Pseudo-Differential Operators and Symmetries: Background Analysis and Advanced Topics

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This monograph develops a global quantization theory of pseudo-differential operators on compact Lie groups.

Traditionally, the theory of pseudo-differential operators was introduced in the Euclidean setting with the aim of tackling a number of important problems in analysis and in the theory of partial differential equations. This also yields a local theory of pseudo-differential operators on manifolds. The present book takes a different approach by using global symmetries of the space which are often available. First, a particular attention is paid to the theory of periodic operators, which are realized in the form of pseudo-differential and Fourier integral operators on the torus. Then, the cases of the unitary group SU(2) and the 3-sphere are analyzed in extensive detail. Finally, the monograph also develops elements of the theory of pseudo-differential operators on general compact Lie groups and homogeneous spaces.

The exposition of the book is self-contained and provides the reader with the background material surrounding the theory and needed for working with pseudo-differential operators in different settings. The background section of the book may be used for independent learning of different aspects of analysis and is complemented by numerous examples and exercises.

Author(s): Michael Ruzhansky, Ville Turunen
Edition: 1
Publisher: Birkhäuser Basel
Year: 2009

Language: English
Pages: 712

3764385138......Page 1
Pseudo-Differential Operators and Symmetries: Background Analysis and Advanced Topics......Page 3
Preface......Page 13
Contents......Page 6
Introduction......Page 15
Part I Foundations of Analysis......Page 21
A Sets, Topology and Metrics......Page 22
B Elementary Functional Analysis......Page 92
C Measure Theory and Integration......Page 127
D Algebras......Page 202
Part II Commutative Symmetries......Page 230
1 Fourier Analysis on Rn......Page 232
2 Pseudo-differential Operators on Rn......Page 270
3 Periodic and Discrete Analysis......Page 308
4 Pseudo-differential Operators on Tn......Page 343
5 Commutator Characterisation of Pseudo-differential Operators......Page 423
Part III Representation Theory of Compact Groups......Page 437
6 Groups......Page 438
7 Topological Groups......Page 454
8 Linear Lie Groups......Page 499
9 Hopf Algebras......Page 522
Part IV Non-commutative Symmetries......Page 534
10 Pseudo-differential Operators on Compact Lie Groups......Page 536
11 Fourier Analysis on SU(2)......Page 601
12 Pseudo-differential Operators on SU(2)......Page 637
13 Pseudo-differential Operators on Homogeneous Spaces......Page 672
Bibliography......Page 687
Notation......Page 696
Index......Page 700