Ideal hyperbolic polyhedra and discrete uniformization
Abstract
We provide a constructive, variational proof of Rivin's realization theorem for ideal hyperbolic polyhedra with prescribed intrinsic metric, which is equivalent to a discrete uniformization theorem for spheres. The same variational method is also used to prove a discrete uniformization theorem of Gu et al. and a corresponding polyhedral realization result of Fillastre. The variational principles involve twice continuously differentiable functions on the decorated Teichm\"uller spaces of punctured surfaces, which are analytic in each Penner cell, convex on each fiber over , and invariant under the action of the mapping class group.
Cite
@article{arxiv.1707.06848,
title = {Ideal hyperbolic polyhedra and discrete uniformization},
author = {Boris Springborn},
journal= {arXiv preprint arXiv:1707.06848},
year = {2025}
}
Comments
41 pages, 14 figures. v2: stronger differentiability statement (C^2, was C^1), convexity holds only on fibers, error in Prop. 5.15 corrected. v3: added details to proof of Lemma 8.1, small changes in exposition. v4: final version