Duals of semisimple Poisson-Lie groups and cluster theory of moduli spaces of G-local systems

Abstract

We study the dual G of a standard semisimple Poisson-Lie group G from a perspective of cluster theory. We show that the coordinate ring O( G) can be naturally embedded into a cluster Poisson algebra with a Weyl group action. We prove that O( G) admits a natural basis which has positive integer structure coefficients and satisfies an invariance property with respect to a braid group action. We continue the study of the moduli space P G,S of G-local systems introduced in GS3, and prove that the coordinate ring of P G, S coincides with its underlying cluster Poisson algebra.