English

Polytopes close to being simple

Combinatorics 2018-11-28 v3

Abstract

It is known that polytopes with at most two nonsimple vertices are reconstructible from their graphs, and that dd-polytopes with at most d2d-2 nonsimple vertices are reconstructible from their 2-skeletons. Here we close the gap between 2 and d2d-2, showing that certain polytopes with more than two nonsimple vertices are reconstructible from their graphs. In particular, we prove that reconstructibility from graphs also holds for dd-polytopes with d+kd+k vertices and at most dk+3d-k+3 nonsimple vertices, provided k5k\ge 5. For k4k\le4, the same conclusion holds under a slightly stronger assumption. Another measure of deviation from simplicity is the {\it excess degree} of a polytope, defined as ξ(P):=2f1df0\xi(P):=2f_1-df_0, where fkf_k denotes the number of kk-dimensional faces of the polytope. Simple polytopes are those with excess zero. We prove that polytopes with excess at most d1d-1 are reconstructible from their graphs, and this is best possible. An interesting intermediate result is that dd-polytopes with less than 2d2d vertices, and at most d1d-1 nonsimple vertices, are necessarily pyramids.

Keywords

Cite

@article{arxiv.1704.00854,
  title  = {Polytopes close to being simple},
  author = {Guillermo Pineda-Villavicencio and Julien Ugon and David Yost},
  journal= {arXiv preprint arXiv:1704.00854},
  year   = {2018}
}

Comments

17 pages

R2 v1 2026-06-22T19:06:49.929Z