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信号与系统:英文版
作者:(美)奥本海姆(Alan V.Oppenheim)等著
出版社:电子工业出版社
出版时间:2002-08-01
ISBN:9787505378469
定价:¥59.00
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内容简介
编辑推荐:本书是美国麻省理工学院电气工程与计算机科学系本科生教材。作者ALANV.OPPENHEIM教授是本领域中的权威专家,在国际上享有盛名。本书是在第一版基础之上经重新组织,重新改写并做补充而成,除保留原书结构新颖、选材得当、论述严谨、条理清楚等特色外,在某些方面更有所加强,恰似锦上添花,堪称反映信号与系统分析当代水平的一部佳作。相对于第一版,本书在内容编排上又进行了大幅度精心调整。在第二版中大大增加了各章例题的数量,将第一版中最为珍贵的章末练习,做了进一步加强,使得习题的总数多达600多,其中大多数习题都是新的。这样就为教师安排课外作业提供了更多的灵活性。另外,为了对学生和教师更好地使用这些习题,对这些习题的组织安排上做一些变化。“信号与系统”不仅是电类本科生必修的基本课程,而且,作为该课程核心的一些基本概念和方法,对所有工科专业来说也是非常重要的。
作者简介
暂缺《信号与系统:英文版》作者简介
目录
1 SIGNALS AND SYSTEMS
1.0 Introduction
1.1 Continuous-Time and Discrete-Time Signals
1.1.1 Examples and Mathematical Representation
1.1.2 Signal Energy and Power
1.2 Transformations of the Independent Variable
1.2.1 Examples of Transformations of the Independent Variable
1.2.2 Periodic Signals
1.2.3 Even and Odd Signals
1.3 Exponential and Sinusoidal Signals
1.3.1 Continuous-Time Complex Exponential and Sinusoidal Signals
1.3.2 Discrete-Time Complex Exponential and Sinusoidal Signals
1.3.3 Periodicity Properties of Discrete-Time Complex Exponentials
1.4 The Unit Impulse and Unit Step Functions
1.4.1 The Discrete-Time Unit Impulse and Unit Step Sequences
1.4.2 The Continuous-Time Unit Step and Unit Impulse Functions
1.5 Continuous-Time and Discrete-Time System
l.5.1 Simple Examples of Systems
1.5.2 Interconnections of Systems
1.6 Basic System Properties
1.6.1 Systems with and without Memory
1.6.2 Invertibility and Inverse Systems
1.6.3 Causality
1.6.4 Stability
1.6.5 Time Invariance
1.6.6 Linearity
1.7 Summary
Problems
LINEAR TIME-INVARIANT SYSTEMS
2.0 Introduction
2.1 Discrete-Time LTI Systems: The Convolution Sum
2.1.1 The Representation of Discrete-Time Signals in Terms of Impulses
2.1.2 The Discrete-Time Unit Impulse Response and the Convolution-Sum Representation of LTI Systems
2.2 Continunus-Time LTI Systems: The Convolution Integral
2.2.1 The Representation of Continuous-Time Signals in Terms of Impulses
2.2.2 The Continuous-Time Unit Impulse Response and the Convolution Integral Representation of LTI Systems
2.3 Properties of Linear Time-Invariant Systems
2.3.1 The Commutative Property
2.3.2 The Distributive Property
2.3.3 The Associative Property '
2.3.4 LTI Systems with and without Memory
2.3.5 Invenibility of LTI Systems
2.3.6 Cansality for LII Systems
2.3.7 Stability for LTI Systems
2.3.8 The Unit Step Response of an LTI System
2.4 Causal LTI Systems Described by Differential and Difference Equations
2.4.1 Linear Constant-Coefficient Differential Equations
2.4.2 Linear Constant-CoeHicient Difference Equations
2.4.3 Block Diagram Representations of First-Order Systems Described by Differential and Difference Equations
2.5 Singularity Functions
2.5.1 The Unit Impulse as an Idealized Short Pulse
2.5.2 Defining the Unit Impulse through Convolution
2.5.3 Unit Doublets and Other Singulanty Functions
2.6 Summary
Problems
3 FOURIER SERIES REPRESENTATION OF PERIODIC SIGNALS
3.0 Introduction
3.1 A Historieal Perspective
