Associated primes of local cohomology modules of weakly Laskerian modules

Abstract

The notion of weakly Laskerian modules was introduced recently by the authors. Let R be a commutative Noetherian ring with identity, an ideal of R, and M a weakly Laskerian module. It is shown that if is principal, then the set of associated primes of the local cohomology module Hi(M) is finite for all i≥ 0. We also prove that when R is local, then R(Hi(M)) is finite for all i≥ 0 in the following cases: (1) R≤ 3, (2) R/≤ 1, (3) M is Cohen-Macaulay and for any ideal , with l=(,M), R(R/,Hl+1(M)) is weakly Laskerian.

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