Atomic basis of quantum cluster algebra of type A2n-1,1

Abstract

Let Q be the affine quiver of type A2n-1,1 and Aq(Q) be the quantum cluster algebra associated to the valued quiver (Q,(2,2,…,2)). We prove some cluster multiplication formulas, and deduce that the cluster variables associated with vertices of Q satisfy a quantum analogue of the constant coefficient linear relations. We then construct two bar-invariant Z[q12]-bases B and S of Aq(Q) consisting of positive elements, and prove that B is an atomic basis.