The Thickness of Some Complete Bipartite and Tripartite Graphs

Pub Date : 2024-11-06 DOI:10.1007/s10255-024-1128-1
Si-wei Hu, Yi-chao Chen
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Abstract

In this paper, we obtain the thickness for some complete k–partite graphs for k = 2, 3. We first compute the thickness of Kn,n+8 by giving a planar decomposition of K4k−1,4k+7 for k ≥ 3. Then, two planar decompositions for K1,g,g(g−1) when g is even and for \(K_{1,g,{1\over{2}}(g-1)^{2}}\) when g is odd are obtained. Using a recursive construction, we also obtain the thickness for some complete tripartite graphs. The results here support the long-standing conjecture that the thickness of Km,n is \(\lceil {mn\over{2(m+n-2)}}\rceil\) for any positive integers m, n.

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一些完整二方图和三方图的厚度
在本文中,我们得到了 k = 2, 3 时一些完整 k 部分图的厚度。我们首先通过给出 k≥3 时 K4k-1,4k+7 的平面分解来计算 Kn,n+8 的厚度。然后,当 g 为偶数时,得到 K1,g,g(g-1)的两个平面分解;当 g 为奇数时,得到 \(K_{1,g,{1/over{2}}(g-1)^{2}}\) 的两个平面分解。通过递归构造,我们还得到了一些完整三方图的厚度。这里的结果支持了一个存在已久的猜想,即对于任意正整数 m、n,Km,n 的厚度都是\(\lceil {mn\over{2(m+n-2)}}\rceil\) 。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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