English

Toroidal graphs without $K_{5}^{-}$ and 6-cycles

Combinatorics 2025-02-25 v1

Abstract

Cai et al.\ proved that a toroidal graph GG without 66-cycles is 55-choosable, and proposed the conjecture that ch(G)=5\textsf{ch}(G) = 5 if and only if GG contains a K5K_{5} [J. Graph Theory 65 (2010) 1--15], where ch(G)\textsf{ch}(G) is the choice number of GG. However, Choi later disproved this conjecture, and proved that toroidal graphs without K5K_{5}^{-} (a K5K_{5} missing one edge) and 66-cycles are 44-choosable [J. Graph Theory 85 (2017) 172--186]. In this paper, we provide a structural description, for toroidal graphs without K5K_{5}^{-} and 66-cycles. Using this structural description, we strengthen Choi's result in two ways: (I) we prove that such graphs have weak degeneracy at most three (nearly 33-degenerate), and hence their DP-paint numbers and DP-chromatic numbers are at most four; (II) we prove that such graphs have Alon-Tarsi numbers at most 44. Furthermore, all of our results are sharp in some sense.

Keywords

Cite

@article{arxiv.2502.17133,
  title  = {Toroidal graphs without $K_{5}^{-}$ and 6-cycles},
  author = {Ping Chen and Tao Wang},
  journal= {arXiv preprint arXiv:2502.17133},
  year   = {2025}
}

Comments

15pages, 7 figures

R2 v1 2026-06-28T21:55:28.479Z