ON HOP DOMINATION NUMBER OF SOME GENERALIZED GRAPH STRUCTURES

Q3 Mathematics Ural Mathematical Journal Pub Date : 2021-12-30 DOI:10.15826/umj.2021.2.009

S. Shanmugavelan, C. Natarajan

引用次数: 0

Abstract

A subset \( H \subseteq V (G) \) of a graph \(G\) is a hop dominating set (HDS) if for every \({v\in (V\setminus H)}\) there is at least one vertex \(u\in H\) such that \(d(u,v)=2\). The minimum cardinality of a hop dominating set of \(G\) is called the hop domination number of \(G\) and is denoted by \(\gamma_{h}(G)\). In this paper, we compute the hop domination number for triangular and quadrilateral snakes. Also, we analyse the hop domination number of graph families such as generalized thorn path, generalized ciliates graphs, glued path graphs and generalized theta graphs.

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一类广义图结构的跳数控制

图\(G\)的子集\( H \subseteq V (G) \)是跳支配集(HDS)，如果对于每个\({v\in (V\setminus H)}\)至少有一个顶点\(u\in H\)使得\(d(u,v)=2\)。\(G\)的跳数支配集的最小基数称为\(G\)的跳数支配数，用\(\gamma_{h}(G)\)表示。本文计算了三角形蛇类和四边形蛇类的跳跃支配数。此外，我们还分析了图族的跳数支配数，如广义刺路图、广义睫状图、胶合路径图和广义θ图。

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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