3.2 The Response of LTI Systems to Complex Exponentials
3.3 Fourier Series Representation of Continuous-Time Periodic Signals
3.3.1 Linear Combinations of Harmonically Related Complex Exponentials
3.3.2 Determination of the Fourier Series Representation of a Continuous-Time Periodic Signal
3.4 Convergence of the Fourier Series
3.5 Properties of Continuous-Time Fourier Series
3.5.1 Linearity
3.5.2 Time Shifting
3.5.3 Time Reversal
3.5.4 Time Scaling
3.5.5 Multiplication
3.5.6 Conjugation and Conjugate Symmetry
3.5.7 Parseval's Relation for Continuous-Time Periodic Signals
3.5.8 Summary of Propenies of the Continuous-Time Fourier Series
3.5.9 Examples
3.6 Fourier Series Representation of Discrete-Time Periodic Signals
3.6.1 Linear Combinations of Harmonically Related Complex Exponentials
3.6.2 Determination of the Fourier Series Representation of a Periodic Signal
3.7 Propedies of Discrete-Time Fourier Series
3.7.1 Multiplication
3.7.2 First Difference
3.7.3 Parseval's Relation for Discrete-Time Periodic Signals
3.7.4 Examples
3.8 Fourier Series and LTI Systems
3.9 Filtering
3.9.1 Frequency-Shaping Filters
3.9.2 Frequency-Selective Filters
3.10 Examples of Continuous-Time Filters Described by Differential Equations
3.10.1 A Simple RC Lowpass Filter
3.10.2 A Simple RC Highpass Filter
3.11 Examples of Discrete-Time Filters Described by Difference Equations
3.11.1 First-Order Recursive Discrete-Time Filters
3.11.2 Nonrecursive Discrete-Time Filters
3.12 Summary
Problems
4 THE CONTINUOUS-TIME FOURIER TRANSFORM
4.0 Introduction
4.1 Representation of Aperiodic Signals: The Continuous-Time Fourier Transform
4.1.1 Development of the Fourier Transform Representation of an Aperiodic Signal
4.1.2 Convergence of Fourier Transforms
4.1.3 Examples of Continuous-Time Fourier Transforms
4.2 The Fourier Tkansform for Periodic Signals
4.3 Properties of the Continuous-Time Fourier Transform
4.3.1 Linearity
4.3.2 Time Shifting
4.3.3 Conjugation and Conjugate Symmetry
4.3.4 Differentiation and Integration
4.3.5 Time and Frequency Scaling
4.3.6 Duality
4.3.7 Parseval's Relation
4.4 The Convolution Property
4.4.1 Examples
4.5 Ihe Multiplication Property
4.5.1 Frequency-Selective Filtering with Variable Center Frequency
4.6 Tables of Fourier Properties and of Basic Fourier Transform Pairs
4.7 Systems Characterized by Linear Constant-Coefficient Differential Equations
4.8 Summary
Problems
5 THE DISCRETE-TIME FOURIER TRANSFORM
5.0 Introduction
5.1 Representation of Aperiodic Signals: The Discrete-Time Fourier Transform
5.1.1 Development of the Discrete-Time Fourier Transform
5.1.2 Examples of Discrete-Time Fourier Transforms
5.1.3 Convergence Issues Associated with the Discrete-Time Fourier Transform
5.2 The Fourier Transform for Periodic Signals
5.3 Properties of the Discrete-Time Fourier Transform
5.3.1 Periodicity of the Discrete-Time Fourier Transform
5.3.2 Linearity of the Fourier Transform
5.3.3 Time Shifting and Frequency Shifting
5.3.4 Conjugation and Conjugate Symmetry
5.3.5 Differencing and Accumulation
5.3.6 Time Reversal
5.3.7 Time Expansion
5.3.8 Differentiation in Frequency
