The representation theory of locally compact groups has been vig orously developed in the past twenty-five years or so; of the various branches of this theory, one of the most attractive (and formidable) is the representation theory of semi-simple Lie groups which, to a great extent, is the creation of a single man: Harish-Chandra. The chief objective of the present volume and its immediate successor is to provide a reasonably self-contained introduction to Harish-Chandra's theory. Granting cer tain basic prerequisites (cf. infra), we have made an effort to give full details and complete proofs of the theorems on which the theory rests. The structure of this volume and its successor is as follows. Each book is divided into chapters; each chapter is divided into sections; each section into numbers. We then use the decimal system of reference; for example, 1. 3. 2 refers to the second number in the third section of the first chapter. Theorems, Propositions, Lemmas, and Corollaries are listed consecutively throughout any given number. Numbers which are set in fine print may be omitted at a first reading. There are a variety of Exam ples scattered throughout the text; the reader, if he is so inclined, can view them as exercises ad libitum. The Appendices to the text collect certain ancillary results which will be used on and off in the systematic exposi tion; a reference of the form A2. Read more...
Abstract:
The representation theory of locally compact groups has been vig- orously developed in the past twenty-five years or so; of the various branches of this theory, one of the most attractive (and formidable) is the representation theory of semi-simple Lie groups which, to a great extent, is the creation of a single man: Harish-Chandra. Read more...
Author(s): Warner, Garth (ed.)
Series: Grundlehren der mathematischen Wissenschaften in Einzeldarstellungen mit besonderer Berücksichtigung der Anwendungsgebiete 188.; Grundlehren der mathematischen Wissenschaften in Einzeldarstellungen mit besonderer Berücksichtigung der Anwendungsgebiete 189
Publisher: Springer
Year: 1972
Language: English
Pages: 501
Tags: Análisis armónico.;Grupos de Lie.;Matemáticas.
Content: Volumen 1. 1 The Structure of Real Semi-Simple Lie Groups. --
1.1 Preliminaries. --
1.2 The Bruhat Decomposition. --
Parabolic Subgroups. --
1.3 Cartan Subalgebras. --
1.4 Cartan Subgroups. --
2 The Universal Enveloping Algebra of a Semi-Simple Lie Algebra. --
2.1 Invariant Theory I. --
Generalities. --
2.2 Invariant Theory II. --
Applications to Reductive Lie Algebras. --
2.3 On the Structure of the Universal Enveloping Algebra. --
2.4 Representations of a Reductive Lie Algebra. --
2.5 Representations on Cohomology Groups. --
3 Finite Dimensional Representations of a Semi-Simple Lie Group. --
3.1 Holomorphic Representations of a Complex Semi-Simple Lie Group. --
3.2 Unitary Representations of a Compact Semi-Simple Lie Group. --
3.3 Finite Dimensional Class One Representations of a Real Semi-Simple Lie Group. --
4 Infinite Dimensional Group Representation Theory. --
4.1 Representations on a Locally Convex Space. --
4.2 Representations on a Banach Space. --
4.3 Representations on a Hubert Space. --
4.3.1 Generalities. --
4.3.2 Examples. --
4.4 Differentiable Vectors, Analytic Vectors. --
4.5 Large Compact Subgroups. --
5 Induced Representations. --
5.1 Unitarily Induced Representations. --
5.2 Quasi-Invariant Distributions. --
5.3 Irreducibility of Unitarily Induced Representations. --
5.4 Systems of Imprimitivity. --
5.5 Applications to Semi-Simple Lie Groups. --
Appendices. --
1 Quasi-Invariant Measures. --
2 Distributions on a Manifold. --
2.1 Differential Operators and Function Spaces. --
2.2 Tensor Products of Topological Vector Spaces. --
2.3 Vector Distributions. --
2.4 Distributions on a Lie Group. --
General Notational Conventions. --
List of Notations. --
Guide to the Literature. Volumen 2. 6 Spherical Functions. --
The General Theory. --
6.1 Fundamentals. --
6.2 Examples. --
7 Topology on the Dual Plancherel Measure Introduction. --
7.1 Topology on the Dual. --
7.2 Plancherel Measure. --
8 Analysis on a Semi-Simple Lie Group. --
8.1 Preliminaries. --
8.2 Differential Operators on Reductive Lie Groups and Algebras. --
8.3 Central Eigendistributions on Reductive Lie Algebras and Groups. --
8.4 The Invariant Integral on a Reductive Lie Algebra. --
8.5 The Invariant Integral on a Reductive Lie Group. --
9 Spherical Functions on a Semi-Simple Lie Group. --
9.1 Asymptotic Behavior of?-Spherical Functions on a Semi-Simple Lie Group. --
9.2 Zonal Spherical Functions on a Semi-Simple Lie Group. --
9.3 Spherical Functions and Differential Equations. --
10 The Discrete Series for a Semi-Simple Lie Group. --
Existence and Exhaustion. --
10.1 The Role of the Distributions?? in the Harmonic Analysis on G. --
10.2 Theory of the Discrete Series. --
Epilogue. --
Append. --
3 Some Results on Differential Equations. --
3.1 The Main Theorems. --
3.2 Lemmas from Analysis. --
3.3 Analytic Continuation of Solutions. --
3.4 Decent Convergence. --
3.5 Normal Sequences of is-Polynomials. --
General Notational Conventions. --
List of Notations. --
Guide to the Literature. --
Subject Index to Volumes I and II.
