A characterization of modules over dg-representations of small categories

Abstract

Let C be a small category and let R be a dg-representation of the category C, that is, a pseudofunctor from a small category to the category of small dg k-categories, where k is a commutative unital ring. In this paper, we mainly study the category Mod- R of right modules over R. We characterize it as an ordinary category of dg-modules over a (differential graded) dg-category Gr(R), where Gr(R) is the linear Grothendieck construction of R. This characterization generalizes the Theorem 3.18 of the paper (S. Estrada and S. Virili. Cartesian modules over representations of small categories. Adv. in Math. 310: 557-609, 2017) of Estrada and Virili to the dg-category context. Furthermore, as some applications of the main characterization theorem, we classify the hereditary torsion pairs, (split) TTF triples and Abelian recollements in Mod- R respectively.