5.3.9 Parseval's Relation
5.4 The Convolution Property
5.4.1 Examples
5.5 The Multiplication Property
5.6 Tables of Fourier Iransform Properties and Basic Fourier Transform Pairs
5.7 Duality
5.7.1 Duality in the Discrete-Time Fourier Series
5.7.2 Duality between the Discrete-Time Fourier Transform and the Continuous-Time Fourier Series
S.8 Systems Characterized by Linear Constant-Coefficient Difference Equations
5.9 Summary
Problems
6 TIME AND FREQUENCY C OF SIGNALS AND SYSTEMS
6.0 Introduction
6.1 The Magnitude-phase Representation of the Fourier Transform
6.2 The Magnitude-Phase Representation of the Frequency R of LTI Systems
6.2.1 Linear and Nonlinear Phase
6.2.2 Group Delay
6.2.3 Log-Magnitude and Bode Plots
6. 3 Time-Domain Properties of Ideal Frequency-Selective Filters
6.4 Time-Domain and Frequency-Domain Aspects of Nonideal Filters
6. 5 First-Order and Second-Order Continuous-Time Systems
6.5.1 First-Order Continuous-Time Systems
6.5.2 Second-Order Continuous-Time Systems
6.5.3 Bode Plots for Rational Frequency Responses
6.6 First-Order and Second-Order Discrete-Time Systems
6.6.1 First-Order Discrete-Time Systems
6.6.2 Second-Order Discrete-Time Systems
6.1 Examples of Time-and Frequency-Domain Analysis of Systems
6.7.1 Analysis of an Automobile Suspension System
6.7.2 Examples of Discrete-Time Nonrecursive Filters
6.8 Summary
Problems
7 SAMPLING
7.0 Introduction
7.1 Representation of a Continuous-Time Signal by Its Samples: The Sampling Theorem
7. 1.1 Impulse-Train Sampling
7. 1.2 Sampling with a
7.2 Reconstruction of a Signal from Its Samplee Using Interpolation
7.3 The Effect of Undersampling: Aliasing
7.4 Discrete-Time
7.4.1 Digital Differentiator
7.4.2 Half-Sample Delay
7. 5 Sampling of Discrete-Time Signals
7.5.1 Impulse-Train Sampling
7.5.2 Discrete-Time Decimation and Interpolation
7.6 S
Problems
8 Co
8.0 Introduction
8.1 Complex
8.1.1 Amplitude Modulation with a Complex Exponential Carrier
8.1.2 Amplitude Modulation with a Sinusoidal Carrier
8.2 Demodulatiou for Sinusoidal AM
8.2.1 Synchronous Demodulation
8.2.2 Asynchronous Demodulation
8.3 Frequency-Division Multiplexing
8.4 Single-Sideband Sinusoidal Amplitude Modulation
8.5 Amplitude Modulation with a Pulse-Train Carrier
8.5.1 Modulation of a Pulse-Train Carrier
8.5.2 Time-Division Multiplexing
8.6 Pulse-Amplitude Modulation
8.6.1 Pulse-Amplitude Modulated Signals
8.6.2 Intersymbol Interference in PAM Systems
8.6.3 Digital Pulse-Amplitude and Pulse-Code Modulation
8.7 Sinusoidal Frequency Modulation
8.7.1 Narrowband Frequency Modulation
8.7.2 Wideband Frequency Modulation
8.7.3 Periodic Square-Wave Modulating Signal
8.8 Discrete-Time Medulation
8.8.1 Discrete-Time Sinusoidal Amplitude Modulation
8.8.2 Discrete-Time Transmodulation
8.9 S
Problems
9 THE LAPLACE TRANSFORM
9.0 Introduction
9.1 The Laplace Transform
9.2 The Region of Convergence for Laplace Transforms
9.3 The Inverse Laplace Transform
9.4 Geometric Evaluation of the Fourier Transform from the Pole-Zero Plot
9.4.1 First-Order Systems
9.4.2 Second-Order Systems
9.4.3 All-Pass Systems
