Reductions of some two-dimensional crystalline representations via Kisin modules

Abstract

We determine rational Kisin modules associated with two-dimensional, irreducible, crystalline representations of Gal(Qp/Qp) of Hodge-Tate weights 0, k-1. If the slope is larger than k-1p , we further identify an integral Kisin module, which we use to calculate the semisimple reduction of the Galois representation. In that range, we find that the reduction is constant, thereby improving on a theorem of Berger, Li, and Zhu.