Prismatic crystals for smooth schemes in characteristic p with Frobenius lifting mod p2

Abstract

Let (A,(p)) be a crystalline prism with An = A/pn+1A for all n≥ 0. Let 0 be a smooth scheme over A0. Suppose that 0 admits a lifting n over An and the absolute Frobenius _0:0 0 admits a lifting over A1. Then we show that there is an equivalence between the category of the prismatic crystals of truncation n on (0/A) and the category of p-connections over n, which is compatible with cohomologies. This generalises a previous work of Ogus. We also give some remarks on trivializing the Hodge--Tate gerbe π_0 HT:0 HT0 introduced by Bhatt--Lurie.