Auslander's defects over extriangulated categories: an application for the General Heart Construction

Abstract

The notion of extriangulated category was introduced by Nakaoka and Palu giving a simultaneous generalization of exact categories and triangulated categories. Our first aim is to provide an extension to extriangulated categories of Auslander's formula: for some extriangulated category C, there exists a localization sequence defCmodClexC, where lexC denotes the full subcategory of finitely presented left exact functors and defC the full subcategory of Auslander's defects. Moreover we provide a connection between the above localization sequence and the Gabriel-Quillen embedding theorem. As an application, we show that the general heart construction of a cotorsion pair (U,V) in a triangulated category, which was provided by Abe and Nakaoka, is same as the construction of a localization sequence defUmodUlexU.