图的 E_A$ 主标签及其对树的 A$ 主标签的影响

Sylwia Cichacz
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引用次数: 0

摘要

如果 $A$ 是一个有限阿贝尔群,那么某个图 $G$ 的边的标签 $f \colon E (G) \rightarrowA$ 会在 $G$ 上诱导一个顶点标签;顶点 $u$ 接收标签 $\sum_{v\in N(u)}f (v)$, 其中 $N(u)$ 是顶点 $u$ 的一个开放邻域。如果存在边标签,且(1)边标签类的大小最多相差一个,(2)诱导顶点标签类的大小最多相差一个,则图 $G$ 是 $E_A$-cordial。在文献中,迄今为止只研究过循环群中的 $E_A$-cordial 标签。卡普兰、列夫和罗迪提研究了相应的问题。也就是说,他们引入了 $A^*$-antimagic labeling 作为 antimagic labeling 的广义化(antimagic labeling \cite{ref_KapLevRod})。简单地说,对于一棵阶数为 $|A|$ 的树,$A^*$-反魔法标注就是这样的$E_A$-核心标注,即在边上禁止标注 $0$。在本文中,我们给出了任意循环 $A$ 的路径成为 $E_A$-cordial 的必要条件和充分条件。我们还证明了 \cite{ref_KapLevRod}中关于树的 $A^*$-antimagic 标签的猜想不成立。
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$E_A$-cordial labeling of graphs and its implications for $A$-antimagic labeling of trees
If $A$ is a finite Abelian group, then a labeling $f \colon E (G) \rightarrow A$ of the edges of some graph $G$ induces a vertex labeling on $G$; the vertex $u$ receives the label $\sum_{v\in N(u)}f (v)$, where $N(u)$ is an open neighborhood of the vertex $u$. A graph $G$ is $E_A$-cordial if there is an edge-labeling such that (1) the edge label classes differ in size by at most one and (2) the induced vertex label classes differ in size by at most one. Such a labeling is called $E_A$-cordial. In the literature, so far only $E_A$-cordial labeling in cyclic groups has been studied. The corresponding problem was studied by Kaplan, Lev and Roditty. Namely, they introduced $A^*$-antimagic labeling as a generalization of antimagic labeling \cite{ref_KapLevRod}. Simply saying, for a tree of order $|A|$ the $A^*$-antimagic labeling is such $E_A$-cordial labeling that the label $0$ is prohibited on the edges. In this paper, we give necessary and sufficient conditions for paths to be $E_A$-cordial for any cyclic $A$. We also show that the conjecture for $A^*$-antimagic labeling of trees posted in \cite{ref_KapLevRod} is not true.
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