Harmonic Analysis on Semi-Simple Lie Gro
β Garth Warner (auth.)
π Library
π
1972
π Springer-Verlag Berlin Heidelberg
π English
β¦ LIBER β¦
π
Harmonic analysis on semi-simple Lie groups II
β Scribed by Warner, Garth (ed.)
- Publisher
- Springer
- Year
- 1972
- Tongue
- English
- Leaves
- 501
- Series
- Grundlehren der mathematischen Wissenschaften in Einzeldarstellungen mit besonderer BeruΜcksichtigung der Anwendungsgebiete 188.; Grundlehren der mathematischen Wissenschaften in Einzeldarstellungen mit besonderer BeruΜcksichtigung der Anwendungsgebiete 189
- Category
- Library
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β¦ Synopsis
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 Β 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 Β Read more...
β¦ Table of Contents
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.
β¦ Subjects
AnaΜlisis armoΜnico.;Grupos de Lie.;MatemaΜticas.
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