Improved Bounds for Metric Capacitated Covering Problems
Abstract
In the Metric Capacitated Covering (MCC) problem, given a set of balls in a metric space with metric and a capacity parameter , the goal is to find a minimum sized subset and an assignment of the points in to the balls in such that each point is assigned to a ball that contains it and each ball is assigned with at most points. MCC achieves an -approximation using a greedy algorithm. On the other hand, it is hard to approximate within a factor of even with factor expansion of the balls. Bandyapadhyay~{et al.} [SoCG 2018, DCG 2019] showed that one can obtain an -approximation for the problem with factor expansion of the balls. An open question left by their work is to reduce the gap between the lower bound and the upper bound . In this current work, we show that it is possible to obtain an -approximation with only factor expansion of the balls. We also show a similar upper bound of for a more generalized version of MCC for which the best previously known bound was .
Keywords
Cite
@article{arxiv.2006.12454,
title = {Improved Bounds for Metric Capacitated Covering Problems},
author = {Sayan Bandyapadhyay},
journal= {arXiv preprint arXiv:2006.12454},
year = {2020}
}
Comments
To appear at European Symposia on Algorithms 2020