Cofiniteness and finiteness of associated prime ideals of generalized local cohomology modules

Abstract

Let n be a non-negative integer, R a commutative Noetherian ring, a an ideal of R, M and N two finitely generated R-modules, and X an arbitrary R-module. In this paper, we study cofiniteness and finiteness of associated prime ideals of generalized local cohomology modules. In some cases, we show that Hia(M,X) is an (FD<n,a)-cofinite R-module and \p∈AssR(Hia(M,X)):(R/p)≥n\ is a finite set for all i. If R is semi-local, we observe that AssR(Hia(M,N)) is finite for all i when R(M)≤3 or R(N)≤3. Also, in some situations, we prove that Hia(M,X) is an a-cofinite R-module for all i.