Higher exact dg-categories

Abstract

We introduce the notion of an n-exact dg-category. This notion provides a higher analogue of Chen's exact dg-category, in the sense that the case where n equals 1 recovers exact dg-categories. We prove that, under a suitable vanishing condition on the cohomologies of Hom-complexes of an n-exact dg-category A, its homotopy category admits a natural n-exangulated structure. Thus n-exact dg-categories provide dg-enhancements of n-exangulated categories. At the same time, our framework can be regarded as a dg-categorical generalization of n-exangulated categories applicable even without the vanishing condition. In the latter part of the article, we show that an n-cluster tilting subcategory of an exact dg-category naturally carries the structure of an n-exact dg-category. This result indicates that n-exact dg-structures provide an intrinsic dg-categorical axiomatization of n-cluster tilting subcategories, highlighting the advantages of studying dg-generalizations of n-exangulated categories.