Lifting semisimple characters of p-adic types from fixed-point subgroups

Abstract

Given a p-adic group G=G(F) and a finite group ⊂AutF(G) such that the fixed-point subgroup G is reductive, we show that every semisimple character (in the sense of Bushnell and Kutzko) of a type for G = G(F) arises as the restriction of a semisimple character of a type for G. We achieve this by explicitly lifting the truncated Kim--Yu datum (or character-datum) that parametrizes the semisimple character for G to a character-datum that parametrizes a semisimple character for G. Our proof, which is of independent interest, uses state-of-the-art techniques and, as a special case, defines a lift of a Howe factorization of a character of a maximal torus of G.