On the associated primes of generalized local cohomology modules

Abstract

Let be an ideal of a commutative Noetherian ring R with identity and let M and N be two finitely generated R-modules. Let t be a positive integer. It is shown that R(Ht(M,N)) is contained in the union of the sets R(Ri(M,Ht-i(N))), where 0≤ i≤ t. As an immediate consequence, it follows that if either Hi(N) is finitely generated for all i<t or R(Hi(N)) is finite for all i<t, then R(Ht(M,N)) is finite. Also, we prove that if d=(M) and n=(N) are finite, then Hd+n(M,N) is Artinian. In particular, R(Hd+n(M,N)) is a finite set consisting of maximal ideals.

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