Recurrence formula, positivity and polytope basis in cluster algebras via Newton polytopes

Abstract

In this paper, we study the Newton polytopes of F-polynomials in a TSSS cluster algebra A and generalize them to a larger set consisting of polytopes Nh associated to vectors h∈n as well as P consisting of polytope functions h corresponding to Nh. The main contribution contains that (i) obtaining a recurrence construction of the Laurent expression of a cluster variable in a cluster from its g-vector; (ii) proving the subset P of P consisting of Laurent polynomials in P is a strongly positive Trop(Y)-basis for U() consisting of certain universally indecomposable Laurent polynomials when is a cluster algebra with principal coefficients. For a cluster algebra A over arbitrary semifield P in general, P is a strongly positive -basis for the intermediate cluster subalgebra IP(A) of U(A). We call P the polytope basis; (iii) constructing some explicit maps among corresponding F-polynomials, g-vectors, d-vectors and cluster variables to characterize their relationship. Moreover, we give three applications of (i), (ii) and (iii) respectively.