Pseudoskew category algebras and modules over representations of small categories

Abstract

Let C be a small category and let R be a representation of the category C, that is, a pseudofunctor from a small category to the category of small preadditive categories. In this paper, we mainly study the category Mod- R of right modules over R. We characterize it both as a category of the Abelian group valued functors on Gr(R) and as a category of modules over a new family of algebras: the pseudoskew category algebras R[ C], where Gr(R) is the linear Grothendieck construction of R. Moreover, we also classify the hereditary torsion pairs in Mod- R and reprove 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.