Filtered F-crystals on Shimura varieties of abelian type

Abstract

In this paper, we define and construct canonical filtered F-crystals with G-structure over the integral models for Shimura varieties of abelian type at hyperspecial level defined by Kisin. We check that these are related by p-adic comparison theorems to the usual lisse sheaves, and as an application we also use this to show that the Galois representations generated from the p-adic \'etale cohomology of Shimura varieties with nontrivial coefficient sheaves are crystalline, at least in the case of proper abelian type Shimura varieties.