This monograph gives access to the theory of continuous linear representations of general real Lie groups to readers who are already familiar with the rudiments of functional analysis and Lie groups. The first half of the book is centered around the relation between a continuous linear representation (of a Lie group over a Banach space or even a more general space) and its tangent; the latter is a Lie algebra representation in a sense. Starting with the Hille-Yosida theory, quite recent results are reached. The second half is more standard unitary theory with applications concerning the Galilean and Poincaré groups. Appendices help readers with diverse backgrounds to find the precise descriptions of the concepts needed from earlier literature. Each chapter includes exercises.
Author(s): Leopoldo Nachbin (Eds.)
Series: North-Holland Mathematics Studies 168
Publisher: Elsevier Science Ltd
Year: 1992
Language: English
Pages: ii-vi, 1-301
Content:
Editor
Page ii
Copyright page
Page iv
Preface
Pages v-vi
Zoltán Magyar
0. Introduction
Pages 1-2
1. The Hille-Yosida Theory
Pages 3-23
2. Convolution and Regularization
Pages 25-37
3. Smooth Vectors
Pages 39-72
4. Analytic Mollifying
Pages 73-89
5. The Integrability Problem
Pages 91-111
6. Compact Groups
Pages 113-138
7. Commutative Groups
Pages 139-154
8. Induced Representations
Pages 155-170
9. Projective Representations
Pages 171-188
10. The Galilean and Poincaré Groups
Pages 189-205
Appendix
Pages 206-281
References
Pages 283-290
Index of Notation
Pages 291-292
Index
Pages 293-301
