English

The list-coloring function of signed graphs

Combinatorics 2022-07-13 v1

Abstract

It is known that, for any kk-list assignment LL of a graph GG, the number of LL-list colorings of GG is at least the number of the proper kk-colorings of GG when k>(m1)/ln(1+2)k>(m-1)/\ln(1+\sqrt{2}). In this paper, we extend the Whitney's broken cycle theorem to LL-colorings of signed graphs, by which we show that if k>(m3)+(m4)+m1k> \binom{m}{3}+\binom{m}{4}+m-1 then, for any kk-assignment LL, the number of LL-colorings of a signed graph Σ\Sigma with mm edges is at least the number of the proper kk-colorings of Σ\Sigma. Further, if LL is 00-free (resp., 00-included) and kk is even (resp., odd), then the lower bound (m3)+(m4)+m1\binom{m}{3}+\binom{m}{4}+m-1 for kk can be improved to (m1)/ln(1+2)(m-1)/\ln(1+\sqrt{2}).

Keywords

Cite

@article{arxiv.2207.05262,
  title  = {The list-coloring function of signed graphs},
  author = {Sumin Huang and Jianguo Qian and Wei Wang},
  journal= {arXiv preprint arXiv:2207.05262},
  year   = {2022}
}

Comments

13 pages

R2 v1 2026-06-25T00:49:59.823Z