Associated primes of local cohomology of flat extensions with regular fibers and -finite D-modules

Abstract

In this article, we study the following question raised by Mel Hochster: let (R,m,K) be a local ring and S be a flat extension with regular closed fiber. Is (mS)S HiI(S) finite for every ideal I⊂ S and i∈ ? We prove that the answer is positive when S is either a polynomial or a power series ring over R and (R/I R)≤ 1. In addition, we analyze when this question can be reduced to the case where S is a power series ring over R. An important tool for our proof is the use of -finite D-modules, which are not necessarily finitely generated as D-modules, but whose associated primes are finite. We give examples of this class of D-modules and applications to local cohomology.