On (4,2)-Choosable Graphs
Abstract
A graph is called -choosable if for any list assignment which assigns to each vertex a set of permissible colours, there is a -tuple -colouring of . An -choosable graph is also called -choosable. In the pioneering paper on list colouring of graphs by Erd\H{o}s, Rubin and Taylor, -choosable graphs are characterized. Confirming a special case of a conjecture of Erd\H{o}s--Rubin--Taylor, Tuza and Voigt proved that -choosable graphs are -choosable for any positive integer . On the other hand, Voigt proved that if is an odd integer, then these are the only -choosable graphs; however, when is even, there are -choosable graphs that are not -choosable. A graph is called -choosable-critical if it is not -choosable, but all its proper subgraphs are -choosable. Voigt conjectured that for every positive integer , all bipartite -choosable-critical graphs are -choosable. In this paper, we determine which -choosable-critical graphs are -choosable, refuting Voigt's conjecture in the process. Nevertheless, a weaker version of the conjecture is true: we prove that there is an even integer such that for any positive integer , every bipartite -choosable-critical graph is -choosable. Moving beyond -choosable-critical graphs, we present an infinite family of non--choosable-critical graphs which have been shown by computer analysis to be -choosable. This shows that the family of all -choosable graphs has rich structure.
Cite
@article{arxiv.1404.6821,
title = {On (4,2)-Choosable Graphs},
author = {Jixian Meng and Gregory J. Puleo and Xuding Zhu},
journal= {arXiv preprint arXiv:1404.6821},
year = {2017}
}
Comments
18 pages, 8 figures. Now includes source code in ancillary files