Spherical character of a supercuspidal representation as weighted orbital integral

Abstract

Let E/ F be an unramified quadratic extension of local non archimedean fields of characteristic 0. Let H be an algebraic reductive group, defined and split over F. We assume that the split connected component of the center of H is trivial. Let (τ,V) be a H( F)-distinguished supercuspidal representation of H( E). Using the recent results of C. Zhang, and the geometric side of a local relative trace formula obtained by P. Delorme, P. Harinck and S. Souaifi, we describe spherical characters associated to H( F)-invariant linear forms on V in terms of weighted orbital integrals of matrix coefficients of τ.