English

On the List Color Function Threshold

Combinatorics 2023-08-04 v2

Abstract

The chromatic polynomial of a graph GG, denoted P(G,m)P(G,m), is equal to the number of proper mm-colorings of GG. The list color function of graph GG, denoted P(G,m)P_{\ell}(G,m), is a list analogue of the chromatic polynomial that has been studied since the early 1990s, primarily through comparisons with the corresponding chromatic polynomial. It is known that for any graph GG there is a kNk \in \mathbb{N} such that P(G,m)=P(G,m)P_\ell(G,m) = P(G,m) whenever mkm \geq k. The list color function threshold of GG, denoted τ(G)\tau(G), is the smallest kχ(G)k \geq \chi(G) such that P(G,m)=P(G,m)P_{\ell}(G,m) = P(G,m) whenever mkm \geq k. In 2009, Thomassen asked whether there is a universal constant α\alpha such that for any graph GG, τ(G)χ(G)+α\tau(G) \leq \chi_{\ell}(G) + \alpha, where χ(G)\chi_{\ell}(G) is the list chromatic number of GG. We show that the answer to this question is no by proving that there exists a constant CC such that τ(K2,l)χ(K2,l)Cl\tau(K_{2,l}) - \chi_{\ell}(K_{2,l}) \ge C\sqrt{l} for l16l \ge 16.

Keywords

Cite

@article{arxiv.2202.03431,
  title  = {On the List Color Function Threshold},
  author = {Hemanshu Kaul and Akash Kumar and Jeffrey A. Mudrock and Patrick Rewers and Paul Shin and Khue To},
  journal= {arXiv preprint arXiv:2202.03431},
  year   = {2023}
}

Comments

11 pages

R2 v1 2026-06-24T09:24:49.109Z