Higher-dimensional generalization of abelian categories via DG-categories

Abstract

In this paper, we introduce abelian n-truncated DG-categories as an n-dimensional analogue of abelian categories in the setting of DG-categories. When n=1, this recovers ordinary abelian categories, and when n=∞, it corresponds to stable DG-categories. This notion serves as a DG-categorical analogue of abelian (n,1)-categories in the context of (n,1)-categories. We show that the homotopy categories of abelian n-truncated DG-categories acquire the structure of extriangulated and pretriangulated categories. Furthermore, we develop a general theory of abelian n-truncated DG-categories, including the analogues of the existence epi-mono factorizations of morphisms, as in classical abelian categories.