Real reductive groups

Real Reductive Groups I is an introduction to the representation theory of real reductive groups. It is based on courses that the author has given at Rutgers for the past 15 years. It also had its genesis in an attempt of the author to complete a manuscript of the lectures that he gave at the CBMS regional conference at The University of North Carolina at Chapel Hill in June of 1981. This book comprises 10 chapters and begins with some background material as an introduction. The following chapters then discuss elementary representation theory; real reductive groups; the basic theory of (g, K)-modules; the asymptotic behavior of matrix coefficients; The Langlands Classification; a construction of the fundamental series; cusp forms on G; character theory; and unitary representations and (g, K)-cohomology. This book will be of interest to mathematicians and statisticians.

Preface IntroductionChapter 0. Background Material Introduction 0.1 Invariant measures on homogeneous spaces 0.2 The structure of reductive Lie algebras 0.3 The structure of compact Lie groups 0.4 The universal enveloping algebra of a Lie algebra 0.5. Some basic representation theory 0.6 Modules over the universal enveloping algebraChapter 1. Elementary Representation Theory Introduction 1.1. General properties of representations 1.2. Schur's lemma 1.3. Square integrable representations 1.4. Basic representation theory of compact 9 groups 1.5. A class of induced representations 1.6. C" vectors and analytic vectors 1.7. Representations of compact Lie groups 1.8. Further results and commentsChapter 2. Real Reductive Groups Introduction 2.1. The definition of a real reductive group 2.2. Parabolic pairs 2.3. Cartan subgroups 2.4. Integration formulas 2.5. The Weyl character formula 2.A. Appendices to Chapter 2 2.A.1. Some linear algebra 2.A.2. Norms on real reductive groupsChapter 3. The Basic Theory of (g, K)-Modules Introduction 3.1. The Chevalley restriction theorem 3.2. The Harish-Chandra isomorphism of the center of the universal enveloping algebra 3.3. (g, K)-modules 3.4. A basic theorem of Harish-Chandra 3.5. The subquotient theorem 3.6. The spherical principal series 3.7. A Lemma of Osborne 3.8. The subrepresentation theorem 3.9. Notes and further results 3.A. Appendices to Chapter 3 3.A.1. Some associative algebra 3.A.2. A Lemma of Harish-ChandraChapter 4. The Asymptotic Behavior of Matrix Coefficients Introduction 4.1 The Jacquet module of an admissible (g, K)-module 4.2 Three applications of the Jacquet module 4.3 Asymptotic behavior of matrix coefficients 4.4 Asymptotic expansions of matrix coefficients 4.5. Harish-Chandra's E-function 4.6. Notes and further results 4.A. Appendices to Chapter 4 4.A.1. Asymptotic expansions 4.A.2. Some inequalitiesChapter 5. The Langlands Classification Introduction 5.1. Tempered (g, K)-modules 5.2. The principal series 5.3. The intertwining integrals 5.4. The Langlands classification 5.5. Some applications of the classification 5.6. SL(2,R) 5.7. SL(2,C) 5.8. Notes and further results 5.A. Appendices to Chapter 5 5.A.1. A Lemma of Langlands 5.A.2. An a priori estimate 5.A.3. Square integrability and the polar decompositionChapter 6. A Construction of the Fundamental Series Introduction 6.1 Relative Lie algebra cohomology 6.2 A construction of (f, K)-modules 6.3 The Zuckerman functors 6.4 Some vanishing theorems 6.5 Blattner type formulas 6.6 Irreducibility 6.7 Unitarizability 6.8 Temperedness and square integrability 6.9 The case of disconnected G 6.10 Notes and further results 6.A Appendices to Chapter 6 6.A.1 Some homological algebra 6.A.2 Partition functions 6.A.3 Tensor products with finite dimensional representations 6.A.4 Infinitesimally unitary modulesChapter 7. Cusp Forms on G Introduction 7.1. Some Frechet spaces of functions on G 7.2. The Harish-Chandra transform 7.3. Orbital integrals on a reductive Lie algebra 7.4 Orbital integral on a reductive Lie group 7.5 The orbital integrals of cusp forms 7.6 Harmonic analysis on the space of cusp forms 7.7 Square integrable representations revisited 7.8 Notes and further results 7.A Appendices to Chapter 7 7.A.1 Some linear algebra 7.A.2 Radial components on the Lie algebra 7.A.3 Radial components on the Lie group 7.A.4 Some harmonic analysis on Tori 7.A.5 Fundamental solutions of certain differential operatorsChapter 8. Character Theory Introduction 8.1 The character of an admissible representation 8.2 The K-character of a (g, K)-module 8.3 Harish-Chandra's regularity theorem on the Lie algebra 8.4 Harish-Chandra's regularity theorem on the Lie group 8.5 Tempered invariant Z(g)-finite distributions on G 8.6. Harish-Chandra's basic inequality 8.7. The completeness of the p 8.A. Appendices to Chapter 8 8.A.1 Trace class operators 8.A.2. Some operations on distributions 8.A.3. The radial component revisited 8.A.4. The orbit structure on a real reductive Lie algebra 8.A.5. Some technical results for Harish-Chandra's regularity theoremChapter 9. Unitary Representations and (g, K)-Cohomology Introduction 9.1. Tensor products of finite dimensional representations 9.2. Spinors 9.3. The Dirac operator 9.4. (g, K)-cohomology 9.5. Some results of Kumaresan, Parthasarathy, Vogan, Zuckerman 9.6. -cohomology 9.7. A theorem of Vogan-Zuckerman 9.8. Further results 9.A. Appendices to Chapter 9 9.A.1. Weyl groups 9.A.2. Spectral sequencesBibliographyIndex

This book is the sequel to "Real Reductive Groups I", and emphasizes the more analytical aspects of representation theory, while still retaining its focus on the interaction between algebra, analysis and geometry, like the first volume. It provides a self-contained introduction to abstract representation theory, covering locally compact groups, C- algebras, Von Neuman algebras, direct integral decompositions. In addition, it contains a proof of Harish-Chandra's plancherel theorem. Together, the two volumes comprise a complete introduction to representation theory. Both volumes are based on courses and lectures given by the author over the last 20 years. They are intended for research mathematicians and graduate-level students taking courses in representation theory and mathematical physics.

• Intertwining operators
• completions of admissible (g,K)-modules
• the theory of the leading term
• the Harish-Chandra plancherel theorem
• abstract representation theory
• the Whittaker plancherel theorem.