Purity of level m stratifications

Abstract

Let k be a field of characteristic p>0. Let Dm be a m over k (i.e., an m-truncated Barsotti--Tate group over k). Let S be a k-scheme and let X be a m over S. Let SDm(X) be the subscheme of S which describes the locus where X is locally for the fppf topology isomorphic to Dm. If p 5, we show that SDm(X) is pure in S i.e., the immersion SDm(X) S is affine. For p∈\2,3\, we prove purity if Dm satisfies a certain property depending only on its p-torsion Dm[p]. For p 5, we apply the developed techniques to show that all level m stratifications associated to Shimura varieties of Hodge type are pure.