Triangulated categories with cluster-tilting subcategories

Abstract

Let be a triangulated category with a cluster tilting subcategory . We introduce the notion of [1]-cluster tilting subcategories (also called ghost cluster tilting subcategories) of , which are a generalization of cluster tilting subcategories. We first develop a basic theory on ghost cluster tilting subcategories. Secondly, we study links between ghost cluster tilting theory and τ-tilting theory: Inspired by the work of Iyama, Jrgensen and Yang ijy, we introduce the notion of τ-tilting subcategories and tilting subcategories of . We show that there exists a bijection between weak [1]-cluster tilting subcategories of and support τ-tilting subcategories of . Moreover, we figure out the subcategories of which correspond to cluster tilting subcategories of . This generalizes and improves several results by Adachi-Iyama-Reiten AIR, Beligiannis Be2, and Yang-Zhu YZ. Finally, we prove that the definition of ghost cluster tilting objects is equivalent to the definition of relative cluster tilting objects introduced by the first and the third author in YZ.