Higher-dimensional Auslander-Reiten theory on (d+2)-angulated categories

Abstract

Let C be a (d+2)-angulated category with d-suspension functor d. Our main results show that every Serre functor on C is a (d+2)-angulated functor. We also show that C has a Serre functor S if and only if C has Auslander--Reiten (d+2)-angles. Moreover, τd=S-d where τd is d-Auslander-Reiten translation. These results generalize work by Bondal-Kapranov and Reiten-Van den Bergh. As an application, we prove that for a strongly functorially finite subcategory X of C, the quotient category C/X is a (d+2)-angulated category if and only if (C,C) is an X-mutation pair, and if and only if τdX=X.