Rigid connections and F-isocrystals

Abstract

An irreducible integrable connection (E,∇) on a smooth projective complex variety X is called rigid if it gives rise to an isolated point of the corresponding moduli space MdR(X). According to Simpson's motivicity conjecture, irreducible rigid flat connections are of geometric origin, that is, arise as subquotients of a Gau-Manin connection of a family of smooth projective varieties defined on an open dense subvariety of X. In this article we study mod p reductions of irreducible rigid connections and establish results which confirm Simpson's prediction. In particular, for large p, we prove that p-curvatures of mod p reductions of irreducible rigid flat connections are nilpotent, and building on this result, we construct an F-isocrystalline realization for irreducible rigid flat connections. More precisely, we prove that there exist smooth models XR and (ER,∇R) of X and (E,∇), over a finite type ring R, such that for every Witt ring W(k) of a finite field k and every homomorphism R W(k), the p-adic completion of the base change (EW(k),∇W(k)) on XW(k) represents an F-isocrystal. Subsequently we show that irreducible rigid flat connections with vanishing p-curvatures are unitary. This allows us to prove new cases of the Grothendieck--Katz p-curvature conjecture. We also prove the existence of a complete companion correspondence for F-isocrystals stemming from irreducible cohomologically rigid connections.