Flows and bisections in cubic graphs
Abstract
A -weak bisection of a cubic graph is a partition of the vertex-set of into two parts and of equal size, such that each connected component of the subgraph of induced by () is a tree of at most vertices. This notion can be viewed as a relaxed version of nowhere-zero flows, as it directly follows from old results of Jaeger that every cubic graph with a circular nowhere-zero -flow has a -weak bisection. In this paper we study problems related to the existence of -weak bisections. We believe that every cubic graph which has a perfect matching, other than the Petersen graph, admits a 4-weak bisection and we present a family of cubic graphs with no perfect matching which do not admit such a bisection. The main result of this article is that every cubic graph admits a 5-weak bisection. When restricted to bridgeless graphs, that result would be a consequence of the assertion of the 5-flow Conjecture and as such it can be considered a (very small) step toward proving that assertion. However, the harder part of our proof focuses on graphs which do contain bridges.
Cite
@article{arxiv.1504.03500,
title = {Flows and bisections in cubic graphs},
author = {Louis Esperet and Giuseppe Mazzuoccolo and Michael Tarsi},
journal= {arXiv preprint arXiv:1504.03500},
year = {2017}
}
Comments
14 pages, 6 figures - revised version