Covering theory, (mono)morphism categories and stable Auslander algebras

Abstract

Let A be a locally bounded k-category and G a torsion-free group of k-linear automorphisms of A acting freely on the objects of A, and F:A→ B is a Galois functor. We extend naturally the push-down functor Fλ to the functor HFλ:H(mod- A)→ H(mod- B), resp. S Fλ:S(mod- A)→ S(mod- B), between the corresponding morphism categories, resp. monomorphism categories, of mod- A and mod- B. Under some additional conditions, we show that H(mod-A), resp. S( mod-A), is locally bounded if and only if H(mod- B), resp. S(mod-B), is of finite representation type. As an application, we show that the stable Auslander algebra of a representation-finite selfinjective algebra is again representation-finite if and only if is of Dynkin type An with n≤slant 4.