Grothendieck groups of triangulated categories via cluster tilting subcategories

Abstract

Let k be a field and C a k-linear, Hom-finite triangulated category with split idempotents. In this paper, we show that under suitable circumstances, the Grothendieck group of C, denoted K0(C), can be expressed as a quotient of the split Grothendieck group of a higher-cluster tilting subcategory of C. Assume that n≥ 2 is an even integer, C is n-Calabi Yau and has an n-cluster tilting subcategory T. Then, for every indecomposable M in T, there is an Auslander-Reiten (n+2)-angle in T of the form M→ Tn-1→…→ T0→ M and align* K0(C) K0sp(T)/ Σi=0n-1(-1)i[Ti] M∈T indecomposable . align* Assume now that d is a positive integer and C has a d-cluster tilting subcategory S closed under d-suspension. Then S is a so called (d+2)-angulated category whose Grothendieck group K0(S) can be defined as a certain quotient of K0sp(S). We will show align* K0(C) K0(S). align* Moreover, assume that n=2d, that all the above assumptions hold, and that T⊂eq S. Then our results can be combined to express K0(S) as a quotient of K0sp(T).