Generic bases for cluster algebras and the Chamber Ansatz

Abstract

Let Q be a finite quiver without oriented cycles, and let be the corresponding preprojective algebra. Let g be the Kac-Moody Lie algebra with Cartan datum given by Q, and let W be its Weyl group. With w in W is associated a unipotent cell Nw of the Kac-Moody group with Lie algebra g. In previous work we proved that the coordinate ring [Nw] of Nw is a cluster algebra in a natural way. A central role is played by generating functions X of Euler characteristics of certain varieties of partial composition series of X, where X runs through all modules in a Frobenius subcategory Cw of the category of nilpotent -modules. We show that for every X in Cw, X coincides after appropriate changes of variables with the cluster characters of Fu and Keller associated with any cluster-tilting module T of Cw. As an application, we get a new description of a generic basis of the cluster algebra obtained from [Nw] via specialization of coefficients to 1. For the special case of coefficient-free acyclic cluster algebras this proves a conjecture by Dupont.