Counting the number of elements in the mutation classes of An-quivers

Abstract

In this article we prove explicit formulae for the number of non-isomorphic cluster-tilted algebras of type An in the derived equivalence classes. In particular, we obtain the number of elements in the mutation classes of quivers of type An. As a by-product, this provides an alternative proof for the number of quivers of Dynkin type Dn which was first determined by Buan and Torkildsen.