Characterizations of standard derived equivalences of diagrams of dg categories and their gluings

Abstract

A diagram consisting of differential graded (dg for short) categories and dg functors is formulated in this paper as a colax functor X from a small category I to the 2-category k-dgCat of small dg categories, dg functors and dg natural transformations over a fixed commutative ring k. If I is a group regarded as a category with only one object *, then X is nothing but a colax action of the group I on the dg category X(*). In this sense, this X can be regarded as a generalization of a dg category with a colax action of a group. We define a notion of standard derived equivalence between such colax functors by generalizing the corresponding notion between dg categories with a group action. Our first main result gives some characterizations of this notion, one of which is given in terms of generalized versions of a tilting object and a quasi-equivalence. On the other hand, for such a colax functor X, the dg categories X(i) with i objects of I can be glued together to have a single dg category ∫I X, called the Grothendieck construction of X. Our second main result asserts that for such colax functors X and X', the Grothendieck construction ∫I X' is derived equivalent to ∫I X if there exists a standard derived equivalence from X' to X. These results generalize the first-named author's results to the dg case, respectively. Even for dg categories with group actions, these results are new. In particular, the second result gives a new tool to show the derived equivalence between the orbit categories of dg categories with group actions, which will be illustrated in some examples.