Exactness of the reduction on \'etale modules

Abstract

We prove the exactness of the reduction map from \'etale (φ,)-modules over completed localized group rings of compact open subgroups of unipotent p-adic algebraic groups to usual \'etale (φ,)-modules over Fontaine's ring. This reduction map is a component of a functor from smooth p-power torsion representations of p-adic reductive groups (or more generally of Borel subgroups of these) to (φ,)-modules. Therefore this gives evidence for this functor---which is intended as some kind of p-adic Langlands correspondence for reductive groups---to be exact. We also show that the corresponding higher -functors vanish. Moreover, we give the example of the Steinberg representation as an illustration and show that it is acyclic for this functor to (φ,)-modules whenever our reductive group is d+1(Qp) for some d≥ 1.