Generic Variables in Acyclic Cluster Algebras and Bases in Affine Cluster Algebras

Abstract

Let Q be a finite quiver without oriented cycles and A(Q) be the coefficient-free cluster algebra with initial seed (Q, u). Using the Caldero-Chapoton map, we introduce and investigate a family of generic variables in [ u 1] containing the cluster monomials of A(Q). The aim of these generic variables is to give an explicit new method for constructing -bases in the cluster algebra A(Q). If Q is an affine quiver with minimal imaginary root δ, we investigate differences between cluster characters associated to indecomposable representations of dimension vector δ. We define the notion of difference property which gives an explicit description of these differences. We prove in particular that this property holds for quivers of affine type A. When Q satisfies the difference property, we prove that generic variables span the cluster algebra A(Q). If A(Q) satisfies some gradability condition, we prove that generic variables are linearly independent over Z in A(Q). In particular, this implies that generic variables form a -basis in a cluster algebra associated to an affine quiver of type A.