Twisted Levi Sequences and Explicit Styles on Sp(4)

Author(s)

Kim, Ju-Lee; Yu, Jiu-Kang

Abstract

Let G be a connected reductive group over a field F. A twisted Levi subgroup G0 of G is a reductive subgroup such that G' [circle times]F F[over-bar] is a Levi subgroup of G' [circle times]F F[over-bar]. Twisted Levi subgroups have been an important tool in studying the structure theory of representations of p-adic groups. For example, supercuspidal representations are built out of certain representations of twisted Levi subgroups ([20]), and Hecke algebra isomorphisms are established with Hecke algebras on twisted Levi subgroups, which suggests an inductive structure of representations (see [9] for example).

Date issued

2011-01

URI

http://hdl.handle.net/1721.1/71711

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Proceedings of the AMS Special Session on Harmonic Analysis and Representations of Reductive, p-adic Groups (Contemporary Mathematics)

Publisher

American Mathematical Society

Citation

Kim, Ju-Lee and Jiu-Kang Yu. "Twisted Levi Sequences and Explicit Styles on Sp(4)." in Harmonic Analysis on Reductive, p-adic Groups." Edited by Robert S. Doran, Paul J. Sally, Jr., and Loren Spice. Providence, RI: American Mathematical Society, 2011 (Contemporary Mathematics, vol. 543).

Version: Author's final manuscript

ISBN

0-8218-4985-9

978-0-8218-4985-9