Central morphisms and Cuspidal automorphic Representations

Abstract

Let F be a global field. Let G and H be two connected reductive group defined over F endowed with an F-morphism f: H→ G such that the induced morphism Hder→ Gder on the derived groups is a central isogeny. Our main results yield in particular the following theorem: Given any irreducible cuspidal representation π of G( AF) its restriction to H( AF) contains a cuspidal representation σ of H( AF). Conversely, assuming moreover that f is an injection, any irreducible cuspidal representation σ of H( AF) appears in the restriction of some cuspidal representation π of G( AF). This theorem has an obvious local analogue.