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Cohomological Induction and Unitary Representations (PMS-45), Volume 45

Author: Anthony W. Knapp

Publisher: Princeton University Press

Published: 2016-06-02

Total Pages: 968

ISBN-13: 1400883938

This book offers a systematic treatment--the first in book form--of the development and use of cohomological induction to construct unitary representations. George Mackey introduced induction in 1950 as a real analysis construction for passing from a unitary representation of a closed subgroup of a locally compact group to a unitary representation of the whole group. Later a parallel construction using complex analysis and its associated co-homology theories grew up as a result of work by Borel, Weil, Harish-Chandra, Bott, Langlands, Kostant, and Schmid. Cohomological induction, introduced by Zuckerman, is an algebraic analog that is technically more manageable than the complex-analysis construction and leads to a large repertory of irreducible unitary representations of reductive Lie groups. The book, which is accessible to students beyond the first year of graduate school, will interest mathematicians and physicists who want to learn about and take advantage of the algebraic side of the representation theory of Lie groups. Cohomological Induction and Unitary Representations develops the necessary background in representation theory and includes an introductory chapter of motivation, a thorough treatment of the "translation principle," and four appendices on algebra and analysis.

Cohomological Induction and Unitary Representations

Author: Anthony W. Knapp

Publisher: Princeton University Press

Published: 1995

Total Pages: 976

ISBN-13: 9780691037561

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Unitary Representations of Reductive Lie Groups

Author: David A. Vogan

Publisher: Princeton University Press

Published: 1987-10-21

Total Pages: 324

ISBN-13: 9780691084824

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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.

Unitary Representations of Reductive Lie Groups

Author: David A. Vogan

Publisher:

Published: 1987

Total Pages: 308

ISBN-13: 9780691084817

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Dirac Operators in Representation Theory

Author: Jing-Song Huang

Publisher: Springer Science & Business Media

Published: 2007-05-27

Total Pages: 205

ISBN-13: 0817644938

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This book presents a comprehensive treatment of important new ideas on Dirac operators and Dirac cohomology. Using Dirac operators as a unifying theme, the authors demonstrate how some of the most important results in representation theory fit together when viewed from this perspective. The book is an excellent contribution to the mathematical literature of representation theory, and this self-contained exposition offers a systematic examination and panoramic view of the subject. The material will be of interest to researchers and graduate students in representation theory, differential geometry, and physics.

The Penrose Transform and Analytic Cohomology in Representation Theory

Author: Michael G. Eastwood

Publisher: American Mathematical Soc.

Published: 1993

Total Pages: 274

ISBN-13: 0821851764

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This book contains refereed papers presented at the AMS-IMS-SIAM Summer Research Conference on the Penrose Transform and Analytic Cohomology in Representation Theory held in the summer of 1992 at Mount Holyoke College. The conference brought together some of the top experts in representation theory and differential geometry. One of the issues explored at the conference was the fact that various integral transforms from representation theory, complex integral geometry, and mathematical physics appear to be instances of the same general construction, which is sometimes called the ``Penrose transform''. There is considerable scope for further research in this area, and this book would serve as an excellent introduction.

Representations and Cohomology: Volume 2, Cohomology of Groups and Modules

Author: D. J. Benson

Publisher: Cambridge University Press

Published: 1991-08-22

Total Pages: 296

ISBN-13: 9780521636520

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A further introduction to modern developments in the representation theory of finite groups and associative algebras.

Continuous Cohomology, Discrete Subgroups, and Representations of Reductive Groups

Author: Armand Borel

Publisher: American Mathematical Soc.

Published: 2013-11-21

Total Pages: 282

ISBN-13: 147041225X

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It has been nearly twenty years since the first edition of this work. In the intervening years, there has been immense progress in the use of homological algebra to construct admissible representations and in the study of arithmetic groups. This second edition is a corrected and expanded version of the original, which was an important catalyst in the expansion of the field. Besides the fundamental material on cohomology and discrete subgroups present in the first edition, this edition also contains expositions of some of the most important developments of the last two decades.

Cohomology of Arithmetic Groups

Author: James W. Cogdell

Publisher: Springer

Published: 2018-08-18

Total Pages: 304

ISBN-13: 3319955497

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This book discusses the mathematical interests of Joachim Schwermer, who throughout his career has focused on the cohomology of arithmetic groups, automorphic forms and the geometry of arithmetic manifolds. To mark his 66th birthday, the editors brought together mathematical experts to offer an overview of the current state of research in these and related areas. The result is this book, with contributions ranging from topology to arithmetic. It probes the relation between cohomology of arithmetic groups and automorphic forms and their L-functions, and spans the range from classical Bianchi groups to the theory of Shimura varieties. It is a valuable reference for both experts in the fields and for graduate students and postdocs wanting to discover where the current frontiers lie.

Lie Theory and Its Applications in Physics

Author: Vladimir Dobrev

Publisher: Springer

Published: 2016-12-10

Total Pages: 614

ISBN-13: 981102636X

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This volume presents modern trends in the area of symmetries and their applications based on contributions from the workshop "Lie Theory and Its Applications in Physics", held near Varna, Bulgaria, in June 2015. Traditionally, Lie theory is a tool to build mathematical models for physical systems.Recently, the trend has been towards geometrization of the mathematical description of physical systems and objects. A geometric approach to a system yields in general some notion of symmetry, which is very helpful in understanding its structure. Geometrization and symmetries are employed in their widest sense, embracing representation theory, algebraic geometry, number theory, infinite-dimensional Lie algebras and groups, superalgebras and supergroups, groups and quantum groups, noncommutative geometry, symmetries of linear and nonlinear partial differential operators (PDO), special functions, and others. Furthermore, the necessary tools from functional analysis are included.“div>This is a large interdisciplinary and interrelated field, and the present volume is suitable for a broad audience of mathematicians, mathematical physicists, and theoretical physicists, including researchers and graduate students interested in Lie Theory.