English

The Crossing Tverberg Theorem

Computational Geometry 2021-04-13 v2 Combinatorics

Abstract

Tverberg's theorem is one of the cornerstones of discrete geometry. It states that, given a set XX of at least (d+1)(r1)+1(d+1)(r-1)+1 points in Rd\mathbb R^d, one can find a partition X=X1XrX=X_1\cup \ldots \cup X_r of XX, such that the convex hulls of the XiX_i, i=1,,ri=1,\ldots,r, all share a common point. In this paper, we prove a strengthening of this theorem that guarantees a partition which, in addition to the above, has the property that the boundaries of full-dimensional convex hulls have pairwise nonempty intersections. Possible generalizations and algorithmic aspects are also discussed. As a concrete application, we show that any nn points in the plane in general position span n/3\lfloor n/3\rfloor vertex-disjoint triangles that are pairwise crossing, meaning that their boundaries have pairwise nonempty intersections; this number is clearly best possible. A previous result of Rebollar et al.\ guarantees n/6\lfloor n/6\rfloor pairwise crossing triangles. Our result generalizes to a result about simplices in Rd,d2\mathbb R^d,d\ge2.

Keywords

Cite

@article{arxiv.1812.04911,
  title  = {The Crossing Tverberg Theorem},
  author = {Radoslav Fulek and Bernd Gärtner and Andrey Kupavskii and Pavel Valtr and Uli Wagner},
  journal= {arXiv preprint arXiv:1812.04911},
  year   = {2021}
}

Comments

13 pages, 7 figures

R2 v1 2026-06-23T06:40:05.528Z