English

The well-separated pair decomposition for balls

Computational Geometry 2017-06-21 v1

Abstract

Given a real number t>1t>1, a geometric tt-spanner is a geometric graph for a point set in Rd\mathbb{R}^d with straight lines between vertices such that the ratio of the shortest-path distance between every pair of vertices in the graph (with Euclidean edge lengths) to their actual Euclidean distance is at most tt. An imprecise point set is modeled by a set RR of regions in Rd\mathbb{R}^d. If one chooses a point in each region of RR, then the resulting point set is called a precise instance of~RR. An imprecise tt-spanner for an imprecise point set RR is a graph G=(R,E)G=(R,E) such that for each precise instance SS of RR, graph GS=(S,ES)G_S=(S,E_S), where ESE_S is the set of edges corresponding to EE, is a tt-spanner. In this paper, we show that, given a real number t>1t>1, there is an imprecise point set RR of nn straight-line segments in the plane such that any imprecise tt-spanner for RR has Ω(n2)\Omega(n^2) edges. Then, we propose an algorithm that computes a Well-Separated Pair Decomposition (WSPD) of size O(n){\cal O}(n) for a set of nn pairwise disjoint dd-dimensional balls with arbitrary sizes. Given a real number t>1t>1 and given a set of nn pairwise disjoint dd-balls with arbitrary sizes, we use this WSPD to compute in O(nlogn+n/(t1)d){\cal O}(n\log n+n/(t-1)^d) time an imprecise tt-spanner with O(n/(t1)d){\cal O}(n/(t-1)^d) edges for balls.

Keywords

Cite

@article{arxiv.1706.06287,
  title  = {The well-separated pair decomposition for balls},
  author = {Abolfazl Poureidi and Mohammad Farshi},
  journal= {arXiv preprint arXiv:1706.06287},
  year   = {2017}
}
R2 v1 2026-06-22T20:23:34.210Z