Symplectic groupoid and cluster algebras

Abstract

We consider the symplectic groupoid of pairs (B,A) with A unipotent upper-triangular matrices and B∈ GLn being such that A=B A BT are also unipotent upper-triangular matrices. We explicitly solve this groupoid condition using Fock--Goncharov--Shen cluster variables and show that for B satisfying the standard semiclassical Lie--Poisson algebra, the matrices B, A, and A satisfy the closed Poisson algebra relations expressible in the r-matrix form. Identifying entries of A and A with geodesic functions for geodesics on the two halves of a closed Riemann surface of genus g=n-1 separated by the Markov element, we are able to construct the geodesic function GB ``dual'' to the Markov element. We thus obtain the complete cluster algebra description of Teichm\"uller space T2,0 of genus two. We discuss also the generalization of our construction for higher genera. For genus larger than three we need a Hamiltonian reduction based on the rank condition rank\,( A+ AT) 4; we present the example of such a reduction for T4,0.