Laurent phenomenon and simple modules of quiver Hecke algebras

Abstract

We study consequences of a monoidal categorification of the unipotent quantum coordinate ring Aq(n(w)) together with the Laurent phenomenon of cluster algebras. We show that if a simple module S in the category Cw strongly commutes with all the cluster variables in a cluster [ C], then [S] is a cluster monomial in [ C ]. If S strongly commutes with cluster variables except exactly one cluster variable [Mk], then [S] is either a cluster monomial in [ C ] or a cluster monomial in μk([ C ]). We give a new proof of the fact that the upper global basis is a common triangular basis (in the sense of Fan Qin) of the localization Aq(n(w)) of Aq(n(w)) at the frozen variables. A characterization on the commutativity of a simple module S with cluster variables in a cluster [ C] is given in terms of the denominator vector of [S] with respect to the cluster [ C].