n-cluster tilting subcategories for radical square zero algebras

Abstract

We give a characterization of radical square zero bound quiver algebras k Q/J2 that admit n-cluster tilting subcategories and nZ-cluster tilting subcategories in terms of Q. We also show that if Q is not of cyclically oriented extended Dynkin type A, then the poset of n-cluster tilting subcategories of k Q/J2 with relation given by inclusion forms a lattice isomorphic to the opposite of the lattice of divisors of an integer which depends on Q.