Stability of Gorenstein flat categories with respect to a semidualizing module

Abstract

In this paper, we first introduce WF-Gorenstein modules to establish the following Foxby equivalence: @C=80pt G( F) AC(R) @<0.5ex>[r]CR- & G( WF) @<0.5ex>[l]HomR(C,-) where G( F), AC(R) and G( WF) denote the class of Gorenstein flat modules, the Auslander class and the class of WF-Gorenstein modules respectively. Then, we investigate two-degree WF-Gorenstein modules. An R-module M is said to be two-degree WF-Gorenstein if there exists an exact sequence G=∈dent ... G1 G0 G0 G1... in G( WF) such that M (G0→ G0) and that G is HomR( G( WF),-) and G( WF)+R- exact. We show that two notions of the two-degree WF-Gorenstein and the WF-Gorenstein modules coincide when R is a commutative GF-closed ring.