On the cyclic coloring conjecture
Abstract
A cyclic coloring of a plane graph is a coloring of its vertices such that vertices incident with the same face have distinct colors. The minimum number of colors in a cyclic coloring of a plane graph is its cyclic chromatic number . Let be the maximum face degree of a graph . In this note we show that to prove the Cyclic Coloring Conjecture of Borodin from 1984, saying that every connected plane graph has , it is enough to do it for subdivisions of simple -connected plane graphs. We have discovered four new different upper bounds on for graphs from this restricted family; three bounds of them are tight. As corollaries, we have shown that the conjecture holds for subdivisions of plane triangulations, simple -connected plane quadrangulations, and simple -connected plane pentagulations with an even maximum face degree, for regular subdivisions of simple -connected plane graphs of maximum degree at least 10, and for subdivisions of simple -connected plane graphs having the maximum face degree large enough in comparison with the number of vertices of their longest paths consisting only of vertices of degree two.
Cite
@article{arxiv.2009.10436,
title = {On the cyclic coloring conjecture},
author = {Stanislav Jendrol and Roman Sotak},
journal= {arXiv preprint arXiv:2009.10436},
year = {2020}
}