Relative Fontaine-Messing theory over power series rings

Abstract

Let k be a perfect field of characteristic p>2, R := W(k)[\![t1, …, td]\!] be the power series ring over the Witt vectors, and X be a smooth proper scheme over R. The main goal of this article is to extend classical Fontaine-Messing theory to the setting where the base ring is R. In particular, we obtain comparison theorems between torsion crystalline cohomology of X/R and torsion \'etale cohomology in this setting.