English

Many triangulated odd-spheres

Combinatorics 2016-03-10 v1 Geometric Topology

Abstract

It is known that the (2k1)(2k-1)-sphere has at most 2O(nklogn)2^{O(n^k \log n)} combinatorially distinct triangulations with nn vertices, for every k2k\ge 2. Here we construct at least 2Ω(nk)2^{\Omega(n^k)} such triangulations, improving on the previous constructions which gave 2Ω(nk1)2^{\Omega(n^{k-1})} in the general case (Kalai) and 2Ω(n5/4)2^{\Omega(n^{5/4})} for k=2k=2 (Pfeifle-Ziegler). We also construct 2Ω(nk1+1k)2^{\Omega\left(n^{k-1+\frac{1}{k}}\right)} geodesic (a.k.a. star-convex) nn-vertex triangualtions of the (2k1)(2k-1)-sphere. As a step for this (in the case k=2k=2) we construct nn-vertex 44-polytopes containing Ω(n3/2)\Omega(n^{3/2}) facets that are not simplices, or with Ω(n3/2)\Omega(n^{3/2}) edges of degree three.

Keywords

Cite

@article{arxiv.1408.3501,
  title  = {Many triangulated odd-spheres},
  author = {Eran Nevo and Francisco Santos and Stedman Wilson},
  journal= {arXiv preprint arXiv:1408.3501},
  year   = {2016}
}

Comments

This paper extends and subsumes arXiv:1311.1641, by two of the authors

R2 v1 2026-06-22T05:29:51.610Z