Cluster algebras arising from cluster tubes II: the Caldero-Chapoton map

Abstract

We continue our investigation on cluster algebras arising from cluster tubes. Let C be a cluster tube of rank n+1. For an arbitrary basic maximal rigid object T of C, one may associate a skew-symmetrizable integer matrix BT and hence a cluster algebra A(BT) to T. We define an analogue Caldero-Chapoton map XMT for each indecomposable rigid object M∈ C and prove that X?T yields a bijection between the indecomposable rigid objects of C and the cluster variables of the cluster algebra A(BT). The construction of the Caldero-Chapoton map involves Grassmanians of locally free submodules over the endomorphism algebra of T. We also show that there is a non-trivial C×-action on the Grassmanians of locally free submodules, which is of independent interest.