using similar arguments, we can show that

and

To determine a 0 in Eq. (6.3) we integrate both sides of Eq. (6.3) over one period T0 to yield

Recall that T0 is the period of a sinusoid of frequency ω0 . Therefore functions cos n ω0 t and sin n ω0 t execute n complete cycles over any interval of T0 seconds, so that the area under these functions over an interval T0 is zero, and the last two integrals on the righthand side of the foregoing equation are zero. This yields

and

Next we multiply both sides of Eq. (6.3) by cos mω0 t and integrate the resulting equation over an interval T0 :

The first integral on the right-hand side is zero because it is an area under m integral number of cycles of a sinusoid. Also, the last integral on the right-hand side vanishes because of Eq. (6.7c). This leaves only the middle integral, which is also zero for all n ≠ m, because of Eq. (6.7a). But n takes on all values from 1 to ∞, including m. When n = m, this integral is T0 /2, according to Eq. (6.7a). Therefore, from the infinite number of terms on the right-hand side, only one term survives to yield a n T0 /2 = a m T0 /2 (recall that n = m). Therefore

and

Similarly, by multiplying both sides of Eq. (6.3) by sin n ω0 t and then integrating over an interval T0 , we obtain

To sum up our discussion, which applies to real or complex x(t), we have shown that a periodic signal x(t) with period T0 can be expressed as a sum of a sinusoid of period T0 and its harmonics:

where

COMPACT FORM OF FOURIER SERIES The results derived so far are general and apply whether x(t) is a real or a complex function of t. However, when x(t) is real, coefficients a n and b n are real for all n, and the trigonometric Fourier series can be expressed in a compact form, using the results in Eqs. (B.23)

where C n and θn are related to a n and b n , as [see Eqs. (B.23b) and (B.23c)]

These results are summarized in Table 6.1. Table 6.1: Fourier Series Representation of a Periodic Signal of Period T0 (ω0 = 2π /T0 ) Open table as spreadsheet Series Form

Coefficient Computation

Trigonometric

Conversion Formulas a 0 = c0 = D0 a n − jb n = C n e jθ n = 2D n

Compact trigonometric

a n + jb n = C n e −jθn = 2D −n C0 = a0

C0 = D0 C n = 2|D n | n≥1 θn = ∠D n

Exponential

The compact form in Eq. (6.12) uses the cosine form. We could just as well have used the sine form, with terms sin (n ω0 t + θn ) instead of cos (n ω0 t + θn ). The literature overwhelmingly favors the cosine form, for no apparent reason except possibly that the cosine phasor is represented by the horizontal axis, which happens to be the reference axis in phasor representation. Equation (6.11a) shows that a 0 (or C 0 ) is the average value of x(t) (averaged over one period). This value can often be determined by inspection of x(t). Because a n and b n are real, C n and θn are also real. In the following discussion of trigonometric Fourier series, we shall assume real x(t), unless mentioned otherwise.

6.1-1 The Fourier Spectrum

The compact trigonometric Fourier series in Eq. (6.12) indicates that a periodic signal x(t) can be expressed as a sum of sinusoids of frequencies 0 (dc), ? 0 , 2? 0 , ..., n? 0 , ..., whose amplitudes are C 0 , C 1 , C 2 , ..., C n , ..., and whose phases are 0, θ1 , ? 2 , ..., ? n , ...,

respectively. We can readily plot amplitude C n versus n (the amplitude spectrum) and θn versus n (the phase spectrum).[†] Because n is proportional to the frequency n ω0 , these plots are scaled plots of C n versus ω and θn versus ω. The two plots together are the frequency spectra of x(t). These spectra show at a glance the frequency contents of the signal x(t) with their amplitudes and phases. Knowing these spectra, we can reconstruct or synthesize the signal x(t) according to Eq. (6.12). Therefore frequency spectra, which are an alternative way of describing a periodic signal x(t), are in every way equivalent to the plot of x(t) as a function of t. The frequency spectra of a signal constitute the frequency-domain description of x(t), in contrast to the time-domain description, where x(t) is specified as a function of time. In computing θn , the phase of the nth harmonic from Eq. (6.13c), the quadrant in which θn lies should be determined from the signs of a n and b n . For example, if a n = −1 and b n = 1, θn lies in the third quadrant, and Observe that Although C n , the amplitude of the nth harmonic as defined in Eq. (6.13b), is positive, we shall find it convenient to allow C n to take on negative values when b n = 0. This will become clear in later examples. EXAMPLE 6.1 Find the compact trigonometric Fourier series for the periodic signal x(t) shown in Fig. 6.2a. Sketch the amplitude and phase spectra for x(t).

Figure 6.2: A periodic signal and (b,c) its Fourier spectra. In this case the period T0 = π and the fundamental frequency f0 = 1/T0 = 1/π Hz, and

Therefore

where

In this example the obvious choice for the interval of integration is from 0 to χ. Hence

and

Table 6.2 Open table as spreadsheet n

Cn

θn

0

0.504

0

1

0.244

−75.96

2

0.125

−82.87

3

0.084

−85.24

4

0.063

−86.42

5

0.0504

−87.14

6

0.042

−87.61

7

0.036

−87.95

Therefore

Also from Eqs. (6.13)

Amplitude and phases of the dc and the first seven harmonics are computed from the above equations and displayed in Table 6.2. We can use these numerical values to express x(t) as

COMPUTER EXAMPLE C6.1 Following Example 6.1, compute and plot the Fourier coefficients for the periodic signal in Fig. 6.2a. In this example, T0 = π and ω0 = 2. The expressions for a 0 , a n , b n , C n , and θn are derived in Example 6.1. >> >> >> >> >> >> >> >> >>

n = 1:10; a_n(1) = 0.504; a_n(n+1) = 0.504*2./(1+16*n.^2); b_n(1) = 0; b_n(n+1) = 0.504*8*n./(1+16*n.^2); c_n(1) = a_n(1); c_n(n+1) = sqrt (a_n(n+1).^2+b_n(n+1),^2); theta_n(1) = 0; theta_n(n+1) = atan2(-b_n(n+1),a_n(n+1)); n = [0,n]; clf; subplot(2,2,1); stem(n,a_n,'k'); ylabel('a_n'); xlabel('n'); subplot(2,2,2); stem(n,b_n,'k'); ylabel('b_n'); xlabel('n'); subplot(2,2,3); stem(c_n,'k'); ylabel('c_n'); xlabel('n'); subplot(2,2,4); stem(n,theta n,'k'); ylabel('\theta n [rad]'); xlabel('n');

Figure C6.1 The amplitude and phase spectra for x(t), in Fig. 6.2b and 6.2c, tell us at a glance the frequency composition of x(t), that is, the amplitudes and phases of various sinusoidal components of x(t). Knowing the frequency spectra, we can reconstruct x(t), as shown on the right-hand side of Eq. (6.15b). Therefore the frequency spectra (Fig. 6.2b, 6.2c) provide an alternative description-the frequencydomain description of x(t). The time-domain description of x(t) is shown in Fig. 6.2a. A signal, therefore, has a dual identity: the timedomain identity x(t) and the frequency-domain identity (Fourier spectra). The two identities complement each other; taken together, they provide a better understanding of a signal. An interesting aspect of Fourier series is that whenever there is a jump discontinuity in x(t), the series at the point of discontinuity converges to an average of the left-hand and right-hand limits of x(t) at the instant of discontinuity. [†] In the present example, for

instance, x(t) is discontinuous at t = 0 with x(0 + ) = 1 and x(0 − ) = x(π) = e −π/2 = 0.208. The corresponding Fourier series converges to a value (1 + 0.208)/2 = 0.604 at t = 0. This is easily verified from Eq. (6.15b) by setting t = 0. EXAMPLE 6.2 Find the compact trigonometric Fourier series for the triangular periodic signal x(t) shown in Fig. 6.3a, and sketch the amplitude and phase spectra for x(t).

Figure 6.3: (a) A triangular periodic signal and (b, c) its Fourier spectra. In this case the period T0 = 2. Hence

and

where

Here it will be advantageous to choose the interval of integration from −1/2 to 3/2 rather than 0 to 2. A glance at Fig. 6.3a shows that the average value (dc) of x(t) is zero, so that a 0 = 0. Also

Detailed evaluation of these integrals shows that both have a value of zero. Therefore

Detailed evaluation of these integrals yields, in turn,

Therefore

To plot Fourier spectra, the series must be converted into compact trigonometric form as in Eq. (6.12). In this case this is readily done by converting sine terms into cosine terms with a suitable phase shift. For example,

By using these identities, Eq. (6.16) can be expressed as

In this series all the even harmonics are missing. The phases of the odd harmonics alternate from −90° to 90°. Figure 6.3 shows amplitude and phase spectra for x(t). EXAMPLE 6.3 A periodic signal x(t) is represented by a trigonometric Fourier series Express this series as a compact trigonometric Fourier series and sketch amplitude and phase spectra for x(t). In compact trigonometric Fourier series, the sine and cosine terms of the same frequency are combined into a single term and all terms are expressed as cosine terms with positive amplitudes. Using Eqs. (6.12), (6.13b), and (6.13c), we have Also and

Therefore In this case only four components (including dc) are present. The amplitude of dc is 2. The remaining three components are of frequencies ω = 2, 3, and 7 with amplitudes 5, 2, and 1 and phases −53.13°, −60°, and −30°, respectively. The amplitude and phase spectra for this signal are shown in Fig. 6.4a and 6.4b, respectively.

Figure 6.4: Fourier spectra of the signal. EXAMPLE 6.4 Find the compact trigonometric Fourier series for the square-pulse periodic signal shown in Fig. 6.5a and sketch its amplitude and phase spectra.

Figure 6.5: (a) A square pulse periodic signal and (b) its Fourier spectra. Here the period is T0 = 2π and ω0 = 2π/T0 = 1. Therefore

where

From Fig. 6.5a, it is clear that a proper choice of region of integration is from −π to π. But since x(t) = 1 only over (−π/2, π/2) and x(t) = 0 over the remaining segment,

We could have found a 0 , the average value of x(t), to be 1/2 merely by inspection of x(t) in Fig. 6.5a. Also,

Therefore

Observe that b n = 0 and all the sine terms are zero. Only the cosine terms appear in the trigonometric series. The series is therefore already in the compact form except that the amplitudes of alternating harmonics are negative. Now by definition, amplitudes C n are positive [see Eq. (6.13b)]. The negative sign can be accommodated by associating a proper phase, as seen from the trigonometric identity [†]

Using this fact, we can express the series in (6.17) as

This is the desired form of the compact trigonometric Fourier series. The amplitudes are

We might use these values to plot amplitude and phase spectra. However, we can simplify our task in this special case if we allow amplitude C n to take on negative values. If this is allowed, we do not need a phase of −π to account for the sign as seen from Eq. (6.17). This means that phases of all components are zero, and we can discard the phase spectrum and manage with only the amplitude spectrum, as shown in Fig. 6.5b. Observe that there is no loss of information in doing so and that the amplitude spectrum in Fig. 6.5b has the complete information about the Fourier series in Eq. (6.17). Therefore, whenever all sine terms vanish (b n = 0), it is convenient to allow C n to take on negative values. This permits the spectral information to be conveyed by a single spectrum. [†]

Let us investigate the behavior of the series at the points of discontinuities. For the discontinuity at t = π/2, the values of x(t) on either

sides of the discontinuity are x((π/2) − ) = 1 and x((π/2) + ) = 0. We can verify by setting t = π/2 in Eq. (6.17) that x(π/2) = 0.5, which is a value midway between the values of x(t) on the either sides of the discontinuity at t = π/2.

6.1-2 The Effect of Symmetry The Fourier series for the signal x(t) in Fig. 6.2a (Example 6.1) consists of sine and cosine terms, but the series for the signal x(t) in Fig 6.3a (Example 6.2) consists of sine terms only and the series for the signal x(t) in Fig. 6.5a (Example 6.4) consists of cosine terms only. This is no accident. We can show that the Fourier series of any even periodic function x(t) consists of cosine terms only and the

series for any odd periodic function x(t) consists of sine terms only. Moreover, because of symmetry (even or odd), the information of one period of x(t) is implicit in only half the period, as seen in Figs. 6.3a and 6.5a. In these cases, knowing the signal over a half-period and knowing the kind of symmetry (even or odd), we can determine the signal waveform over a complete period. For this reason, the Fourier coefficients in these cases can be computed by integrating over only half the period rather than a complete period. To prove this result, recall that

Recall also that cos n ω0 t is an even function and sin n ω0 t is an odd function of t. If x(t) is an even function of t, then x(t) cos n ω0 t is also an even function and x(t) sin n ω0 t is an odd function of t (see Section 1.5-1). Therefore, following from Eqs. (1.33a) and (1.33b),

Similarly, if x(t) is an odd function of t, then x(t) cos n ω0 t is an odd function of t and x(t) sin n ω0 t is an even function of t. Therefore

Observe that because of symmetry, the integration required to compute the coefficients need be performed over only half the period. If a periodic signal x(t) shifted by half the period remains unchanged except for a sign-that is, if

the signal is said to have a half-wave symmetry. It can be shown that for a signal with a half-wave symmetry, all the even-numbered harmonics vanish (see Prob. 6.1-5). The signal in Fig. 6.3a is an example of such a symmetry. The signal in Fig. 6.5a also has this symmetry, although it is not obvious owing to a dc component. If we subtract the dc component of 0.5 from this signal, the remaining signal has a half-wave symmetry. For this reason this signal has a dc component 0.5 and only the odd harmonics. EXERCISE E6.1

Find the compact trigonometric Fourier series for periodic signals shown in Fig. 6.6. Sketch their amplitude and phase spectra. Allow C n to take on negative values if b n = 0 so that the phase spectrum can be eliminated. [Hint: Use Eqs. (6.18) and (6.19) for appropriate symmetry conditions.]

Figure 6.6: Periodic signals. Answers

a.

b.

6.1-3 Determining the Fundamental Frequency and Period We have seen that every periodic signal can be expressed as a sum of sinusoids of a fundamental frequency ω0 and its harmonics. One may ask whether a sum of sinusoids of any frequencies represents a periodic signal. If so, how does one determine the period? Consider the following three functions:

Recall that every frequency in a periodic signal is an integer multiple of the fundamental frequency ω0 . Therefore the ratio of any two frequencies is of the form m/n, where m and n are integers. This means that the ratio of any two frequencies is a rational number. When the ratio of two frequencies is a rational number, the frequencies are said to be harmonically related. The largest number of which all the frequencies are integer multiples is the fundamental frequency. In other words, the fundamental frequency is the greatest common factor (GCF) of all the frequencies in the series. The frequencies in the spectrum of x 1 (t) are 1/2, 2/3, and 7/6 (we do not consider dc). The ratios of the successive frequencies are 3:4 and 4:7, respectively. Because both these numbers are rational, all the three frequencies in the spectrum are harmonically related, and the signal x 1 (t) is periodic. The GCF, that is, the greatest number of which 1/2, 2/3, and 7/6 are integer multiples, is 1/6.[†] Moreover, 3(1/6) = 1/2, 4(1/6) = 2/3, and 7(1/6) = 7/6. Therefore the fundamental frequency is 1/6, and the three frequencies in the spectrum are the third, fourth, and seventh harmonics. Observe that the fundamental frequency component is absent in this Fourier series.

The signal x 2 (t) is not periodic because the ratio of two frequencies in the spectrum is 2/π, which is not a rational number. The signal x 3 (t) is periodic because the ratio of frequencies 3√2 and 6√2 is 1/2, a rational number. The greatest common factor of 3√2 and 6√2 is 3√2. Therefore the fundamental frequency ω0 = 3√2, and the period

EXERCISE E6.2

Determine whether the signal is periodic. If it is periodic, find the fundamental frequency and the period. What harmonics are present in x(t)?

Answers Periodic with ω0 = 2/15 and period T0 = 15π. The fifth and sixth harmonics. A HISTORICAL NOTE: BARON JEAN-BAPTISTE-JOSEPH FOURIER (1768-1830) The Fourier series and integral comprise a most beautiful and fruitful development, which serves as an indispensable instrument in the

treatment of many problems in mathematics, science, and engineering. Maxwell was so taken by the beauty of the Fourier series that he called it a great mathematical poem. In electrical engineering, it is central to the areas of communication, signal processing, and several other fields, including antennas, but its initial reception by the scientific world was not enthusiastic. In fact, Fourier could not get his results published as a paper. Fourier, a tailor's son, was orphaned at age 8 and educated at a local military college (run by Benedictine monks), where he excelled in mathematics. The Benedictines prevailed upon the young genius to choose the priesthood as his vocation, but revolution broke out before he could take his vows. Fourier joined the people's party. But in its early days, the French Revolution, like most such upheavals, liquidated a large segment of the intelligentsia, including prominent scientists such as Lavoisier. Observing this trend, many intellectuals decided to leave France to save themselves from a rapidly rising tide of barbarism. Fourier, despite his early enthusiasm for the Revolution, narrowly escaped the guillotine twice. It was to the everlasting credit of Napoleon that he stopped the persecution of the intelligentsia and founded new schools to replenish their ranks. The 26-year-old Fourier was appointed chair of mathematics at the newly created École Normale in 1794. [1]

Napoleon was the first modern ruler with a scientific education, and he was one of the rare persons who are equally comfortable with soldiers and scientists. The age of Napoleon was one of the most fruitful in the history of science. Napoleon liked to sign himself as "member of Institut de France" (a fraternity of scientists), and he once expressed to Laplace his regret that "force of circumstances has

led me so far from the career of a scientist." [2] Many great figures in science and mathematics, including Fourier and Laplace, were honored and promoted by Napoleon. In 1798 he took a group of scientists, artists, and scholars-Fourier among them-on his Egyptian expedition, with the promise of an exciting and historic union of adventure and research. Fourier proved to be a capable administrator of the newly formed Institut d'Égypte, which, incidentally, was responsible for the discovery of the Rosetta stone. The inscription on this stone in two languages and three scripts (hieroglyphic, demotic, and Greek) enabled Thomas Young and Jean-François Champollion, a protégé of Fourier, to invent a method of translating hieroglyphic writings of ancient Egypt-the only significant result of Napoleon's Egyptian expedition. Back in France in 1801, Fourier briefly served in his former position as professor of mathematics at the École Polytechnique in Paris. In 1802 Napoleon appointed him the prefect of Isère (with its headquarters in Grenoble), a position in which Fourier served with distinction. Fourier was created Baron of the Empire by Napoleon in 1809. Later, when Napoleon was exiled to Elba, his route was to take him through Grenoble. Fourier had the route changed to avoid meeting Napoleon, which would have displeased Fourier's new master, King Louis XVIII. Within a year, Napoleon escaped from Elba and returned to France. At Grenoble, Fourier was brought before him in chains. Napoleon scolded Fourier for his ungrateful behavior but reappointed him the prefect of Rhône at Lyons. Within four months Napoleon was defeated at Waterloo and was exiled to St. Helena, where he died in 1821. Fourier once again was in disgrace as a Bonapartist and had to pawn his effects to keep himself alive. But through the intercession of a former student, who was now a prefect of Paris, he was appointed director of the statistical bureau of the Seine, a position that allowed him ample time for scholarly pursuits. Later, in 1827, he was elected to the powerful position of perpetual secretary of the Paris Academy of Science, a section of the Institut de France. [3] .

While serving as the prefect of Grenoble, had Fourier carried on his elaborate investigation of the propagation of heat in solid bodies, which led him to the Fourier series and the Fourier integral. On December 21, 1807, he announced these results in a prize paper on the theory of heat. Fourier claimed that an arbitrary function (continuous or with discontinuities) defined in a finite interval by an arbitrarily capricious graph can always be expressed as a sum of sinusoids (Fourier series). The judges, who included the great French mathematicians Laplace, Lagrange, Legendre, Monge, and LaCroix, admitted the novelty and importance of Fourier's work but criticized it for lack of mathematical rigor and generality. Lagrange thought it incredible that a sum of sines and cosines could add up to anything but an infinitely differentiable function. Moreover, one of the properties of an infinitely differentiable function is that if we know its behavior over an arbitrarily small interval, we can determine its behavior over the entire range (the Taylor-Maclaurin series). Such a function is far from an arbitrary or a capriciously drawn graph.[4] Laplace had additional reason to criticize Fourier's work. Laplace and his students had already approached the problem of heat conduction by a different angle, and Laplace was reluctant to accept the

superiority of Fourier's method.[5] Fourier thought the criticism unjustified but was unable to prove his claim because the tools required for operations with infinite series were not available at the time. However, posterity has proved Fourier to be closer to the truth than his critics. This is the classic conflict between pure mathematicians and physicists or engineers, as we saw earlier (Chapter 4) in the life of Oliver Heaviside. In 1829 Dirichlet proved Fourier's claim concerning capriciously drawn functions with a few restrictions (Dirichlet conditions). Although three of the four judges were in favor of publication, Fourier's paper was rejected because of vehement opposition by Lagrange. Fifteen years later, after several attempts and disappointments, Fourier published the results in expanded form as a text, Théorie analytique de la chaleur, which is now a classic. [†] In Eq. (6.3), the constant term a corresponds to the cosine term for n = 0 because cos (0 x ω )t = 1. However, sin (0 x ω )t = 0. 0 0 0

Hence, the sine term for n = 0 is nonexistent.

