Matching of orbital integrals (transfer) and Roche Hecke algebra isomorphisms

Abstract

Let F be a non-Archimedan local field, G a connected reductive group defined and split over F, and T a maximal F-split torus in G. Let 0 be a depth zero character of the maximal compact subgroup T of T(F). It gives by inflation a character of an Iwahori subgroup I of G(F) containing T. From Roche, 0 defines a split endoscopic group G' of G, and there is an injective morphism of C-algebras H(G(F),) → H(G'(F),1I') where H(G(F),) is the Hecke algebra of compactly supported -1-spherical functions on G(F) and I' is an Iwahori subgroup of G'(F). This morphism restricts to an injective morphism ζ: Z(G(F),)→ Z(G'(F),1I') between the centers of the Hecke algebras. We prove here that a certain linear combination of morphisms analogous to ζ realizes the transfer (matching of strongly G-regular semisimple orbital integrals). If char(F)=p>0, our result is unconditional only if p is large enough.