Divided prismatic Frobenius crystals of small height and the category MF

Abstract

Let X be a smooth p-adic formal scheme over a mixed characteristic complete discrete valuation ring OK with perfect residue field. We introduce a general category MF[0, p-2]tor-free(X) of p-torsion free crystalline coefficient objects and show that this category is equivalent to the category of completed prismatic Frobenius crystals of height p-2, recently introduced by Du-Liu-Moon-Shimizu. In particular this shows that the category MFtor-free[0, p-2](X) is equivalent to the category of crystalline Zp-local systems on X with Hodge-Tate weights in \0,… , p-2\, which generalizes the crystalline part of a theorem of Breuil-Liu to higher dimensions.