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

Abstract

Let o be the ring of integers in a finite extension K of Qp, let k be its residue field. Let G be a split reductive group over Qp, let T be a maximal split torus in G. Let H(G,I0) be the pro-p-Iwahori Hecke o-algebra. Given a semiinfinite reduced chamber gallery (alcove walk) C() in the T-stable apartment, a period φ∈ N(T) of C() of length r and a homomorphism τ: Zp× T compatible with φ, we construct a functor from the category Mod fin( H(G,I0)) of finite length H(G,I0)-modules to \'etale (r,)-modules over Fontaine's ring O E. If G= GLd+1( Qp) there are essentially two choices of (C(), φ, τ) with r=1, both leading to a functor from Mod fin( H(G,I0)) to \'etale (,)-modules and hence to Gal Qp-representations. Both induce a bijection between the set of absolutely simple supersingular H(G,I0) o k-modules of dimension d+1 and the set of irreducible representations of Gal Qp over k of dimension d+1. We also compute these functors on modular reductions of tamely ramified locally unitary principal series representations of G over K. For d=1 we recover Colmez' functor (when restricted to o-torsion GL2( Qp)-representations generated by their pro-p-Iwahori invariants)