ABSTRACT

Signal processing is a broad and timeless area. The term "signal" includes audio, video, speech, image, communication, geophysical, sonar, radar, medical, and more. Signal processing applies to the theory and application of filtering, coding, transmitting, estimating, detecting, analyzing, recognizing, synthesizing, recording, and reproducing signals.
Handbook of Formulas and Tables for Signal Processing a must-have reference for all engineering professionals involved in signal and image processing. Collecting the most useful formulas and tables - such as integral tables, formulas of algebra, formulas of trigonometry - the text includes:

  • Material for the deterministic and statistical signal processing areas
  • Examples explaining the use of the given formula
  • Numerous definitions
  • Many figures that have been added to special chapters
    Handbook of Formulas and Tables for Signal Processing brings together - in one textbook - all the equations necessary for signal and image processing for professionals transforming anything from a physical to a manipulated form, creating a new standard for any person starting a future in the broad, extensive area of research.
  • chapter 1

    Fourier Series

    chapter 2

    Laplace Transforms

    chapter 3

    Fourier Transform

    chapter 6

    The Z-Transform

    chapter 7

    Windows

    chapter 8

    Two-Dimensional Z-Transform

    chapter 9

    Analytical Methods

    chapter 11

    Discrete Fourier Transform

    chapter 12

    Analog Filter Approximations

    chapter 13

    Sine and Cosine Transforms

    chapter 14

    The Hartley Transform

    chapter 15

    The Hilbert Transform

    chapter 16

    The Radon and Abel Transform

    chapter 17

    The Hankel Transform

    chapter 18

    The Mellin Transform

    chapter 21

    Legendre Polynomials

    chapter 22

    Hermite Polynomials

    chapter 23

    Laguerre Polynomials

    chapter 24

    Chebyshev Polynomials

    chapter 25

    Bessel Functions

    chapter 26

    Zernike Polynomials

    chapter 27

    Special Functions

    chapter 28

    Asymptotic Expansions

    chapter 29

    Nonrecursive Filters

    (Finite Impulse Response, Fir)

    chapter 30

    Recursive Filters

    (Infinite Impulse Response, IIR)

    chapter 32

    Statistics

    chapter 33

    Matrices

    chapter 37

    Adaptive Filters

    chapter 41

    Nonlinear Digital Filtering

    chapter 42

    Wavelet Transform

    chapter 44

    Algebra

    chapter 45

    Calculus