Hodge-Newton filtration for p-divisible groups with ramified endomorphism structure

Abstract

Let OK be a complete discrete valuation ring of mixed characteristic (0,p) with perfect residue field. We prove the existence of the Hodge-Newton filtration for p-divisible groups over OK with additional endomorphism structure for the ring of integers of a finite, possibly ramified field extension of Qp. The argument is based on the Harder-Narasimhan theory for finite flat group schemes over OK. In particular, we describe a sufficient condition for the existence of a filtration of p-divisible groups over OK associated to a break point of the Harder-Narasimhan polygon.