Rank n swapping algebra for PGLn Fock-Goncharov X moduli space

Abstract

The rank n swapping algebra is a Poisson algebra defined on the set of ordered pairs of points of the circle using linking numbers, whose geometric model is given by a certain subspace of (Kn × Kn*)r/GL(n,K). For any ideal triangulation of Dk---a disk with k points on its boundary, using determinants, we find an injective Poisson algebra homomorphism from the fraction algebra generated by the Fock--Goncharov coordinates for XPGLn,Dk to the rank n swapping multifraction algebra for r=k·(n-1) with respect to the (Atiyah--Bott--)Goldman Poisson bracket and the swapping bracket. This is the building block of the general surface case. Two such injective Poisson algebra homomorphisms related to two ideal triangulations T and T' are compatible with each other under the flips.