d-abelian quotients of (d+2)-angulated categories

Abstract

Let T be a triangulated category. If T is a cluster tilting object and I = [ add T ] is the ideal of morphisms factoring through an object of add T, then the quotient category T / I is abelian. This is an important result of cluster theory, due to Keller-Reiten and K\"onig-Zhu. More general conditions which imply that T / I is abelian were determined by Grimeland and the first author. Now let T be a suitable ( d+2 )-angulated category for an integer d ≥slant 1. If T is a cluster tilting object in the sense of Oppermann-Thomas and I = [ add T ] is the ideal of morphisms factoring through an object of add T, then we show that T / I is d-abelian. The notions of ( d+2 )-angulated and d-abelian categories are due to Geiss-Keller-Oppermann and Jasso. They are higher homological generalisations of triangulated and abelian categories, which are recovered in the special case d = 1. We actually show that if = End T T is the endomorphism algebra of T, then T / I is equivalent to a d-cluster tilting subcategory of mod in the sense of Iyama; this implies that T / I is d-abelian. Moreover, we show that is a d-Gorenstein algebra. More general conditions which imply that T / I is d-abelian will also be determined, generalising the triangulated results of Grimeland and the first author.