Unitary Representations of Reductive Lie Groups. (AM-118), Volume 118 /

Unitary Representations of Reductive Lie Groups. (AM-118), Volume 118 / / David A. Vogan.

This book is an expanded version of the Hermann Weyl Lectures given at the Institute for Advanced Study in January 1986. It outlines some of what is now known about irreducible unitary representations of real reductive groups, providing fairly complete definitions and references, and sketches (at le...

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Superior document:Title is part of eBook package: De Gruyter Princeton Annals of Mathematics eBook-Package 1940-2020
VerfasserIn:
Vogan, David A.,
Place / Publishing House:Princeton, NJ : : Princeton University Press, , [2016]
©1988
Year of Publication:2016
Language:English
Series:Annals of Mathematics Studies ; 118
Online Access:
Physical Description:1 online resource (319 p.)
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072 7 |a MAT002050  |2 bisacsh 
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100 1 |a Vogan, David A.,   |e author.  |4 aut  |4 http://id.loc.gov/vocabulary/relators/aut 
245 1 0 |a Unitary Representations of Reductive Lie Groups. (AM-118), Volume 118 /  |c David A. Vogan. 
264 1 |a Princeton, NJ :   |b Princeton University Press,   |c [2016] 
264 4 |c ©1988 
300 |a 1 online resource (319 p.) 
336 |a text  |b txt  |2 rdacontent 
337 |a computer  |b c  |2 rdamedia 
338 |a online resource  |b cr  |2 rdacarrier 
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490 0 |a Annals of Mathematics Studies ;  |v 118 
505 0 0 |t Frontmatter --   |t CONTENTS --   |t ACKNOWLEDGEMENTS --   |t INTRODUCTION --   |t Chapter 1. COMPACT GROUPS AND THE BOREL-WEIL THEOREM --   |t Chapter 2. HARISH-CHANDRA MODULES --   |t Chapter 3. PARABOLIC INDUCTION --   |t Chapter 4. STEIN COMPLEMENTARY SERIES AND THE UNITARY DUAL OF GL(n,ℂ) --   |t Chapter 5. COHOMOLOGICAL PARABOLIC INDUCTION: ANALYTIC THEORY --   |t Chapter 6. COHOMOLOGICAL PARABOLIC INDUCTION: ALGEBRAIC THEORY --   |t Interlude. THE IDEA OF UNIPOTENT REPRESENTATIONS --   |t Chapter 7. FINITE GROUPS AND UNIPOTENT REPRESENTATIONS --   |t Chapter 8. LANGLANDS' PRINCIPLE OF FUNCTORIALITY AND UNIPOTENT REPRESENTATIONS --   |t Chapter 9. PRIMITIVE IDEALS AND UNIPOTENT REPRESENTATIONS --   |t Chapter 10. THE ORBIT METHOD AND UNIPOTENT REPRESENTATIONS --   |t Chapter 11. E-MULTIPLICITIES AND UNIPOTENT REPRESENTATIONS --   |t Chapter 12. ON THE DEFINITION OF UNIPOTENT REPRESENTATIONS --   |t Chapter 13. EXHAUSTION --   |t REFERENCES --   |t Backmatter 
506 0 |a restricted access  |u http://purl.org/coar/access_right/c_16ec  |f online access with authorization  |2 star 
520 |a This book is an expanded version of the Hermann Weyl Lectures given at the Institute for Advanced Study in January 1986. It outlines some of what is now known about irreducible unitary representations of real reductive groups, providing fairly complete definitions and references, and sketches (at least) of most proofs. The first half of the book is devoted to the three more or less understood constructions of such representations: parabolic induction, complementary series, and cohomological parabolic induction. This culminates in the description of all irreducible unitary representation of the general linear groups. For other groups, one expects to need a new construction, giving "unipotent representations." The latter half of the book explains the evidence for that expectation and suggests a partial definition of unipotent representations. 
530 |a Issued also in print. 
538 |a Mode of access: Internet via World Wide Web. 
546 |a In English. 
588 0 |a Description based on online resource; title from PDF title page (publisher's Web site, viewed 31. Jan 2022) 
