Purity of Crystalline Strata

Abstract

Let p be a prime. Let n∈ N-\0\. Let C be an Fn-crystal over a locally noetherian Fp-scheme S. Let (a,b)∈ N2. We show that the reduced locally closed subscheme of S whose points are exactly those x∈ S such that (a,b) is a break point of the Newton polygon of the fiber Cx of C at x is pure in S, i.e., it is an affine S-scheme. This result refines and reobtains previous results of de Jong--Oort, Vasiu, and Yang. As an application, we show that for all m∈ N the reduced locally closed subscheme of S whose points are exactly those x∈ S for which the p-rank of Cx is m is pure in S; the case n=1 was previously obtained by Deligne (unpublished) and the general case n 1 refines and reobtains a result of Zink.