Triangulable F-analytic (q,)-modules of rank 2

Abstract

The theory of (q,)-modules is a generalization of Fontaine's theory of (,)-modules, which classifies GF-representations on F-modules and F-vector spaces for any finite extension F of p. In this paper following Colmez's method we classify triangulable F-analytic (q,)-modules of rank 2. In this process we establish two kinds of cohomology theories for F-analytic (q,)-modules. Using them we show that, if D is an F-analytic (q,)-module such that Dq=1,=1=0 i.e. VGF=0 where V is the Galois representation attached to D, then any overconvergent extension of the trivial representation of GF by V is F-analytic. In particular, contrarily to the case of F=p, there are representations of GF that are not overconvergent.