Game $k$-Domination Number of Graphs

IF 0.7 Q2 MATHEMATICS Tamkang Journal of Mathematics Pub Date : 2021-02-02 DOI:10.5556/J.TKJM.52.2021.3254
R. Khoeilar, M. Chellali, H. Karami, S. M. Sheikholeslami
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Abstract

For a positive integer $k$, a subset $D$ of vertices in a digraph $\overrightarrow{G}$ is a $k$-dominating set if every vertex not in $D$ has at least $k$ direct predecessors in $D.$ The $k$-domination number is the minimum cardinality among all $k$-dominating sets of $\overrightarrow{G}$. The game $k$-domination number of a simple and undirected graph is defined by the following game. Two players, $\mathcal{A}$ and $\mathcal{D}$, orient the edges of the graph alternately until all edges are oriented. Player $\mathcal{D}$ starts the game, and his goal is to decrease the $k$-domination number of the resulting digraph, while $\mathcal{A}$ is trying to increase it. The game $k$-domination number of the graph $G$ is the $k$-domination number of the directed graph resulting from this game. This is well defined if we suppose that both players follow their optimal strateries. We are mainly interested in the study of the game $2$-domination number, where some upper bounds will be presented. We also establish a Nordhaus-Gaddum bound for the game $2$-domination number of a graph and its complement.
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游戏$k$-图形的支配数
对于正整数$k$,如果不在$D$中的每个顶点在$D$中至少有$k$的直接前导,则有向图$\右移{G}$中的顶点的子集$D$是$k$支配集。$k$支配数是$\overright {G}$的所有$k$支配集的最小基数。一个简单无向图的游戏k -支配数由下面的游戏定义。两个玩家$\mathcal{A}$和$\mathcal{D}$交替地定位图的边,直到所有边都有方向。玩家$\mathcal{D}$开始游戏,他的目标是减少结果有向图的$k$支配数,而$\mathcal{A}$则试图增加它。图$G$的游戏$k$支配数是由这个游戏产生的有向图$k$支配数。如果我们假设双方都遵循自己的最优策略,这就很好地定义了。我们主要对游戏$2$-支配数的研究感兴趣,其中将出现一些上界。我们还建立了图及其补的游戏$2$支配数的诺德豪斯-加达姆界。
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CiteScore
1.50
自引率
0.00%
发文量
11
期刊介绍: To promote research interactions between local and overseas researchers, the Department has been publishing an international mathematics journal, the Tamkang Journal of Mathematics. The journal started as a biannual journal in 1970 and is devoted to high-quality original research papers in pure and applied mathematics. In 1985 it has become a quarterly journal. The four issues are out for distribution at the end of March, June, September and December. The articles published in Tamkang Journal of Mathematics cover diverse mathematical disciplines. Submission of papers comes from all over the world. All articles are subjected to peer review from an international pool of referees.
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