On sublinear approximations for the Petersen coloring conjecture
Abstract
If is a function, then let us say that is sublinear if If is a cubic graph and is a proper -edge-coloring of , then an edge of is poor (rich) in , if the edges incident to and are colored with three (five) colors. An edge is abnormal if it is neither rich nor poor. The Petersen coloring conjecture of Jaeger states that any bridgeless cubic graph admits a proper 5-edge-coloring , such that there is no an abnormal edge of with respect to . For a proper 5-edge-coloring of , let be the set of abnormal edges of with respect to . In this paper we show that (a) The Petersen coloring conjecture is equivalent to the statement that there is a sublinear function , such that all bridgeless cubic graphs admit a proper 5-edge-coloring with ; (b) for , the statement that there is a sublinear function , such that all (cyclically) -edge-connected cubic graphs admit a proper 5-edge-coloring with is equivalent to the statement that all (cyclically) -edge-connected cubic graphs admit a proper 5-edge-coloring with .
Keywords
Cite
@article{arxiv.2104.09241,
title = {On sublinear approximations for the Petersen coloring conjecture},
author = {Davide Mattiolo and Giuseppe Mazzuoccolo and Vahan Mkrtchyan},
journal= {arXiv preprint arXiv:2104.09241},
year = {2021}
}
Comments
10 pages, 4 figures