English

On Small Pair Decompositions for Point Sets

Computational Geometry 2026-02-04 v2

Abstract

\newcommand{\Re}{\mathbb{R}}We study the minWSPD problem of computing the minimum-size well-separated pairs decomposition of a set of points, and show constant approximation algorithms in low-dimensional Euclidean space and doubling metrics. This problem is computationally hard already 2\Re^2, and is also hard to approximate. We also introduce a new pair decomposition, removing the requirement that the diameters of the parts should be small. Surprisingly, we show that in a general metric space, one can compute such a decomposition of size O(nεlogn)O( \tfrac{n}{\varepsilon}\log n), which is dramatically smaller than the quadratic bound for WSPDs. In d\Re^d, the bound improves to O(dnεlog1ε)O( d \tfrac{n}{\varepsilon}\log \tfrac{1}{\varepsilon } ).

Keywords

Cite

@article{arxiv.2601.22728,
  title  = {On Small Pair Decompositions for Point Sets},
  author = {Kevin Buchin and Jacobus Conradi and Sariel Har-Peled and Antonia Kalb and Abhiruk Lahiri and Lukas Plätz and Carolin Rehs and Sampson Wong},
  journal= {arXiv preprint arXiv:2601.22728},
  year   = {2026}
}
R2 v1 2026-07-01T09:27:24.673Z