Poisson geometry and Azumaya loci of cluster algebras

Abstract

There are two main types of objects in the theory of cluster algebras: the upper cluster algebras U with their Gekhtman-Shapiro-Vainshtein Poisson brackets and their root of unity quantizations U. On the Poisson side, we prove that (without any assumptions) the spectrum of every finitely generated upper cluster algebra U with its GSV Poisson structure always has a Zariski open orbit of symplectic leaves and give an explicit description of it. On the quantum side, we describe the fully Azumaya loci of the quantizations U under the assumption that A = U and U is a finitely generated algebra. All results allow frozen variables to be either inverted or not.