On Krull-Gabriel dimension of cluster repetitive categories and cluster-tilted algebras

Abstract

Assume that K is an algebraically closed field and denote by KG(R) the Krull-Gabriel dimension of R, where R is a locally bounded K-category (or a bound quiver K-algebra). Assume that C is a tilted K-algebra and C,C,C are the associated repetitive category, cluster repetitive category and cluster-tilted algebra, respectively. Our first result states that KG(C)=KG(C)≤ KG(C). Since the Krull-Gabriel dimensions of tame locally support-finite repetitive categories are known, we further conclude that KG(C)=KG(C)=KG(C)∈\0,2,∞\. Finally, in the Appendix Grzegorz Bobi\'nski presents a different way of determining the Krull-Gabriel dimension of the cluster-tilted algebras, by applying results of Geigle.