Ratio coordinates for higher Teichm\"uller spaces
Abstract
We define new coordinates for Fock-Goncharov's higher Teichm\"uller spaces for a surface with holes, which are the moduli spaces of representations of the fundamental group into a reductive Lie group . Some additional data on the boundary leads to two closely related moduli spaces, the -space and the -space, forming a cluster ensemble. Fock and Goncharov gave nice descriptions of the coordinates of these spaces in the cases of and , together with Poisson structures. We consider new coordinates for higher Teichm\"uller spaces given as ratios of the coordinates of the -space for , which are generalizations of Kashaev's ratio coordinates in the case . Using Kashaev's quantization for , we suggest a quantization of the system of these new ratio coordinates, which may lead to a new family of projective representations of mapping class groups. These ratio coordinates depend on the choice of an ideal triangulation decorated with a distinguished corner at each triangle, and the key point of the quantization is to guarantee certain consistency under a change of such choices. We prove this consistency for , and for completeness we also give a full proof of the presentation of Kashaev's groupoid of decorated ideal triangulations.
Cite
@article{arxiv.1407.3074,
title = {Ratio coordinates for higher Teichm\"uller spaces},
author = {Hyun Kyu Kim},
journal= {arXiv preprint arXiv:1407.3074},
year = {2020}
}
Comments
42 pages, 6 figures