Almost Cp Galois representations and vector bundles

Abstract

Let K be a finite extension of Qp and GK the absolute Galois group. Then GK acts on the fundamental curve X of p-adic Hodge theory and we may consider the abelian category M(GK) of coherent OX-modules equipped with a continuous and semi-linear action of GK. An almost Cp-representation of GK is a p-adic Banach space V equipped with a linear and continuous action of GK such that there exists d∈N, two GK-stable finite dimensional sub-Qp-vector spaces U+ of V, U- of Cpd, and a GK-equivariant isomorphism V/U+ Cpd/U-. These representations form an abelian category C(GK). The main purpose of this paper is to prove that C(GK) can be recovered from M(GK) by a simple construction (and conversely) inducing, in particular, an equivalence of triangulated categories Db(M(GK)) Db(C(GK)).