Conditional Hardness for Approximate Coloring
Abstract
We study the coloring problem: Given a graph G, decide whether or , where c(G) is the chromatic number of G. We derive conditional hardness for this problem for any constant . For , our result is based on Khot's 2-to-1 conjecture [Khot'02]. For , we base our hardness result on a certain `fish shaped' variant of his conjecture. We also prove that the problem almost coloring is hard for any constant , assuming Khot's Unique Games conjecture. This is the problem of deciding for a given graph, between the case where one can 3-color all but a fraction of the vertices without monochromatic edges, and the case where the graph contains no independent set of relative size at least . Our result is based on bounding various generalized noise-stability quantities using the invariance principle of Mossel et al [MOO'05].
Cite
@article{arxiv.cs/0504062,
title = {Conditional Hardness for Approximate Coloring},
author = {Irit Dinur and Elchanan Mossel and Oded Regev},
journal= {arXiv preprint arXiv:cs/0504062},
year = {2007}
}