9.5 Properties of the Laplace Transform
9.5.1 Linearity of the Laplace Transform
9.5.2 Time Shifting
9.5.3 Shifting in the s-Domain
9.5.4 Time Scaling
9.5.5 Conjugation
9.5.6 Convolution Property
9.5.7 Differentiation in the Time Domain
9.5.8 Differentiation in the s-Domain
9.5.9 Integration in the Time Domain
9.5.1O The Initial- and Final-Value Theorems
9.5.11 Table of Properties
9.6 Some Laplace Transform Pairs
9.7 Analysis and Characterization of LTI Systems Dsing the Laplace Transform
9.7.1 Causality
9.7.2 Stability
9.7.3 LTI Systems Characterized by Linear Constant-Coefficient Differential Equations
9.7.4 Examples Relating System Behavior to the System Function
9.7.5 Butterworth Filters
9.8 System Function Algebra and Block Representations
9.8.1 System Functions for Interconnections of LTI Systems
9.8.2 Block Diagram Representations for Causal LTI Systems Described by Differential Equations and Rational System Functions
9.9 The Unilateral Laplace Transform
9.9.1 Examples of Unilateral Laplace Transforms
9.9.2 Properties of the Unilateral Laplace Transform
9.9.3 Solving Differential Equations Using the Unilateral Laplace Transform
9.10 S
Problems
10 THE Z-TRANSFORM
10.0 Introduction
10.1 The z-Transform
10.2 The Region of Convergence for the z-Transform
10.3 The Inverse z-Transform
10.4 Geometric Evaluation of the Fourier Transform from the Pole-Zero Plot
10.1.1 First-Order Systems
10.4.2 Second-Order Systems
10.5 Properties of the z-Transform
10.5.1 Linearity
10.5.2 Time Shifting
10.5.3 Scaling in the z-Domain
10.5.4 Time Reversal
10.5.5 Time Expansion
10.5.6 Conjugation
10.5.7 The Convolution Property
10.5.8 Differentiation in the z-Domain
10.5.9 Ihe Initial-Value Theorem
10.5.10 S
10.6 Some Common z-Transform Pairs
10.1 Analysis and Characterization of LTI Systems Using z-Transforms
10.7.1 Causality
10.7.2 Stability
10.7.3 LTI Systems Characterized by Linear Constant-Coefficient Difference Equations
10.7.4 Examples Relating System Behavior to the System Function
10.8 System Function Algebra and Block Diagram Representations
10.8.1 System Functions for Interconnections of LTI Systems
10.8.2 Block Diagram Representations for Causal LTI Systems Described by Difference Equations and Rational System Functions
10.9 The Unilateral z-Transform
10.9.1 Examples of Unilateral z-Transforms and Inverse Transforms
10.9.2 Properties of the Unilateral z-Transform
10.9.3 Solving Difference Equations Using the Unilateral z-Transform
10.10 S
Problems
11 LINEAR FEEDBACK SYSTEMS
11.0 Introduction
11.1 Linear Feedback Systems
11.2 Some Applications and Consequences of Feedback
11.2.1 Inverse System Design
11.2.2 Compensation for Nonideal Elements
11.2.3 Stabilization of Unstable Systems
11.2.4 Sampled-Data Feedback Systems
11.2.5 Tracking System
11.2.6 Destabilization Caused by Feedback
11.3 Root-Loeus Analysls of Linear Feedbaek Systems
11.3.1 An Introductory Example
11.3.2 Equation for the Closed-Loop Poles
11.3.3 The End Points of the Root Locus: The Closed-Loop Poles for K=O and |K|= +
11.3.4 The Angle Criterion
11.3.5 Properties of the Root Locus
