Understanding Digital Signal Processing
Published on 3. January 1997
Book
Hardback
544 pages
978-0-201-63467-9 (ISBN)
Description
Understanding Digital Signal Processing presents both the theory and application of DSP in an approachable manner, using graphical examples and clear explanations. The book illustrates the techniques using practical examples and provides a comprehensive discussion of the important topics of periodic sampling and discrete Fourier transforms.
More details
Language
English
Place of publication
Harlow
United Kingdom
Publishing group
Pearson Education Limited
Target group
College/higher education
Dimensions
Width: 241 mm
Thickness: 34 mm
Weight
946 gr
ISBN-13
978-0-201-63467-9 (9780201634679)
Copyright in bibliographic data is held by Nielsen Book Services Limited or its licensors: all rights reserved.
Schweitzer Classification
Other editions
New editions
Richard G. Lyons
Understanding Digital Signal Processing
Book
04/2004
2nd Edition
Prentice Hall
€69.32
Article exhausted; check for reprint
Person
Richard G. Lyons is a Systems Engineer with the Systems Integration Group at TRW, Inc. He has been involved with the design and testing of digital signal processing systems for the past fifteen years. He is the author of numerous articles on the topic and is a member of the IEEE and Eta Kappa Nu, the electrical engineering honor society.
0201634678AB04062001
0201634678AB04062001
Content
Preface.
1. Discrete Sequences and Systems.
Discrete Sequences and Their Notation. Signal Amplitude, Magnitude, Power. Signal Processing Operational Symbols. Introduction to Discrete Linear Time-Invariant Systems. Discrete Linear Systems. Time-Invariant Systems. The Commutative Property of Linear Time-Invariant Systems. Analyzing Linear Time-Invariant Systems.
2. Periodic Sampling.
Aliasing: Signal Ambiquity in the Frequency Domain. Sampling Low-Pass Signals. Sampling Bandpass Signals. Spectral Inversion in Bandpass Sampling.
3. The Discrete Fourier Transform.
Understanding the DFT Equation. DFT Symmetry. DFT Linearity. DFT Magnitudes. DFT Frequency Axis. DFT Shifting Theorem. Inverse DFT. DFT Leakage. Windows. DFT Scalloping Loss. DFT Resolution, Zero Stuffing, and Frequency-Domain Sampling. DFT Processing Gain. The DFT of Rectangular Functions. The DFT Frequency Response to a Complex Input. The DFT Frequency Response to a Real Cosine Input. The DFT Single-Bin Frequency Response to a Real Cosine Input.
4. The Fast Fourier Transform.
Relationship of the FFT to the DFT. Hints on Using FFTs in Practice. FFT Software Programs. Derivation of the Radix-2 FFT Algorithm. FFT Input/Output Data Index Bit Reversal. Radix-2 FFT Butterfly Structures.
5. Finite Impulse Response Filters.
An Introduction to Finite Impulse Response FIR Filters. Convolution in FIR Filters. Low-Pass FIR Filter Design. Bandpass FIR Filter Design. Highpass FIR Filter Design. Remez Exchange FIR Filter Design Method. Half-Band FIR Filters. Phase Response of FIR Filters. A Generic Description of Discrete Convolution.
6. Infinite Impulse Response Filters.
An Introduction to Infinite Impulse Response Filters. The Laplace Transform. The z-Transform. Impulse Invariance IIR Filter Design Method. Bilinear Transform IIR Filter Design Method. Optimized IIR Filter Design Method. Pitfalls in Building IIR Digital Filters. Cascade and Parallel Combinations of Digital Filters. A Brief Comparison of IIR and FIR Filters.
7. Advanced Sampling Techniques.
Quadrature Sampling. Quadrature Sampling with Digital Mixing. Digital Resampling.
8. Signal Averaging.
Coherent Averaging. Incoherent Averaging. Averaging Multiple Fast Fourier Transforms. Filtering Aspects of Time-Domain Averaging. Exponential Averaging.
9. Digital Data Formats and Their Effects.
Fixed-Point Binary Formats. Binary Number Precision and Dynamic Range. Effects of Finite Fixed-Point Binary Word Length. Floating-Point Binary Formats. Block Floating-Point Binary Format.
10. Digital Signal Processing Tricks.
Frequency Translation without Multiplication. High-Speed Vector-Magnitude Approximation. Data Windowing Tricks. Fast Multiplication of Complex Numbers. Efficiently Performing the FFT of Real Sequences. Calculating the Inverse FFT Using the Forward FFT. Fast FFT Averaging. Simplified FIR Filter Structure. Accurate A/D Converter Testing Technique. Fast FIR Filtering Using the FFT. Calculation of Sines and Cosines of Consecutive Angles. Generating Normally Distributed Random Data.
Appendix A: The Arithmetic of Complex Numbers.
Graphical Representation of Real and Complex Numbers. Arithmetic Representation of Complex Numbers. Arithmetic Operations of Complex Numbers. Some Practical Implications of Using Complex Numbers.
