On the relative Cohen-Macaulay modules

Abstract

Let R be a commutative Noetherian local ring and let be a proper ideal of R. A non-zero finitely generated R-module M is called relative Cohen-Macaulay with respect to if there is precisely one non vanishing local cohomology modules i(M) of M. In this paper, as a main result, it is shown that if M is a Gorenstein R--module, then i(M)=0 for all i≠ c where c=M is completely encoded in homological properties of c(M), in particular in its Bass numbers. Notice that, this result provides a generalization of a result of M. Hellus and P. Schenzel which has been proved before, as a main result, in the case where M=R.