Tighter inapproximability for set cover
Abstract
Set Cover is a classic NP-hard problem; as shown by Slav\'{i}k (1997) the greedy algorithm gives an approximation ratio of . A series of works by Lund \& Yannakakis (1994), Feige (1998), Moshkovitz (2015) have shown that, under the assumption , it is impossible to obtain a polynomial-time approximation ratio with approximation ratio , for any constant . In this note, we show that under the Exponential Time Hypothesis (a stronger complexity-theoretic assumptions than ), there are no polynomial-time algorithms achieving approximation ratio , where is some universal constant. Thus, the greedy algorithm achieves an essentially optimal approximation ratio (up to the coefficient of ).
Cite
@article{arxiv.1612.01610,
title = {Tighter inapproximability for set cover},
author = {David G. Harris},
journal= {arXiv preprint arXiv:1612.01610},
year = {2017}
}
Comments
We discovered that these results have already appeared in Dinur & Steurer, "Analytical approach to parallel repetition."