[†] Strictly speaking, this statement applies only if a periodic signal x(t) is a continuous function of t. However, Section 6.5-4 shows that

it can be applied even for discontinuous signals, if we interpret the equality in Eq. (6.3), not in the ordinary sense, but in the meansquare sense. This means that the power of the difference between the periodic signal x(t) and its Fourier series on the right-hand side of Eq. (6.3) approaches zero as the number of terms in the series approach infinity.

[†] The amplitude C , by definition here, is nonnegative. Some authors define amplitude A that can take positive or negative values and n n

magnitude C n = |An | that can only be nonnegative. Thus, what we call amplitude spectrum becomes magnitude spectrum. The distinction between amplitude and magnitude, although useful, is avoided in this book in the interest of keeping definitions of essentially similar entities to a minimum. [†] This behavior of the Fourier series is dictated by its convergence in the mean, discussed later in Sections 6.2 and 6.5. [†] Because cos (x ± π) = − cos x, we could have chosen the phase π or −π. In fact, cos (x ± Nπ) = − cos x for any odd integral

value of N. Therefore the phase can be chosen as ± Nπ, where N is any convenient odd integer.

[†] Here, the distinction between amplitude A and magnitude C = |A | would have been useful. But, for the reason mentioned in the n n n

footnote on page 600, we refrain from this distinction formally.

[†] The greatest common factor of a /b , a /b , ..., a /b is the ratio of the GCF of the numerators set (a , a ,..., a ) to the LCM 1 1 2 2 m m 1 2 m

(least common multiple) of the denominator set (b 1 , b 2 , ..., b m ). For instance, for the set (2/3, 6/7, 2), the GCF of the numerator set (2, 6, 2) is 2; the LCM of the denominator set (3, 7, 1) is 21. Therefore 2/21 is the largest number of which 2/3, 6/7, and 2 are integer multiples. [1] Bell, E. T. Men of Mathematics. Simon & Schuster, New York, 1937. [2] Durant, Will, and Ariel Durant. The Age of Napoleon, Part XI in The Story of Civilization Series. Simon & Schuster, New York, 1975. [3] Calinger, R. Classics of Mathematics, 4th ed. Moore Publishing, Oak Park, IL, 1982. [4] Lanczos, C. Discourse on Fourier Series. Oliver Boyd, London, 1966. [5] Körner, T. W. Fourier Analysis. Cambridge University Press, Cambridge, UK, 1989.

6.2 EXISTENCE AND CONVERGENCE OF THE FOURIER SERIES For the existence of the Fourier series, coefficients a 0 , a n , and b n in Eqs. (6.11) must be finite. It follows from Eqs. (6.11a), (6.11b), and (6.11c) that the existence of these coefficients is guaranteed if x(t) is absolutely integrable over one period; that is,

However, existence, by itself, does not inform us about the nature and the manner in which the series converges. We shall first discuss the notion of convergence.

6.2-1 Convergence of a Series The key to many puzzles lies in the nature of the convergence of the Fourier series. Convergence of infinite series is a complex problem. It took mathematicians several decades to understand the convergence aspect of the Fourier series. We shall barely scratch the surface here. Nothing annoys a student more than the discussion of convergence. Have we not proved, they ask, that a periodic signal x(t) can be expressed as a Fourier series? Then why spoil the fun by this annoying discussion? All we have shown so far is that a signal represented by a Fourier series in Eq. (6.3) is periodic. We have not proved the converse, that every periodic signal can be expressed as a Fourier series. This issue will be tackled later, in Section 6.5-4, where it will be shown that a periodic signal can be represented by a Fourier series, as in Eq. (6.3), where the equality of the two sides of the equation is not in the ordinary sense, but in the meansquare sense (explained later in this discussion). But the astute reader should have been skeptical of the claims of the Fourier series to represent discontinuous functions in Figs. 6.2a and 6.5a. If x(t) has a jump discontinuity, say at t = 0, then x(0 + ), x(0), and x(0 − ) are generally different. How could a series consisting of the sum of continuous functions of the smoothest type (sinusoids) add to one value

at t = 0 − and a different value at t = 0 and yet another value at t = 0 + ? The demand is impossible to satisfy unless the math involved executes some spectacular acrobatics. How does a Fourier series act under such conditions? Precisely for this reason, the great mathematicians Lagrange and Laplace, two of the judges examining Fourier's paper, were skeptical of Fourier's claims and voted against publication of the paper that later became a classic.

There are also other issues. In any practical application, we can use only a finite number of terms in a series. If, using a fixed number of terms, the series guarantees convergence within an arbitrarily small error at every value of t, such a series is highly desirable, and is

called an uniformly convergent series. If a series converges at every value of t, but to guarantee convergence within a given error requires different number of terms at different t, then the series is still convergent, but is less desirable. It goes under the name pointwise convergent series. Finally, we have the case of a series that refuses to converge at some t, no matter how many terms are added. But the series may converge in the mean, that is, the energy of the difference between x(t) and the corresponding finite term series approaches zero as

the number of terms approaches infinity. [†] . To explain this concept, let us consider representation of a function x(t) by an infinite series

Let the partial sum of the first N terms of the series on the right-hand side be denoted by x N (t), that is,

If we approximate x(t) by x N (t) (the partial sum of the first N terms of the series), the error in the approximation is the difference x(t) − x N(t). The series converges in the mean to x(t) in the interval (0, T0 ) if

Hence, the energy of the error x(t) − x N(t) approaches zero as N → ∞. This form of convergence does not require for the series to be equal to x(t) for all t. It just requires the energy of the difference (area under |x(t) − x N (t)|2 ) to vanish as N → ∞. Superficially it may appear that if the energy of a signal over an interval is zero, the signal (the error) must be zero everywhere. This is not true. The signal energy can be zero even if there are nonzero values at finite number of isolated points. This is because although the signal is nonzero at a point (and zero everywhere else), the area under its square is still zero. Thus, a series that converges in the mean to x(t) need not converge to x(t) at a finite number of points. This is precisely what happens to the Fourier series when x(t) has jump discontinuities. This is also what makes Fourier series convergence compatible with the Gibbs phenomenon, to be discussed later in this section. There is a simple criterion for ensuring that a periodic signal x(t) has a Fourier series that converges in the mean. The Fourier series for x(t) converges to x(t) in the mean if x(t) has a finite energy over one period, that is,

Thus, the periodic signal x(t), having a finite energy over one period, guarantees the convergence in the mean of its Fourier series. In all the examples discussed so far, condition (6.26) is satisfied, and hence the corresponding Fourier series converges in the mean. Condition (6.26), like condition (6.22), guarantees that the Fourier coefficients are finite. We shall now discuss an alternate set of criteria, due to Dirichlet, for convergence of the Fourier series. DIRICHLET CONDITIONS Dirichlet showed that if x(t) satisfies certain conditions (Dirichlet conditions), its Fourier series is guaranteed to converge pointwise at all points where x(t) is continuous. Moreover, at the points of discontinuities, x(t) converges to the value midway between the two values of x(t) on either sides of the discontinuity. These conditions are: 1. The function x(t) must be absolutely integrable; that is, it must satisfy Eq. (6.22). 2. The function x(t) must have only a finite number of finite discontinuities in one period. 3. The function x(t) must contain only a finite number of maxima and minima in one period. All practical signals, including those in Examples 6.1-6.4, satisfy these conditions.

6.2-2 The Role of Amplitude and Phase Spectra in Waveshaping The trigonometric Fourier series of a signal x(t) shows explicitly the sinusoidal components of x(t). We can synthesize x(t) by adding the sinusoids in the spectrum of x(t). Let us synthesize the square-pulse periodic signal x(t) of Fig. 6.5a by adding successive harmonics in its spectrum step by step and observing the similarity of the resulting signal to x(t). The Fourier series for this function as found in Eq. (6.17) is

We start the synthesis with only the first term in the series (n = 0), a constant 1/2 (dc); this is a gross approximation of the square wave, as shown in Fig. 6.7a. In the next step we add the dc (n = 0) and the first harmonic (fundamental), which results in a signal shown in Fig. 6.7b. Observe that the synthesized signal somewhat resembles x(t). It is a smoothed-out version of x(t). The sharp corners in x(t) are not reproduced in this signal because sharp corners mean rapid changes, and their reproduction requires rapidly varying (i.e., higher-frequency) components, which are excluded. Figure 6.7c shows the sum of dc, first, and third harmonics (even harmonics are absent). As we increase the number of harmonics progressively, as shown in Fig. 6.7d (sum up to the fifth harmonic) and 6.7e (sum up to the nineteenth harmonic), the edges of the pulses become sharper and the signal resembles x(t) more closely. ASYMPTOTIC RATE OF AMPLITUDE SPECTRUM DECAY Figure 6.7 brings out one interesting aspect of the Fourier series. Lower frequencies in the Fourier series affect the large-scale behavior of x(t), whereas the higher frequencies determine the fine structure such as rapid wiggling. Hence, sharp changes in x(t), being a part of fine structure, necessitate higher frequencies in the Fourier series. The sharper the change [the higher the time derivative x(t)], the higher are the frequencies needed in the series.

Figure 6.7: Synthesis of a square-pulse periodic signal by successive addition of its harmonics. The amplitude spectrum indicates the amounts (amplitudes) of various frequency components of x(t). If x(t) is a smooth function, its variations are less rapid. Synthesis of such a function requires predominantly lower-frequency sinusoids and relatively small amounts of rapidly varying (higher-frequency) sinusoids. The amplitude spectrum of such a function would decay swiftly with frequency. To synthesize such a function we require fewer terms in the Fourier series for a good approximation. On the other hand, a signal with sharp changes, such as jump discontinuities, contains rapid variations, and its synthesis requires relatively large amount of highfrequency components. The amplitude spectrum of such a signal would decay slowly with frequency, and to synthesize such a function, we require many terms in its Fourier series for a good approximation. The square wave x(t) is a discontinuous function with jump discontinuities, and therefore its amplitude spectrum decays rather slowly, as 1/n [see Eq. (6.17)]. On the other hand, the triangular pulse periodic signal in Fig. 6.3a is smoother because it is a continuous function (no jump discontinuities). Its spectrum decays rapidly with frequency as 1/n 2 [see Eq. (6.16)].

We can show that[6] that if the first k − 1 derivatives of a periodic signal x(t) are continuous and the kth derivative is discontinuous,

then its amplitude spectrum c n decays with frequency at least as rapidly as 1/n k+1 . This result provides a simple and useful means for predicting the asymptotic rate of convergence of the Fourier series. In the case of the square-wave signal (Fig. 6.5a), the zeroth derivative of the signal (the signal itself) is discontinuous, so that k = 0. For the triangular periodic signal in Fig. 6.3a, the first derivative is discontinuous; that is, k = 1. For this reason the spectra of these signals decay as 1/n and 1/n 2 , respectively.

PHASE SPECTRUM: THE WOMAN BEHIND A SUCCESSFUL MAN[†] The role of the amplitude spectrum in shaping the waveform x(t) is quite clear. However, the role of the phase spectrum in shaping this waveform is less obvious. Yet, the phase spectrum, like the woman behind a successful man, plays an equally important role in waveshaping. We can explain this role by considering a signal x(t) that has rapid changes such as jump discontinuities. To synthesize an instantaneous change at a jump discontinuity, the phases of the various sinusoidal components in its spectrum must be such that all (or most) of the harmonic components will have one sign before the discontinuity and the opposite sign after the discontinuity. This will result in a sharp change in x(t) at the point of discontinuity. We can verify this fact in any waveform with jump discontinuity. Consider, for example, the sawtooth waveform in Fig. 6.6b. This waveform has a discontinuity at t = 1. The Fourier series for this waveform, as given in Exercise E6.1b, is

Figure 6.8 shows the first three components of this series. The phases of all the (infinite) components are such that all the components are positive just before t = 1 and turn negative just after t = 1, the point of discontinuity. The same behavior is also observed at t = −1, where a similar discontinuity occurs. This sign change in all the harmonics adds up to produce very nearly a jump discontinuity. The role of the phase spectrum is crucial in achieving a sharp change in the waveform. If we ignore the phase spectrum when trying to reconstruct this signal, the result will be a smeared and spread-out waveform. In general, the phase spectrum is just as crucial as the amplitude spectrum in determining the waveform. The synthesis of any signal x(t) is achieved by using a proper combination of amplitudes and phases of various sinusoids. This unique combination is the Fourier spectrum of x(t).

Figure 6.8: Role of the phase spectrum in shaping a periodic signal. FOURIER SYNTHESIS OF DISCONTINUOUS FUNCTIONS: THE GIBBS PHENOMENON Figure 6.7 showed the square function x(t) and its approximation by a truncated trigonometric Fourier series that includes only the first N harmonics for N = 1, 3, 5, and 19. The plot of the truncated series approximates closely the function x(t) as N increases, and we expect that the series will converge exactly to x(t) as N→ ∞. Yet the curious fact, as seen from Fig. 6.7, is that even for large N, the truncated series exhibits an oscillatory behavior and an overshoot approaching a value of about 9% in the vicinity of the discontinuity at the nearest peak of oscillation.[†] Regardless of the value of N, the overshoot remains at about 9%. Such strange behavior certainly would undermine anyone's faith in the Fourier series. In fact, this behavior puzzled many scholars at the turn of the century. Josiah Willard Gibbs, an eminent mathematical physicist who was the inventor of vector analysis, gave a mathematical explanation of this behavior (now called the Gibbs phenomenon).

We can reconcile the apparent aberration in the behavior of the Fourier series by observing from Fig. 6.7 that the frequency of oscillation of the synthesized signal is N f0 , so the width of the spike with 9% overshoot is approximately 1/2Nf0 . As we increase N, the frequency of oscillation increases and the spike width 1/2Nf0 diminishes. As N → ∞, the error power → 0 because the error consists mostly of the spikes, whose widths → 0. Therefore, as N → ∞, the corresponding Fourier series differs from x(t) by about 9% at the immediate left and right of the points of discontinuity, and yet the error power → 0. The reason for all this confusion is that in this case, the Fourier series converges in the mean. When this happens, all we promise is that the error energy (over one period) → 0 as N → ∞. Thus, the series may differ from x(t) at some points and yet have the error signal power zero, as verified earlier. Note that the series, in this case also converges pointwise at all points except the points of discontinuity. It is precisely at the discontinuities that the series differs from x(t) by 9%. [†]

When we use only the first N terms in the Fourier series to synthesize a signal, we are abruptly terminating the series, giving a unit weight to the first N harmonics and zero weight to all the remaining harmonics beyond N. This abrupt termination of the series causes the Gibbs phenomenon in synthesis of discontinuous functions. Section 7.8 offers more discussion on the Gibbs phenomenon, its

ramifications, and cure. The Gibbs phenomenon is present only when there is a jump discontinuity in x(t). When a continuous function x(t) is synthesized by using the first N terms of the Fourier series, the synthesized function approaches x(t) for all t as N → ∞. No Gibbs phenomenon appears. This can be seen in Fig. 6.9, which shows one cycle of a continuous periodic signal being synthesized from the first 19 harmonics. Compare the similar situation for a discontinuous signal in Fig. 6.7.

Figure 6.9: Fourier synthesis of a continuous signal using first 19 harmonics. EXERCISE E6.3

By inspection of signals in Figs. 6.2a, 6.6a, and 6.6b, determine the asymptotic rate of decay of their amplitude spectra.

Answers 1/n, 1/n 2 , and 1/n, respectively. COMPUTER EXAMPLE C6.2 Analogous to Fig. 6.7, demonstrate the synthesis of the square wave of Fig. 6.5a by successively adding its Fourier components. >>x = inline ('mod(t+pi/2,2*pi)< =pi'); t = linspace (-2*pi, 2*pi,1000); >>sumterms = zeros(16, length(t)); sumterms(1,:) = 1/2; >>for n = 1:size(sumterms,1)-1; >>sumterms(n+1,:) = (2/(pi*n)*sin(pi*n/2))*cos(n*t); >>end >>x_N = cumsum (sumterms); figure(1); clf; ind = 0; >>for N = [0,1:2:size(sumterms, 1)-1], >>ind = ind+1; subplot (3,3,ind); >>plot (t,x_N(N+1),:), 'k',t,x(t), 'k--'); axis ([-2*pi 2*pi -0.2 1.2]); >>xlabel ('t'); ylabel (['x_{',num2str (N),'} (t)']); >>end

Figure C6.2 A HISTORICAL NOTE ON THE GIBBS PHENOMENON Normally speaking, troublesome functions with strange behavior are invented by mathematicians; we rarely see such oddities in practice. In the case of the Gibbs phenomenon, however, the tables were turned. A rather puzzling behavior was observed in a mundane object, a mechanical wave synthesizer, and then well-known mathematicians of the day were dispatched on the scent of it to discover its hideout. Albert Michelson (of Michelson-Morley fame) was an intense, practical man who developed ingenious physical instruments of

extraordinary precision, mostly in the field of optics. His harmonic analyzer, developed in 1898, could compute the first 80 coefficients of the Fourier series of a signal x(t) specified by any graphical description. The instrument could also be used as a harmonic synthesizer, which could plot a function x(t) generated by summing the first 80 harmonics (Fourier components) of arbitrary amplitudes and phases. This analyzer, therefore, had the ability of self-checking its operation by analyzing a signal x(t) and then adding the resulting 80 components to see whether the sum yielded a close approximation of x(t). Michelson found that the instrument checked very well with most of signals analyzed. However, when he tried a discontinuous function,

such as a square wave,[†] a curious behavior was observed. The sum of 80 components showed oscillatory behavior (ringing), with an overshoot of 9% in the vicinity of the points of discontinuity. Moreover, this behavior was a constant feature regardless of the number of terms added. A larger number of terms made the oscillations proportionately faster, but regardless of the number of terms added, the overshoot remained 9%. This puzzling behavior caused Michelson to suspect some mechanical defect in his synthesizer. He wrote about his observation in a letter to Nature (December 1898). Josiah Willard Gibbs, who was a professor at Yale, investigated and

clarified this behavior for a sawtooth periodic signal in a letter to Nature.[7] Later, in 1906, Bôcher generalized the result for any function

with discontinuity. [8] It was Bôcher who gave the name Gibbs phenomenon to this behavior. Gibbs showed that the peculiar behavior in the synthesis of a square wave was inherent in the behavior of the Fourier series because of nonuniform convergence at the points of discontinuity. This, however, is not the end of the story. Both Bôcher and Gibbs were under the impression that this property had remained undiscovered until Gibbs's work published in 1899. It is now known that what is called the Gibbs phenomenon had been observed in 1848 by Wilbraham of Trinity College, Cambridge, who clearly saw the behavior of the sum of the Fourier series components in the periodic sawtooth signal later investigated by Gibbs. [9] Apparently, this work was not known to most people, including Gibbs and Bôcher. [†] The reason for calling this behavior "convergence in the mean" is that minimizing the error energy over a certain interval is

equivalent to minimizing the mean-squared value of the error over the same interval. [6] Guillemin, E. A. Theory of Linear Physical Systems. Wiley, New York, 1963. [†] Or, to keep up with times, "the man behind a successful woman".

[†] There is also an undershoot of 9% at the other side [at t = (π/2) + ] of the discontinuity. [†] Actually, at discontinuities, the series converges to a value midway between the values on either side of the discontinuity. The 9% overshoot occurs at t = (π/2) − and 9% undershoot occurs at t = (π/2) + . [†] Actually it was a periodic sawtooth signal. [7] Gibbs, W. J. Nature, vol. 59, p. 606, April 1899. [8] Bôcher, M. Annals of Mathematics, vol. 7, no. 2, 1906. [9] Carslaw, H. S. Bulletin of the American Mathematical Society, vol. 31, pp. 420-424, October 1925.

