English

Heilbronn's triangle problem in three dimensions

Combinatorics 2025-10-31 v1 Classical Analysis and ODEs Metric Geometry

Abstract

We show that among any nn points in the unit cube one can find a triangle of area at most n2/3cn^{-2/3-c} for some absolute constant c>0c >0. This gives the first non-trivial upper bound for the three-dimensional version of Heilbronn's triangle problem. This estimate is a consequence of the following result about configurations of point-line pairs in R3\mathbb R^3: for n2n \ge 2 let p1,,pn[0,1]3p_1, \ldots,p_n \in [0,1]^3 be a collection of points and let i\ell_i be a line through pip_i for every ii such that d(pi,j)δd(p_i, \ell_j) \ge \delta for all iji\neq j. Then we have nδ3+γn \lesssim \delta^{-3+\gamma} for some absolute constant γ>0\gamma>0. The analogous result about point-line configurations in the plane was previously established by Cohen, Pohoata and the last author.

Keywords

Cite

@article{arxiv.2510.26644,
  title  = {Heilbronn's triangle problem in three dimensions},
  author = {Dominique Maldague and Hong Wang and Dmitrii Zakharov},
  journal= {arXiv preprint arXiv:2510.26644},
  year   = {2025}
}

Comments

34 pages

R2 v1 2026-07-01T07:14:06.997Z