关于图的距离不规则标记的一个注记

4区 数学 Q4 Mathematics Ars Combinatoria Pub Date : 2023-07-25 DOI:10.61091/ars156-04
A. Ahmad
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引用次数: 0

摘要

让我们考虑一个简单连通无向图\(G=(V,E)\)。对于图\(G\),我们定义\(k\) -标记\(\phi: V(G)\to \{1,2, \dots, k\}\)为距离不规则顶点\(k\) -标记\(G\),如果对于\(G\)的每两个不同的顶点\(u\)和\(v\),有\(wt(u) \ne wt(v),\)其中标记\(\phi\)中的顶点\(u\)的权值为\(wt(u)=\sum\limits_{v\in N(u)}\phi(v),\)其中\(N(u)\)是\(u\)的邻居集。图\(G\)具有距离不规则顶点\(k\)标记的最小\(k\)称为距离不规则强度\(G,\),表示为\(dis(G)\)。本文用完全阶图\(1,\)友情图、贾汉吉尔图和赫尔姆图确定了环径电晕积距离不规则强度的精确值。对于未来的研究,我们提出了一些对同一研究领域的研究人员开放的问题。
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A Note on Distance Irregular Labeling of Graphs
Let us consider a~simple connected undirected graph \(G=(V,E)\). For a~graph \(G\) we define a~\(k\)-labeling \(\phi: V(G)\to \{1,2, \dots, k\}\) to be a~distance irregular vertex \(k\)-labeling of the graph \(G\) if for every two different vertices \(u\) and \(v\) of \(G\), one has \(wt(u) \ne wt(v),\) where the weight of a~vertex \(u\) in the labeling \(\phi\) is \(wt(u)=\sum\limits_{v\in N(u)}\phi(v),\) where \(N(u)\) is the set of neighbors of \(u\). The minimum \(k\) for which the graph \(G\) has a~distance irregular vertex \(k\)-labeling is known as distance irregularity strength of \(G,\) it is denoted as \(dis(G)\). In this paper, we determine the exact value of the distance irregularity strength of corona product of cycle and path with complete graph of order \(1,\) friendship graph, Jahangir graph and helm graph. For future research, we suggest some open problems for researchers of the same domain of study.
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来源期刊
Ars Combinatoria
Ars Combinatoria 数学-数学
CiteScore
0.30
自引率
0.00%
发文量
0
审稿时长
5 months
期刊介绍: Information not localized
期刊最新文献
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