11.4 The Nyquist Stability Criterion
11.4.1 The Encirclement Property
11.4.2 The Nyquist Criterion for Continuous-Time LTI Feedback Systems
11.4.3 The Nyquist Criterion for Discrete-Time LTI Feedback Systems
11.5 Gain and Phase
11.6 S
Problems
APPENDIX PARTIAL-FRACTION EXPANSION
BIBLIOGRAPHY
ANSWERS
INDEX
1.0 Introduction
1.1 Continuous-Time and Discrete-Time Signals
1.1.1 Examples and Mathematical Representation
1.1.2 Signal Energy and Power
1.2 Transformations of the Independent Variable
1.2.1 Examples of Transformations of the Independent Variable
1.2.2 Periodic Signals
1.2.3 Even and Odd Signals
1.3 Exponential and Sinusoidal Signals
1.3.1 Continuous-Time Complex Exponential and Sinusoidal Signals
1.3.2 Discrete-Time Complex Exponential and Sinusoidal Signals
1.3.3 Periodicity Properties of Discrete-Time Complex Exponentials
1.4 The Unit Impulse and Unit Step Functions
1.4.1 The Discrete-Time Unit Impulse and Unit Step Sequences
1.4.2 The Continuous-Time Unit Step and Unit Impulse Functions
1.5 Continuous-Time and Discrete-Time System
l.5.1 Simple Examples of Systems
1.5.2 Interconnections of Systems
1.6 Basic System Properties
1.6.1 Systems with and without Memory
1.6.2 Invertibility and Inverse Systems
1.6.3 Causality
1.6.4 Stability
1.6.5 Time Invariance
1.6.6 Linearity
1.7 Summary
Problems
LINEAR TIME-INVARIANT SYSTEMS
2.0 Introduction
2.1 Discrete-Time LTI Systems: The Convolution Sum
2.1.1 The Representation of Discrete-Time Signals in Terms of Impulses
2.1.2 The Discrete-Time Unit Impulse Response and the Convolution-Sum Representation of LTI Systems
2.2 Continunus-Time LTI Systems: The Convolution Integral
2.2.1 The Representation of Continuous-Time Signals in Terms of Impulses
2.2.2 The Continuous-Time Unit Impulse Response and the Convolution Integral Representation of LTI Systems
2.3 Properties of Linear Time-Invariant Systems
2.3.1 The Commutative Property
2.3.2 The Distributive Property
2.3.3 The Associative Property '
2.3.4 LTI Systems with and without Memory
2.3.5 Invenibility of LTI Systems
2.3.6 Cansality for LII Systems
2.3.7 Stability for LTI Systems
2.3.8 The Unit Step Response of an LTI System
2.4 Causal LTI Systems Described by Differential and Difference Equations
2.4.1 Linear Constant-Coefficient Differential Equations
2.4.2 Linear Constant-CoeHicient Difference Equations
2.4.3 Block Diagram Representations of First-Order Systems Described by Differential and Difference Equations
2.5 Singularity Functions
2.5.1 The Unit Impulse as an Idealized Short Pulse
2.5.2 Defining the Unit Impulse through Convolution
2.5.3 Unit Doublets and Other Singulanty Functions
2.6 Summary
Problems
3 FOURIER SERIES REPRESENTATION OF PERIODIC SIGNALS
3.0 Introduction
3.1 A Historieal Perspective
3.2 The Response of LTI Systems to Complex Exponentials
3.3 Fourier Series Representation of Continuous-Time Periodic Signals
3.3.1 Linear Combinations of Harmonically Related Complex Exponentials
3.3.2 Determination of the Fourier Series Representation of a Continuous-Time Periodic Signal
3.4 Convergence of the Fourier Series
3.5 Properties of Continuous-Time Fourier Series
