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引用次数: 0
摘要
图\(\chi\)的顶点标记\(\neneneba xi \)被称为“顶点公平标记(VEq.)”,如果通过对末端顶点的标签求和而获得的诱导边权重满足以下条件:具有标签\(\nenenebb xi(v)=A\)和\(\nenenebc xi(u)=b\)(其中在Z\中\(A,\b\))的顶点数量的绝对差约为\(1\),考虑由第一个非负整数组成的给定集合\(a\)。允许顶点公平标记(VEq.)的图$\chi$被称为“顶点公平”图。在这篇手稿中,我们已经证明了与循环和路径相关的图是顶点公平图的例子。
A vertex labeling \(\xi\) of a graph \(\chi\) is referred to as a 'vertex equitable labeling (VEq.)' if the induced edge weights, obtained by summing the labels of the end vertices, satisfy the following condition: the absolute difference in the number of vertices \(v\) and \(u\) with labels \(\xi(v)= a\) and \(\xi(u)= b\) (where \(a,\ b\in Z\)) is approximately \(1\), considering a given set \(A\) that consists of the first \(\lceil \frac{q}{2} \rceil\) non-negative integers. A graph $\chi$ that admits a vertex equitable labeling (VEq.) is termed a 'vertex equitable' graph. In this manuscript, we have demonstrated that graphs related to cycles and paths are examples of vertex-equitable graphs.
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