English

A Quantitative Steinitz Theorem for Plane Triangulations

Combinatorics 2013-11-05 v1 Computational Geometry Discrete Mathematics

Abstract

We give a new proof of Steinitz's classical theorem in the case of plane triangulations, which allows us to obtain a new general bound on the grid size of the simplicial polytope realizing a given triangulation, subexponential in a number of special cases. Formally, we prove that every plane triangulation GG with nn vertices can be embedded in R2\mathbb{R}^2 in such a way that it is the vertical projection of a convex polyhedral surface. We show that the vertices of this surface may be placed in a 4n3×8n5×ζ(n)4n^3 \times 8n^5 \times \zeta(n) integer grid, where ζ(n)(500n8)τ(G)\zeta(n) \leq (500 n^8)^{\tau(G)} and τ(G)\tau(G) denotes the shedding diameter of GG, a quantity defined in the paper.

Keywords

Cite

@article{arxiv.1311.0558,
  title  = {A Quantitative Steinitz Theorem for Plane Triangulations},
  author = {Igor Pak and Stedman Wilson},
  journal= {arXiv preprint arXiv:1311.0558},
  year   = {2013}
}

Comments

25 pages, 6 postscript figures

R2 v1 2026-06-22T02:00:04.321Z