Uniform bounds on the Harish-Chandra characters

Abstract

Let G be a connected reductive algebraic group over a p-adic local field F. In this paper we study the asymptotic behaviour of the trace characters θ π evaluated at a regular element γ of G(F) as π varies among supercuspidal representations of G(F). Kim, Shin and Templier conjectured that θπ(γ) deg(π) tends to 0 when π runs over irreducible supercuspidal representations of G(F) with unitary central character and the formal degree of π tends to infinity. For G semisimple we prove that the trace character is uniformly bounded on γ under the assumption, which is expected to hold true for every G (F), that all irreducible supercuspidal representations of G(F) are compactly induced from an open compact modulo center subgroup. Moreover, we give an explicit upper bound in the case of γ ellitpic.