Quaternionic Hyperbolic Fenchel-Nielsen Coordinates
Abstract
Let be the isometry group of the quaternionic hyperbolic plane . An element in is `hyperbolic' if it fixes exactly two points on the boundary of . We classify pairs of hyperbolic elements in up to conjugation. A hyperbolic element of is called `loxodromic' if it has no real eigenvalue. We show that the set of conjugation orbits of irreducible loxodromic pairs is a -bundle over a topological space that is locally a semi-analytic subspace of . We use the above classification to show that conjugation orbits of `geometric' representations of a closed surface group (of genus ) into can be determined by a system of real parameters. Further, we consider the groups and . These groups also act by the orientation-preserving isometries of the four and five dimensional real hyperbolic spaces respectively. We classify conjugation orbits of pairs of hyperbolic elements in these groups. These classifications determine conjugation orbits of `geometric' surface group representations into these groups.
Cite
@article{arxiv.1708.06044,
title = {Quaternionic Hyperbolic Fenchel-Nielsen Coordinates},
author = {Krishnendu Gongopadhyay and Sagar B. Kalane},
journal= {arXiv preprint arXiv:1708.06044},
year = {2018}
}
Comments
major structural revision. Restructured the exposition. Introduction re-written