English

Conditional Hardness for Approximate Coloring

Computational Complexity 2007-05-23 v1 Probability

Abstract

We study the coloring problem: Given a graph G, decide whether c(G)qc(G) \leq q or c(G)Qc(G) \ge Q, where c(G) is the chromatic number of G. We derive conditional hardness for this problem for any constant 3q<Q3 \le q < Q. For q4q\ge 4, our result is based on Khot's 2-to-1 conjecture [Khot'02]. For q=3q=3, 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 \eps>0\eps>0, 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 \eps\eps fraction of the vertices without monochromatic edges, and the case where the graph contains no independent set of relative size at least \eps\eps. Our result is based on bounding various generalized noise-stability quantities using the invariance principle of Mossel et al [MOO'05].

Keywords

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}
}