6.3 EXPONENTIAL FOURIER SERIES 0

0

By using Euler's equality, we can express cos nω0 t and sin nω0 t in terms of exponentials e jnω t and e −jnω t . Clearly, we should be able to express the trigonometric Fourier series in Eq. (6.9) in terms of exponentials of the form e jnω0 t with the index n taking on all integer values from −∞ to ∞, including zero. Derivation of the exponential Fourier series from the results already derived for the trigonometric Fourier series is straightforward, involving conversion of sinusoids to exponentials. We shall, however, derive them here independently, without using the prior results of the trigonometric series. This discussion shows that the exponential Fourier series for a periodic signal x(t) can be expressed as

To derive the coefficients D n , we multiply both sides of this equation by e −jm ω0 t (m integer) and integrate over one period. This yields

Here we use the orthogonality property of exponentials (proved in the footnote below) [†]

Using this result in Eq. (6.27), we obtain

from which we obtain

To summarize, the exponential Fourier series can be expressed as

where

Observe the compactness of expressions (6.29a) and (6.29b) and compare them with expressions corresponding to the trigonometric Fourier series. These two equations demonstrate very clearly the principal virtue of the exponential Fourier series. First, the form of the series is most compact. Second, the mathematical expression for deriving the coefficients of the series is also compact. It is much more convenient to handle the exponential series than the trigonometric one. For this reason we shall use exponential (rather than trigonometric) representation of signals in the rest of the book. We can now relate D n to trigonometric series coefficients a n and b n . Setting n = 0 in Eq. (6.29b), we obtain

Moreover, for n ≠ 0

and

These results are valid for general x(t), real or complex. When x(t) is real, a n and b n are real, and Eqs. (6.30b) and (6.30c) show that D n and D −n are conjugates.

Moreover, from Eqs. (6.13), we observe that

Hence

and

Therefore

Note that |D n | are the amplitudes and ∠D n are the angles of various exponential components. From Eqs. (6.33) it follows that when x(t)

is real, the amplitude spectrum (|D n | versus ω) is an even function of ω and the angle spectrum (∠D n versus ω) is an odd function of ω. For complex x(t), D n and D −n are generally not conjugates. EXAMPLE 6.5 Find the exponential Fourier series for the signal in Fig. 6.2a (Example 6.1). In this case T0 = π, ω0 = 2π/T0 = 2, and

where

and

Observe that the coefficients D n are complex. Moreover, D n and D −n are conjugates, as expected. COMPUTER EXAMPLE C6.3 Following Example 6.5, compute and plot the exponential Fourier spectra for the periodic signal x(t) shown in Fig. 6.2a. The expression for D n is derived in Example 6.5. >> >> >> >> >>

n = (-10:10); D_n = 0.504./(1+j*4*n); clf; subplot (2,1,1); stem(n,abs(D_n),'k'); xlabel('n'); ylabel ('|D_n|'); subplot (2,1,2); stem(n,angle(D_n),'k'); xlabel ('n'); ylabel('\angle D n [rad]');

Figure C6.3

6.3-1 Exponential Fourier Spectra In exponential spectra, we plot coefficients D n as a function of ω. But since D n is complex in general, we need both parts of one of two sets of plots: the real and the imaginary parts of D n , or the magnitude and the angle of D n . We prefer the latter because of its close connection to the amplitudes and phases of corresponding components of the trigonometric Fourier series. We therefore plot |D n |

versus ω and ∠D n versus ω. This requires that the coefficients D n be expressed in polar form as |D n |e ∠Dn , where |D n | are the amplitudes and ∠D n are the angles of various exponential components. Equations (6.33) show that for real x(t), the amplitude spectrum (|D n | versus ω) is an even function of ω and the angle spectrum (ωD n versus ω) is an odd function of ω. For the series in Example 6.5 [Eq. (6.35b)], for instance,

and

and so on. Note that D n and D −n are conjugates, as expected [see Eqs. (6.33)]. Figure 6.10 shows the frequency spectra (amplitude and angle) of the exponential Fourier series for the periodic signal x(t) in Fig. 6.2a.

Figure 6.10: Exponential Fourier spectra for the signal in Fig. 6.2a. We notice some interesting features of these spectra. First, the spectra exist for positive as well as negative values of ω (the frequency). Second, the amplitude spectrum is an even function of ω and the angle spectrum is an odd function of ω. At times it may appear that the phase spectrum of a real periodic signal fails to satisfy the odd symmetry: for example, when D k = D −k = −10. In this case, D k = 10e j π , and therefore, D −k = 10e −j π . Recall that e ±j π = −1. Here, although D k = D −k , their phases should be taken as π and −π. WHAT IS A NEGATIVE FREQUENCY? The existence of the spectrum at negative frequencies is somewhat disturbing because, by definition, the frequency (number of repetitions per second) is a positive quantity. How do we interpret a negative frequency? We can use a trigonometric identity to express a sinusoid of a negative frequency −ω0 as This equation clearly shows that the frequency of a sinusoid cos(ω0 t + θ) is |ω0 |, which is a positive quantity. The same conclusion is reached by observing that Thus, the frequency of exponentials e ±jω0 t is indeed |ω0 |. How do we then interpret the spectral plots for negative values of ω? A more satisfying way of looking at the situation is to say that exponential spectra are a graphical representation of coefficients D n as a function of ω. Existence of the spectrum at ω = − n ω0 is merely an indication that an exponential component e −jn ω0 t exists in the series. We know that a sinusoid of frequency n ω0 can be expressed in terms of a pair of exponentials e jnω 0 t and e −jnω 0 t .

We see a close connection between the exponential spectra in Fig. 6.10 and the spectra of the corresponding trigonometric Fourier series for x(t) (Fig. 6.2b, 6.2c). Equations (6.33) explain the reason for close connection, for real x(t), between the trigonometric spectra (C n and ∠ n ) with exponential spectra (|D n | and ∠D n ). The dc components D 0 and C 0 are identical in both spectra. Moreover, the exponential amplitude spectrum |D n | is half the trigonometric amplitude spectrum C n for n ≥ 1. The exponential angle spectrum ∠D n is identical to the trigonometric phase spectrum θn for n ≥ 0. We can therefore produce the exponential spectra merely by inspection of trigonometric spectra, and vice versa. The following example demonstrates this feature. EXAMPLE 6.6 The trigonometric Fourier spectra of a certain periodic signal x(t) are shown in Fig. 6.11a. By inspecting these spectra, sketch the corresponding exponential Fourier spectra and verify your results analytically.

Figure 6.11 The trigonometric spectral components exist at frequencies 0, 3, 6, and 9. The exponential spectral components exist at 0, 3, 6, 9, and −3, −6, −9. Consider first the amplitude spectrum. The dc component remains unchanged: that is, D 0 = C 0 = 16. Now |D n | is an even function of ω and |D n | = |D −n | = C n /2. Thus, all the remaining spectrum |D n | for positive n is half the trigonometric amplitude spectrum C n , and the spectrum |D n | for negative n is a reflection about the vertical axis of the spectrum for positive n, as shown in Fig. 6.11b. The angle spectrum ∠D n = θn for positive n and is −θn for negative n, as depicted in Fig. 6.11b. We shall now verify that both sets of spectra represent the same signal. Signal x(t), whose trigonometric spectra are shown in Fig. 6.11a, has four spectral components of frequencies 0, 3, 6, and 9. The dc component is 16. The amplitude and the phase of the component of frequency 3 are 12 and −π/4, respectively. Therefore, this component can be expressed as 12 cos (3t − π/4). Proceeding in this manner, we can write the Fourier series for x(t) as

Consider now the exponential spectra in Fig. 6.11b. They contain components of frequencies 0 (dc), ±3, ±6, and ±9. The dc component

is D 0 = 16. The component e j3t (frequency 3) has magnitude 6 and angle −π/4. Therefore, this component strength is 6e j π /4 and it can

be expressed as (6e −j π /4 )e j3t. Similarly, the component of frequency −3 is (6e j π /4 )e −j3t. Proceeding in this manner, corresponding to the spectra in Fig. 6.11b, is

the signal

Clearly both sets of spectra represent the same periodic signal. BANDWIDTH OF A SIGNAL The difference between the highest and the lowest frequencies of the spectral components of a signal is the bandwidth of the signal. The bandwidth of the signal whose exponential spectra are shown in Fig. 6.11b is 9 (in radians). The highest and lowest frequencies are 9 and 0, respectively. Note that the component of frequency 12 has zero amplitude and is nonexistent. Moreover, the lowest frequency is 0, not −9. Recall that the frequencies (in the conventional sense) of the spectral components at ˉ = −3, −6, and −9 in

reality are 3, 6, and 9.[†] The bandwidth can be more readily seen from the trigonometric spectra in Fig. 6.11a.

EXAMPLE 6.7 Find the exponential Fourier series and sketch the corresponding spectra for the impulse train δT0(t) depicted in Fig. 6.12a. From this result sketch the trigonometric spectrum and write the trigonometric Fourier series for δT0(t).

Figure 6.12: (a) Impulse train and (b, c) its Fourier spectra. The unit impulse train shown in Fig. 6.12a can be expressed as

Following Papoulis, we shall denote this function as δT0(t) for the sake of notational brevity. The exponential Fourier series is given by

where

Choosing the interval of integration (−T0 /2, T0 /2) and recognizing that over this interval δT0(t) = δ(t),

In this integral the impulse is located at t = 0. From the sampling property (1.24a), the integral on the right-hand side is the value of e −jnω0 t at t = 0 (where the impulse is located). Therefore

Substitution of this value in Eq. (6.36) yields the desired exponential Fourier series

Equation (6.37) shows that the exponential spectrum is uniform (D n =1/T0 ) for all the frequencies, as shown in Fig. 6.12b. The spectrum, being real, requires only the amplitude plot. All phases are zero. To sketch the trigonometric spectrum, we use Eq. (6.33) to obtain

Figure 6.12c shows the trigonometric Fourier spectrum. From this spectrum we can express δT0 (t) as

EFFECT OF SYMMETRY IN EXPONENTIAL FOURIER SERIES When x(t) has an even symmetry, b n =0, and from Eq. (6.30b), D n =a n /2, which is real (positive or negative). Hence, ∠D n can only be 0 or ±π. Moreover, we may compute D n =a n /2 by using Eq. (6.18b), which requires integration over a half-period only. Similarly, when x(t) has an odd symmetry, a n =0, and D n =−jb n /2 is imaginary (positive or negative). Hence, ∠D n can only be 0 or ±π/2. Moreover, we may compute D n =/jb n /2 by using Eq. (6.19b), which requires integration over a half-period only. Note, however, that in the exponential case, we are using the symmetry property indirectly by finding the trigonometric coefficients. We cannot apply it directly to Eq. (6.29b). EXERCISE E6.4

The exponential Fourier spectra of a certain periodic signal x(t) are shown in Fig. 6.13. Determine and sketch the trigonometric Fourier spectra of x(t) by inspection of Fig. 6.13. Now write the (compact) trigonometric Fourier series for x(t).

Figure 6.13 Answers

EXERCISE E6.5

Find the exponential Fourier series and sketch the corresponding Fourier spectrum D n versus ω for the fullwave rectified sine wave depicted in Fig. 6.14.

Figure 6.14 Answers

EXERCISE E6.6

Find the exponential Fourier series and sketch the corresponding Fourier spectra for the periodic signals shown in Fig. 6.6.

Answers a.

b.

6.3-2 Parseval's Theorem The trigonometric Fourier series of a periodic signal x(t) is given by

Every term on the right-hand side of this equation is a power signal. As shown in Example 1.2, Eq. (1.4d), the power of x(t) is equal to the sum of the powers of all the sinusoidal components on the right-hand side.

The result is one form of the Parseval's theorem, as applied to power signals. It states that the power of a periodic signal is equal to the sum of the powers of its Fourier components. We can apply the same argument to the exponential Fourier series (see Prob. 1.1-8). The power of a periodic signal x(t) can be

expressed as a sum of the powers of its exponential components. In Eq. (1.4e), we showed that the power of an exponential Dejω0 t is |D 2 |. We can use this result to express the power of a periodic signal x t) in terms; of its exponential Fourier series coefficients as

For a real (t), |D −n |=|D n |. Therefore

EXAMPLE 6.8 The input signal to an audio amplifier of gain 100 is given by x (t)=0.1 cos ω0 t. Hence, the output is a sinusoid 10 cos ω0 t. However, the amplifier, being nonlinear at higher amplitude levels, clips all amplitudes beyond ±8 volts as shown in Fig. 6.15a. We shall determine the harmonic distortion incurred in this operation.

Figure 6.15: (a) A clipped sinusoid cos. ω0 t (b) The distortion component x d (t) of the signal in (a). The output y(t) is the clipped signal in Fig. 6.15a. The distortion signal y d (t), shown in Fig. 6.15b, is the difference between the undistorted sinusoid 10 cos ω0 t and the output signal y(t). The signal y d (t), whose period is T0 [the same as that of y(t) can be described over the first cycle as

Observe that y d (t) is an even function of t and its mean value is zero. Hence, a 0 =C 0 =0, and b n =0. Thus, C n =a n and the Fourier series for y d (t) can be expressed as

As usual, we can compute the coefficients C n (which is equal to a n ) by integrating y d (t) cos n ω0 t over one cycle (and then dividing by 2/T0 ). Because y d (t) has even symmetry, we can find a n by integrating the expression over a half-cycle only using Eq. (6.18b). The straightforward evaluation of the appropriate integral yields [†]

Computing the coefficients C 1 C 2 C 3 ,... from this expression, we can write COMPUTING HARMONIC DISTORTION We can compute the amount of harmonic distortion in the output signal by computing the power of the distortion component y d (t). Because y d (t) is an even function of t and because the energy in the first half-cycle is identical to the energy in the second half-cycle, we can compute the power by averaging the energy over a quarter-cycle. Thus

The power of the desired signal 10 cos ω0 t is (10) 2 /2=50. Hence, the total harmonic distortion is

The power of the third harmonic components of y y (t) is (0.733) 2 /2=0.2686. The third harmonic distortion is [‡]

[†] We can readily prove this property as follows. For the case of m = n, the integrand in Eq. (6.28) is unity and the integral is T . When 0

m ≠ n, the integral on the left-hand side of Eq. (6.28) can be expressed as

Both the integrals on the right-hand side represent area under n − m number of cycles. Because n − m is an integer, both the areas are zero. Hence follows Eq. (6.28). [†] Some authors do define bandwidth as the difference between the highest and the lowest (negative) frequency in the exponential spectrum. The bandwidth according to this definition is twice that defined here. In reality, this phrasing defines not the signal bandwidth but the spectral width (width of the exponential spectrum of the signal). [†] In addition, y (t) exhibits half-wave symmetry (see Prob. 6.1-5), where the second half-cycle is the negative of the first. Because of d

this property, all the even harmonics vanish, and the odd harmonics can be computed by integrating the appropriate expressions over the first half-cycle only (from − T0 /4 to T0 /4) and doubling the resulting values. Moreover, because of even symmetry, we can integrate the appropriate expressions over 0 to T0 /4 (instead of from /T0 /4 to T0 /4) and double the resulting values. In essence, this allows us to compute C n integrating the expression over the quarter-cycle only and then quadrupling the resulting values. Thus

[‡] In the literature, the harmonic distortion often refers to the rms distortion rather than the power distortion. The rms values are the

. square-root values of the corresponding powers. Thus, the third harmonic distortion in this sense is Alternately, we may also compute this value directly from the amplitudes of the third harmonic 0.733 and that of the fundamental as 10. The ratio of the rms values is (0.733/√2). (10/√2) = 0.0733 and the percentage distortion is 7.33%.

6.4 LTIC SYSTEM RESPONSE TO PERIODIC INPUTS A periodic signal can be expressed as a sum of everlasting exponentials (or sinusoids). We also know how to find the response of an

LTIC system to an everlasting exponential. From this information we can readily determine the response of an LTIC system to periodic inputs. A periodic signal x(t) with period T0 can be expressed as an exponential Fourier series

In Section 4.8, we showed that the response of an LTIC system with transfer function H(s) to an everlasting exponential input e jωt is an everlasting exponential H(jω)e jωt . This input-output pair can be displayed as[†]

Therefore, from the linearity property

The response y (t) is obtained in the form of an exponential Fourier series and is therefore a periodic signal of the same period as that of the input. We shall demonstrate the utility of these results by the following example. EXAMPLE 6.9 A full-wave rectifier (Fig. 6.16a) is used to obtain a dc signal from a sinusoid sin t. The rectified signal x(t), depicted in Fig. 6.14, is applied to the input of a lowpass RC filter, which suppresses the time-varying component and yields a dc component with some residual ripple. Find the filter output y(t). Find also the dc output and the rms value of the ripple voltage.

Figure 6.16: (a) Full-wave rectifier with a lowpass filter and (b) its output. First, we shall find the Fourier series for the rectified signal x(t), whose period is T0 =π Consequently, ω=2, and

where

Therefore

Next, we find the transfer function of the RC filter in Fig. 6.16a. This filter is identical to the RC circuit in Example 1.11 (Fig. 1.35) for which the differential equation relating the output(capacitor voltage) to the input x(t) was found to be [Eq. (1.60)] The transfer function H(s) for this system is found from Eq. (2.50) as

and

From Eq. (6.42), the filter output y(t) can be expressed as (with ω 0=2)

Substituting D n and H(j2n) from Eqs. (6.43) and (6.44) in the foregoing equation, we obtain

Note that the output y(t) is also a periodic signal given by the exponential Fourier series on the right-hand side. The output is numerically computed from Eq. (6.45) and plotted in Fig. 6.16b. The output Fourier series coefficient corresponding to n=0 is the dc component of the output, given by 2/π. The remaining terms in the Fourier series constitute the unwanted component called the ripple. We can determine the rms value of the ripple voltage by using Eq. (6.41) to find the power of the ripple component. The power of the ripple is the power of all the components except the dc (n=0). Note that

, the exponential Fourier coefficient for the output y(t) is

Therefore, from Eq. (6.41b), we have

Numerical computation of the right-hand side yields Pripple=0.0025, and the ripple rms value ripple voltage is 5% of the amplitude of the input sinusoid.

. This shows that the rms

WHY USE EXPONENTIALS? The exponential Fourier series is just another way of representing trigonometric Fourier series (or vice versa). The two forms carry identical information-no more no less. The reasons for preferring the exponential form have already been mentioned: this form is more compact, and the expression for deriving the exponential coefficients is also more compact, than those in the trigonometric series. Furthermore, the LTIC system response to exponential signals is also simpler (more compact) than the system response to sinusoids. In addition, the exponential form proves to be much easier than the trigonometric form to manipulate mathematically and otherwise handle in the area of signals as well as systems. Moreover, exponential representation proves much more convenient for analysis of complex x(t). For these reasons, in our future discussion we shall use the exponential form exclusively. A minor disadvantage of the exponential form is that it cannot be visualized as easily as sinusoids. For intuitive and qualitative understanding, the sinusoids have the edge over exponentials. Fortunately, this difficulty can be overcome readily because of the close connection between exponential and Fourier spectra. For the purpose of mathematical analysis, we shall continue to use exponential signals and spectra; but to understand the physical situation intuitively or qualitatively, we shall speak in terms of sinusoids and trigonometric spectra. Thus, although all mathematical manipulation will be in terms of exponential spectra, we shall now speak of exponential and sinusoids interchangeably when we discuss intuitive and qualitative insights in attempting to arrive at an understanding of physical situations. This is an important point; readers should make an extra effort to familiarize themselves with the two forms of spectra, their relationships, and their convertibility. DUAL PERSONALITY OF A SIGNAL The discussion so far shows that a periodic signal has a dual personality-the time domain and the frequency domain. It can be described by its waveform or by its Fourier spectra. The time and frequency-domain descriptions provide complementary insights into a signal. For in-depth perspective, we need to understand both these identities. It is important to learn to think of a signal from both perspectives. In the next chapter, we shall see that aperiodic signals also have this dual personality. Moreover, we shall show that even LTI systems have this dual personality, which offers complementary insights into the system behavior. LIMITATIONS OF THE FOURIER SERIES METHOD OF ANALYSIS We have developed here a method of representing a periodic signal as a weighted sum of everlasting exponentials whose frequencies lie along the jω axis in the s plane. This representation (Fourier series) is valuable in many applications. However, as a tool for analyzing linear systems, it has serious limitations and consequently has limited utility for the following reasons: 1. The Fourier series can be used only for periodic inputs. All practical inputs are aperiodic (remember that a periodic signal

starts at t=−∞). 2. The Fourier methods can be applied readily to BIBO-stable (or asymptotically stable) systems. It cannot handle unstable or even marginally stable systems. The first limitation can be overcome by representing a periodic signals in terms of everlasting exponentials. This representation can be achieved through the Fourier integral, which may be considered to be an extension of the Fourier series. We shall therefore use the Fourier series as a stepping stone to the Fourier integral developed in the next chapter. The second limitation can be overcome by

using exponentials e st , where s is not restricted to the imaginary axis but is free to take on complex values. This generalization leads to the Laplace integral, discussed in Chapter 4 (the Laplace transform). [†] This result applies only to the asymptotically stable systems. This is because when s=jω , the integral on the right-hand side of Eq.