3.5.1 Linearity
3.5.2 Time Shifting
3.5.3 Time Reversal
3.5.4 Time Scaling
3.5.5 Multiplication
3.5.6 Conjugation and Conjugate Symmetry
3.5.7 Parseval's Relation for Continuous-Time Periodic Signals
3.5.8 Summary of Propenies of the Continuous-Time Fourier Series
3.5.9 Examples
3.6 Fourier Series Representation of Discrete-Time Periodic Signals
3.6.1 Linear Combinations of Harmonically Related Complex Exponentials
3.6.2 Determination of the Fourier Series Representation of a Periodic Signal
3.7 Propedies of Discrete-Time Fourier Series
3.7.1 Multiplication
3.7.2 First Difference
3.7.3 Parseval's Relation for Discrete-Time Periodic Signals
3.7.4 Examples
3.8 Fourier Series and LTI Systems
3.9 Filtering
3.9.1 Frequency-Shaping Filters
3.9.2 Frequency-Selective Filters
3.10 Examples of Continuous-Time Filters Described by Differential Equations
3.10.1 A Simple RC Lowpass Filter
3.10.2 A Simple RC Highpass Filter
3.11 Examples of Discrete-Time Filters Described by Difference Equations
3.11.1 First-Order Recursive Discrete-Time Filters
3.11.2 Nonrecursive Discrete-Time Filters
3.12 Summary
Problems
4 THE CONTINUOUS-TIME FOURIER TRANSFORM
4.0 Introduction
4.1 Representation of Aperiodic Signals: The Continuous-Time Fourier Transform
4.1.1 Development of the Fourier Transform Representation of an Aperiodic Signal
4.1.2 Convergence of Fourier Transforms
4.1.3 Examples of Continuous-Time Fourier Transforms
4.2 The Fourier Tkansform for Periodic Signals
4.3 Properties of the Continuous-Time Fourier Transform
4.3.1 Linearity
4.3.2 Time Shifting
4.3.3 Conjugation and Conjugate Symmetry
4.3.4 Differentiation and Integration
4.3.5 Time and Frequency Scaling
4.3.6 Duality
4.3.7 Parseval's Relation
4.4 The Convolution Property
4.4.1 Examples
4.5 Ihe Multiplication Property
4.5.1 Frequency-Selective Filtering with Variable Center Frequency
4.6 Tables of Fourier Properties and of Basic Fourier Transform Pairs
4.7 Systems Characterized by Linear Constant-Coefficient Differential Equations
4.8 Summary
Problems
5 THE DISCRETE-TIME FOURIER TRANSFORM
5.0 Introduction
5.1 Representation of Aperiodic Signals: The Discrete-Time Fourier Transform
5.1.1 Development of the Discrete-Time Fourier Transform
5.1.2 Examples of Discrete-Time Fourier Transforms
5.1.3 Convergence Issues Associated with the Discrete-Time Fourier Transform
5.2 The Fourier Transform for Periodic Signals
5.3 Properties of the Discrete-Time Fourier Transform
5.3.1 Periodicity of the Discrete-Time Fourier Transform
5.3.2 Linearity of the Fourier Transform
5.3.3 Time Shifting and Frequency Shifting
5.3.4 Conjugation and Conjugate Symmetry
5.3.5 Differencing and Accumulation
5.3.6 Time Reversal
5.3.7 Time Expansion
5.3.8 Differentiation in Frequency
5.3.9 Parseval's Relation
5.4 The Convolution Property
5.4.1 Examples
5.5 The Multiplication Property
5.6 Tables of Fourier Iransform Properties and Basic Fourier Transform Pairs
5.7 Duality
5.7.1 Duality in the Discrete-Time Fourier Series
5.7.2 Duality between the Discrete-Time Fourier Transform and the Continuous-Time Fourier Series
