English

Transversal Hamilton paths and cycles

Combinatorics 2024-06-21 v1

Abstract

Given a collection G={G1,G2,,Gm}\mathcal{G} =\{G_1,G_2,\dots,G_m\} of graphs on the common vertex set VV of size nn, an mm-edge graph HH on the same vertex set VV is transversal in G\mathcal{G} if there exists a bijection φ:E(H)[m]\varphi :E(H)\rightarrow [m] such that eE(Gφ(e))e \in E(G_{\varphi(e)}) for all eE(H)e\in E(H). Denote δ(G):=min{δ(Gi):i[m]}\delta(\mathcal{G}):=\operatorname*{min}\left\{\delta(G_i): i\in [m]\right\}. In this paper, we first establish a minimum degree condition for the existence of transversal Hamilton paths in G\mathcal{G}: if n=m+1n=m+1 and δ(G)n12\delta(\mathcal{G})\geq \frac{n-1}{2}, then G\mathcal{G} contains a transversal Hamilton path. This solves a problem proposed by [Li, Li and Li, J. Graph Theory, 2023]. As a continuation of the transversal version of Dirac's theorem [Joos and Kim, Bull. Lond. Math. Soc., 2020] and the stability result for transversal Hamilton cycles [Cheng and Staden, arXiv:2403.09913v1], our second result characterizes all graph collections with minimum degree at least n21\frac{n}{2}-1 and without transversal Hamilton cycles. We obtain an analogous result for transversal Hamilton paths. The proof is a combination of the stability result for transversal Hamilton paths or cycles, transversal blow-up lemma, along with some structural analysis.

Keywords

Cite

@article{arxiv.2406.13998,
  title  = {Transversal Hamilton paths and cycles},
  author = {Yangyang Cheng and Wanting Sun and Guanghui Wang and Lan Wei},
  journal= {arXiv preprint arXiv:2406.13998},
  year   = {2024}
}

Comments

33 pages, 10 figures

R2 v1 2026-06-28T17:12:56.879Z