English

Variable degeneracy of graphs with restricted structures

Combinatorics 2022-07-05 v4

Abstract

Bernshteyn and Lee defined a new notion, weak degeneracy, which is slightly weaker than the ordinary degeneracy. It is proved that strictly ff-degenerate transversal is a common generalization of list coloring, LL-forested-coloring and DP-coloring. In this paper, we consider three classes of graphs, including planar graphs without any configuration in Fig. 2, toroidal graphs without any configuration in Fig. 5, and planar graphs without intersecting 55-cycles. We give structural results for each class of graphs, and prove each structure is reducible for weakly 33-degenerate and the existence of strictly ff-degenerate transversals. As consequences, these three classes of graphs are weakly 33-degenerate, and have a strictly ff-degenerate transversal. Then these three classes of graph have DP-paint number at most four, and have list vertex arboricity at most two. This greatly improve all the results in [2-4, 11-13, 16-18, 22, 25, 32, 34]. Furthermore, the first and the third classes of graphs have Alon-Tarsi number at most four.

Keywords

Cite

@article{arxiv.2112.09334,
  title  = {Variable degeneracy of graphs with restricted structures},
  author = {Qianqian Wang and Tao Wang and Xiaojing Yang},
  journal= {arXiv preprint arXiv:2112.09334},
  year   = {2022}
}

Comments

39 pages, 21 figures

R2 v1 2026-06-24T08:21:31.590Z