An integral comparison of crystalline and de Rham cohomology

Abstract

Let OK be a mixed characteristic complete DVR with perfect residue field k and fraction field K. It is a celebrated result of Berthelot and Ogus that for a smooth proper formal scheme X/OK there exists a comparison between the de Rham cohomology groups HidR(X/OK) and the crystalline cohomology groups Hicrys(Xk/W(k)) of the special fibre, after tensoring with K. In this article, we use the stacky perspective on prismatic cohomology, due to Drinfeld and Bhatt--Lurie, to give a version of this comparison result with coefficients in a perfect complex of prismatic F-crystals on X. Our method is of an integral nature and suggests new tools to understand the relationship between torsion in de Rham and crystalline cohomology.