A Local Search-Based Approach for Set Covering
Abstract
In the Set Cover problem, we are given a set system with each set having a weight, and we want to find a collection of sets that cover the universe, whilst having low total weight. There are several approaches known (based on greedy approaches, relax-and-round, and dual-fitting) that achieve a approximation for this problem, where the size of each set is bounded by . Moreover, getting a approximation is hard. Where does the truth lie? Can we close the gap between the upper and lower bounds? An improvement would be particularly interesting for small values of , which are often used in reductions between Set Cover and other combinatorial optimization problems. We consider a non-oblivious local-search approach: to the best of our knowledge this gives the first -approximation for Set Cover using an approach based on local-search. Our proof fits in one page, and gives a integrality gap result as well. Refining our approach by considering larger moves and an optimized potential function gives an -approximation, improving on the previous bound of (\emph{R.\ Hassin and A.\ Levin, SICOMP '05}) based on a modified greedy algorithm.
Cite
@article{arxiv.2211.04444,
title = {A Local Search-Based Approach for Set Covering},
author = {Anupam Gupta and Euiwoong Lee and Jason Li},
journal= {arXiv preprint arXiv:2211.04444},
year = {2022}
}
Comments
To appear in SOSA '23