The relative Breuil-Kisin classification of p-divisible groups and finite flat group schemes

Abstract

Assume that p>2, and let OK be a p-adic discrete valuation ring with residue field admitting a finite p-basis, and let R be a formally smooth formally finite-type OK-algebra. (Indeed, we allow slightly more general rings R.) We construct an anti-equivalence of categories between the categories of p-divisible groups over R and certain semi-linear algebra objects which generalise (,S)-modules of height ≤slant1 (or Kisin modules). A similar classification result for p-power order finite flat group schemes is deduced from the classification of p-divisible groups. We also show compatibility of various construction of (Zp-lattice or torsion) Galois representations, including the relative version of Faltings' integral comparison theorem for p-divisible groups. We obtain partial results when p=2.