Bipartite graphs are weak antimagic
Abstract
The \emph{Antimagic Graph Conjecture} asserts that every connected graph except admits an edge labeling such that each label is used exactly once and the sums of the labels on all edges incident with a given node are distinct. We study an associated counting function (replacing the upper bound on the possible labels by a variable) and prove that a variant of this counting function, when we do not require the labels to be distinct, is a polynomial if is bipartite. As a consequence, we show that every connected bipartite graph except admits a \emph{weakly} antimagic labeling, that is, each edge label is among (repetition allowed) and the sums of the labels on all edges incident with a given node are distinct. We also present a natural extension of these results to directed and bidirected graphs; this extension gives rise to a (bi-)directed version of the Antimagic Graph Conjecture, which might be of independent interest.
Cite
@article{arxiv.1306.1763,
title = {Bipartite graphs are weak antimagic},
author = {Matthias Beck and Michael Jackanich},
journal= {arXiv preprint arXiv:1306.1763},
year = {2013}
}
Comments
This paper has been withdrawn due to a flaw in the proof of the main result