The well-separated pair decomposition for balls
Abstract
Given a real number , a geometric -spanner is a geometric graph for a point set in 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 . An imprecise point set is modeled by a set of regions in . If one chooses a point in each region of , then the resulting point set is called a precise instance of~. An imprecise -spanner for an imprecise point set is a graph such that for each precise instance of , graph , where is the set of edges corresponding to , is a -spanner. In this paper, we show that, given a real number , there is an imprecise point set of straight-line segments in the plane such that any imprecise -spanner for has edges. Then, we propose an algorithm that computes a Well-Separated Pair Decomposition (WSPD) of size for a set of pairwise disjoint -dimensional balls with arbitrary sizes. Given a real number and given a set of pairwise disjoint -balls with arbitrary sizes, we use this WSPD to compute in time an imprecise -spanner with 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}
}