On a relation of overconvergence and F-analyticity on p-adic Galois representations of a p-adic field F

Abstract

Let p be a prime number. There are properties called ``overconvergence'' and ``F-analyticity'' for p-adic Galois representations of a p-adic field F. By Berger's work, it is known that F-analyticity is stricter than overconvergence. In this article, we show that, in many cases, an overconvergent Galois representation is F-analytic up to a twist by a character. This result emphasizes the necessity of the theory of (,)-modules over the multivariable Robba ring, by which we expect to study all p-adic Galois representations.