Integral p-adic Hodge theory of formal schemes in low ramification

Abstract

We prove that for any proper smooth formal scheme X over OK, where OK is the ring of integers in a complete discretely valued nonarchimedean extension K of Qp with perfect residue field k and ramification degree e, the i-th Breuil-Kisin cohomology group and its Hodge-Tate specialization admit nice decompositions when ie<p-1. Thanks to the comparison theorems in the recent works of Bhatt, Morrow and Scholze, we can then get an integral comparison theorem for formal schemes when the cohomological degree i satisfies ie<p-1, which generalizes the case of schemes under the condition (i+1)e<p-1 proven by Fontaine-Messing and Caruso.