Cofiniteness of local cohomology modules for ideals of dimension one

Abstract

Let R denote a commutative Noetherian (not necessarily local) ring, M an arbitrary R-module and I an ideal of R of dimension one. It is shown that the R-module iR(R/I,M) is finitely generated (resp. weakly Laskerian) for all i≤ cd(I,M)+1 if and only if the local cohomology module HiI(M) is I-cofinite (resp. I-weakly cofinite) for all i. Also, we show that when I is an arbitrary ideal and M is finitely generated module such that the R-module HiI(M) is weakly Laskerian for all i≤ t-1, then HiI(M) is I-cofinite for all i≤ t-1 and for any minimax submodule K of HtI(M), the R-modules R(R/I, HtI(M)/K) and 1R(R/I, HtI(M)/K) are finitely generated, where t is a non-negative integer. This generalizes the main result of Bahmanpour-Naghipour BN and Brodmann and Lashgari BL.