Crystalline boundedness principle

Abstract

We prove that an F-crystal (M,) over an algebraically closed field k of characteristic p>0 is determined by (M,) mod pn, where n 1 depends only on the rank of M and on the greatest Hodge slope of (M,). We also extend this result to triples (M,,G), where G is a flat, closed subgroup scheme of GLM whose generic fibre is connected and has a Lie algebra normalized by . We get two purity results. If C is an F-crystal over a reduced Fp-scheme S, then each stratum of the Newton polygon stratification of S defined by C, is an affine S-scheme (a weaker result was known before for S noetherian). The locally closed subscheme of the Mumford scheme d,1,Nk defined by the isomorphism class of a principally quasi-polarized p-divisible group over k of height 2d, is an affine d,1,Nk-scheme.

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