(2.48) does not converge for unstable systems. Moreover, for marginally stable systems also, that integral does not converge in the ordinary sense, and H(jω) cannot be obtained from H(s) by replacing s with jω.

6.5 GENERALIZED FOURIER SERIES: SIGNALS AS VECTORS [†] We now consider a very general approach to signal representation with far-reaching consequences. There is a perfect analogy between signals and vectors; the analogy is so strong that the term analogy understates the reality. Signals are not just like vectors. Signals are vectors! A vector can be represented as a sum of its components in a variety of ways, depending on the choice of coordinate system. A signal can also be represented as a sum of its components in a variety of ways. Let us begin with some basic vector concepts and then apply these concepts to signals.

6.5-1 Component of a Vector A vector is specified by its magnitude and its direction. We shall denote all vectors by boldface. For example, x is a certain vector with magnitude or length |x|. For the two vector x and y shown in Fig. 6.17, we define their dot (inner or scalar) product as

Figure 6.17: Component (projection) of a vector along another vector. where θ is the angle between these vectors. Using this definition we can express |x|, the length of a vector x, as

Let the component of x along y be c y as depicted in Fig. 6.17. Geometrically, the component of x along y is the projection of x on y and is obtained by drawing a perpendicular from the tip of x on the vector y, as illustrated in Fig. 6.17. What is the mathematical significance of a component of a vector along another vector? As seen from Fig. 6.17, the vector x can be expressed in terms of vector y as

However, this is not the only way to express x in terms of y. From Fig. 6.18, which shows two of the infinite other possibilities, we have

Figure 6.18: Approximation of a vector in terms of another vector. In each of these three representations, x is represented in terms of y plus another vector called the error vector, If we approximate x by cy

the error in the approximation is the vector e=x − c y. Similarly, the errors in approximations in these drawing are e 1 (Fig. 6.18a) and e 2 (Fig. 6.18b). What is unique about the approximation in Fig. 6.17 is that the error vector is the smallest. We can now define mathematically the component of a vector x along vector y to be c y where c is chosen to minimize the length of the error vector e=x−c y. Now, the length of the component of x along y is |x| cos θ. But its is also c|y| as seen from Fig. 6.17. Therefore Multiplying both sides by |y| yields Therefore

From Fig. 6.17, it is apparent that when x and y and are perpendicular, or orthogonal, then x has a zero component along y; consequently, c=0. Keeping an eye on Eq. (6.51), we therefore define x and y to be orthogonal if the inner (scalar or dot) product of the two vector is zero, that is, if

6.5-2 Signal Comparison and Component of a Signal The concept of a vector component and orthogonality can be extended to signals. Consider the problem of approximating a real signal x(t) in terms of another real signal y(t) over an interval (t1 , t 2 ):

The error e(t) in this approximation is

We now select a criterion for the "best approximation." We know that the signal energy is one possible measure of a signal size. For best approximation, we shall use the criterion that minimizes the size or energy of the error signal e(t) over the interval (t1 , t 2 ). This energy Ee is given by

Note that the right-hand side is a definite integral with t as the dummy variable. Hence, Ee is a function of the parameter c (not t) and Ee is minimum for some choice of c. To minimize Ee , a necessary condition is

or

Expanding the squared term inside the integral, we obtain

From which we obtain

and

We observe a remarkable similarity between the behavior of vectors and signals, as indicated by Eqs. (6.51) and (6.56). It is evident from these two parallel expressions that the area under the product of two signals corresponds to the inner (scalar or dot) product of two vectors. In fact, the area under the product of x(t) and y(t) is called the inner product of x(t) and y(t), and is denoted by (x, y). The energy of a signal is the inner product of a signal with itself, and corresponds to the vector length square (which is the inner product of the vector with itself). To summarize our discussion, if a signal x(t) is approximated by another signal y(t) as then the optimum value of c that minimizes the energy of the error signal in this approximation is given by Eq. (6.56). Taking our clue from vectors, we say that a signal x(t) contains a component cy(t), where c is given by Eq. (6.56). Note that in vector terminology, cy(t) is the projection of x(t) on y(t). Continuing with the analogy, we say that if the component of a signal x(t) of the form y(t) is zero (i.e., c=0), the signals x(t) and y(t) are orthogonal over the interval (t1 , t 2 ). Therefore, we define the real signals x(t) and y(t) to be orthogonal over the interval (t1 , t 2 ) if [†]

EXAMPLE 6.10 For the square signal x(t) shown in Fig. 6.19 find the component in x(t) of the form sin t. In other words, approximate x(t) in terms of sin t

Figure 6.19: Approximation of a square signal in terms of a single sinusoid. so that the energy of the error signal is minimum. In this case

From Eq. (6.56), we find

Thus

represents the best approximation of x(t) by the function sin t, which will minimize the error energy. This sinusoidal component of x(t) is shown shaded in Fig. 6.19. By analogy with vectors, we say that the square function x(t) depicted in Fig. 6.19 has a component of signal sin t and that the magnitude of this component is 4/π. EXERCISE E6.7 Show that over an interval (−π < t < π), the "best" approximation of the signal x(t)=t in terms of the function sin t is 2 sin t. Verify that the error signal e(t)=t − 2 sin t is orthogonal to the signal sin t over the interval −π < t < π. Sketch the signals t and 2 sin t over the interval −π < t < π.

6.5-3 Extension to Complex Signals So far we have restricted ourselves to real functions of t. To generalize the results to complex functions of t, consider again the problem of approximating a signal x(t) by a signal y(t) over an interval (t1 < t < t2 ):

where x(t) and y(t) now can be complex functions of t. Recall that the energy Ey of the complex signal y(t) over an interval (t1 , t 2 ) is

In this case, both the coefficient c and the error

are complex (in general). For the "best" approximation, we choose c so that Ee , the energy of the error signal e(t) is minimum. Now,

Recall also that

After some manipulation, we can use this result to rearrange Eq. (6.62) as

Since the first two terms on the right-hand side are independent of c, it is clear that Ee is minimized by choosing c so that the third term on the right-hand side is zero. This yields

In light of this result, we need to redefine orthogonality for the complex case as follows: two complex functions x 1 (t) and x 2 (t) are orthogonal over an interval (t1 < t < t2 ) if

Either equality suffices. This is a general definition of orthogonality, which reduces to Eq. (6.57) when the functions are real. EXERCISE E6.8 Show that over an interval (0 < t < 2π), the "best" approximation of the square signal x(t) in Fig. 6.19 in terms of the signal e jt is given

by (2/jπ)e jt . Verify that the error signal e(t)=x(t) − (2/jπ)e jt is orthogonal to the signal e jt . ENERGY OF THE SUM OF ORTHOGONAL SIGNALS

We know that the square of the length of a sum of two orthogonal vectors is equal to the sum of the squares of the lengths of the two vectors. Thus, if vectors x and y are orthogonal, and if z=x + y, then We have a similar result for signals. The energy of the sum of two orthogonal signals is equal to the sum of the energies of the two

signals. Thus, if signals x(t) and y(t) are orthogonal over an interval (t1 , t 2 ), and if z(t)=x(t) + y(t), then

We now prove this result for complex signals of which real signals are a special case. From Eq. (6.63) it follows that

The last result follows from the fact that because of orthogonality, the two integrals of the products x(t)y*(t) and x*(t)y(t) are zero [see Eq. (6.65)]. This result can be extended to the sum of any number of mutually orthogonal signals.

6.5-4 Signal Representation by an Orthogonal Signal Set In this section we show a way of representing a signal as a sum of orthogonal signals. Here again we can benefit from the insight gained from a similar problem in vectors. We know that a vector can be represented as a sum of orthogonal vectors, which form the coordinate system of a vector space. The problem in signals is analogous, and the results for signals are parallel to those for vectors. So, let us review the case of vector representation. ORTHOGONAL VECTOR SPACE Let us investigate a three-dimensional Cartesian vector space described by three mutually orthogonal vectors x 1 , x 2 , and x 3 , as illustrated in Fig. 6.20. First, we shall seek to approximate a three-dimensional vector x in terms of two mutually orthogonal vectors x 1 and x 2 :

Figure 6.20: Representation of a vector in three-dimensional space. The error e in this approximation is or As in the earlier geometrical argument, we see from Fig 6.20 that the length of e is minimum when e is perpendicular to the x 1 -x 2 plane, and c 1 x 1 and c 2 x 2 are the projections (components) of x on x 1 and x 2 , respectively. Therefore, the constants c 1 and c 2 are given by Eq. (6.51). Observe that the error vector is orthogonal to both the vectors x 1 and x 2 . Now, let us determine the "best" approximation to x in terms of all three mutually orthogonal vectors x 1 , x 2 , and x 3 :

Figure 6.20 shows that a unique choice of c 1 , c 2 , and c 3 exists, for which Eq. (6.68) is no longer an approximation but an equality

In this case, c 1 x 1 , c 2 x 2 , and c 3 x 3 are the projections (components) of x on x 1 , x 2 , and x 3 , respectively; that is,

Note that the error in the approximation is zero when x is approximated in terms of three mutually orthogonal vectors: x 1 , x 2 , and x 3 . The reason is that x is a three-dimensional vector, and the vectors x 1 , x 2 , and x 3 represent a complete set of orthogonal vectors in three-dimensional space. Completeness here means that it is impossible to find another vector x 4 in this space, which is orthogonal to all three vectors, x 1 , x 2 , and x 3 . Any vector in this space can then be represented (with zero error) in terms of these three vectors. Such vectors are known as basis vectors. If a set of vectors {x i } is not complete, the error in the approximation will generally not be zero. Thus, in the three-dimensional case discussed earlier, it is generally not possible to represent a vector x in terms of only two basis vectors without an error. The choice of basis vectors is not unique. In fact, a set of basis vectors corresponds to a particular choice of coordinate system. Thus, a three-dimensional vector x may be represented in many different ways, depending on the coordinate system used. ORTHOGONAL SIGNAL SPACE We start with real signals first and then extend the discussion to complex signals. We proceed with our signal approximation problem, using clues and insights developed for vector approximation. As before, we define orthogonality of a real signal set x 1 (t), x 2 (t), ..., x N(t) over interval (t1 , t 2 ) as

If the energies En =1 for all n, then the set is normalized and is called an orthonormal set. An orthogonal set can always be normalized by dividing x n (t) by √En for all n. Now, consider approximating a signal x(t) over the interval (t1 , t 2 ) by a set of N real, mutually orthogonal signals x 1 (t), x 2 (t), ..., x N(t) as

In the approximation of Eqs. (6.72) the error e(t) is

and Ee , the error signal energy is

According to our criterion for best approximation, we select the values of c i that minimize Ee . Hence, the necessary condition is ∂Ee /dci =0 for i=1, 2, ..., N, that is,

When we expand the integrand, we find that all the cross-multiplication terms arising from the orthogonal signals are zero by virtue of orthogonality: that is, all terms of the form ∮x m (t)x n (t) dt with m ≠ n vanish. Similarly, the derivative with respect to c i of all terms that do not contain c i is zero. For each i, this leaves only two nonzero terms in Eq. (6.75):

or

Therefore

A comparison of Eqs. (6.76) with Eqs. (6.70) forcefully brings out the analogy of signals with vectors. Finality Property. Equation (6.76) shows one interesting property of the coefficients of c 1 , c 2 , ..., c N: the optimum value of any coefficient in approximation (6.72a) is independent of the number of terms used in the approximation. For example, if we used only one term (N=1) or two terms (N=2) or any number of terms, the optimum value of the coefficient c 1 would be the same [as given by Eq. (6.76)]. The advantage of this approximation of a signal x(t) by a set of mutually orthogonal signals is that we can continue to add terms to the approximation without disturbing the previous terms. This property of finality of the values of the coefficients is very important from a practical point of view.[†]

ENERGY OF THE ERROR SIGNAL When the coefficients c i in the approximation (6.72) are chosen according to Eqs. (6.76), the error signal energy in the approximation (6.72) is minimized. This minimum value of Ee is given by Eq. (6.74):

Substitution of Eqs. (6.71) and (6.76) in this equation yields

Observe that because the term c k 2 Ek is nonnegative, the error energy Ee generally decreases as N, the number of terms, is increased. Hence, it is possible that the error energy → 0 as N →∞. When this happens, the orthogonal signal set is said to be complete. In this case, Eq. (6.72b) is no more an approximation but an equality

where the coefficients c n are given by Eq. (6.76b). Because the error signal energy approaches zero, it follows that the energy of x(t) is now equal to the sum of the energies of its orthogonal components c 1 x 1 (t), c 2 x 2 (t), c 3 x 3 (t), ... The series on the right-hand side of Eq. (6.78) is called the generalized Fourier series of x(t) with respect to the set {x n (t)}. When the set {x n (t)} is such that the error energy Ee → 0 as N → ∞ for every member of some particular class, we say that the set {x n (t)} is complete on (t1 , t 2 ) for that class of x(t), and the set {x n (t)} is called a set of basis functions or basis signals. Unless otherwise mentioned, in future we shall consider only the class of energy signals. Thus, when the set {x n (t)} is complete, we have the equality (6.78). One subtle point that must be understood clearly is the meaning of equality in Eq. (6.78). The equality here is not an equality in the ordinary sense, but in the sense that the error energy, that is, the energy of the difference between the two sides of Eq. (6.78), approaches zero. If the equality exists in the ordinary sense, the error energy is always zero, but the converse is not necessarily true. The error energy can approach zero even though e(t), the difference between the two sides, is nonzero at some isolated instants. The reason is that even if e(t) is nonzero at such instants, the area under

e 2 (t) is still zero; thus the Fourier series on the right-hand side of Eq. (6.78) may differ from x(t) at a finite number of points. In Eq. (6.78), the energy of the left-hand side is Ex , and the energy of the right-hand side is the sum of the energies of all the

orthogonal components. [†] Thus

This is the Parseval's theorem applicable to energy signals. In Eqs. (6.40) and (6.41), we have already encountered the form of the Parseval theorem suitable for power signals. Recall that the signal energy (area under the squared value of a signal) is analogous to the square of the length of a vector in the vector-signal analogy. In vector space, we know that the square of the length of a vector is equal to the sum of the squares of the lengths of its orthogonal components. The Parseval theorem in Eq. (6.79) is the statement of this fact as it applies to signals. GENERALIZATION TO COMPLEX SIGNALS The foregoing results can be generalized to complex signals as follows: a set of functions x 1 (t), x 2 (t), ..., x N(t) is mutually orthogonal over the interval (t1 , t 2 ) if

If this set is complete for a certain class of functions, then a function x(t) in this class can be expressed as

where

EXAMPLE 6.11 As an example, we shall consider again the square signal x(t) in Fig. 6.19. In Example 6.10 this signal was approximated by a single sinusoid sin t. Actually the set sin t, sin 2t, ..., sin nt, ... is orthogonal over the interval over any interval of duration 2π. [†] The reader can verify this fact by showing that for any real number a

Let us approximate the square signal in Fig. 6.19, using this set, and see how the approximation improves with number of terms where

Therefore

Note that coefficients of terms sin kt are zero for even values of k. Figure 6.21 shows how the approximation improves as we increase the number of terms in the series. Let us investigate the error signal energy as N → ∞. Form Eq. (6.77)

Figure 6.21: Approximation of a square signal by a sum of sinusoids. Note that

and from Eq. (6.83) Therefore

For a single-term approximation (N=1),

For a two-term approximation (N=3)

Table 6.3 shows the error energy Ee for various values of N. Table 6.3 Open table as spreadsheet N

Ee

1

1.1938

3

0.6243

5

0.4206

7

0.3166

99

0.02545

∞

0

Clearly, x(t) can be represented by the infinite series

The equality exists in the sense that the error signal energy → 0 as N → ∞. In this case, the error energy decreases rather slowly with N, indicating that the series converges slowly. This is to be expected because x(t) has jump discontinuities and consequently, according to discussion in Section 6.2-2, the series converges asymptotically as 1/n. EXERCISE E6.9

Approximate the signal x(t)=t − π (Fig. 6.22) over the interval (0, 2p) in terms of the set of sinusoids {sin nt}, n=0, 1, 2, ..., used in Example 6.11. Find Ee , the error energy. Show that Ee → 0 as N → ∞.

Figure 6.22 Answers

SOME EXAMPLES OF GENERALIZED FOURIER SERIES Signals are vectors in every sense. Like a vector, a signal can be represented as a sum of its components in a variety of ways. Just as vector coordinate systems are formed by mutually orthogonal vectors (rectangular, cylindrical, spherical), we also have signal coordinate systems (basis signals) formed by a variety of sets of mutually orthogonal signals. There exist a large number of orthogonal signal sets that can be used as basis signals for generalized Fourier series. Some well-known signal sets are trigonometric (sinusoid) functions, exponential functions, Walsh functions, Bessel functions, Legendre polynomials, Laguerre functions, Jacobi polynomials, Hermite polynomials, and Chebyshev polynomials. The functions that concern us most in this book are the trigonometric and the exponential sets discussed earlier in this chapter.

LEGENDRE FOURIER SERIES A set of Legendre polynomials Pn (t) (n=0, 1, 2, 3, ...) forms a complete set of mutually orthogonal functions over an interval (−1 < t < 1). These polynomials can be defined by the Rodrigues formula:

It follows from this equation that

and so on. We may verify the orthogonality of these polynomials by showing that

We can express a function x(t) in terms of Legendre polynomials over an interval (−1 < t < 1) as

where

Note that although the series representation is valid over the interval (−1, 1), it can be extended to any interval by the appropriate time scaling (see Prob. 6.5-8). EXAMPLE 6.12 Let us consider the square signal shown in Fig. 6.23. This function can be represented by Legendre Fourier series:

Figure 6.23 The coefficients c 0 , c 1 , c 2 , ..., c r may be found from Eq. (6.89). We have

and

This result follows immediately from the fact that the integrand is an odd function of t. In fact, this is true of all c r for even values of r, that is, Also,

In a similar way, coefficients c 5 , c 7 , ... can be evaluated. We now have

TRIGONOMETRIC FOURIER SERIES We have already proved [see Eqs. (6.7)] that the trigonometric signal set

is orthogonal over any interval of duration T0 , where T0 =1/ƒ 0 is the period of the sinusoid of frequency ƒ 0 . This is a complete set for a class of signals with finite energies. [11] , [12] Therefore we can express a signal x(t) by a trigonometric Fourier series over any interval of duration T0 seconds as

or

where

We can use Eq. (6.76) to determine the Fourier coefficients a 0 , a n , and b n . Thus

The integral in the denominator of Eq. (6.93) has already been found to be T0 /2 when n ≠ 0 [Eq. (6.7a) with m=n]. For n=0, the denominator is T0 . Hence

and

Similarly, we find that

Note that the Fourier series in Eq. (6.85) of Example 6.11 is indeed the trigonometric Fourier series with T0 =2π and ω0 =2π/T0 . In this particular example, it is easy to verify from Eqs. (6.94a) and (6.94b) that a n =0 for all n, including n=0. Hence the Fourier series in that example consisted only of sine terms. EXPONENTIAL FOURIER SERIES As shown in the footnote on page 624, the set of exponentials e j?0 t (n=0, ±1, ±2, ...) is a set of functions orthogonal over any interval of duration T0 =2π/ω0 . An arbitrary signal x(t) can now be expressed over an interval (t1 , t 1 + T0 ) as

where [see Eq. (6.82)]

WHY USE THE EXPONENTIAL SET? If x(t) can be represented in terms of hundreds of different orthogonal sets, why do we exclusively use the exponential (or trigonometric) set for the representation of signals or LTI systems? It so happens that the exponential signal is an eigenfunction of LTI systems. In other words, for an LTI system, only an exponential input e st yields the response that is also an exponential of the same form, given by

H(s)e st . The same is true of the trigonometric set. This fact makes the use of exponential signals natural for LTI systems in the sense that the system analysis using exponentials as the basis signals is greatly simplified.

