A prime-characteristic analogue of a theorem of Hartshorne-Polini

Abstract

Let R be an F-finite Noetherian regular ring containing an algebraically closed field k of positive characteristic, and let M be an -finite -module over R in the sense of Lyubeznik (for example, any local cohomology module of R). We prove that the Fp-dimension of the space of -module morphisms M → E(R/) (where is any maximal ideal of R and E(R/) is the R-injective hull of R/) is equal to the k-dimension of the Frobenius stable part of R(M,E(R/)). This is a positive-characteristic analogue of a recent result of Hartshorne and Polini for holonomic -modules in characteristic zero. We use this result to calculate the -module length of certain local cohomology modules associated with projective schemes.