The local cohomology of a parameter ideal with respect to an arbitrary ideal

Abstract

Let R be a regular ring, let J be an ideal generated by a regular sequence of codimension at least 2, and let I be an ideal containing J. We give an example of a module H3I(J) with infinitely many associated primes, answering a question of Hochster and N\'u\~nez-Betancourt in the negative. In fact, for i≤ 4, we show that under suitable hypotheses on R/J, Ass\,HiI(J) is finite if and only if Ass\,Hi-1I(R/J) is finite. Our proof of this statement involves a novel generalization of an isomorphism of Hellus, which may be of some independent interest. The finiteness comparison between Ass\, HiI(J) and Ass\, Hi-1I(R/J) tends to improve as our hypotheses on R/J become more restrictive. To illustrate the extreme end of this phenomenon, at least in the prime characteristic p>0 setting, we show that if R/J is regular, then Ass\, HiI(J) is finite for all i≥ 0.