Noncommutative coordinates for symplectic representations
Abstract
We introduce coordinates on the spaces of framed and decorated representations of the fundamental group of a surface with nonempty boundary into the symplectic group . These coordinates provide a noncommutative generalization of the parametrizations of the spaces of representations into or given by Thurston, Penner, Kashaev, and Fock-Goncharov. On the space of decorated symplectic representations the coordinates give a geometric realization of the noncommutative cluster-like structures introduced by Berenstein-Retakh. The locus of positive coordinates maps to the space of framed maximal representations. We use this to determine an explicit homeomorphism between the space of framed maximal representations and a quotient by the group . This allows us to describe the homotopy type and, when , to give an exact description of the singularities. Along the way, we establish a complete classification of pairs of nondegenerate quadratic forms.
Cite
@article{arxiv.1911.08014,
title = {Noncommutative coordinates for symplectic representations},
author = {Daniele Alessandrini and Olivier Guichard and Eugen Rogozinnikov and Anna Wienhard},
journal= {arXiv preprint arXiv:1911.08014},
year = {2022}
}
Comments
124 pages, to appear in Memoirs of the AMS