The crystalline cohomology of covers with a cyclic p-Sylow subgroup

Abstract

Let X be a smooth projective curve over a field k with an action of a finite group G. A well-known result of Chevalley and Weil describes the k[G]-module structure of cohomologies of X in the case when the characteristic of k does not divide \# G. In case when G has a cyclic p-Sylow subgroup, it is known that the G-structures of the module of holomorphic differentials and of de Rham cohomology of X are completely determined by the ramification data of the cover X X/G. In this article we extend this result to the crystalline cohomology of X. Also, we provide an explicit description of the structure of the crystalline cohomology when G = Z/pn. The main used tool is the theory of Yakovlev diagrams - algebraic objects that classify the G-modules over Witt vectors.