| Unitary Representations of Reductive Lie Groups. (Am-118), Volume 118 Contributor(s): Vogan, David A. (Author) |
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ISBN: 0691084823 ISBN-13: 9780691084824 Publisher: Princeton University Press OUR PRICE: $109.25 Product Type: Paperback - Other Formats Published: October 1987 Annotation: 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. |
| Additional Information |
| BISAC Categories: - Mathematics | Algebra - Linear |
| Dewey: 512.55 |
| LCCN: 87003102 |
| Physical Information: 0.82" H x 6.08" W x 9.04" (1.13 lbs) 319 pages |
| Descriptions, Reviews, Etc. |
| Publisher Description: 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. |