Appendix B: Closed Form of a Geometric Series.
Appendix C: Complex Signals and Negative Frequency.
Development of Imaginary Numbers. Representing Real Signals Using Complex Phasors. Representing Real Signals Using Negative Frequencies. Complex Signals and Quadrature Mixing.
Appendix D: Mean, Variance, and Standard Deviation Statistical Measures.
Standard Deviation, or RMS, of a Continuous Sinewave. The Mean and Variance of Random Functions. The Normal Probability Density Function.
E. Decibels (dB and dBm.)
Using Logarithms to Determine Relative Signal Power. Some Useful Decibel Numbers. Absolute Power Using Decibels.
F. Digital Filter Terminology.
Index.
1. Discrete Sequences and Systems.
Discrete Sequences and Their Notation. Signal Amplitude, Magnitude, Power. Signal Processing Operational Symbols. Introduction to Discrete Linear Time-Invariant Systems. Discrete Linear Systems. Time-Invariant Systems. The Commutative Property of Linear Time-Invariant Systems. Analyzing Linear Time-Invariant Systems.
2. Periodic Sampling.
Aliasing: Signal Ambiquity in the Frequency Domain. Sampling Low-Pass Signals. Sampling Bandpass Signals. Spectral Inversion in Bandpass Sampling.
3. The Discrete Fourier Transform.
Understanding the DFT Equation. DFT Symmetry. DFT Linearity. DFT Magnitudes. DFT Frequency Axis. DFT Shifting Theorem. Inverse DFT. DFT Leakage. Windows. DFT Scalloping Loss. DFT Resolution, Zero Stuffing, and Frequency-Domain Sampling. DFT Processing Gain. The DFT of Rectangular Functions. The DFT Frequency Response to a Complex Input. The DFT Frequency Response to a Real Cosine Input. The DFT Single-Bin Frequency Response to a Real Cosine Input.
4. The Fast Fourier Transform.
Relationship of the FFT to the DFT. Hints on Using FFTs in Practice. FFT Software Programs. Derivation of the Radix-2 FFT Algorithm. FFT Input/Output Data Index Bit Reversal. Radix-2 FFT Butterfly Structures.
5. Finite Impulse Response Filters.
An Introduction to Finite Impulse Response FIR Filters. Convolution in FIR Filters. Low-Pass FIR Filter Design. Bandpass FIR Filter Design. Highpass FIR Filter Design. Remez Exchange FIR Filter Design Method. Half-Band FIR Filters. Phase Response of FIR Filters. A Generic Description of Discrete Convolution.
6. Infinite Impulse Response Filters.
An Introduction to Infinite Impulse Response Filters. The Laplace Transform. The z-Transform. Impulse Invariance IIR Filter Design Method. Bilinear Transform IIR Filter Design Method. Optimized IIR Filter Design Method. Pitfalls in Building IIR Digital Filters. Cascade and Parallel Combinations of Digital Filters. A Brief Comparison of IIR and FIR Filters.
7. Advanced Sampling Techniques.
Quadrature Sampling. Quadrature Sampling with Digital Mixing. Digital Resampling.
8. Signal Averaging.
Coherent Averaging. Incoherent Averaging. Averaging Multiple Fast Fourier Transforms. Filtering Aspects of Time-Domain Averaging. Exponential Averaging.
9. Digital Data Formats and Their Effects.
Fixed-Point Binary Formats. Binary Number Precision and Dynamic Range. Effects of Finite Fixed-Point Binary Word Length. Floating-Point Binary Formats. Block Floating-Point Binary Format.
10. Digital Signal Processing Tricks.
Frequency Translation without Multiplication. High-Speed Vector-Magnitude Approximation. Data Windowing Tricks. Fast Multiplication of Complex Numbers. Efficiently Performing the FFT of Real Sequences. Calculating the Inverse FFT Using the Forward FFT. Fast FFT Averaging. Simplified FIR Filter Structure. Accurate A/D Converter Testing Technique. Fast FIR Filtering Using the FFT. Calculation of Sines and Cosines of Consecutive Angles. Generating Normally Distributed Random Data.
Appendix A: The Arithmetic of Complex Numbers.
Graphical Representation of Real and Complex Numbers. Arithmetic Representation of Complex Numbers. Arithmetic Operations of Complex Numbers. Some Practical Implications of Using Complex Numbers.
Appendix B: Closed Form of a Geometric Series.
Appendix C: Complex Signals and Negative Frequency.
Development of Imaginary Numbers. Representing Real Signals Using Complex Phasors. Representing Real Signals Using Negative Frequencies. Complex Signals and Quadrature Mixing.
Appendix D: Mean, Variance, and Standard Deviation Statistical Measures.
Standard Deviation, or RMS, of a Continuous Sinewave. The Mean and Variance of Random Functions. The Normal Probability Density Function.
E. Decibels (dB and dBm.)
Using Logarithms to Determine Relative Signal Power. Some Useful Decibel Numbers. Absolute Power Using Decibels.
F. Digital Filter Terminology.
Index.