Artinianness of local cohomology modules of ZD-modules

Abstract

This paper centers around Artinianness of the local cohomology of ZD-modules. Let be an ideal of a commutative Noetherian ring R. The notion of -relative Goldie dimension of an R-module M, as a generalization of that of Goldie dimension is presented. Let M be a ZD-module such that -relative Goldie dimension of any quotient of M is finite. It is shown that if R/=0, then the local cohomology modules Hi(M) are Artinian. Also, it is proved that if d= M is finite, then Hd(M) is Artinian, for any ideal of R . These results extend the previously known results concerning Artinianness of local cohomology of finitely generated modules.

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