Cluster automorphism groups of cluster algebras of finite type

Abstract

We study the cluster automorphism group Aut(A) of a coefficient free cluster algebra A of finite type. A cluster automorphism of A is a permutation of the cluster variable set X that is compatible with cluster mutations. We show that, on the one hand, by the well-known correspondence between X and the almost positive root system ≥ -1 of the corresponding Dynkin type, the piecewise-linear transformations τ+ and τ- on ≥ -1 induce cluster automorphisms f+ and f- of A respectively; on the other hand, excepting type D2n,(n≥slant 2), all the cluster automorphisms of A are compositions of f+ and f-. For a cluster algebra of type D2n,(n≥slant 2), there exists exceptional cluster automorphism induced by a permutation of negative simple roots in ≥ -1, which is not a composition of τ+ and τ-. By using these results and folding a simply laced cluster algebra, we compute the cluster automorphism group for a non-simply laced finite type cluster algebra. As an application, we show that Aut(A) is isomorphic to the cluster automorphism group of the FZ-universal cluster algebra of A.