Gorenstein homological dimensions and Auslander categories

Abstract

In this paper, we study Gorenstein injective, projective, and flat modules over a Noetherian ring R. For an R-module M, we denote by GpdRM and GfdR M the Gorenstein projective and flat dimensions of M, respectively. We show that GpdRM<∞ if and only if GfdRM<∞ provided the Krull dimension of R is finite. Moreover, in the case that R is local, we correspond to a dualizing complex D of R, the classes A'(R) and B'(R) of R-modules. For a module M over a local ring R, we show that M∈ A'(R) if and only if GpdRM<∞ or equivalently GfdRM<∞. In dual situation by using the class B'(R), we provide a characterization of Gorenstein injective modules.

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