English

Upper-bounding the k-colorability threshold by counting covers

Combinatorics 2017-11-29 v2 Discrete Mathematics

Abstract

Let G(n,m)G(n,m) be the random graph on nn vertices with mm edges. Let d=2m/nd=2m/n be its average degree. We prove that G(n,m)G(n,m) fails to be kk-colorable with high probability if d>2klnklnk1+ok(1)d>2k\ln k-\ln k-1+o_k(1). This matches a conjecture put forward on the basis of sophisticated but non-rigorous statistical physics ideas (Krzakala, Pagnani, Weigt 2004). The proof is based on applying the first moment method to the number of "covers", a physics-inspired concept. By comparison, a standard first moment over the number of kk-colorings shows that \gnm\gnm is not kk-colorable with high probability if d>2klnklnkd>2k\ln k-\ln k.

Keywords

Cite

@article{arxiv.1305.0177,
  title  = {Upper-bounding the k-colorability threshold by counting covers},
  author = {Amin Coja-Oghlan},
  journal= {arXiv preprint arXiv:1305.0177},
  year   = {2017}
}
R2 v1 2026-06-22T00:09:35.920Z