S.8 Systems Characterized by Linear Constant-Coefficient Difference Equations
5.9 Summary
Problems
6 TIME AND FREQUENCY C OF SIGNALS AND SYSTEMS
6.0 Introduction
6.1 The Magnitude-phase Representation of the Fourier Transform
6.2 The Magnitude-Phase Representation of the Frequency R of LTI Systems
6.2.1 Linear and Nonlinear Phase
6.2.2 Group Delay
6.2.3 Log-Magnitude and Bode Plots
6. 3 Time-Domain Properties of Ideal Frequency-Selective Filters
6.4 Time-Domain and Frequency-Domain Aspects of Nonideal Filters
6. 5 First-Order and Second-Order Continuous-Time Systems
6.5.1 First-Order Continuous-Time Systems
6.5.2 Second-Order Continuous-Time Systems
6.5.3 Bode Plots for Rational Frequency Responses
6.6 First-Order and Second-Order Discrete-Time Systems
6.6.1 First-Order Discrete-Time Systems
6.6.2 Second-Order Discrete-Time Systems
6.1 Examples of Time-and Frequency-Domain Analysis of Systems
6.7.1 Analysis of an Automobile Suspension System
6.7.2 Examples of Discrete-Time Nonrecursive Filters
6.8 Summary
Problems
7 SAMPLING
7.0 Introduction
7.1 Representation of a Continuous-Time Signal by Its Samples: The Sampling Theorem
7. 1.1 Impulse-Train Sampling
7. 1.2 Sampling with a
7.2 Reconstruction of a Signal from Its Samplee Using Interpolation
7.3 The Effect of Undersampling: Aliasing
7.4 Discrete-Time
7.4.1 Digital Differentiator
7.4.2 Half-Sample Delay
7. 5 Sampling of Discrete-Time Signals
7.5.1 Impulse-Train Sampling
7.5.2 Discrete-Time Decimation and Interpolation
7.6 S
Problems
8 Co
8.0 Introduction
8.1 Complex
8.1.1 Amplitude Modulation with a Complex Exponential Carrier
8.1.2 Amplitude Modulation with a Sinusoidal Carrier
8.2 Demodulatiou for Sinusoidal AM
8.2.1 Synchronous Demodulation
8.2.2 Asynchronous Demodulation
8.3 Frequency-Division Multiplexing
8.4 Single-Sideband Sinusoidal Amplitude Modulation
8.5 Amplitude Modulation with a Pulse-Train Carrier
8.5.1 Modulation of a Pulse-Train Carrier
8.5.2 Time-Division Multiplexing
8.6 Pulse-Amplitude Modulation
8.6.1 Pulse-Amplitude Modulated Signals
8.6.2 Intersymbol Interference in PAM Systems
8.6.3 Digital Pulse-Amplitude and Pulse-Code Modulation
8.7 Sinusoidal Frequency Modulation
8.7.1 Narrowband Frequency Modulation
8.7.2 Wideband Frequency Modulation
8.7.3 Periodic Square-Wave Modulating Signal
8.8 Discrete-Time Medulation
8.8.1 Discrete-Time Sinusoidal Amplitude Modulation
8.8.2 Discrete-Time Transmodulation
8.9 S
Problems
9 THE LAPLACE TRANSFORM
9.0 Introduction
9.1 The Laplace Transform
9.2 The Region of Convergence for Laplace Transforms
9.3 The Inverse Laplace Transform
9.4 Geometric Evaluation of the Fourier Transform from the Pole-Zero Plot
9.4.1 First-Order Systems
9.4.2 Second-Order Systems
9.4.3 All-Pass Systems
9.5 Properties of the Laplace Transform
9.5.1 Linearity of the Laplace Transform
9.5.2 Time Shifting
9.5.3 Shifting in the s-Domain
9.5.4 Time Scaling
9.5.5 Conjugation
9.5.6 Convolution Property
9.5.7 Differentiation in the Time Domain
9.5.8 Differentiation in the s-Domain
9.5.9 Integration in the Time Domain
9.5.1O The Initial- and Final-Value Theorems
