On the Hilton-Zhao vertex-splitting conjecture

Xuli Qi; Yanrui Feng

arXiv:2605.18783·math.CO·May 20, 2026

On the Hilton-Zhao vertex-splitting conjecture

Xuli Qi, Yanrui Feng

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Abstract

Let $G$ be a simple graph with order $n$ , maximum degree $Δ (G)$ , and chromatic index $χ^{'} (G)$ , respectively. A graph $G$ is edge-chromatic critical if $χ^{'} (H) < χ^{'} (G)$ for every proper subgraph $H$ of $G$ . Assume that $G$ is an $n$ -vertex connected regular Class $1$ graph, and let $G^{*}$ be obtained from $G$ by splitting one vertex into two vertices. Hilton and Zhao in 1997 proposed the vertex-splitting conjecture: if $Δ (G) > \frac{n}{3}$ , then $G^{*}$ is edge-chromatic critical. Recently, Cao, Chen, and Shan (Discrete Math. 2022) verified the conjecture for $Δ (G) \geq \frac{3 n}{4}$ . In this paper, we confirm the conjecture for $Δ (G) \geq \frac{2 n - 2}{3}$ .

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