On flat and Gorenstein flat dimensions of local cohomology modules

Abstract

Let be an ideal of a Noetherian local ring R and let C be a semidualizing R-module. For an R-module X, we denote any of the quantities R X, R X and RX by (X). Let M be an R-module such that i(M)=0 for all i≠ n. It is proved that if (X)<∞, then (n(M))≤(M)+n and the equality holds whenever M is finitely generated. With the aid of these results, among other things, we characterize Cohen-Macaulay modules, dualizing modules and Gorenstein rings.