Relative Gorenstein flat modules and Foxby classes and their model structures

Abstract

A model structure on a category is a formal way of introducing a homotopy theory on that category, and if the model structure is abelian and hereditary, its homotopy category is known to be triangulated. So a good way to both build and model a triangulated category is to build a hereditary abelian model structure. Given a ring R and a (non necessarily semidualizing) left R-module C, we introduce and study new concepts of relative Gorenstein cotorsion and cotorsion modules: GC-cotorsion and (strongly) CC-cotorsion. As an application, we prove that there is a unique hereditary abelian model structure on the category of left R-modules, in which the cofibrations are the monomorphisms with GC-flat cokernel and the fibrations are the epimorphisms with CC-cotorsion kernel belonging to the Bass class BC(R). In the second part, when C is a semidualizing (R,S)-bimodule, we investigate the existence of abelian model structures on the category of left (resp., right) R-modules where the cofibrations are the epimorphisms (resp., monomorphisms) with kernel (resp., cokernel) belonging to the Bass (resp., Auslander) class BC(R) (resp., AC(R)). We also study the class of GC-flat modules and the Bass class from the Auslander-Buchweitz approximation theory point of view. We show that they are part of weak AB-contexts. As the concept of weak AB-context can be dualized, we also give dual results that involve the class of GC-cotorsion modules and the Auslander class.

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