Non-Commutative Harmonic Analysis
- ISBN-10
- 0991326601
- ISBN-13
- 9780991326600
- Series
- Non-Commutative Harmonic Analysis
- Category
- Fourier analysis
- Pages
- 529
- Language
- English
- Published
- 2014-07-06
- Authors
- Gestur Ólafsson, Raymond C. Fabec
Description
This is a graduate text on harmonic analysis. It begins with a chapter on Fourier series. The next two chapters are spent covering function theory on real spaces and the classical Fourier transform. Following this is a chapter covering the Paley-Wiener Theorem, distributions, convolution, the Sobolev Lemma, the Shannon Sampling Theorem, windowed and wavelet transforms, and the Poisson summation formula. The later chapters deal with non-commutative theory. Topics include abstract homogeneous spaces and fundamentals of representation theory. These are used in the last two chapters. The first covers the Heisenberg group which encode the Heisenberg uncertainty principle. This is first instance of the use of infinite dimensional representations. The last covers the basic theory of compact groups. Here finite dimensionality is sufficient. Spherical functions and Gelfand pairs are discussed. There is also a section on finite groups. The text is interspersed with over 50 exercise sets that range in difficulty from basic to challenging. The text should be useful to graduate students in mathematics, physics, and engineering.
Get the book
Other editions
-
- 2006-11-15
- 249 pages
- Ebook
- Springer
-
- 2006-11-15
- 244 pages
- Ebook
- Springer
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