Strongly flat modules via universal localization

Abstract

In this paper, we investigate a non-commutative version of strongly flat modules, which is based on the concept of universal localization introduced by Cohn. We consider a set σ consisting of maps of finitely generated projective R-modules, where R is not necessarily a commutative ring. Let Rσ denote the universal localization of R with respect to σ. The class of σ-strongly flat modules is defined as the left class in the cotorsion pair generated by Rσ. We examine the homotopy category of σ-strongly flat modules and demonstrate that the thick subcategory Sσ, consisting of acyclic complexes, wherein all syzygies are σ-strongly flat, forms a precovering class within this homotopy category. This implies that the quotient map from K(σ-SF) to K(σ-SF)/Sσ always has a fully faithful right adjoint.