Italian, 2-rainbow and Roman domination numbers in middle graphs
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Abstract
Given a graph $G$, we consider the Italian domination number $\gamma_I(G)$, the $2$-rainbow domination number $\gamma_{r2}(G)$ and the Roman domination number $\gamma_R(G)$. It is known that $\gamma_I(G) \leq \gamma_{r2}(G) \leq \gamma_R(G)$ holds for any graph $G$. In this paper, we prove that $\gamma_I(M(G)) =\gamma_{r2}(M(G)) =\gamma_R(M(G)) =n$ for the middle graph $M(G)$ of a graph $G$ of order $n$, which gives an answer for an open problem posed by Mustapha Chellali et al. [Discrete Applied Mathematics 204 (2016) 22--28]. Moreover, we give a complete characterization of Roman domination stable middle graphs, 2-rainbow domination stable middle graphs and Italian domination stable middle graphs.中图中的意大利、2-rainbow 和罗马统治数字
给定一个图 $G$,我们考虑意大利支配数 $\gamma_I(G)$、2$-彩虹支配数 $\gamma_{r2}(G)$和罗马支配数 $\gamma_R(G)$。众所周知,对于任何图 $G$,$\gamma_I(G) \leq \gamma_{r2}(G) \leq \gamma_R(G)$ 都成立。本文证明了对于阶数为 $n$ 的图 $G$ 的中间图 $M(G)$,$gamma_I(M(G)) =\gamma_{r2}(M(G)) =\gamma_R(M(G)) =n$,这给出了 Mustapha Chellali 等人提出的一个开放问题的答案。[此外,我们还给出了罗马支配稳定中间图、2-虹支配稳定中间图和意大利支配稳定中间图的完整表征。
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