Frobenius split subvarieties pull back in almost all characteristics

Abstract

Let X and Y be schemes of finite type over Spec\ Z and let α: Y X be a finite map. We show the following holds for all sufficiently large primes p: If φ and are any splittings on X × Spec\ Fp and Y × Spec\ Fp, such that the restriction of α is compatible with φ and , and V is any compatibly split subvariety of (X × Spec\ Fp, φ), then the reduction α-1(V)red is a compatibly split subvariety of (Y × Spec\ Fp, ). This is meant as a tool to aid in listing the compatibly split subvarieties of various classically split varieties.