Relative singularity categories, Gorenstein objects and silting theory

Abstract

We study singularity categories through Gorenstein objects in triangulated categories and silting theory. Let ω be a semi-selforthogonal (or presilting) subcategory of a triangulated category T. We introduce the notion of ω-Gorenstein objects, which is far extended version of Gorenstein projective modules and Gorenstein injective modules in triangulated categories. We prove that the stable category Gω, where Gω is the subcategory of all ω-Gorenstein objects, is a triangulated category and it is, under some conditions, triangle equivalent to the relative singularity category of T with respect to ω.