Variable degeneracy of graphs with restricted structures
Abstract
Bernshteyn and Lee defined a new notion, weak degeneracy, which is slightly weaker than the ordinary degeneracy. It is proved that strictly -degenerate transversal is a common generalization of list coloring, -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 -cycles. We give structural results for each class of graphs, and prove each structure is reducible for weakly -degenerate and the existence of strictly -degenerate transversals. As consequences, these three classes of graphs are weakly -degenerate, and have a strictly -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