Crystalline prisms: Reflections and diffractions, present and past

Abstract

Let Y/S be a p-completely smooth morphism of p-torsion free p-adic formal schemes endowed with a Frobenius lift, and let Y/ S denote its reduction modulo p. We show that the category of crystals on the prismatic site of Y/S is equivalent to the category of OY-modules with integrable and quasi-nilpotent p-connection, and that the cohomology of such a crystal is computed by the associated p-de Rham complex. More generally, if X is a closed subscheme of Y, smooth over S, then the prismatic envelope X(Y) of X in Y admits such a p-connection, the category of prismatic crystals on X/S is equivalent to the category of O X(Y)-modules with compatible integrable and quasi-nilpotent p-connection, and the cohomology of such a crystal is again computed by its p-de Rham complex. We also give a geometric construction of the ``prismatic Sen operator.'' Namely, we show that a lifting of X (mod p2) in Y defines a vector field on the reduction modulo p of X(Y) and on a ``diffracted'' Higgs complex which calculates the mod p prismatic and de Rham cohomologies of X. Surprisingly, this complex is not the reduction modulo p of the afore-mentioned p-de Rham complexbut is rather its ``α-transform.'' As a consequence, we get a fairly explicit description of the action of the group scheme Gγ on R(X, X/S), Drinfeld's strengthening of the Deligne-Illusie decomposition theorem. We also explain how earlier work by several authors relating Higgs fields, p-connections, and connections can be placed in the prismatic context.