Irreducible morphisms and locally finite dimensional representations

Abstract

Let A be a Hom-finite additive Krull-Schmidt k-category where k is an algebraically closed field. Let mod A denote the category of locally finite dimensional A-modules, that is, the category of covariant functors A mod k. We prove that an irreducible monomorphism in mod A has a finitely generated cokernel, and that an irreducible epimorphism in mod A has a finitely co-generated kernel. Using this, we get that an almost split sequence in mod A has to start with a finitely co-presented module and end with a finitely presented one. Finally, we apply our results in the study of rep(Q), the category of locally finite dimensional representations of a strongly locally finite quiver. We describe all possible shapes of the Auslander-Reiten quiver of rep(Q).