Triangular Matrix Categories II: Recollements and functorially finite subcategories

Abstract

In this paper we continue the study of triangular matrix categories =[ smallmatrix T & 0 \\ M & U smallmatrix] initiated in [21]. First, given an additive category C and an ideal IB in C, we prove a well known result that there is a canonical recollement Mod(C/IB)[r] & Mod(C)[r]@<-1ex>[l]@<1ex>[l] & Mod(B)@<-1ex>[l]@<1ex>[l]. We show that given a recollement between functor categories we can induce a new recollement between triangular matrix categories, this is a generalization of a result given by Chen and Zheng in [11, theorem 4.4]. In the case of dualizing K-varieties we can restrict the recollement we obtained to the categories of finitely presented functors. Given a dualizing variety C, we describe the maps category of mod(C) as modules over a triangular matrix category and we study its Auslander-Reiten sequences and contravariantly finite subcategories, in particular we generalize several results from [24]. Finally, we prove a generalization of a result due to Smal ([35, Theorem 2.1]), which give us a way of construct functorially finite subcategories in the category Mod([ smallmatrix T & 0 \\ M & U smallmatrix]) from those of Mod(T) and Mod(U).