From angled triangulations to hyperbolic structures
Abstract
This survey paper contains an elementary exposition of Casson and Rivin's technique for finding the hyperbolic metric on a 3-manifold M with toroidal boundary. We also survey a number of applications of this technique. The method involves subdividing M into ideal tetrahedra and solving a system of gluing equations to find hyperbolic shapes for the tetrahedra. The gluing equations decompose into a linear and non-linear part. The solutions to the linear equations form a convex polytope A. The solution to the non-linear part (unique if it exists) is a critical point of a certain volume functional on this polytope. The main contribution of this paper is an elementary proof of Rivin's theorem that a critical point of the volume functional on A produces a complete hyperbolic structure on M.
Cite
@article{arxiv.1004.0440,
title = {From angled triangulations to hyperbolic structures},
author = {David Futer and François Guéritaud},
journal= {arXiv preprint arXiv:1004.0440},
year = {2011}
}
Comments
24 pages, 7 figures. Survey article to appear in the Contemporary Mathematics volume entitled "Interactions Between Hyperbolic Geometry, Quantum Topology, and Number Theory"