Verfügbarkeit: Non-Abelian harmonic analysis | Technische Universität München

Non-Abelian harmonic analysis: applications of SL (2,R)

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Bibliographische Detailangaben
Beteiligte Personen:	Howe, Roger 1945- (VerfasserIn), Tan, Eng C. (VerfasserIn)
Format:	Buch
Sprache:	Englisch
Veröffentlicht:	New York u.a. Springer 1992
Schriftenreihe:	Universitext
Schlagwörter:	Analyse harmonique Représentations de groupes Harmonic analysis Representations of groups Darstellung > Mathematik Harmonische Analyse Unimodulare Gruppe Darstellungstheorie Lineare Gruppe
Links:	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=003496686&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
Umfang:	XV, 257 S. graph. Darst.
ISBN:	0387977686 3540977686

Internformat

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adam_text	Contents Preface vii Notations xi I Preliminaries 1. Lie Groups and Lie Algebras 1 1.1. Basic Structure 1 1.2. Representations of Lie Groups 9 1.3. Representations of Lie Algebras 20 2. Theory of Fourier Transform 27 2.1. Distributions 27 2.2. Fourier Transform 33 3. Spectral Analysis for Representations of R™ 37 Exercises 41 II Representations of the Lie Algebra of SL(2,R) 1. Standard Modules and the Structure of sl(2) Modules 52 1.1. Indecomposable Modules 52 1.2. Standard Modules 60 1.3. Structure Theorem 64 2. Tensor Products 69 2.1. Tensor Product of Two Lowest Weight Modules 69 2.2. Formal Vectors 72 2.3. Tensor Product Vx ® % 73 3. Formal Eigenvectors 77 3.1. Action of Other Bases of «I(2) 77 3.2. Formal e+ Null Vectors in (Vx ® %)~ 80 3.3. Formal h Eigenvectors in U{y+,v~)~ 81 3.4. Some Modules in U{v+, i/ )~ 84 Exercises 88 xiii xiv Contents III Unitary Representations of the Universal Cover of SL(2, R) 1. Infinitesimal Classification 93 1.1. Unitarizability of Standard Modules 93 1.2. A Realization of U(u+, u~) 96 1.3. Unitary Dual of SL(2, E) 99 2. Oscillator Representation 102 2.1. Theory of Hermite Functions 102 2.2. The Contragredient (w ,S(En)) 107 2.3. Tensor Product wp g w9* 108 2.4. Case q = 0: Theory of Spherical Harmonics 110 Exercises 113 IV Applications to Analysis 1. Bochner s Periodicity Relations ___ 121 1.1. Fourier Transform as an Element of SL(2, R) 121 1.2. Bochner s Periodicity Relations 122 2. Harish Chandra s Restriction Formula 126 2.1. Motivation: Case of 0(3, R) 126 2.2. Harish Chandra s Restriction Formula for U{n) 131 2.3. Some Consequences 138 3. Fundamental Solution of the Laplacian 148 3.1. Fundamental Solution of the Definite Laplacian 149 3.2. Fundamental Solution of the Indefinite Laplacian 152 3.3. Structure of O(p, g) Invariant Distributions Supported on the Light Cone 162 4. Huygens Principle 164 4.1. The Propagator 165 4.2. Symmetries of the Propagator 167 4.3. Representation Theoretic Considerations 173 4.4. O+(n, 1) Invariant Distributions 175 5. Harish Chandra s Regularity Theorem for SL{2, R), and the Rossman Harish Chandra Kirillov Character Formula 177 5.1. Regularity of Invariant Eigendistributions 179 5.2. Tempered Distributions and the Character Formula 189 Exercises 195 Contents xv V Asymptotics of Matrix Coefficients 1. Generalities 204 1.1. Various Decompositions 204 1.2. Matrix Coefficients 206 2. Vanishing of Matrix Coefficients at Infinity for SL(n, R) 211 3. Quantitative Estimates 214 3.1. Decay of Matrix Coefficients of Irreducible Unitary Representations of SL(2, R) 214 3.2. Decay of Matrix Coefficients of the Regular Representation ofSL(2,R) 217 3.3. Quantitative Estimates for SL(n,R) 221 4. Some Consequences 229 4.1. Kazhdan s Property T 229 4.2. Ergodic Theory 232 Exercises 236 References 243 Index 253
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illustrated	Illustrated
indexdate	2024-12-20T08:35:39Z
institution	BVB
isbn	0387977686 3540977686
language	English
oai_aleph_id	oai:aleph.bib-bvb.de:BVB01-003496686
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physical	XV, 257 S. graph. Darst.
publishDate	1992
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spellingShingle	Howe, Roger 1945- Tan, Eng C. Non-Abelian harmonic analysis applications of SL (2,R) Analyse harmonique Analyse harmonique ram Représentations de groupes Représentations de groupes ram Harmonic analysis Representations of groups Darstellung Mathematik (DE-588)4128289-9 gnd Harmonische Analyse (DE-588)4023453-8 gnd Unimodulare Gruppe (DE-588)4186897-3 gnd Darstellungstheorie (DE-588)4148816-7 gnd Lineare Gruppe (DE-588)4138778-8 gnd
subject_GND	(DE-588)4128289-9 (DE-588)4023453-8 (DE-588)4186897-3 (DE-588)4148816-7 (DE-588)4138778-8
title	Non-Abelian harmonic analysis applications of SL (2,R)
title_auth	Non-Abelian harmonic analysis applications of SL (2,R)
title_exact_search	Non-Abelian harmonic analysis applications of SL (2,R)
title_full	Non-Abelian harmonic analysis applications of SL (2,R) Roger Howe ; Eng Chye Tan
title_fullStr	Non-Abelian harmonic analysis applications of SL (2,R) Roger Howe ; Eng Chye Tan
title_full_unstemmed	Non-Abelian harmonic analysis applications of SL (2,R) Roger Howe ; Eng Chye Tan
title_short	Non-Abelian harmonic analysis
title_sort	non abelian harmonic analysis applications of sl 2 r
title_sub	applications of SL (2,R)
topic	Analyse harmonique Analyse harmonique ram Représentations de groupes Représentations de groupes ram Harmonic analysis Representations of groups Darstellung Mathematik (DE-588)4128289-9 gnd Harmonische Analyse (DE-588)4023453-8 gnd Unimodulare Gruppe (DE-588)4186897-3 gnd Darstellungstheorie (DE-588)4148816-7 gnd Lineare Gruppe (DE-588)4138778-8 gnd
topic_facet	Analyse harmonique Représentations de groupes Harmonic analysis Representations of groups Darstellung Mathematik Harmonische Analyse Unimodulare Gruppe Darstellungstheorie Lineare Gruppe
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=003496686&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
work_keys_str_mv	AT howeroger nonabelianharmonicanalysisapplicationsofsl2r AT tanengc nonabelianharmonicanalysisapplicationsofsl2r

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