On the universal module of p-adic spherical Hecke algebras

Abstract

Let G be a split connected reductive group with connected center Z over a local non-Archimedean field F of residue characteristic p, let K be a hyperspecial maximal compact open subgroup in G. Let R be a commutative ring, let V be a finitely generated R-free R[K]-module. For an R-algebra B and a character : HV(G,K) B of the spherical Hecke algebra HV(G,K)= EndR[G] indKG(V) we consider the specialization M(V)= indKGV HV(G,K),B of the universal HV(G,K)-module indKG(V). For large classes of R (including OF and Fp), V, B and , arguing geometrically on the Bruhat Tits building we give a sufficient criterion for M(V) to be B-free and to admit a G-equivariant resolution by a Koszul complex built from finitely many copies of indKZG(V). This criterion is the exactness of certain fairly small and explicit N-equivariant R-module complexes, where N is the group of OF-valued points of the unipotent radical of a Borel subgroup in G. We verify it if F= Qp and if V is an irreducible Fp[K]-representation with highest weight in the (closed) bottom p-alcove, or a lift of it to OF. We use this to construct p-adic integral structures in certain locally algebraic representations of G.