English

Ideal hyperbolic polyhedra and discrete uniformization

Metric Geometry 2025-01-07 v4 Geometric Topology

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 Tg,n~\widetilde{\mathcal{T}_{g,n}} of punctured surfaces, which are analytic in each Penner cell, convex on each fiber over Tg,n\mathcal{T}_{g,n}, and invariant under the action of the mapping class group.

Keywords

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

R2 v1 2026-06-22T20:53:50.748Z