Fourier analysis
著者
書誌事項
Fourier analysis
Oxford University Press, 1988
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注記
Bibliography: p. 426-430
Includes index
内容説明・目次
内容説明
Fourier analysis is a mathematical technique for decomposing a signal into identifiable components. It is used in the study of all types of waves. This book explains the basic mathematical theory and some of the principal applications of Fourier analysis, in areas ranging from sound and vibration to optics and CAT scanning. The author provides in-depth coverage of the techniques and includes exercises that range from straightforward applications of formulas to
more complex collections of problems. The text will be a valuable guide for courses in electrical engineering, applied mathematics, and signal processing.
目次
- Introduction to Fourier Series
- Convergence of Fourier Series
- Applications of Fourier Series
- Some harmonic function theory
- Multiple Fourier Series
- Basic theory of the Fourier transform
- Applications of Fourier transforms: 1) Partial differential equations
- 2) Fourier optics
- Legendre polynomials and spherical harmonics
- Some other transforms: 1) The Laplace transform
- 2) The Radon transform
- A brief introduction to Bessel functions: A) Divergence of Fourier Series
- B) Brief tables of Fourier Series and integrals.
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