The rigidity of filtered colimits of n-cluster tilting subcategories

Abstract

Let be an artin algebra and M be an n-cluster tilting subcategory of -mod with n 2. From the viewpoint of higher homological algebra, a question that naturally arose in [17] is when M induces an n-cluster tilting subcategory of -Mod. In this paper, we answer this question and explore its connection to Iyama's question on the finiteness of n-cluster tilting subcategories of -mod. In fact, our theorem reformulates Iyama's question in terms of the vanishing of Ext; and highlights its relation with the rigidity of filtered colimits of M. Also, we show that Add(M) is an n-cluster tilting subcategory of -Mod if and only if Add(M) is a maximal n-rigid subcategory of -Mod if and only if X∈ -Mod~|~ Exti(M,X)=0 ~~~ for ~all~ 0<i<n ⊂eq Add(M) if and only if M is of finite type if and only if Ext1(M, M)=0. Moreover, we present several equivalent conditions for Iyama's question which shows the relation of Iyama's question with different subjects in representation theory such as purity and covering theory.