[†] This section closely follows the material from the author's earlier book [10] . Omission of this section will not cause any discontinuity in

understanding the rest of the book. Derivation of Fourier series through the signal-vector analogy provides an interesting insight into signal representation and other topics such as signal correlation, data truncation, and signal detection. [†] Lathi, B. P. Signals, Systems, and Communication. Wiley, New York, 1965. [†] For complex signals the definition is modified as in Eq. (6.65), in Section 6.5-3. [†] Contrast this situation with polynomial approximation of x(t). Suppose we wish to find a two-point approximation of x(t) by a

polynomial in t; that is, the polynomial is to be equal to x(t) at two points t1 and t2 . This can be done by choosing a first-order polynomial a 0 + a 1 t with

Solution of these equations yields the desired values of a 0 and a 1 . For a three-point approximation, we must choose the polynomial a 0 + a 1 t + a 2 t2 with The approximation improves with larger number of points (higher-order polynomial), but the coefficients a 0 , a 1 , a 2 , ..., do not have the finality property. Every time we increase the number of terms in the polynomial, we need to recalculate the coefficients. [†] Note that the energy of a signal cx(t) is c 2 E . x [†] This sine set, along with the cosine set cos 0 t, cos 2t, ..., cos nt, ..., forms a complete set. In this case, however, the coefficients c i

corresponding to the cosine terms are zero. For this reason, we have omitted cosine terms in this example. This composite sine and cosine set is the basis set for the trigonometric Fourier series. [11] Walker P. L. The Theory of Fourier Series and Integrals. Wiley, New York, 1986. [12] Churchill, R. V., and J. W. Brown. Fourier Series and Boundary Value Problems, 3rd ed. McGraw-Hill, New York, 1978.

6.6 NUMERICAL COMPUTATION OF Dn We can compute D n numerically by using the DFT (the discrete Fourier transform discussed in Section 8.5), which uses the samples of a periodic signal x(t) over one period. The sampling interval is T seconds. Hence, there are N 0 =T0 /T number of samples in one period T0 . To find the relationship between D n and the samples of x(t), consider Eq. (6.29b)

where x(kT) is the kth sample of x(t) and

In practice, it is impossible to make T → 0 in computing the right-hand side of Eq. (6.96). We can make T small, but not zero, which will cause the data to increase without limit. Thus, we shall ignore the limit on T in Eq. (6.96) with the implicit understanding that T is reasonably small. Nonzero T will result in some computational error, which is inevitable in any numerical evaluation of an integral. The error resulting from nonzero T is called the aliasing error, which is discussed in more detail in Chapter 8. Thus, we can express Eq. (6.96) as

Now, from Eq. (6.97), Ω 0 N 0 =2π. Hence, e j Ω0 (k+N 0)=e j Ω0 k and from Eq. (6.98a), it follows that

The periodicity property D n+N0 =D n means that beyond n=N 0 /2, the coefficients represent the values for negative n. For instance, when

N 0 =32, D 17 =D −15, D 18 =D -14 , ..., D 31 =D −1 . The cycle repeats again from n=32 on.

We can use the efficient FFT (the fast Fourier transform discussed in Section 8.6) to compute the right-hand side of Eq. (6.98b). We shall use MATLAB to implement the FFT algorithm. For this purpose, we need samples of x(t) over one period starting at t = 0. In this algorithm, it is also preferable (although not necessary) that N 0 be a power of 2, that is N 0 =2m , where m is an integer.

COMPUTER EXAMPLE C6.4 Numerically compute and then plot the trigonometric and exponential Fourier spectra for the periodic signal in Fig. 6.2a (Example 6.1). The samples of x(t) start at t =0 and the last (N 0 th) sample is at t=T0 − T. At the points of discontinuity, the sample value is taken as the average of the values of the function on two sides of the discontinuity. Thus, the sample at t =0 is not 1 but (e −π/2 + 1)/2 =0.604. To determine N 0 , we require that D n for n ≥ N 0 /2 to be negligible. Because x(t) has a jump discontinuity, D n decays rather slowly as 1/n. Hence, a choice of N 0 =200 is acceptable because the (N 0 /2)nd (100th) harmonic is about 1% of the fundamental. However, we also require N 0 to be power of 2. Hence, we shall take N 0 =256=2.[8]

First, the basic parameters are established. >> T_0 = pi; N_0 = 256; T = T_0/N_0; t = (0:T:T*(N_0-1))'; M = 10; >> x = exp(-t/2); x(1) = (exp(-pi/2) + 1)/2; Next, the DFT, computed by means of the fft function, is used to approximate the exponential Fourier spectra over −M ≤ n ≤ M. >> D_n = fft (x)/N_0; n = [-N_0/2:N_0/2-1]'; >> clf; subplot (2, 2, 1); stem(n, abs(fftshift (D_n)),'k'); >> axis ([-M M -.1 .6]); xlabel('n'); ylabel('|D_n|'); >> subplot (2, 2, 2); stem(n, angle(fftshift(D_n)),'k'); >> axis([-M M -pi pi]); xlabel ('n'); ylabel('\angle D n [rad]'); The approximate trigonometric Fourier spectra over 0 ≤ n ≤ M immediately follow. >> n = [0:M]; C_n(1) = abs(D_n(1)); C_n(2:M+1) = 2*abs (D_n(2:M+1)); >> theta_n(1) = angle(D_n(1)); theta_n(2:M+1) = angle(D_n(2:M+1)); >> subplot (2, 2, 3); stem(n,C_n,'k');

>> xlabel ('n'); ylabel('C_n'); >> subplot (2, 2, 4); stem(n,theta_n,'k'); >> xlabel ('n'); ylabel('\theta n [rad]');

Figure C6.4 [8] Bôcher, M. Annals of Mathematics, vol. 7, no. 2, 1906.

6.7 SUMMARY In this chapter we showed how a periodic signal can be represented as a sum of sinusoids or exponentials. If the frequency of a periodic signal is ƒ 0 , then it can be expressed as a weighted sum of a sinusoid of frequency ƒ 0 and its harmonics (the trigonometric Fourier series). We can reconstruct the periodic signal from a knowledge of the amplitudes and phases of these sinusoidal components (amplitude and phase spectra). If a periodic signal x(t) has an even symmetry, its Fourier series contains only cosine terms (including dc). In contrast, if x(t) has an odd symmetry, its Fourier series contains only sine terms. If x(t) has neither type of symmetry, its Fourier series contains both sine and cosine terms. At points of discontinuity, the Fourier series for x(t) converges to the mean of the values of x(t) on either sides of the discontinuity. For signals with discontinuities, the Fourier series converges in the mean and exhibits Gibbs phenomenon at the points of discontinuity. The amplitude spectrum of the Fourier series for a periodic signal x(t) with jump discontinuities decays slowly (as 1/n) with frequency. We need a large number of terms in the Fourier series to approximate x(t) within a given error. In contrast, smoother periodic signal amplitude spectrum decays faster with frequency and we require a fewer number of terms in the series to approximate x(t) within a given error. A sinusoid can be expressed in terms of exponentials. Therefore the Fourier series of a periodic signal can also be expressed as a sum of exponentials (the exponential Fourier series). The exponential form of the Fourier series and the expressions for the series coefficients are more compact than those of the trigonometric Fourier series. Also, the response of LTIC systems to an exponential input is much simpler than that for a sinusoidal input. Moreover, the exponential form of representation lends itself better to mathematical manipulations than does the trigonometric form. For these reasons, the exponential form of the series is preferred in modern practice in the areas of signals and systems. The plots of amplitudes and angles of various exponential components of the Fourier series as functions of the frequency are the exponential Fourier spectra (amplitude and angle spectra) of the signal. Because a sinusoid cos ω0 t can be represented as a sum of

two exponentials, e j ω0 t and e j ω0 t , the frequencies in the exponential spectra range from π =−∞ to ∞. By definition, frequency of a signal is always a positive quantity. Presence of a spectral component of a negative frequency −nω0 merely indicates that the Fourier series contains terms of the form e jn ω0 t . The spectra of the trigonometric and exponential Fourier series are closely related, and one can be found by the inspection of the other.

In Section 6.5 we discuss a method of representing signals by the generalized Fourier series, of which the trigonometric and exponential Fourier series are special cases. Signals are vectors in every sense. Just as a vector can be represented as a sum of its components in a variety of ways, depending on the choice of the coordinate system, a signal can be represented as a sum of its components in a variety of ways, of which the trigonometric and exponential Fourier series are only two examples. Just as we have vector coordinate systems formed by mutually orthogonal vectors, we also have signal coordinate systems (basis signals) formed by mutually orthogonal signals. Any signal in this signal space can be represented as a sum of the basis signals. Each set of basis signals yields a particular Fourier series representation of the signal. The signal is equal to its Fourier series, not in the ordinary sense, but in

the special sense that the energy of the difference between the signal and its Fourier series approaches zero. This allows for the signal to differ from its Fourier series at some isolated points.

REFERENCES 1. Bell, E. T. Men of Mathematics. Simon & Schuster, New York, 1937. 2. Durant, Will, and Ariel Durant. The Age of Napoleon, Part XI in The Story of Civilization Series. Simon & Schuster, New York, 1975. 3. Calinger, R. Classics of Mathematics, 4th ed. Moore Publishing, Oak Park, IL, 1982. 4. Lanczos, C. Discourse on Fourier Series. Oliver Boyd, London, 1966. 5. Körner, T. W. Fourier Analysis. Cambridge University Press, Cambridge, UK, 1989. 6. Guillemin, E. A. Theory of Linear Physical Systems. Wiley, New York, 1963. 7. Gibbs, W. J. Nature, vol. 59, p. 606, April 1899. 8. Bôcher, M. Annals of Mathematics, vol. 7, no. 2, 1906. 9. Carslaw, H. S. Bulletin of the American Mathematical Society, vol. 31, pp. 420-424, October 1925. 10. Lathi, B. P. Signals, Systems, and Communication. Wiley, New York, 1965. 11. Walker P. L. The Theory of Fourier Series and Integrals. Wiley, New York, 1986. 12. Churchill, R. V., and J. W. Brown. Fourier Series and Boundary Value Problems, 3rd ed. McGraw-Hill, New York, 1978.

MATLAB SESSION 6: FOURIER SERIES APPLICATIONS Computational packages such as MATLAB simplify the Fourier-based analysis, design, and synthesis of periodic signals. MATLAB permits rapid and sophisticated calculations, which promote practical application and intuitive understanding of the Fourier series.

M6.1 Periodic Functions and the Gibbs Phenomenon It is sufficient to define any T0 -periodic function over the interval (0 ≤ t < T0 ). For example, consider the 2π-periodic function given by

Although similar to a square wave, x(t) has a linearly rising edge of width A, where (0 < A < π). As A → 0,x(t) approaches a square wave; as A → π, x(t) approaches a type of sawtooth wave. In MATLAB, the mod command helps represent periodic functions such as x(t). >> x = inline (['mod(t,2*pi)/A.*(mod(t,2*pi) =A) & (mod(t,2*pi) < pi))'], 't', 'A'); Sometimes referred to as the signed remainder after division, mod (t,2*pi) returns the value t modulo 2π. Thought of another way, the mod operator appropriately shifts t into [0, T0 ), where x(t) is conveniently defined. When an inline object is a function of multiple variables, the variables are simply listed in the desired order following the function expression. The exponential Fourier series coefficients for x(t) (see Prob. 6.3-2) are given by

Since x(t) is real, D -n =D n *. Truncating the Fourier series at |n|=N yields the approximation

Program MS 6 P1 uses Eq. (M6.2) to compute x N(t) for (0 ≤ N ≤ 100), each over (− π/4 ≤ t < 2π + π/4). function [x_N,t]=MS6P1(A); % MS6P1. m : MATLAB Session 6, Program 1 % Function M-file approximates x(t) using Fourier series % truncated at |n| = N for (0 < = N < = 100). % INPUTS: A = width of rising edge % OUTPUTS: x_N = output matrix, where x_N(N+1,:) is the |n| = N truncation % t=time vector for x_N t=linspace (-pi/4,2*pi+pi/4, 1000); % Time vector exceeds one period. sumterms = zeros (101, length (t)); % Pre-allocate memory sumterms (1,:) = (2*pi-A)/(4*pi); % Compute DC term for n = 1:100, % Compute N remaining terms D_n=1/(2*pi*n)*((exp(-j*n*A)-1)/(n*A) + j*exp(-j*n*pi)); sumterms (1+n,:)=real (D_n*exp(j*n*t) + conj(D_n)*exp(-j*n*t)); end x N = cumsum (sumterms); Although theoretically not required, the real command ensures that small computer round-off errors do not cause a complex-valued result. For a matrix input, the cumsum command cumulatively sums along rows: the first output row is identical to the first input row, the second output row is the sum of the first two input rows, the third output row is the sum of the first three input rows, and so forth. Thus, row (N + 1) of x_N corresponds to the truncation of the exponential Fourier series at |n|=N. Setting A=π/2, Fig. M6.1 compares x(t) and x 20 (t). >> A = pi/2; [x_N,t] = MS6P1(A); >> plot (t,x_N(21,:),'k',t,x(t,A),'k:'); axis([-pi/4,2*pi+pi/4,-0.1,1.1]); >> xlabel ('t'); ylabel ('Amplitude'); legend ('x 20(t)','x(t)',0);

Figure M6.1: Comparison of x 20 (t) and x(t) using A=π/2. As expected, the falling edge is accompanied by the overshoot that is characteristic of the Gibbs phenomenon. Increasing N to 100, as shown in Fig. M6.2, improves the approximation but does not reduce the overshoot. >> plot(t,x_N(101,:),'k',t,x(t,A),'k:'); axis([-pi/4,2*pi+pi/4,-0.1,1.1]); >> xlabel('t'); ylabel('Amplitude'); legend('x_100(t)','x(t)',0);

Figure M6.2: Comparison of x 100 (t) and x(t) using A=π/2. Reducing A to π/64 produces a curious result. For N=20, both the rising and falling edges are accompanied by roughly 9% of

overshoot, as shown in Fig. M6.3. As the number of terms is increased, overshoot persists only in the vicinity of jump discontinuities. For x N(t), increasing N decreases the overshoot near the rising edge but not near the falling edge. Remember that it is a true jump discontinuity that causes the Gibbs phenomenon. A continuous signal, no matter how sharply it rises, can always be represented by a Fourier series at every point within any small error by increasing N. This is not the case when a true jump discontinuity is present. Figure M6.4 illustrates this behavior using N=100.

Figure M6.3: Comparison of x 20 (t) and x(t) using A=π/64.

Figure M6.4: Comparison of x 100 (t) and x(t) using A=π/64.

M6.2 Optimization and Phase Spectra Although magnitude spectra typically receive the most attention, phase spectra are critically important in some applications. Consider the problem of characterizing the frequency response of an unknown system. By applying sinusoids one at a time, the frequency response is empirically measured one point at a time. This process is tedious at best. Applying a superposition of many sinusoids, however, allows simultaneous measurement of many points of the frequency response. Such measurements can be taken by a spectrum analyzer equipped with a transfer function mode or by applying Fourier analysis techniques, which are discussed in later chapters. A multitone test signal m(t) is constructed using a superposition of N real sinusoids

where Mn and θn establish the relative magnitude and phase of each sinusoidal component. It is sensible to constrain all gains to be equal, Mn =M for all n. This ensures equal treatment at each point of the measured frequency response. Although the value M is normally chosen to set the desired signal power, we set M=1 for convenience. While not required, it is also sensible to space the sinusoidal components uniformly in frequency,

Another sensible alternative, which spaces components logarithmically in frequency, is treated in Prob. 6.M-1. Equation (M6.4) is now a truncated compact-form Fourier series with a flat magnitude spectrum. Frequency resolution and range are set by w 0 and N, respectively. For example, a 2 kHz range with a resolution of 100 Hz requires w 0 =2π 100 and N=20. The only remaining unknowns are the θn . While it is tempting to set θn =0 for all n, the results are quite unsatisfactory. MATLAB helps demonstrate the problem by using Ω 0 =2π 100 and N=20 sinusoids, each with a peak-to-peak voltage of one volt.

>> >> >> >>

m = inline('sum(cos(omega*t+theta*ones(size(t))))','theta','t','omega'); N = 20; omega = 2*pi*100*[1:N]'; theta = zeros(size(omega)); t = linspace(-0.01,0.01,1000); plot(t,m(theta,t,omega),'k'); xlabel('t [sec]'); ylabel('m(t) [volts]');

As shown in Fig. M6.5, θn =0 causes each sinusoid to constructively add. The resulting 20-volt peak can saturate system components, such as operational amplifiers operating with ±12-volt rails. To improve signal performance, the maximum amplitude of m(t) over t needs to be reduced.

Figure M6.5: Test signal m(t) with θn =0. One way to reduce max t (|m(t)|) is to reduce M, the strength of each component. Unfortunately, this approach reduces the system's signal-to-noise ratio and ultimately degrades measurement quality. Therefore, reducing M is not a smart decision. The phases θn , however, can be adjusted to reduce max t (|m(t)|) while preserving signal power. In fact, since ΰn =0 maximizes max t (|m(t)|), just about any other choice of θn will improve the situation. Even a random choice should improve performance. As with any computer, MATLAB cannot generate truly random numbers. Rather, it generates pseudo-random numbers. Pseudo-random numbers are deterministic sequences that appear to be random. The particular sequence of numbers that is realized depends entirely on the initial state of the pseudo-random-number generator. Setting the generator's initial state to a known value allows a "random" experiment with reproducible results. The command rand ('state', 0) initializes the state of the pseudorandom number generator to a known condition of zero, and the MATLAB command rand (a, b) generates an a-by-b matrix of pseudo-random numbers that are uniformly distributed over the interval (0, 1). Radian phases occupy the wider interval (0, 2π), so the results from rand need to be appropriately scaled. >> rand ('statr' 0); theta_rand0 =2*pi*rand(N, 1); By using the randomly chosen θn , m(t) is computed, the maximum magnitude is identified, and the results are plotted as shown in Fig. M6.6. >> m_rand0 = m (theta_rand0,t,omega); >> [max_mag,max_ind] = max(abs(m_rand0(1:end/2))); >> plot (t,m_rand0,'k'); axis([-0.01,0.01,-10,10]); >> xlabel('t [sec]'); ylabel ('m(t) [volts]'); >> text (t(max_ind),m_rand0(max_ind,... ['\leftarrow max = ',num2str(m rand0(max ind))]);

Figure M6.6: Test signal m(t) with random θn found by using rand ('state', 0). For a vector input, the max command returns the maximum value and the index corresponding to the first occurrence of the maximum. Similarly, although not used here, the MATLAB command min determines and locates minima. The text (a, b, c) command annotates the current figure with the string c at the location (a, b). MATLAB's help facilities describe the many properties availabel to adjust the appearance and format delivered by the text command. The /leftarrow command produces the symbol ←. Similarly, /rightarrow, /uparrow, and /downarrow produce the symbols →↑, and ↓, respectively. Randomly chosen phases suffer a fatal fault: there is little guarantee of optimal performance. For example, repeating the experiment with rand ('state', 1) produces a maximum magnitude of 9.1 volts, as shown in Fig. M6.7. This value is significantly higher than the previous maximum of 7.2 volts. Clearly, it is better to replace a random solution with an optimal solution.

Figure M6.7: Test signal m(t) with random θn found by using rand ('state', 1). What constitutes "optimal"? Many choices exist, but desired signal criteria naturally suggest that optimal phases minimize the maximum magnitude of m(t) over all t. To find these optimal phases, MATLAB's fminsearch command is useful. First, the function to be minimized, called the objective function, is defined. >> maxmagm = inline('max (abs(sum(cos(omega*t+theta*ones(size(t))))))',... 'theta','t','omega'); The inline argument order is important; fminsearch uses the first input argument as the variable of minimization. To minimize over θ, as desired, θ must be the first argument of the objective function maxmagm. Next, the time vector is shortened to include only one period of m(t). >> t = linespace(0, 0.01, 201) ; A full period ensures that all values of m(t) are considered; the short length of t helps ensure that functions execute quickly. An initial value of t is randomly chosen to begin the search.

>> rand('state', 0); theta_init = 2*pi*rand(N,1); >> theta_opt = fminsearch(maxmagm,theta_int, [], t, omega); Notice that fminsearch finds the minimizer to maxmagm over θ by using an initial value theta_init. Most numerical minimization techniques are capable of finding only local minima, and fminsearch is no exception. As a result, fminsearch does not always produce a unique solution. The empty square brackets indicate no special options are requested, and the remaining ordered arguments are secondary inputs for the objective function. Full format details for fminsearch are available from MATLAB's help facilities. Figure M6.8 shows the phase-optimized test signal. The maximum magnitude is reduced to a value of 5.4 volts, which is a significant improvement over the original peak of 20 volts.

Figure M6.8: Test signal m(t) with optimized phases. Although the signals shown in Figs. M6.5 through M6.8 look different, they all possess the same magnitude spectra. They differ only in phase spectra. It is interesting to investigate the similarities and differences of these signals in ways other than graphs and mathematics. For example, is there an audible difference between the signals? For computers equipped with sound capability, the MATLAB sound command can be used to find out. >> Fs = 8000; t = [0:1/Fs:2]; % Two second records at a sampling rate of 8kHz >> m_0 = m(theta,t,omega); % m(t) using zero phases >> sound(m 0/20,Fs); Since the sound command clips magnitudes that exceed one, the input vector is scaled by 1/20. The remaining signals are created and played in a similar fashion. How well does the human ear discern the differences in phase spectra?

