图的最大度和谱半径大小

Pub Date : 2024-01-20 DOI:10.1007/s10801-023-01289-5

Zhiwen Wang, Ji-Ming Guo

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引用次数: 0

摘要

用 \(\rho (G)\) 和 \(\kappa (G)\) 分别表示图 G 的谱半径和无符号拉普拉斯谱半径。让 \(k\ge 0\) 是一个固定整数，G 是一个大小为 m 且足够大的图。我们证明，如果 \(\rho (G)\ge \sqrt{m-k}\), 那么 \(C_4\subseteq G\) 或者 \(K_{1,m-k}\subseteq G\).此外，我们还证明了如果\(\kappa (G)\ge m-k+1\)，那么\(K_{1,m-k}subseteq G\).这两个结果都扩展了一些已知结果。

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Maximum degree and spectral radius of graphs in terms of size

Denote by \(\rho (G)\) and \(\kappa (G)\) the spectral radius and the signless Laplacian spectral radius of a graph G, respectively. Let \(k\ge 0\) be a fixed integer and G be a graph of size m which is large enough. We show that if \(\rho (G)\ge \sqrt{m-k}\), then \(C_4\subseteq G\) or \(K_{1,m-k}\subseteq G\). Moreover, we prove that if \(\kappa (G)\ge m-k+1\), then \(K_{1,m-k}\subseteq G\). Both these results extend some known results.

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