Liftability of singularities and their Frobenius morphism modulo p2

Abstract

We investigate the W2(k)-liftability of singular schemes. We prove constructibility of the locus of W2(k)-liftable schemes in a flat family X S. Moreover, we construct an explicit W2(k)-lifting of a Frobenius split scheme X over a perfect field k, reproving Bhatt's existential result. Furthermore, we study existence of liftings of the Frobenius morphism. In particular, we prove that in dimension n ≥ 4 ordinary double points do not admit a W2(k)-lifting compatible with Frobenius, and that canonical surface singularities are Frobenius liftable. Combined with Bhatt's results, the latter result implies that the crystalline cohomology groups over k of surfaces with canonical singularities are not finite dimensional. As a corollary of our results, we provide a thorough comparison between the notions of W2(k)-liftability, Frobenius liftability and classical F-singularity types.