English

Two trees are better than one

Computational Geometry 2024-01-02 v2 Combinatorics

Abstract

We consider partitions of a point set into two parts, and the lengths of the minimum spanning trees of the original set and of the two parts. If w(P)w(P) denotes the length of a minimum spanning tree of PP, we show that every set PP of n12n \geq 12 points admits a bipartition P=RBP= R \cup B for which the ratio w(R)+w(B)w(P)\frac{w(R)+w(B)}{w(P)} is strictly larger than 11; and that 11 is the largest number with this property. Furthermore, we provide a very fast algorithm that computes such a bipartition in O(1)O(1) time and one that computes the corresponding ratio in O(nlogn)O(n \log{n}) time. In certain settings, a ratio larger than 11 can be expected and sometimes guaranteed. For example, if PP is a set of nn random points uniformly distributed in [0,1]2[0,1]^2 (nn \to \infty), then for any \eps>0\eps>0, the above ratio in a maximizing partition is at least 2\eps\sqrt2 -\eps with probability tending to 11. As another example, if PP is a set of nn points with spread at most αn\alpha \sqrt{n}, for some constant α>0\alpha>0, then the aforementioned ratio in a maximizing partition is 1+Ω(α2)1 + \Omega(\alpha^{-2}). All our results and techniques are extendable to higher dimensions.

Keywords

Cite

@article{arxiv.2312.09916,
  title  = {Two trees are better than one},
  author = {Adrian Dumitrescu and János Pach and Géza Tóth},
  journal= {arXiv preprint arXiv:2312.09916},
  year   = {2024}
}

Comments

2 figures, 11 pages

R2 v1 2026-06-28T13:52:35.896Z