PROBLEMS 6.1.1

For each of the periodic signals shown in Fig. P6.1-1, find the compact trigonometric Fourier series and sketch the amplitude and phase spectra. If either the sine or cosine terms are absent in the Fourier series, explain why.

6.1.2

Figure P6.1-1 a. Find the trigonometric Fourier series for y(t) shown in Fig. P6.1-2.

Figure P6.1-2 b. The signal y(t) can be obtained by time reversal of x(t) shown in Fig. 6.2a. Use this fact to obtain the Fourier series for y(t) from the results in Example 6.1. Verify that the Fourier series thus obtained is identical to that found in part (a).

6.1.3

c. Show that, in general, time reversal of a periodic signal does not affect the amplitude spectrum, and the phase spectrum is also unchanged except for the change of sign. a. Find the trigonometric Fourier series for the periodic signal y(t) depicted in Fig. P6.1-3.

Figure P6.1-3 b. The signal y(t) can be obtained by time compression of x(t) shown in Fig. 6.2a by a factor 2. Use this fact to obtain the Fourier series for y(t) from the results in Example 6.1. Verify that the Fourier series thus obtained is identical to that found in part (a).

6.1.4

c. Show that, in general, time-compression of a periodic signal by a factor a expands the Fourier spectra along the Ω axis by the same factor a. In other words C 0 , C n , and θn remain unchanged, but the fundamental frequency is increased by the factor a, thus expanding the spectrum. Similarly time expansion of a periodic signal by a factor a compresses its Fourier spectra along the Ω axis by the factor a. a. Find the trigonometric Fourier series for the periodic signal g(t) in Fig. P6.1-4. Take advantage of the symmetry.

Figure P6.1-4 b. Observe that g(t) is identical to x(t) in Fig. 6.3a left-shifted by 0.5 second. Use this fact to obtain the Fourier series for g(t) from the results in Example 6.2. Verify that the Fourier series thus obtained is identical to that found in part (a).

6.1.5

c. Show that, in general, a time shift of T seconds of a periodic signal does not affect the amplitude spectrum. However, the phase of the nth harmonic is increased or decreased nw0 T depending on whether the signal is advanced or delayed by T seconds. If the two halves of one period of a periodic signal are identical in shape except that one is the negative of the other, the periodic signal is said to have a half-wave symmetry. If a periodic signal x(t) with a period T0 satisfies the half-wave symmetry condition, then

In this case, show that all the even-numbered harmonics vanish and that the odd-numbered harmonic coefficients are given by

and

Using these results, find the Fourier series for the periodic signals in Fig. P6.1-5.

6.1.6

Figure P6.1-5 Over a finite interval, a signal can be represented by more than one trigonometric (or exponential) Fourier series. For instance, if we wish to represent x(t)=t over an interval 0 < t < 1 by a Fourier series with fundamental frequency w 0 =2, we can draw a pulse x(t)=t over the interval 0 < t < 1 and repeat the pulse every π seconds so that T0 =π and Ω 0 =2 (Fig. P6.1-6a). If we want the fundamental frequency Ω 0 to be 4, we repeat the pulse every π/2 seconds. If we want the series to contain only cosine terms with w 0 =2, we construct a pulse x(t)=|t| over − 1 < t < 1, and repeat it every π seconds (Fig. P6.1-6b). The resulting signal is an even function with period π. Hence, its Fourier series will have only cosine terms with w 0 =2. The resulting Fourier series represents x(t)=t over 0 < t < 1, as desired. We do not care what it represents outside this interval.

Figure P6.1-6 Sketch the periodic signal x(t) such that x(t)=t for 0 < t < 1 and the Fourier series for x(t) satisfies the following conditions. a. ω0 =π/2 and contains all harmonics, but cosine terms only b. ω0 =2 and contains all harmonics, but sine terms only

c. ω0 =π/2 and contains all harmonics, which are neither exclusively sine nor cosine d. ω0 =1 and contains only odd harmonics and cosine terms e. ω0 =π/2 and contains only odd harmonics and sine terms f. ω0 =1 and contains only odd harmonics, which are neither exclusively sine nor cosine.

6.1.7

[Hint: For parts (d), (e), and (f), you need to use half-wave symmetry discussed in Prob. 6.1-5. Cosine terms imply possible dc component.] You are asked only to sketch the periodic signal x(t) satisfying the given conditions. Do not find the values of the Fourier coefficients. State with reasons whether the following signals are periodic or aperiodic. For periodic signals, find the period and state which of the harmonics are present in the series. a. 3 sin t + 2 sin 3t b. 2 + 5 sin 4t + 4 cos 7t c. 2 sin 3t + 7 cos πt d. 7 cos πt + 5 sin 2πt e. 3 cos √2t + 5 cos 2t

f. g. h. (3 sin 2t + sin 5t) 2 i. (5 sin 2t) 3 6.3.1

For each of the periodic signals in Fig. P6.1-1, find exponential Fourier series and sketch the corresponding spectra.

6.3.2

A 2π-periodic signal x(t) is specified over one period as

Sketch x(t) over two periods from t=0 to 4π. Show that the exponential Fourier series coefficients D n for this series are given by

6.3.3

A periodic signal x(t) is expressed by the following Fourier series:

a. Sketch the amplitude and phase spectra for the trigonometric series. b. By inspection of spectra in part (a), sketch the exponential Fourier series spectra. c. By inspection of spectra in part (b), write the exponential Fourier series for x(t).

6.3.4

d. Show that the series found in part (c) is equivalent to the trigonometric series for x(t). The trigonometric Fourier series of a certain periodic signal is given by

a. Sketch the trigonometric Fourier spectra. b. By inspection of spectra in part (a), sketch the exponential Fourier series spectra. c. By inspection of spectra in part (b), write the exponential Fourier series for x(t).

6.3.5

d. Show that the series found in part (c) is equivalent to the trigonometric series for x(t). The exponential Fourier series of a certain function is given as

a. Sketch the exponential Fourier spectra. b. By inspection of the spectra in part (a), sketch the trigonometric Fourier spectra for x(t). Find the compact trigonometric Fourier series from these spectra. c. Show that the trigonometric series found in part (b) is equivalent to the exponential series for x(t).

6.3.6

d. Find the signal bandwidth. Figure P6.3-6 shows the trigonometric Fourier spectra of a periodic signal x(t). a. By inspection of Fig. P6.3-6, find the trigonometric Fourier series representing x(t). b. By inspection of Fig. P6.3-6, sketch the exponential Fourier spectra of x(t). c. By inspection of the exponential Fourier spectra obtained in part (b), find the exponential Fourier series for x(t). d. Show that the series found in parts (a) and (c) are equivalent.

6.3.7

Figure P6.3-6 Figure P6.3-7 shows the exponential Fourier spectra of a periodic signal x(t). a. By inspection of Fig. P6.3-7, find the exponential Fourier series representing x(t). b. By inspection of Fig. P6.3-7, sketch the trigonometric Fourier spectra for x(t). c. By inspection of the trigonometric Fourier spectra found in part (b), find the trigonometric Fourier series for x(t). d. Show that the series found in parts (a) and (c) are equivalent.

Figure P6.3-7

6.3.8

a. Find the exponential Fourier series for the signal in Fig. P6.3-8a.

Figure P6.3-8

6.3.9

b. Using the results in part (a), find the Fourier series for the signal shifted version of the signal ○(t).

in Fig. P6.3-8b, which is a time-

c. Using the results in part (a), find the Fourier series for the signal scaled version of the signal x(t).

in Fig. P6.3-8c, which is a time-

If a periodic signal x(t) is expressed as an exponential Fourier series

a. Show that the exponential Fourier series for

is given by

in which This result shows that time-shifting of a periodic signal by T seconds merely changes the phase spectrum by nw0 T. The amplitude spectrum is unchanged. b. Show that the exponential Fourier series for

6.3.10

6.3.11

is given by

This result shows that time compression of a periodic signal by a factor a expands its Fourier spectra along the w axis by the same factor a. Similarly, time expansion of a periodic signal by a factor a compresses its Fourier spectra along the w axis by the factor a. Can you explain this result intuitively? a. The Fourier series for the periodic signal in Fig. 6.6a is given in Exercise E6.1. Verify Parseval's theorem for this series, given that

b. If x(t) is approximated by the first N terms in this series, find N so that the power of the error signal is less than 1% of Px . a. The Fourier series for the periodic signal in Fig. 6.6b is given in Exercise E6.1. Verify Parseval's theorem for this series, given that

b. If x(t) is approximated by the first N terms in this series, find N so that the power of the error signal is less than 10% of Px .

6.3.12

6.4.1

6.4.2

The signal x(t) in Fig. 6.14 is approximated by the first 2N + 1 terms (from n=-N to N) in its exponential Fourier series given in Exercise E6.5. Determine the value of N if this (2N + 1)-term Fourier series power is to be no less than 99.75% of the power of x(t). Find the response of an LTIC system with transfer function

to the periodic input shown in Fig. 6.2a. a. Find the exponential Fourier series for a signal x(t)=cos 5t sin 3t. You can do this without evaluating any integrals. b. Sketch the Fourier spectra. c. The signal x(t) is applied at the input of an LTIC system with frequency response, as shown in Fig. P6.4-2. Find the output y(t).

6.4.3

Figure P6.4-2 a. Find the exponential Fourier series for a periodic signal x(t) shown in Fig. P6.4-3a.

Figure P6.4-3 b. The signal x(t) is applied at the input of an LTIC system shown in Fig. P6.4-3b. Find the expression for the output y(t). 6.5.1

6.5.2

Derive Eq. (6.51) in an alternate way by observing that e=(x − c y) and |e| 2 =(x − c y) · (x − c y)=|x| 2 + c 2 |y| 2 − 2c x · y. A signal x(t) is approximated in terms of a signal y(t) over an interval (t1 , t 2 ): where c is chosen to minimize the error energy. a. Show that y(t) and the error e(t)=x(t) − cy(t) are orthogonal over the interval (t1 , t 2 ). b. Can you explain the result in terms of the signal-vector analogy?

6.5.3

c. Verify this result for the square signal x(t) in Fig. 6.19 and its approximation in terms of signal sin t. If x(t) and y(t) are orthogonal, then show that the energy of the signal x(t) + y(t) is identical to the energy of the signal x(t) − y(t) and is given by E + E . Explain this result by using the vector analogy. In general, show that for orthogonal

x

y

signals x(t) and y(t) and for any pair of arbitrary real constants c 1 and c 2 , the energies of c 1 x(t) + c 2 y(t) and c 1 x(t) −

6.5.4

c 2 y(t) are identical, given by c 1 2 Ex + c 2 2 Ey .

a. For the signals x(t) and y(t) depicted in Fig. P6.5-4, find the component of the form y(t) contained in x(t). In other words find the optimum value of c in the approximation x(t) ≈ cy(t) so that the error signal energy is minimum. b. Find the error signal e(t) and its energy Ee . Show that the error signal is orthogonal to y(t), and that

6.5.5

6.5.6

6.5.7

Ex =c 2 Ey + Ee . Can you explain this result in terms of vectors.

For the signals x(t) and y(t) shown in Fig. P6.5-4, find the component of the form x(t) contained in y(t). In other words, find the optimum value of c in the approximation y(t) ≈ cx(t) so that the error signal energy is minimum. What is the error signal energy? Represent the signal x(t) shown in Fig. P6.5-4a over the interval from 0 to 1 by a trigonometric Fourier series of fundamental frequency Ω 0 =2π. Compute the error energy in the representation of x(t) by only the first N terms of this series for N=1, 2, 3, and 4. Represent x(t)=t over the interval (0, 1) by a trigonometric Fourier series that has a. ω0 =2π and only sine terms b. ω0 =π and only sine terms c. ω0 =π and only cosine terms

6.5.8

You may use a dc term in these series if necessary. In Example 6.12, we represented the function in Fig. 6.23 by Legendre polynomials. a. Use the results in Example 6.12 to represent the signal g(t) in Fig. P6.5-8 by Legendre polynomials.

Figure P6.5-8

6.5.9

b. Compute the error energy for the approximations having one and two-(nonzero) terms. Walsh functions, which can take on only two amplitude values, form a complete set of orthonormal functions and are of great practical importance in digital applications because they can be easily generated by logic circuitry and because multiplication with these functions can be implemented by simply using a polarity-reversing switch. Figure P6.5-9 shows the first eight functions in this set. Represent x(t) in Fig. P6.5-4a over the interval (0, 1) by using a Walsh Fourier series with these eight basis functions. Compute the energy of e(t), the error in the approximation, using the first N nonzero terms in the series for N=1, 2, 3, and 4. We found the trigonometric Fourier series for x(t) in Prob. 6.5-6. How does the Walsh series compare with the trigonometric series in Prob. 6.5-6 from the viewpoint of the error energy for a given N?

Figure P6.5-9 6.m.1

MATLAB Session 6 discusses the construction of a phase-optimized multitone test signal with linearly spaced frequency components. This problem investigates a similar signal with logarithmically spaced frequency components. A multitone test signal m(t) is constructed by using a superposition of N real sinusoids

where θn establishes the relative phase of each sinusoidal component. a. Determine a suitable set of N=10 frequencies π n that logarithmically spans [(2π) ≤ π ≤ 100(2π)] yet still results in a periodic test signal m(t). Determine the period T0 of your signal. Using θn =0. plot the resulting (T0 )-periodic signal over-T0 /2 ≤ t ≤ T0 /2. b. Determine a suitable set of phases θn that minimize the maximum magnitude of m(t). Plot the resulting signal and identify the maximum magnitude that results. c. Many systems suffer from what is called one-over-f noise. The power of this undesirable noise is proportional to 1/f. Thus, low-frequency noise is stronger than high-frequency noise. What modifications to m(t) are appropriate for use in environments with 1/f noise? Justify your answer.

Chapter 7: Continuous-Time Signal Analysis-The Fourier Transform OVERVIEW We can analyze linear systems in many different ways by taking advantage of the property of linearity, where by the input is expressed as a sum of simpler components. The system response to any complex input can be found by summing the system's response to these simpler components of the input. In time-domain analysis, we separated the input into impulse components. In the frequency-domain

analysis in Chapter 4, we separated the input into exponentials of the form e st (the Laplace transform), where the complex frequency s= σ + jω. The Laplace transform, although very valuable for system analysis, proves somewhat awkward for signal analysis, where we

prefer to represent signals in terms of exponentials e jωt instead of e st . This is accomplished by the Fourier transform. In a sense, the Fourier transform may be considered to be a special case of the Laplace transform with s=jω. Although this view is true most of the time, it does not always hold because of the nature of convergence of the Laplace and Fourier integrals.

In Chapter 6, we succeeded in representing periodic signals as a sum of (everlasting) sinusoids or exponentials of the form e jωt . The Fourier integral developed in this chapter extends this spectral representation to aperiodic signals.

7.1 APERIODIC SIGNAL REPRESENTATION BY FOURIER INTEGRAL Applying a limiting process, we now show that an aperiodic signal can be expressed as a continuous sum (integral) of everlasting exponentials. To represent an aperiodic signal x(t) such as the one depicted in Fig. 7.1a by everlasting exponentials, let us construct a new periodic signal x T0 (t) formed by repeating the signal x(t) at intervals of T0 seconds, as illustrated in Fig. 7.1b. The period T0 is made long enough to avoid overlap between the repeating pulses. The periodic signal x T0 (t) can be represented by an exponential Fourier series. If we let T0 → ∞, the pulses in the periodic signal repeat after an infinite interval and, therefore

Figure 7.1: Construction of a periodic signal by periodic extension of x(t). Thus, the Fourier series representing x T0 (t) will also represent x(t) in the limit T0 → ∞. The exponential Fourier series for x T0 (t) is given by

where

and

Observe that integrating x T0 (t) over (−T0 /2, T0 /2) is the same as integrating x(t) over (−∞, ∞). Therefore, Eq. (7.2a) can be expressed as

It is interesting to see how the nature of the spectrum changes as T0 increases. To understand this fascinating behavior, let us define

X(ω), a continuous function of ω, as

A glance at Eqs. (7.2c) and (7.3) shows that

Figure 7.2: Change in the Fourier spectrum when the period T0 in Fig. 7.1 is doubled. This means that the Fourier coefficients D n are 1/T0 times the samples of X(ω) uniformly spaced at intervals of ω0 , as depicted in Fig. 7.2a.[†] Therefore, (1/T0 )X(ω) is the envelope for the coefficients D n . We now let T0 → ∞ by doubling T0 repeatedly. Doubling T0 halves the fundamental frequency ω0 [Eq. (7.2b)], so that there are now twice as many components (samples) in the spectrum. However, by doubling T0 , the envelope (1/T0 )X(ω) is halved, as shown in Fig. 7.2b. If we continue this process of doubling T0 repeatedly, the spectrum progressively becomes denser while its magnitude becomes smaller. Note, however, that the relative shape of the envelope remains the same [proportional to X(ω) in Eq. (7.3)]. In the limit as T0 → ∞, ω0 → 0 and D n → 0. This result makes for a spectrum so dense that the spectral components are spaced at zero (infinitesimal) intervals. At the same time, the amplitude of each component is zero (infinitesimal). We have nothing of everything, yet we have something! This paradox sounds like Alice in Wonderland, but as we shall see, these are the classic characteristics of a very familiar phenomenon. [‡]

Substitution of Eq. (7.4) in Eq. (7.1) yields

As T0 → ∞, ω0 becomes infinitesimal (ω0 → 0). Hence, we shall replace ω0 by a more appropriate notation, Δω. In terms of this new notation, Eq. (7.2b) becomes

and Eq. (7.5) becomes

Equation (7.6a) shows that x T0 (t) can be expressed as a sum of everlasting exponentials of frequencies 0, ±Δω, ±2Δω, ±3Δω,... (the Fourier series). The amount of the component of frequency nΔω is [X(nΔω)Δω]/2π. In the limit as T0 → ∞, Δω → 0 and xT 0 (t) → x(t). Therefore

The sum on the right-hand side of Eq. (7.6b) can be viewed as the area under the function X(ω),e jωt , as illustrated in Fig. 7.3. Therefore

Figure 7.3: The Fourier series becomes the Fourier integral in the limit as T0 → ∞. The integral on the righteqnhand side is called the Fourier integral. We have now succeeded in representing an aperiodic signal x(t) by

a Fourier integral (rather than a Fourier series).[†] This integral is basically a Fourier series (in the limit) with fundamental frequency Δω

→ 0, as seen from Eq. (7.6). The amount of the exponential e jnΔωt is X (nΔω)Δω/2π. Thus, the function X(ω) given by Eq. (7.3) acts as a spectral function. We call X (ω) the direct Fourier transform of x(t), and x(t) the inverse Fourier transform of X(ω). The same information is conveyed by the statement that x(t) and X(ω) are a Fourier transform pair. Symbolically, this statement is expressed as or To recapitulate,

and

It is helpful to keep in mind that the Fourier integral in Eq. (7.8b) is of the nature of a Fourier series with fundamental frequency Δω approaching zero [Eq. (7.6b)]. Therefore, most of the discussion and properties of Fourier series apply to the Fourier transform as well. The transform X (ω) is the frequency-domain specification of x(t). We can plot the spectrum X(ω) as a function of ω. Since X(ω)is complex, we have both amplitude and angle (or phase) spectra

in which |X(ω)| is the amplitude and ∠X(ω) is the angle (or phase) of X(ω). According to Eq. (7.8a),

Taking the conjugates of both sides yields

This property is known as the conjugation property. Now, if x(t) is a real function of t, then x(t)=x*(t), and from the conjugation property, we find that

This is the conjugate symmetry property of the Fourier transform, applicable to real x(t). Therefore, for real x(t)

Thus, for real x(t), the amplitude spectrum |X(ω)| is an even function, and the phase spectrum ∠X(ω) is an odd function of ω. These results were derived earlier for the Fourier spectrum of a periodic signal (Eq. (6.33)] and should come as no surprise. EXAMPLE 7.1 Find the Fourier transform of e −at u(t). By definition [Eq. (7.8a)],

But |e −jωt | = 1. Therefore, as t → ∞,e −(a+jω)t = e −at e −jωt = ∞ if a < 0, but it is equal to 0 if a > 0. Therefore

Expressing a + jω in the polar form as

, we obtain

Therefore

The amplitude spectrum |X(ω)| and the phase spectrum ∠X(ω) are depicted in Fig. 7.4b. Observe that |X(ω)| is an even function of ω, and ∠X(ω) is an odd function of ω, as expected.

