The homotopy category of monomorphisms between projective modules

Abstract

Let (S, ) be a commutative noetherian local ring and ω∈ be non-zerodivisor. This paper deals with the behavior of the category (ω, ) consisting of all monomorphisms between finitely generated projective S-modules with cokernels annihilated by ω. We introduce a homotopy category (ω, ), which is shown to be triangulated. It is proved that this homotopy category embeds into the singularity category of the factor ring R=S/(ω). As an application, not only the existence of almost split sequences ending at indecomposable non-projective objects of (ω, ) is proven, but also the Auslander-Reiten translation, τ(-), is completely recognized. Particularly, it will be observed that any non-projective object of (ω, ) with local endomorphism ring is invariant under the square of the Auslander-Reiten translation.