Jie Chen, Cai-Xia Wang, Yi-Ping Liang, Shou-Jun Xu
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引用次数: 0
摘要
在无孤立图 G 中,如果顶点子集 S 是 G 的支配集,且 S 中的每个顶点与 S 中另一个顶点的距离都在 2 以内,则该顶点子集 S 是 G 的半总支配集。G 的半总支配数用 \(\gamma _{t2}(G)\) 表示,它是 G 中半总支配集的最小卡片度。Zhu 等人(Gr Combin 33, 1119-1130, 2017)证明了如果 \(G\notin \{K_4,N_2\}\) 是阶数为 n 的连通无爪立方图,那么 \(\gamma _{t2}(G)\le \frac{n}{3}\) 是尖锐的。他们提出了极值图的特征问题。我们完全解决了这个问题。有十类图,其中三类是无限图族。
A Characterization of Graphs with Semitotal Domination Number One-Third Their Order
In an isolate-free graph G, a subset S of vertices is a semitotal dominating set of G if it is a dominating set of G and every vertex in S is within distance 2 of another vertex of S. The semitotal domination number of G, denoted by \(\gamma _{t2}(G)\), is the minimum cardinality of a semitotal dominating set in G. Zhu et al. (Gr Combin 33, 1119–1130, 2017) proved that if \(G\notin \{K_4,N_2\}\) is a connected claw-free cubic graph of order n, then \(\gamma _{t2}(G)\le \frac{n}{3}\), which is sharp. They proposed the problem of characterizing the extremal graphs. We completely solve this problem. There are ten classes of graphs, three of which are infinite families of graphs.
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