F-adjunction

Abstract

In this paper we study singularities defined by the action of Frobenius in characteristic $p > 0$. We prove results analogous to inversion of adjunction along a center of log canonicity. For example, we show that if $X$ is a Gorenstein normal variety then to every normal center of sharp $F$-purity $W \subseteq X$ such that $X$ is $F$-pure at the generic point of $W$, there exists a canonically defined \bQ-divisor $\Delta_{W}$ on $W$ satisfying (K_X)|_W \sim_{\bQ} K_{W} + \Delta_{W}. Furthermore, the singularities of $X$ near $W$ are "the same" as the singularities of $(W, \Delta_{W})$. As an application, we show that there are finitely many subschemes of a quasi-projective variety that are compatibly split by a given Frobenius splitting. We also reinterpret Fedder's criterion in this context, which has some surprising implications.Comment: 31 pages; to appear in Algebra and Number Theory. Typos corrected, presentation improved throughout. Section 7 subdivided into two sections (7 and 8). The proofs of 4.8, 5.8 and 9.5 improve