Geometric structure in the representation theory of p-adic groups II
Geometric structure in the representation theory of p-adic groups II
This expository note will state the ABP (Aubert-Baum-Plymen) conjecture. The conjecture can be stated at four levels: 1. K-theory of C*-algebras 2. Periodic cyclic homology of finite type algebras 3. Geometric equivalence of finite type algebras 4. Representation theory.
The emphasis in this note will be on representation theory.
0-8218-4985-9
American Mathematical Society
Aubert, Anne-Marie
f1ab184a-28bd-49a7-bec5-d0abcec2fed0
Baum, Paul
fb630982-847c-4fef-8bd3-b344875be774
Plymen, Roger
76de3dd0-ddcb-4a34-98e1-257dddb731f5
2011
Aubert, Anne-Marie
f1ab184a-28bd-49a7-bec5-d0abcec2fed0
Baum, Paul
fb630982-847c-4fef-8bd3-b344875be774
Plymen, Roger
76de3dd0-ddcb-4a34-98e1-257dddb731f5
Aubert, Anne-Marie, Baum, Paul and Plymen, Roger
(2011)
Geometric structure in the representation theory of p-adic groups II.
Doran, Robert S., Sally, Paul J. and Spice, Loren
(eds.)
In Harmonic Analysis on Reductive p-adic Groups.
American Mathematical Society.
20 pp
.
Record type:
Conference or Workshop Item
(Paper)
Abstract
This expository note will state the ABP (Aubert-Baum-Plymen) conjecture. The conjecture can be stated at four levels: 1. K-theory of C*-algebras 2. Periodic cyclic homology of finite type algebras 3. Geometric equivalence of finite type algebras 4. Representation theory.
The emphasis in this note will be on representation theory.
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More information
Published date: 2011
Venue - Dates:
AMS Special Session on Harmonic Analysis and Representations of Reductive p-adic Groups, 2010-01-16 - 2010-01-16
Identifiers
Local EPrints ID: 180483
URI: http://eprints.soton.ac.uk/id/eprint/180483
ISBN: 0-8218-4985-9
PURE UUID: 439c530e-f835-4855-b431-a20f669dce73
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Date deposited: 11 Apr 2011 13:33
Last modified: 10 Dec 2021 19:02
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Contributors
Author:
Anne-Marie Aubert
Author:
Paul Baum
Editor:
Robert S. Doran
Editor:
Paul J. Sally
Editor:
Loren Spice
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