The k-Colorable Unit Disk Cover Problem

Abstract

We consider the k-Colorable Discrete Unit Disk Cover (k-CDUDC) problem as follows. Given a parameter k, a set P of n points, and a set D of m unit disks, both sets lying in the plane, the objective is to compute a set \(D'\subseteq D\) such that every point in P is covered by at least one disk in \(D'\) and there exists a function \(\chi :D'\rightarrow C\) that assigns colors to disks in \(D'\) such that for any d and \(d'\) in \(D'\) if \(d\cap d'\ne \emptyset \), then \(\chi (d)\ne \chi (d')\), where C denotes a set containing k distinct colors.

For the k-CDUDC problem, our proposed algorithms approximate the number of colors used in the coloring if there exists a k-colorable cover. We first propose a 4-approximation algorithm in \(O(m^{7k}n\log k)\) time for this problem, where k is a positive integer. The previous best known result for the problem when \(k=3\) is due to the recent work of Biedl et al. [Computational Geometry: Theory & Applications, 2021], who proposed a 2-approximation algorithm in \(O(m^{25}n)\) time. For \(k=3\), our algorithm runs in \(O(m^{21}n)\) time, faster than the previous best algorithm, but gives a 4-approximate result. We then generalize the above approach to yield a family of \(\rho \)-approximation algorithms in \(O(m^{\alpha k}n\log k)\) time, where \((\rho ,\alpha )\in \{(4, 7), (6,5), (7, 5), (9,4)\}\). We also extend our algorithm to solve the k-Colorable Line Segment Disk Cover (k-CLSDC) and k-Colorable Rectangular Region Cover (k-CRRC) problems, in which instead of the set P of n points, we are given a set S of n line segments, and a rectangular region \(\mathcal R\), respectively.