From pro-p Iwahori-Hecke modules to (,)-modules, II

Abstract

Let o be the ring of integers in a finite extension field of Qp, let k be its residue field. Let G be a split reductive group over Qp, let H(G,I0) be its pro-p-Iwahori Hecke o-algebra. In dfun we introduced a general principle how to assign to a certain additionally chosen datum (C(),φ,τ) an exact functor M D(* VM) from finite length H(G,I0)-modules to (r,)-modules. In the present paper we concretely work out such data (C(),φ,τ) for the classical matrix groups. We show that the corresponding functor identifies the set of (standard) supersingular H(G,I0) ok-modules with the set of (r,)-modules satisfying a certain symmetry condition.