Polygones de Hodge, de Newton et de l'inertie mod\'er\'ee des repr\'esentations semi-stables

Abstract

Let k be a perfect field, and K be a totally ramified extension of K0 = Frac W(k) of degree e. To a semi-stable p-adic representation of GK (the absolute Galois group of K), one can classicaly associate two polygons : the Hodge polygon et the Newton polygon. It is well known that the former lies below the latter, and that they have same endpoints. In this note, we introduce a third polygon gotten from the semi-simplification of the representation mod p, and, under some conditions on Hodge-Tate weights, we prove that it lies above the Hodge polygon again with same endpoint. We finally examine one exemple associated to a crystalline representation.