Title	Commutative Harmonic Analysis III [electronic resource] : Generalized Functions. Application / edited by V. P. Havin, N. K. Nikol'skij
Imprint	Berlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer, 1995
Connect to	http://dx.doi.org/10.1007/978-3-642-57854-0
Descript	VII, 268 p. online resource

This EMS volume shows the great power provided by modern harmonic analysis, not only in mathematics, but also in mathematical physics and engineering. Aimed at a reader who has learned the principles of harmonic analysis, this book is intended to provide a variety of perspectives on this important classical subject. The authors have written an outstanding book which distinguishes itself by the authors' excellent expository style. It can be useful for the expert in one area of harmonic analysis who wishes to obtain broader knowledge of other aspects of the subject and also by graduate students in other areas of mathematics who wish a general but rigorous introduction to the subject

I. Distributions and Harmonic Analysis -- II. Optical and Acoustic Fourier Processors -- III. The Uncertainty Principle in Harmonic Analysis

1. Mathematics
2. Topological groups
3. Lie groups
4. Mathematical analysis
5. Analysis (Mathematics)
6. Physics
7. Acoustics
8. Mathematics
9. Topological Groups
10. Lie Groups
11. Analysis
12. Mathematical Methods in Physics
13. Numerical and Computational Physics
14. Acoustics