Lollipops, dense cycles and chords
Combinatorics
2025-10-13 v4
Abstract
In 1980, Gupta, Kahn and Robertson proved that every graph with minimum degree at least contains a cycle containing at least vertices each having at least neighbors in (so has at least chords). In this work, we go further by showing that some of its edges can be contracted to obtain a graph with high minimum degree (we call such a minor of a \emph{cyclic minor}). We then investigate further cycles having cliques as cyclic minors, and show that minimum degree at least guarantees a cyclic -minor.
Keywords
Cite
@article{arxiv.2502.04726,
title = {Lollipops, dense cycles and chords},
author = {Zdeněk Dvořák and Beatriz Martins and Stéphan Thomassé and Nicolas Trotignon},
journal= {arXiv preprint arXiv:2502.04726},
year = {2025}
}
Comments
Added explanations, mostly about the application of Marcus Tardos Theorem