650 0 |a Lie groups. 
650 0 |a Representations of Lie groups. 
650 7 |a MATHEMATICS / Algebra / Linear.  |2 bisacsh 
653 |a Abelian group. 
653 |a Adjoint representation. 
653 |a Annihilator (ring theory). 
653 |a Atiyah-Singer index theorem. 
653 |a Automorphic form. 
653 |a Automorphism. 
653 |a Cartan subgroup. 
653 |a Circle group. 
653 |a Class function (algebra). 
653 |a Classification theorem. 
653 |a Cohomology. 
653 |a Commutator subgroup. 
653 |a Complete metric space. 
653 |a Complex manifold. 
653 |a Conjugacy class. 
653 |a Cotangent space. 
653 |a Dimension (vector space). 
653 |a Discrete series representation. 
653 |a Dixmier conjecture. 
653 |a Dolbeault cohomology. 
653 |a Duality (mathematics). 
653 |a Eigenvalues and eigenvectors. 
653 |a Exponential map (Lie theory). 
653 |a Exponential map (Riemannian geometry). 
653 |a Exterior algebra. 
653 |a Function space. 
653 |a Group homomorphism. 
653 |a Harmonic analysis. 
653 |a Hecke algebra. 
653 |a Hilbert space. 
653 |a Hodge theory. 
653 |a Holomorphic function. 
653 |a Holomorphic vector bundle. 
653 |a Homogeneous space. 
653 |a Homomorphism. 
653 |a Induced representation. 
653 |a Infinitesimal character. 
653 |a Inner automorphism. 
653 |a Invariant subspace. 
653 |a Irreducibility (mathematics). 
653 |a Irreducible representation. 
653 |a Isometry group. 
653 |a Isometry. 
653 |a K-finite. 
653 |a Kazhdan-Lusztig polynomial. 
653 |a Langlands decomposition. 
653 |a Lie algebra cohomology. 
653 |a Lie algebra representation. 
653 |a Lie algebra. 
653 |a Lie group action. 
653 |a Lie group. 
653 |a Mathematical induction. 
653 |a Maximal compact subgroup. 
653 |a Measure (mathematics). 
653 |a Minkowski space. 
653 |a Nilpotent group. 
653 |a Orbit method. 
653 |a Orthogonal group. 
653 |a Parabolic induction. 
653 |a Principal homogeneous space. 
653 |a Principal series representation. 
653 |a Projective space. 
653 |a Pseudo-Riemannian manifold. 
653 |a Pullback (category theory). 
653 |a Ramanujan-Petersson conjecture. 
653 |a Reductive group. 
653 |a Regularity theorem. 
653 |a Representation of a Lie group. 
653 |a Representation theorem. 
653 |a Representation theory. 
653 |a Riemann sphere. 
653 |a Riemannian manifold. 
653 |a Schwartz space. 
653 |a Semisimple Lie algebra. 
653 |a Sheaf (mathematics). 
653 |a Sign (mathematics). 
653 |a Special case. 
653 |a Spectral theory. 
653 |a Sub"ient. 
653 |a Subgroup. 
653 |a Support (mathematics). 
653 |a Symplectic geometry. 
653 |a Symplectic group. 
653 |a Symplectic vector space. 
653 |a Tangent space. 
653 |a Tautological bundle. 
653 |a Theorem. 
653 |a Topological group. 
653 |a Topological space. 
653 |a Trivial representation. 
653 |a Unitary group. 
653 |a Unitary matrix. 
653 |a Unitary representation. 
653 |a Universal enveloping algebra. 
653 |a Vector bundle. 
653 |a Weyl algebra. 
653 |a Weyl character formula. 
653 |a Weyl group. 
653 |a Zariski's main theorem. 
653 |a Zonal spherical function. 
773 0 8 |i Title is part of eBook package:  |d De Gruyter  |t Princeton Annals of Mathematics eBook-Package 1940-2020  |z 9783110494914  |o ZDB-23-PMB 
773 0 8 |i Title is part of eBook package:  |d De Gruyter  |t Princeton University Press eBook-Package Archive 1927-1999  |z 9783110442496 
776 0 |c print  |z 9780691084824 
856 4 0 |u https://doi.org/10.1515/9781400882380 
856 4 0 |u https://www.degruyter.com/isbn/9781400882380 
856 4 2 |3 Cover  |u https://www.degruyter.com/document/cover/isbn/9781400882380/original 
912 |a 978-3-11-044249-6 Princeton University Press eBook-Package Archive 1927-1999  |c 1927  |d 1999 
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