Figure 7.4: e −at (t) and its Fourier spectra. EXISTENCE OF THE FOURIER TRANSFORM

In Example 7.1 we observed that when a < 0, the Fourier integral for e −at u(t) does not converge. Hence, the Fourier transform for

e −at u(t) does not exist if a < 0 (growing exponential). Clearly, not all signals are Fourier transformable.

Because the Fourier transform is derived here as a limiting case of the Fourier series, it follows that the basic qualifications of the Fourier series, such as equality in the mean, and convergence conditions in suitably modified form apply to the Fourier transform as well. It can be shown that if x(t) has a finite energy, that is if

then the Fourier transform X(ω) is finite and converges to x(t) in the mean. This means, if we let

then Eq. (7.8b) implies

In other words, x(t) and its Fourier integral [the right-hand side of Eq. (7.8b)] can differ at some values of t without contradicting Eq.

(7.14). We shall now discuss an alternate set of criteria due to Dirichlet for convergence of the Fourier transform. As with the Fourier series, if x(t) satisfies certain conditions (Dirichlet conditions), its Fourier transform is guaranteed to converge pointwise at all points where x(t) is continuous. Moreover, at the points of discontinuity, x(t) converges to the value midway between the two values of x(t) on either side of the discontinuity. The Dirichlet conditions are as follows: 1. x(t) should be absolutely integrable, that is,

If this condition is satisfied, we see that the integral on the right-hand side of Eq. (7.8a) is guaranteed to have a finite value. 2. x(t) must have only finite number of finite discontinuities within any finite interval. 3. x(t) must contain only finite number of maxima and minima within any finite interval. We stress here that although the Dirichlet conditions are sufficient for the existence and pointwise convergence of the Fourier transform, they are not necessary. For example, we saw in Example 7.1 that a growing exponential, which violates Dirichlet's first condition in (7.15) does not have a Fourier transform. But the signal of the form (sin at)/t, which does violate this condition, does have a Fourier transform. Any signal that can be generated in practice satisfies the Dirichlet conditions and therefore has a Fourier transform. Thus, the physical existence of a signal is a sufficient condition for the existence of its transform.

LINEARITY OF THE FOURIER TRANSFORM The Fourier transform is linear; that is, if then

The proof is trivial and follows directly from Eq. (7.8a). This result can be extended to any finite number of terms. It can be extended to an infinite number of terms only if the conditions required for interchangeability of the operations of summation and integration are satisfied.

7.1-1 Physical Appreciation of the Fourier Transform In understanding any aspect of the Fourier transform, we should remember that Fourier representation is a way of expressing a signal in terms of everlasting sinusoids (or exponentials). The Fourier spectrum of a signal indicates the relative amplitudes and phases of sinusoids that are required to synthesize that signal. A periodic signal Fourier spectrum has finite amplitudes and exists at discrete frequencies (ω0 and its multiples). Such a spectrum is easy to visualize, but the spectrum of an aperiodic signal is not easy to visualize because it has a continuous spectrum. The continuous spectrum concept can be appreciated by considering an analogous, more tangible phenomenon. One familiar example of a continuous distribution is the loading of a beam. Consider a beam loaded with weights D 1 , D 2 , D 3 , ..., D n units at the uniformly spaced points y 1 , y 2 , ..., y n , as shown in Fig. 7.5a. The total load W T on the beam is given by the sum of these loads at each of the n points:

Consider now the case of a continuously loaded beam, as depicted in Fig. 7.5b. In this case, although there appears to be a load at every point, the load at any one point is zero. This does not mean that there is no load on the beam. A meaningful measure of load in this situation is not the load at a point, but rather the loading density per unit length at that point. Let X(y) be the loading density per unit length of beam. It then follows that the load over a beam length Δy(Δy → 0), at some point y, is X(y)Δy.To find the total load on the beam, we divide the beam into segment of interval Δy(Δy → 0). The load over the nth such segment of length Δy is X(nΔy)Δy. The total load W T is given by

Figure 7.5: Weight-loading analogy for the Fourier transform. The load now exists at every point, and y is now a continuous variable. In the case of discrete loading (Fig. 7.5a), the load exists only at the n discrete points. At other points there is no load. On the other hand, in the continuously loaded case, the load exists at every point, but at any specific point y, the load is zero. The load over a small interval Δy however, is [X(nΔy)] Δy (Fig. 7.5b). Thus, even though the load a point y is zero, the relative load at that point is X(y). An exactly analogous situation exists in the case of a signal spectrum. When x(t) is periodic, the spectrum is discrete, and x(t) can be expressed as a sum of discrete exponentials with finite amplitudes:

For an aperiodic signal, the spectrum becomes continuous; that is, the spectrum exists for every value of ω, but the amplitude of each component in the spectrum is zero. The meaningful measure here is not the amplitude of component of some frequency but the spectral density per unit bandwidth. From Eq. (7.6b) it is clear that x(t) is synthesized by adding exponentials of the form e jnΔωt , in which the contribution by any one exponential component is zero. But the contribution by exponentials in an infinitesimal band Δω located at ω = nΔω is (1/2π) X(nΔω)Δω, and the addition of all these components yields x(t) in the integral form:

Thus, nΔω approaches a continuous variable ω. The spectrum now exists at every ω. The contribution by components within a band dω is (1/2π)X(ω) dω = X(ω)df, where df is the bandwidth in hertz. Clearly, X(ω) is the spectral density per unit bandwidth (in hertz).[†] It also follows that even if the amplitude of any one component is infinitesimal, the relative amount of a component of frequency ω is X(ω). Although X(ω) is spectral density, in practice it is customarily called spectrum of x(t) rather than the spectral density of x(t). Deferring to this convention, we shall call X(ω) the Fourier spectrum (or Fourier transform) of x(t).

A MARVELOUS BALANCING ACT An important point to remember here is that x(t) is represented (or synthesized) by exponentials or sinusoids that are everlasting (not causal). Such conceptualization leads to rather fascinating picture when we try to visualize the synthesis of time limited pulse signal x(t) [Fig. 7.6] by the sinusoidal components in its Fourier spectrum. The signal x(t) exists only over an interval (a, b) and is zero outside this interval. The spectrum x(t) contains an infinite number of exponentials (or sinusoids), which start at t= −∞ and continue forever. The amplitudes and phases of these components add up exactly to x(t) over the finite interval (a, b) and the zero everywhere outside this interval. Juggling the amplitudes and phases of an infinite number of components to achieve such a perfect and delicate balance boggles the human imagination. Yet the Fourier transform accomplishes it routinely, without much thinking on our part. Indeed, we become so involved in mathematical manipulations that we fail to notice this marvel.

Figure 7.6: The marvel of the Fourier transform. [†] For the sake of simplicity, we assume D , and therefore X(ω), in Fig. 7.2, to be real. The argument, however, is also valid for n

complex D n [or X(ω)].

[‡] If nothing else, the reader now has irrefutable proof of the proposition that 0% ownership of everything is better than 100% ownership of nothing. [†] This derivation should not be considered to be a rigorous proof of Eq. (7.7). The situation is not as simple as we have made it appear. [1] [†] Churchill, R. V., and J. W. Brown, Fourier Series and Boundary Value Problems, 3rd ed. McGraw-Hill, New York, 1978. [†] To stress that the signal spectrum is a density function we shall shade the plot of |X(ω)| (as in Fig. 7.4b). The representation of

∠X(ω). however, will be a by a line plot, primarily to avoid confusion.

7.2 TRANSFORMS OF SOME USEFUL FUNCTIONS For convenience, we now introduce a compact notation for the useful gate, triangle, and interpolation functions. UNIT GATE FUNCTION

We define a unit gate function rect (x) as a gate pulse of unit height and unit width, centered at the origin, as illustrated in Fig. 7.7a:[†] :

The gate pulse in Fig. 7.7b is unit gate pulse rect (x) expended by a factor τ along the horizontal axis and therefore can be expressed as rect (x/τ) (see section 1.2-2). Observe that τ, the denominator of the argument of rect (x/τ), indicates the width of the pulse.

Figure 7.7: A gate pulse. UNIT TRIANGLE FUNCTION We define a unit triangle function Δ(x) as triangular pulse of unit height and unit width, centered at the origin, as shown in Fig. 7.8a

The pulse in Fig. 7.8b is Δ(x/τ). Observe that here, as for the gate pulse, the denominator τ of the argument of Δ(x/τ) indicates the pulse width.

Figure 7.8: A triangle pulse. INTERPOLATION FUNCTION sinc (x) The function sin x/x is the "sine over argument" function denoted by sinc (x) [†] . This function plays an important role in signal processing. It is also known as the filtering or interpolating function. We define

Inspection of Eq. (7.20) shows the following: 1. sinc (x) is an even function of x. 2. sinc (x) = 0 when sin x = 0 except at x = 0, where it appears to be indeterminate. This means that sinc x = 0 for x = ±p, ±2p,±3p,.... 3. Using L'Hôpital's rule, we find sinc (0) = 1. 4. sinc (x) is the product of an oscillating signal sin x (of period 2π) and a monotonically decreasing function 1/x. Therefore, sinc (x) exhibits damped oscillations of period 2π, with amplitude decreasing continuously as 1/x. Figure 7.9a shows sinc (x). Observe that sinc (x) = 0 for values of x that are positive and negative integer multiples of π. Figure 7.9a shows sinc (3ω/7). The argument 3ω/7 = π when ω = 7π/3. Therefore, the first zero of this function occurs at ω = 7π/3.

Figure 7.9: A sinc pulse. EXERCISE E7.1 Sketch: a. rect (x/8) b. Δ(ω/10) c. sinc (3πω/2) d. sinc (t) rect (t/4π) EXAMPLE 7.2 Find the Fourier transform of x(t) = rect (t/τ) (fig. 7.10a).

Figure 7.10: (a) A gate pulse x(t), (b) its Fourier spectrum X(ω), (c) its amplitude spectrum |X(ω)|, and (d) its phase spectrum ∠X(ω). Sinc rect (t/τ) = 1 for |t| < τ/2, and since it is zero for |t| > τ/2,

Therefore

Recall that sinc(x) = 0 when x = ±nπ. Hence, sinc (ωτ/2) = 0 when ωτ/2 = ±nπ; that is, when ω = ±2nπ/τ, (n = 1, 2, 3, ...) as depicted in Fig. 7.10b. The Fourier transforms X(ω) shown in Fig. 7.10b exhibits positive and negative values. A negative amplitude can be considered to be a positive amplitude with a phase of −π or π. We use this observation to plot the amplitude spectrum |X(ω)| = |sinc (ωτ/2)| (Fig. 7.10c) and the phase spectrum ∠X(ω) (Fig. 7.10d). The phase spectrum, which is required to be an odd function of ω, may be draen is several other ways because a negative sign can be accounted for by a phase of ±nπ, where n is any odd integer. All such representations are equivalent. BANDWIDTH OF rect (t/τ) The spectrum X(ω) in fig. 7.10 peaks at ω = 0 and decays at higher frequencies. Therefore, rect (t/τ) is a lowpass signal with most of the signal energy in lower-frequency components. Strictly speaking, because the spectrum extends from 0 to ∞. The bandwidth is ∞. However, must of the spectrum is concentrated within first lobe (from ω = 0 to ω = 2π/τ). Therefore, a rough estimate of the bandwidth of a rectangular pulse of width τ seconds is 2π/τ rad/s, or 1/tau Hz[†] . Note the reciprocal relationship of the pulse width with its bandwidth. We shall observe later that this result is true in general. EXAMPLE 7.3 Find the Fourier transform of the unit impulse δ(t). Using the sampling property of the impulse [Eq. (1.24)], we obtain

or

Figure 7.11 shows δ(t) and its spectrum.

Figure 7.11: (a) Unit impulse and (b) its Fourier spectrum. EXAMPLE 7.4 Find the inverse Fourier transform of δ(ω). On the basis of Eq. (7.8b) and the sampling property of the function,

Therefore

or

Figure 7.12: (a) A constant (dc) signal and (b) its Fourier spectrum. This result shows that the spectrum of a constant signal x(t) = 1 is an impulse 2πδ(ω), as illustrated in Fig. 7.12. The result [Eq. (7.23b)] could have been anticipated on qualitative grounds. Recall that the Fourier transform of x(t) is a spectral

representation of x(t) in term of everlasting exponential components of the form e jωt . Now, to represent a constant signal x(t) = 1 we

need a single everlasting exponential e jωt with ω = 0.[†] . This result in spectrum at a single frequency ω = 0. Another way of looking at the situation is that x(t) = 1 is a dc signal which has a single frequency ω = 0 (dc). If an impulse at ω = 0 is a spectrum of a dc signal, what does an impulse at ω = ω0 represent? We shall answer this question in the next example. EXAMPLE 7.5 Find the inverse Fourier transform of δ(ω − ω0 ). Using the sampling property of the impulse function, we obtain

Therefore

or

This result shows that the spectrum of an everlasting exponential e jωt is signal impulse at ω = ω0 . We reach the same conclusion by

qualitative reasoning. To represent the everlasting exponential e jω0 t, we need a single everlasting exponentials e jωt with ω = ω0 . Therefore, the spectrum consists of a single component at frequency ω = ω0 . From Eq. (7.24a) it follows that

EXAMPLE 7.6 Find the Fourier transforms of the everlasting sinusoid cos ω0 t (Fig. 7.13a).

Figure 7.13: (a) A cosine signal and (b) its Fourier spectrum. Recall the Euler formula Adding Eqs. (7.24a) and (7.24b), and using the foregoing result, we obtain

The spectrum of cos ω0 t consists of two impulses at ω0 and −ω0 , as shown in Fig. 7.13b. The result also follows from qualitative reasoning. An everlasting sinusoid cos ω0 t can be synthesized by two everlasting exponentials, e jω0 t and e −jω0 t . Therefore the Fourier spectrum consists of only two components of frequencies ω0 and −ω0 . EXAMPLE 7.7: (Fourier Transform of a Periodic Signal) We can use a Fourier series to express a periodic signal as a sum of a sum of exponentials of the form e jnω0 t , whose Fourier transform is found in Eq. (7.24a). Hence, we can readily find the Fourier transform of a periodic signal by using the linearity property in Eq. (7.16). The Fourier series of a periodic signal x(t) with period T0 is given by

Taking the Fourier transform of both sides, we obtain [†]

EXAMPLE 7.8: (Fourier Transform of a Unit Impulse Train) The Fourier series for the unit impulse train δT0 (t), shown in Fig. 7.14a, was found in Example 6.7. The Fourier coefficient D n for this signal, as seen from Eq. (6.37), is a constant D n = 1/T0 .

Figure 7.14: (a) The uniform impulse train and (b) its Fourier transform. From Eq. (7.26), the Fourier transform for the unit impulse train is

The corresponding spectrum is shown in Fig. 7.14b. EXAMPLE 7.9 Find the Fourier transform of the unit step function u(t). Trying to find the Fourier transform of u(t) by direct integration leads to an indeterminate result because

The upper limit of e −jωt as t → ∞ yields an indeterminate answer. So we approach this problem by considering u(t) to be a decaying exponential e −at u(t) in the limit as a → 0 (Fig. 7.15a). Thus

and

Figure 7.15: Derivation of the Fourier transform of the step function. Expressing the right-hand side in terms of its real and imaginary parts yields

The function a/(a 2 + ω2 ) has interesting properties. First, the area under this function (Fig. 7.15b) is π regardless of the value of a:

Second, when a → 0, this function approaches zero for all ω ≠ 0, and all its area (π) is concentrated at a single point ω = 0. Clearly, as a → 0, this function approaches an impulse of strength π [†] . Thus

Note that u(t) is not a "true" dc signal because it is not constant over the interval − ∞ to ∞. To synthesize a "true" dc, we require only one everlasting exponential with ω = 0 (impulse at ω = 0). The signal u(t) has a jump discontinuity at t = 0. It is impossible to synthesize such a signal with a single everlasting exponential e jωt . To synthesize this signal from everlasting exponentials, we need, in addition to an impulse at ω = 0, all the frequency components, as indicated by the term 1/jω in Eq. (7.29). EXAMPLE 7.10 Find the Fourier transform of the sign function sgn (t) [pronounced signum (t)], depicted in Fig. 7.16.

Figure 7.16 Observe that Using the results in Eqs. (7.23b), (7.29), and the linearity property, we obtain

EXERCISE E7.2 Show that the inverse Fourier transform of X(ω) illustrated in Fig. 7.17 is x(t) = (ω0 /π) sinc (ω0 t). Sketch x(t).

Figure 7.17 EXERCISE E7.3 Show that cos (ω0 t + θ)

π[δ(ω + ω0 )e −jθ + δ(ω − ω0 )e jθ].

7.2-1 Connection Between the Fourier and Laplace Transforms The general (bilateral) Laplace transform of a signal x(t), according to Eq. (4.1) is

Setting s = jω in this equation yields

where X(jω) = X(s)|s = jω. But, the right-hand-side integral defines X(ω), the Fourier transform of x(t). Does this mean that the Fourier transform can be obtained from the corresponding Laplace transform by setting s = jω? In other words, is it true that X(jω) = X(ω)?

Yes and no. Yes, it is true in most cases. For example, when x(t) = e −at u(t), its Laplace transform is 1/(s + a), and X(jω) = 1/(jω + a), which is equal to X(ω) (assuming a < 0). However, for the unit step function u(t), the Laplace transform is

The Fourier transform is given by

Clearly, X(jω) ≠ X(ω) in this case. To understand this puzzle, consider the fact that we obtain X(jω) by setting s = jω in Eq. (7.31a). This implies that the integral on the right-hand side of Eq. (7.31a) converges for s = jω, meaning that s = jω (the imaginary axis) lies in the ROC for X(s). The general rule is that only when the ROC for X(s) includes the jω axis, does setting s = jω in X(s) yield the Fourier transform X(ω), that is, X(jω) = X(ω). This is the case of absolutely integrable x(t). If the ROC of X(s) excludes the jω axis, X(jω) ≠ X(ω). This is the case for exponentially growing x(t) and also x(t) that is constant or is oscillating with constant amplitude. The reason for this peculiar behavior has something to do with the nature of convergence of the Laplace and the Fourier integrals when x(t) is not absolutely integrable.[†]

This discussion shows that although the Fourier transform may be considered as a special case of the Laplace transform, we need to circumscribe such a view. This fact can also be seen from the fact that a periodic signal has the Fourier transform, but the Laplace transform does not exist. [†] At |x| = 0.5, we require rect (x) = 0.5 because the inverse Fourier transform of a discontinuous signal converges to the mean of its

two values at the discontinuity.

[†] sinc(x) is also denoted by Sa (x) in the literature. Some authors define sinc (x) as

[†] To compute bandwidth, we must consider the spectrum only for positive values of ω. See discussion in Section 6.3. [†] The constant multiple 2π in the spectrum [X(ω) = 2πδ(ω))] may be a bit puzzling. Since 1 = e jωt with ω = 0, it appears that the

Fourier transform of x(t) = 1 should be an impulse of strength unity rather than 2π. Recall, however, that in the Fourier transform x(t) is synthesized by exponentials not of amplitude X(nΔω)Δω but of amplitude 1/2π times X(nΔω)Δω, as seen from Eq. (7.66b). Had we used variable f (hertz) instead of ω, the spectrum would have been the unit impulse. [†] We assume here that the linearity property can be extended to an infinite sum. [†] The second term on the right-hand side of Eq. (7.28b), being an odd function of ω, has zero area regardless of the value of a. As a

→ 0, the second term approaches 1/ω.

[†] To explain this point, consider the unit step function and its transforms. Both the Laplace and the Fourier transform synthesize x(t), using everlasting exponentials of the form e st . The frequency s can be anywhere in the complex plane for the Laplace transform, but it

must be restricted to the jω axis in the case of the Fourier transform. The unit step function is readily synthesized in the Laplace transform by a relatively simple spectrum X(s) = 1 /s, in which the frequencies s are chosen in the RHP [the region of convergence for u(t) is Re s > 0]. In the Fourier transform, however, we are restricted to values of s only on the jω axis. The function u(t) can still be synthesized by frequencies along the jω axis, but the spectrum is more complicated than it is when we are free to choose the frequencies in the RHP. In contrast, when x(t) is absolutely integrable, the region of convergence for the Laplace transform includes the jω axis, and we can synthesize x(t) by using frequencies along the jω axis in both transforms. This leads to X(jω) = X(ω). We may explain this concept by an example of two countries, X and Y. Suppose these countries want to construct similar dams in their respective territories. Country X has financial resources but not much manpower. In contrast, Y has considerable manpower but few financial resources. The dams will still be constructed in both countries, although the methods used will be different. Country X will use expensive but efficient equipment to compensate for its lack of manpower, whereas Y will use the cheapest possible equipment in a labor-intensive approach to the project. Similarly, both Fourier and Laplace integrals converge for u(t), but the make-up of the components used to synthesize u(t) will be very different for two cases because of the constraints of the Fourier transform, which are not present for the Laplace transform.

