Representations of generalized linear Reedy categories and abelian model structures

Abstract

In this paper we consider representations of generalized k-linear Reedy categories C, a common generalization of k-linear Reedy categories introduced by Georgiois-St'ov\'cek and k-linearizations of generalized Reedy categories introduced by Berger-Moerdijk, and construct abelian model structures on C -Mod. In the first part, we show that C can be viewed as an infinite categorical analogue of standardly stratified algebras. Explicitly, we give a parameterization of irreducible representations of C -Mod, provide several sufficient criteria such that C -Mod is equivalent to the Cartesian product of module categories over the ``local" endomorphism algebras of C, and describe applications of these results to representation theory of some interesting combinatorial categories including categories of spans and the category of finite dimensional vector spaces over a finite field and linear maps. In the second part, using the technique of Grothendieck bifibrations, we glue a family of complete cotorsion pairs in the module categories of these ``local" endomorphism algebras to a complete cotorsion pair in C -Mod, and deduce that under certain mild conditions a family of abelian model structures on these ``local" module categories can be glued to an abelian model structure on C -Mod. As applications, we obtain a few abelian model structures on generalized k-linear direct or inverse categories.