Non-abelianess of the category of modules over a sum-id bipresheaf of rings

Abstract

Let C be a small category, motivated by the definition of bisheaves of abelian groups of MacPherson and Patel (see the Definition 5.1 of the paper: R. MacPherson and A. Patel. Persistent local systems. Adv. in Math. 386: 107795, 2021), we first introduce the notions of bipresheaves of rings R on C and their module categories Mod- R. Then the linear Grothendieck construction Gr(R) of R is defined. With this linear Grothendieck construction, we show that the category of bipresheaves of modules over a sum-id bipresheaf of rings R can be characterized as the category of bipresheaves of abelian groups on Gr(R). It follows that the category Mod- R of modules over a sum-id bipresheaf of rings R is non-abelian.