An edition of Spherical Inversion on SLn(R) (2001)

Spherical Inversion on SLn(R)

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Last edited by MARC Bot
September 28, 2024 | History
An edition of Spherical Inversion on SLn(R) (2001)

Spherical Inversion on SLn(R)

Harish-Chandra's general Plancherel inversion theorem admits a much shorter presentation for spherical functions. The authors have taken into account contributions by Helgason, Gangolli, Rosenberg, and Anker from the mid-1960s to 1990. Anker's simplification of spherical inversion on the Harish-Chandra Schwartz space had not yet made it into a book exposition. Previous expositions have dealt with a general, wide class of Lie groups. This has made access to the subject difficult for outsiders, who may wish to connect some aspects with several if not all other parts of mathematics, and do so in specific cases of intrinsic interest. The essential features of Harish-Chandra theory are exhibited on SLn(R), but hundreds of pages of background can be replaced by short direct verifications. The material becomes accessible to graduate students with especially no background in Lie groups and representation theory. Spherical inversion is sufficient to deal with the heat kernel, which is at the center of the authors' current research. The book will serve as a self-contained background for parts of this research.

Publish Date
Publisher
Springer New York
Language
English
Pages
426

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Previews available in: English

Edition Availability
Cover of: Spherical Inversion on SLn(R)
Spherical Inversion on SLn(R)
2001, Springer New York
electronic resource / in English

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Book Details


Table of Contents

Iwasawa Decomposition and Positivity
Invariant Differential Operators and the Iwasawa Direct Image
Characters, Eigenfunctions, Spherical Kernel and W-Invariance
Convolutions, Spherical Functions and the Mellin Transform
Gelfand-Naimark Decomposition and the Harish-Chandra -Function
Polar Decomposition
The Casimir Operator
The Harish-Chandra Series for Eigenfunctions of Casimir
General Inversion
The Harish-Chandra Schwartz Space (HCS) and Anker's Proof of Inversion
Tube Domains and the L1 (Even Lp) HCS Spaces
SLn(C).

Edition Notes

Online full text is restricted to subscribers.

Also available in print.

Mode of access: World Wide Web.

Published in
New York, NY
Series
Springer Monographs in Mathematics, Springer monographs in mathematics

Classifications

Dewey Decimal Class
512.55, 512.482
Library of Congress
QA252.3, QA387

The Physical Object

Format
[electronic resource] /
Pagination
1 online resource (xx, 426p. 2 illus.)
Number of pages
426

ID Numbers

Open Library
OL27088736M
Internet Archive
sphericalinversi00jorg
ISBN 10
1441928839, 1468493027
ISBN 13
9781441928832, 9781468493023
OCLC/WorldCat
853256661

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History

Download catalog record: RDF / JSON
September 28, 2024 Edited by MARC Bot import existing book
February 26, 2022 Edited by ImportBot import existing book
July 7, 2019 Created by MARC Bot import new book