Prismatic crystals over the de Rham period sheaf

Abstract

Let OK be a mixed characteristic complete discrete valuation ring with perfect residue field. We study BdR+-crystals on the (log-) prismatic site of OK, which are crystals defined over the de Rham period sheaf. We first classify these crystals using certain log connections. By constructing a Sen--Fontaine theory for BdR+-representations over a Kummer tower, we further classify these crystals by (log-) nearly de Rham representations. In addition, we compare (log-) prismatic cohomology of these crystals with the corresponding Sen--Fontaine cohomology and Galois cohomology.