Modules determined by their composition factors in higher homological algebra

Abstract

ABSTRACT. Let be a finite dimensional K-algebra and let C = mod\: be the abelian category of finitely generated right -modules. In their 1985 paper ``Modules determined by their composition factors'', Auslander and Reiten showed that under certain conditions modules in mod\: are determined by their composition factors, and show an important formula related to the Auslander-Reiten translation. Let T be a d-cluster tilting subcategory of C, which by definition is also d-abelian. In this paper we will define the Grothendieck group for a d-abelian category, and show that the Grothendieck groups of C and T are isomorphic. We show also that under certain conditions, the indecomposable objects of T are determined up to isomorphism by their composition factors in C. Finally, we generalise the formula from Auslander and Reiten involving the higher dimensional Auslander-Reiten translation.