Foxby equivalence relative to $C$-weak injective and $C$-weak flat modules

TL;DR

This paper introduces $C$-weak flat and $C$-weak injective modules to extend the Foxby equivalence between Auslander and Bass classes, providing new characterizations and exploring their stability and Gorenstein injective modules.

Contribution

It generalizes $C$-flat and $C$-injective modules to $C$-weak variants, enhancing understanding of Foxby equivalence and module class stability.

Findings

Established $C$-weak flat and $C$-weak injective modules as generalizations.

Provided alternative characterizations of Auslander and Bass classes.

Explored the relationship between Bass class and Gorenstein injective modules.

Abstract

Let $S$ and $R$ be rings and $_SC_R$ a (faithfully) semidualizing bimodule. We introduce and study $C$-weak flat and $C$-weak injective modules as a generalization of $C$-flat and $C$-injective modules (J. Math. Kyoto Univ. 47(2007), 781-808) respectively, and use them to provide additional information concerning the important Foxby equivalence between the subclasses of the Auslander class $\mathcal{A}_C(R)$ and that of the Bass class $\mathcal{B}_C(S)$. Then we study the stability of Auslander and Bass classes, which enables us to give some alternative characterizations of the modules in $\mathcal{A}_C(R)$ and $\mathcal{B}_C(S)$. Finally we consider an open question which is closely relative to the main results (Proc. Edinb. Math. Soc. 48(2005), 75-90), and discuss the relationship between the Bass class $\mathcal{B}_C(S)$ and the class of Gorenstein injective modules.