Notes on Aharoni's rainbow cycle conjecture
Abstract
In 2017, Ron Aharoni made the following conjecture about rainbow cycles in edge-coloured graphs: If is an -vertex graph whose edges are coloured with colours and each colour class has size at least , then contains a rainbow cycle of length at most . One motivation for studying Aharoni's conjecture is that it is a strengthening of the Caccetta-H\"aggkvist conjecture on digraphs from 1978. In this article, we present a survey of Aharoni's conjecture, including many recent partial results and related conjectures. We also present two new results. Our main new result is for the case of Aharoni's conjecture. We prove that if is an -vertex graph whose edges are coloured with colours and each colour class has size at least 3, then contains a rainbow cycle of length at most . We also discuss how our approach might generalise to larger values of .
Cite
@article{arxiv.2211.07897,
title = {Notes on Aharoni's rainbow cycle conjecture},
author = {Katie Clinch and Jackson Goerner and Tony Huynh and Freddie Illingworth},
journal= {arXiv preprint arXiv:2211.07897},
year = {2022}
}
Comments
12 pages, 0 figures. Minor changes. Also added an exact result for the 3 colour case of Question 2.5