Central morphisms and Cuspidal automorphic Representations
Number Theory
2019-04-24 v2
Abstract
Let be a global field. Let and be two connected reductive group defined over endowed with an -morphism such that the induced morphism on the derived groups is a central isogeny. Our main results yield in particular the following theorem: Given any irreducible cuspidal representation of its restriction to contains a cuspidal representation of . Conversely, assuming moreover that is an injection, any irreducible cuspidal representation of appears in the restriction of some cuspidal representation of . This theorem has an obvious local analogue.
Cite
@article{arxiv.1812.03033,
title = {Central morphisms and Cuspidal automorphic Representations},
author = {Jean-Pierre Labesse and Joachim Schwermer},
journal= {arXiv preprint arXiv:1812.03033},
year = {2019}
}