7.3 SOME PROPERTIES OF THE FOURIER TRANSFORM We now study some of the important properties of the Fourier transform and their implications as well as applications. We have already encountered two important properties, linearity [Eq. (7.16)] and the conjugation property [Eq. (7.10)]. Before embarking on this study, we shall explain an important and pervasive aspect of the Fourier transform: the time-frequency duality.

Figure 7.18: A near symmetry between the direct and the inverse Fourier transforms. TIME-FREQUENCY DUALITY IN THE TRANSFORM OPERATIONS Equations (7.8) show an interesting fact: the direct and the inverse transform operations are remarkably similar. These operations, required to go from x(t) to X(ω) and then from X(ω) to x(t), are depicted graphically in Fig. 7.18. The inverse transform equation can be obtained from the direct transform equation by replacing x(t) with X(ω), t with ω, and ω with t. In a similar way, we can obtain the direct from the inverse. There are only two minor differences in these operations: the factor 2π appears only in the inverse operator,

and the exponential indices in the two operations have opposite signs. Otherwise the two equations are duals of each other. [†] This observation has far-reaching consequences in the study of the Fourier transform. It is the basis of the so-called duality of time and frequency. The duality principle may be compared with a photograph and its negative. A photograph can be obtained from its negative, and by using an identical procedure, a negative can be obtained from the photograph. For any result or relationship between x(t) and X(ω), there exists a dual result or relationship, obtained by interchanging the roles of x(t) and X(ω) in the original result (along with some minor modifications arising because of the factor 2π and a sign change). For example, the time-shifting property, to be proved X(ω), then later, states that if x(t) The dual of this property (the frequency-shifting property) states that

Observe the role-reversal of time and frequency in these two equations (with the minor difference of the sign change in the exponential index). The value of this principle lies in the fact that whenever we derive any result, we can be sure that it has a dual. This possibility can give valuable insights about many unsuspected properties or results in signal processing. The properties of the Fourier transform are useful not only in deriving the direct and inverse transforms of many functions, but also in obtaining several valuable results in signal processing. The reader should not fail to observe the ever-present duality in this discussion. LINEARITY The linearity property [Eq. (7.16)] has already been introduced. CONJUGATION AND CONJUGATE SYMMETRY The conjugation property, which has already been introduced, states that if x(t)

X(ω), then

From this property follows the conjugate symmetry property, also introduced earlier, which states that if x(t) is real, then DUALITY The duality property states that if then

Proof. From Eq. (7.8b) we can write

Hence

Changing t to ω yields Eq. (7.32). EXAMPLE 7.11 In this example we apply the duality property [Eq. (7.32)] to the pair in Fig. 7.19a.

Figure 7.19: The duality property of the Fourier transform. From Eq. (7.21) we have

Also, X(t) is the same as X(ω) with ω replaced by t, and x(−ω) is the same as x(t) with t replaced by −ω. Therefore, the duality property (7.32) yields

In Eq. (7.33) we used the fact that rect (−x) = rect (x) because rect is an even function. Figure 7.19b shows this pair graphically. Observe the interchange of the roles of t and ω (with the minor adjustment of the factor 2π). This result appears as pair 18 in Table 7.1 (with τ/2 = W). As an interesting exercise, the reader should generate the dual of every pair in Table 7.1 by applying the duality property. Table 7.1: Fourier Transforms Open table as spreadsheet X(ω)

No.

x(t)

1

e −at u(t)

a>0

2

e at u(−t)

a>0

3

e −a|t|

a>0

4

te−at u(t)

a>0

5

tn e −at u(t)

a>0

6

δ(t)

1

7

1

2πδ(ω)

8

e jω0 t

2πδ(ω−ω0 )

9

cos ω0 t

π[δ(ω − ω0 ) + δ(ω + ω0 )]

10

sin ω0 t

jπ[δ(ω + ω0 ) − δ (ω − ω0 )]

11

u(t)

12

sgn t

13

cos ω0 t u(t)

14

sin ω0 t u(t)

15

e −at sin ω0 t u(t)

a>0

16

e −at cos ω0 t u(t)

a>0

17

18

19

20

21

22

2

e −t /2σ2

EXERCISE E7.4 Apply the duality property to pairs 1, 3, and 9 (Table 7.1) to show that a. 1/(jt + a)

2πe aω u(−ω)

b. 2a/(t 2 + a 2 )

2π e −a|ω|

c. δ(t + t0 ) + δ(t − t0 )

2 cos t0 ω

THE SCALING PROPERTY If then, for any real constant a,

Proof. For a positive real constant a,

Similarly, we can demonstrate that if a < 0,

Hence follows Eq. (7.34). SIGNIFICANCE OF THE SCALING PROPERTY The function x(at) represents the function x(t) compressed in time by a factor a (see Section 1.2-2). Similarly, a function X(ω/a) represents the function X(ω) expanded in frequency by the same factor a. The scaling property states that time compression of a signal results in its spectral expansion, and time expansion of the signal results in its spectral compression. Intuitively, compression in time by

factor a means that the signal is varying faster by factor a.[†] To synthesize such a signal, the frequencies of its sinusoidal components must be increased by the factor a, implying that its frequency spectrum is expanded by the factor a. Similarly, a signal expanded in time varies more slowly; hence the frequencies of its components are lowered, implying that its frequency spectrum is compressed. For instance, the signal cos 2 ω0 t is the same as the signal cos ω0 t time-compressed by a factor of 2. Clearly, the spectrum of the former (impulse at ±2ω0 ) is an expanded version of the spectrum of the latter (impulse at ±ω0 ). The effect of this scaling is demonstrated in Fig. 7.20.

Figure 7.20: The scaling property of the Fourier transform. RECIPROCITY OF SIGNAL DURATION AND ITS BANDWIDTH The scaling property implies that if x(t) is wider, its spectrum is narrower, and vice versa. Doubling the signal duration halves its bandwidth, and vice versa. This suggests that the bandwidth of a signal is inversely proportional to the signal duration or width (in seconds). [†] We have already verified this fact for the gate pulse, where we found that the bandwidth of a gate pulse of width τ

seconds is 1/τ Hz. More discussion of this interesting topic can be found in the literature. [2] By letting a = −1 in Eq. (7.34), we obtain the inversion property of time and frequency:

EXAMPLE 7.12 Find the Fourier transforms of e at u(−t) and e −a|t|. Application of Eq. (7.35) to pair 1 (Table 7.1) yields

Also Therefore

The signal e −a|t| and its spectrum are illustrated in Fig. 7.21.

Figure 7.21 (a) e −a|t| and (b) its Fourier spectrum. THE TIME-SHIFTING PROPERTY If then

Proof. By definition,

Letting t − t0 = u, we have

This result shows that delaying a signal by t0 seconds does not change its amplitude spectrum. The phase spectrum, however, is changed by − ωt0 . PHYSICAL EXPLANATION OF THE LINEAR PHASE Time delay in a signal causes a linear phase shift in its spectrum. This result can also be derived by heuristic reasoning. Imagine x(t) being synthesized by its Fourier components, which are sinusoids of certain amplitudes and phases. The delayed signal x(t − t0 ) can be synthesized by the same sinusoidal components, each delayed by t0 seconds. The amplitudes of the components remain unchanged. Therefore, the amplitude spectrum of x(t − t0 ) is identical to that of x(t). The time delay of t0 in each sinusoid, however, does change the phase of each component. Now, a sinusoid cos ωt delayed by t0 is given by

Figure 7.22: Physical explanation of the time-shifting property. Therefore a time delay t0 in a sinusoid of frequency ω manifests as a phase delay of ωt0 . This is a linear function of ω, meaning that higher-frequency components must undergo proportionately higher phase shifts to achieve the same time delay. This effect is depicted in Fig. 7.22 with two sinusoids, the frequency of the lower sinusoid being twice that of the upper. The same time delay t0 amounts to a phase shift of π/2 in the upper sinusoid and a phase shift of π in the lower sinusoid. This verifies the fact that to achieve the same time delay, higher-frequency sinusoids must undergo proportionately higher phase shifts. The principle of linear phase shift is very important, and we shall encounter it again in distortionless signal transmission and filtering applications. EXAMPLE 7.13 Find the Fourier transform of e −a|t−t 0 |. This function, shown in Fig. 7.23a, is a time-shifted version of e −a|t| (depicted in Fig. 7.21a). From Eqs. (7.36) and (7.37) we have

The spectrum of e −a|t−t 0 | (Fig. 7.23b) is the same as that of e −a|t| (Fig. 7.21b), except for an added phase shift of −ωt0 . Observe that the time delay t0 causes a linear phase spectrum −ωt0 . This example clearly demonstrates the effect of time shift.

Figure 7.23: Effect of time-shifting on the Fourier spectrum of a signal. EXAMPLE 7.14 Find the Fourier transform of the gate pulse x(t) illustrated in Fig. 7.24a.

The pulse x(t) is the gate pulse rect (t/τ) in Fig. 7.10a delayed by 3τ/4 second. Hence, according to Eq. (7.37a), its Fourier transform is the Fourier transform of rect (t/τ) multiplied by e −jω(3τ/4). Therefore

The amplitude spectrum |X(ω)| (depicted in Fig. 7.24b) of this pulse is the same as that indicated in Fig. 7.10c. But the phase spectrum has an added linear term −3ωτ/4. Hence, the phase spectrum of x(t) (Fig. 7.24a) is identical to that in Fig. 7.10d plus a linear term −3ωτ/4, as shown in Fig. 7.24c. PHASE SPECTRUM USING PRINCIPAL VALUES There is an alternate way of spectral representation of ∠X(ω). The phase angle computed on a calculator or by using a computer subroutine is generally the principal value (modulo 2π value) of the phase angle, which always lies in the range −π to π. For instance, the principal value of angle 3π/2 is −π/2, and so on. The principal value differs from the actual value by ±2π radians (and its integer multiples) in a way that ensures that the principal value remains within −π to π. Thus, the principal value will show jump discontinuities of ±2π whenever the actual phase crosses +π. The phase plot in Fig. 7.24c is redrawn in Fig. 7.24d using principal value for the phase. This phase pattern, which contains phase discontinuities of magnitudes 2π and π, becomes repetitive at intervals of ω = 8π/τ.

Figure 7.24: Another example of time-shifting and its effect on the Fourier spectrum of a signal. EXERCISE E7.5 Use pair 18 of Table 7.1 and the time-shifting property to show that the Fourier transform of sinc[ω0 (t − T)] is (πω0 ) rect (ω/2ω0 )e −jωT. Sketch the amplitude and phase spectra of the Fourier transform. THE FREQUENCY-SHIFTING PROPERTY If then

Proof. By definition,

According to this property, the multiplication of a signal by a factor e jω0 t shifts the spectrum of that signal by ω = ω0 . Note the duality between the time-shifting and the frequency-shifting properties. Changing ω0 to − ω0 in Eq. (7.39) yields

Because e jω0 t is not a real function that can be generated, frequency shifting in practice is achieved by multiplying x(t) by a sinusoid. Observe that From Eqs. (7.39) and (7.40), it follows that

This result shows that the multiplication of a signal x(t) by a sinusoid of frequency ω0 shifts the spectrum X(ω) by ±ω0 , as depicted in Fig. 7.25.

Figure 7.25: Amplitude modulation of a signal causes spectral shifting. Multiplication of a sinusoid cos ω0 t by x(t) amounts to modulating the sinusoid amplitude. This type of modulation is known as amplitude modulation. The sinusoid cos ω0 t is called the carrier, the signal x(t) is the modulating signal, and the signal x(t) cos ω0 t is the modulated signal. Further discussion of modulation and demodulation appears in Section 7.7. To sketch a signal x(t) cos ω0 t, we observe that

Therefore, x(t) cos ω0 t touches x(t) when the sinusoid cos ω0 t is at its positive peaks and touches −x(t) when cos ω0 t is at its negative peaks. This means that x(t) and −x(t) act as envelopes for the signal x(t) cos ω0 t (see Fig. 7.25). The signal −x(t) is a mirror image of x(t) about the horizontal axis. Figure 7.25 shows the signals x(t) and x(t) cos ω0 t and their spectra. EXAMPLE 7.15 Find and sketch the Fourier transform of the modulated signal x(t) cos 10t in which x(t) is a gate pulse rect (t/4) as illustrated in Figure 7.26a.

Figure 7.26: An example of spectral shifting by amplitude modulation. From pair 17 (Table 7.1) we find rect (t/4)

4 sinc (2ω), which is depicted in Fig. 7.26b. From Eq. (7.41) it follows that

In this case, X(ω) = 4 sinc (2ω). Therefore The spectrum of x(t) cos 10t is obtained by shifting X(ω) in Fig. 7.26b to the left by 10 and also to the right by 10, and then multiplying

it by 0.5, as depicted in Fig. 7.26d. EXERCISE E7.6 Show that

EXERCISE E7.7 1. Sketch signal e −|t| cos 10t. Find the Fourier transform of this signal and sketch its spectrum. Answers 1. X(ω) =

See Fig. 7.21b for the spectrum of e −a|t|.

APPLICATION OF MODULATION Modulation is used to shift signal spectra. Some of the situations that call for spectrum shifting are presented next. 1. If several signals, all occupying the same frequency band, are transmitted simultaneously over the same transmission medium, they will all interfere; it will be impossible to separate or retrieve them at a receiver. For example, if all radio stations decide to broadcast audio signals simultaneously, a receiver will not be able to separate them. This problem is solved by using modulation, whereby each radio station is assigned a distinct carrier frequency. Each station transmits a modulated signal. This procedure shifts the signal spectrum to its allocated band, which is not occupied by any other station. A radio receiver can pick up any station by tuning to the band of the desired station. The receiver must now demodulate the received signal (undo the effect of modulation). Demodulation therefore consists of another spectral shift required to restore the signal to its original band. Note that both modulation and demodulation implement spectral shifting; consequently, demodulation operation is similar to modulation (see Section 7.7). This method of transmitting several signals simultaneously over a channel by sharing its frequency band is known as frequency-division multiplexing (FDM).

Old is gold, but sometimes it is fool's gold. 2. For effective radiation of power over a radio link, the antenna size must be of the order of the wavelength of the signal to be radiated. Audio signal frequencies are so low (wavelengths are so large) that impracticably large antennas would be required for radiation. Here, shifting the spectrum to a higher frequency (a smaller wavelength) by modulation solves the problem. CONVOLUTION The time-convolution property and its dual, the frequency-convolution property, state that if then

and

Proof. By definition

The inner integral is the Fourier transform of x 2 (t − τ), given by [time-shifting property in Eq. (7.37)] X2 (ω)e −jωτ. Hence

Let H(ω) be the Fourier transform of the unit impulse response h(t), that is

Application of the time-convolution property to y(t) = x(t)*h(t) yields (assuming that both x(t) and h(t) are Fourier transformable)

The frequency-convolution property (7.43) can be proved in exactly the same way by reversing the roles of x(t) and X(ω). EXAMPLE 7.16 Use the time-convolution property to show that if then

Because

it follows that

Now, from the time-convolution property [Eq. (7.42)], it follows that

In deriving the last result, we used Eq. (1.23a). EXERCISE E7.8 Use the time-convolution property to show that x(t)* δ(t) = x(t). EXERCISE E7.9 Use the time-convolution property to show that

TIME DIFFERENTIATION AND TIME INTEGRATION If then

[†]

and

Proof. Differentiation of both sides of Eq. (7.8b) yields

This result shows that

Repeated application of this property yields

Table 7.2: Fourier Transform Operations Open table as spreadsheet Operation

x(t)

X(ω)

Scalar multiplication

kx(t)

kX(ω)

Addition

x 1 (t) + x 2 (t)

X1 (ω) + X2 (ω)

Conjugation

x*(t)

X*(−ω)

Duality

X(t)

2πx(−ω)

Scaling (a real)

x(at)

Time shifting

x(t − t0 )

X(ω)e −jωt 0

Frequency shifting (ω0 real)

x(t)e jω0 t

X(ω − ω0 )

Time convolution

x 1 (t)* x 2 (t)

X1 (ω)X2 (ω)

Frequency convolution

x 1 (t)x 2 (t)

Time differentiation

Time integration

(jω) n X(ω) ∫ t −∞ x(u)du

The time-integration property [Eq. (7.47)] has already been proved in Example 7.16. The Fourier transform properties are summarized in Table 7.2. EXAMPLE 7.17 Use the time-differentiation property to find the Fourier transform of the triangle pulse Δ(t/τ) illustrated in Fig. 7.27a.

Figure 7.27: Finding the Fourier transform of a piecewise-linear signal using the time-differentiation property. To find the Fourier transform of this pulse we differentiate the pulse successively, as illustrated in Fig. 7.27b and 7.27c. Because dx/dt

is constant everywhere, its derivative, d 2 x/dt2 , is zero everywhere. But dx/dt has jump discontinuities with a positive jump of 2/τ at t = τ/2, and a negative jump of 4/τ at t = 0. Recall that the derivative of a signal at a jump discontinuity is an impulse at that point of

strength equal to the amount of jump. Hence, d 2 x/dt2 , the derivative of dx/dt, consists of a sequence of impulses, as depicted in Fig. 7.27c; that is,

From the time-differentiation property [Eq. (7.46)]

Also, from the time-shifting property [Eq. (7.37b)]

Taking the Fourier transform of Eq. (7.49) and using the results in Eqs. (7.50), we obtain

and

The spectrum X(ω) is depicted in Fig. 7.27d. This procedure of finding the Fourier transform can be applied to any function x(t) made up of straight-line segments with x(t) → 0 as |t| → ∞. The second derivative of such a signal yields a sequence of impulses whose Fourier transform can be found by inspection. This example suggests a numerical method of finding the Fourier transform of an arbitrary signal x(t) by approximating the signal by straight-line segments. EXERCISE E7.10 Use the time-differentiation property to find the Fourier transform of rect (t/τ). [†] Of the two differences, the former can be eliminated by change of variable from ω to f (in hertz). In this case ω = 2π f and dω = 2π

df.

Therefore, the direct and the inverse transforms are given by

This leaves only one significant difference, that of sign change in the exponential index.

[†] We are assuming a > 1, although the argument still holds if a < 1. In the latter case, compression becomes expansion by factor 1/a,

and vice versa.

[†] When a signal has infinite duration, we must consider its effective or equivalent duration. There is no unique definition of effective

signal duration. One possible definition is given in Eq. (2.67).

[2] Bracewell, R. N. Fourier Transform and Its Applications, rev. 2nd ed. McGraw-Hill, New York, 1986. [†] Valid only if the transform of dx/dt exists. In other words, dx/dt must satisfy the Dirichlet conditions. The first Dirichlet condition implies

We also require that x(t) → 0 as t → ±∞. Otherwise, x(t) has a dc component, which gets lost in differentiation, and there is no one-toone relationship between x(t) and dx/dt.

7.4 SIGNAL TRANSMISSION THROUGH LTIC SYSTEMS If x(t) and y(t) are the input and output of an LTIC system with impulse response h(t), then, as demonstrated in Eq. (7.44b)

This equation does not apply to (asymptotically) unstable systems because h(t) for such systems is not Fourier transformable. It applies to BIBO stable as well as most of the marginally stable systems. [†] Also the input x(t) itself must be Fourier transformable if we are to use Eq. (7.52).

In Chapter 4, we saw that the Laplace transform is more versatile and capable of analyzing all kinds of LTIC systems whether stable, unstable, or marginally stable. Laplace transform can also handle exponentially growing inputs. In comparison to the Laplace transform, the Fourier transform in system analysis is not just clumsier, but also very restrictive. Hence, the Laplace transform is preferable to the Fourier transform in LTIC system analysis. We shall not belabor the application of the Fourier transform to LTIC system analysis. We consider just one example here. EXAMPLE 7.18 Find the zero-state response of a stable LTIC system with frequency response [‡]

and the input is x(t) = e −t u(t). In this case

Moreover, because the system is stable, the frequency response H(jω) = H(ω). Hence

Therefore

Expanding the right-hand side in partial fractions yields

and EXERCISE E7.11 For the system in Example 7.18, show that the zero-input response to the input e t u(−t) is y(t) = ⅓[e t u(−t) + e −2t u(t)] [Hint: Use pair 2 t

(Table 7.1) to find the Fourier transform of e u(−t).] HEURISTIC UNDERSTANDING OF LINEAR SYSTEM RESPONSE In finding the linear system response to arbitrary input, the time-domain method uses convolution integral and the frequency-domain method uses the Fourier integral. Despite the apparent dissimilarities of the two methods, their philosophies are amazingly si