9.5.11 Table of Properties
9.6 Some Laplace Transform Pairs
9.7 Analysis and Characterization of LTI Systems Dsing the Laplace Transform
9.7.1 Causality
9.7.2 Stability
9.7.3 LTI Systems Characterized by Linear Constant-Coefficient Differential Equations
9.7.4 Examples Relating System Behavior to the System Function
9.7.5 Butterworth Filters
9.8 System Function Algebra and Block Representations
9.8.1 System Functions for Interconnections of LTI Systems
9.8.2 Block Diagram Representations for Causal LTI Systems Described by Differential Equations and Rational System Functions
9.9 The Unilateral Laplace Transform
9.9.1 Examples of Unilateral Laplace Transforms
9.9.2 Properties of the Unilateral Laplace Transform
9.9.3 Solving Differential Equations Using the Unilateral Laplace Transform
9.10 S
Problems
10 THE Z-TRANSFORM
10.0 Introduction
10.1 The z-Transform
10.2 The Region of Convergence for the z-Transform
10.3 The Inverse z-Transform
10.4 Geometric Evaluation of the Fourier Transform from the Pole-Zero Plot
10.1.1 First-Order Systems
10.4.2 Second-Order Systems
10.5 Properties of the z-Transform
10.5.1 Linearity
10.5.2 Time Shifting
10.5.3 Scaling in the z-Domain
10.5.4 Time Reversal
10.5.5 Time Expansion
10.5.6 Conjugation
10.5.7 The Convolution Property
10.5.8 Differentiation in the z-Domain
10.5.9 Ihe Initial-Value Theorem
10.5.10 S
10.6 Some Common z-Transform Pairs
10.1 Analysis and Characterization of LTI Systems Using z-Transforms
10.7.1 Causality
10.7.2 Stability
10.7.3 LTI Systems Characterized by Linear Constant-Coefficient Difference Equations
10.7.4 Examples Relating System Behavior to the System Function
10.8 System Function Algebra and Block Diagram Representations
10.8.1 System Functions for Interconnections of LTI Systems
10.8.2 Block Diagram Representations for Causal LTI Systems Described by Difference Equations and Rational System Functions
10.9 The Unilateral z-Transform
10.9.1 Examples of Unilateral z-Transforms and Inverse Transforms
10.9.2 Properties of the Unilateral z-Transform
10.9.3 Solving Difference Equations Using the Unilateral z-Transform
10.10 S
Problems
11 LINEAR FEEDBACK SYSTEMS
11.0 Introduction
11.1 Linear Feedback Systems
11.2 Some Applications and Consequences of Feedback
11.2.1 Inverse System Design
11.2.2 Compensation for Nonideal Elements
11.2.3 Stabilization of Unstable Systems
11.2.4 Sampled-Data Feedback Systems
11.2.5 Tracking System
11.2.6 Destabilization Caused by Feedback
11.3 Root-Loeus Analysls of Linear Feedbaek Systems
11.3.1 An Introductory Example
11.3.2 Equation for the Closed-Loop Poles
11.3.3 The End Points of the Root Locus: The Closed-Loop Poles for K=O and |K|= +
11.3.4 The Angle Criterion
11.3.5 Properties of the Root Locus
11.4 The Nyquist Stability Criterion
11.4.1 The Encirclement Property
11.4.2 The Nyquist Criterion for Continuous-Time LTI Feedback Systems
11.4.3 The Nyquist Criterion for Discrete-Time LTI Feedback Systems
11.5 Gain and Phase
11.6 S
Problems
APPENDIX PARTIAL-FRACTION EXPANSION
BIBLIOGRAPHY
ANSWERS
INDEX
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