$C^\ast$-blocks and crossed products for classical $p$-adic groups
Abstract
Let be a real or -adic reductive group. We consider the tempered dual of , and its connected components. For real groups, Wassermann proved in 1987, by noncommutative-geometric methods, that each connected component has a simple geometric structure which encodes the reducibility of induced representations. For -adic groups, each connected component of the tempered dual comes with a compact torus equipped with a finite group action, and we prove that a version of Wassermann's theorem holds true under a certain geometric assumption on the structure of stabilizers for that action. We then focus on the case where is a quasi-split symplectic, orthogonal or unitary group, and explicitly determine the connected components for which the geometric assumption is satisfied.
Cite
@article{arxiv.2002.12864,
title = {$C^\ast$-blocks and crossed products for classical $p$-adic groups},
author = {Alexandre Afgoustidis and Anne-Marie Aubert},
journal= {arXiv preprint arXiv:2002.12864},
year = {2021}
}
Comments
Version 3 (40 pages), to appear in IMRN