On Harish-Chandra's integrability theorem in positive characteristic

Abstract

The celebrated Harish-Chandra's integrability theorem states that the distributional character of an irreducible smooth representation of a p-adic group G(F) is integrable, that is represented by an L1loc(G(F)) function. Here F is a non-Archimedean local field of characteristic 0 and G is a reductive algebraic group defined over F. In this paper we focus on cuspidal representations of GLn(F) for a field F of positive characteristic. We show that in this case the integrability holds under the hypothesis of existence of desingularization of (certain) algebraic varieties in positive characteristics. Furthermore, in the case char(F)>n/2 we establish the regularity of such characters unconditionally.