Abstract
For a graph \(G=(V, E)\), a weak \(\{2\}\)-dominating function \(f:V\rightarrow \{0,1,2\}\) has the property that \(\sum _{u\in N(v)}f(u)\ge 2\) for every vertex \(v\in V\) with \(f(v)= 0\), where N(v) is the set of neighbors of v in G. The weight of a weak \(\{2\}\)-dominating function f is the sum \(\sum _{v\in V}f(v)\) and the minimum weight of a weak \(\{2\}\)-dominating function is the weak \(\{2\}\)-domination number. In this paper, we introduce a discharging approach and provide a short proof for the lower bound of the weak \(\{2\}\)-domination number of \(C_n \Box C_5\), which was obtained by Stȩpień, et al. (Discrete Appl Math 170:113–116, 2014). Moreover, we obtain the weak \(\{2\}\)-domination numbers of \(C_n \Box C_3\) and \(C_n \Box C_4\).
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References
Brešar B, Šumenjak TK (2007) On the \(2\)-rainbow domination in graphs. Discrete Appl Math 155(17):2394–2400
Brešar B, Henning MA, Rall DF (2008) Rainbow domination in graphs. Taiwan J Math 12(1):213–225
Bujtás C, Klavžar S (2016) Improved upper bounds on the domination number of graphs with minimum degree at least five. Graphs Combin 32(2):511–519
Chambers EW, Kinnersley B, Prince N et al (2009) Extremal problems for Roman domination. SIAM J Discrete Math 23(3):1575–1586
Chellali M, Haynes TW, Hedetniemi ST et al (2016) Roman 2-domination. Discrete Appl Math 204:22–28
Cockayne EJ, Dreyer PM Jr, Hedetniemi SM, Hedetniemi ST (2004) Roman domination in graphs. Discrete Math 278:11–22
Favaron O, Karami H, Khoeilar R et al (2009) On the Roman domination number of a graph. Discrete Math 309(10):3447–3451
Goddard W, Henning MA (2002) Domination in planar graphs with small diameter. J Graph Theory 40(1):1–25
Haynes TW, Hedetniemi ST, Slater PJ (eds) (1998) Domination in graphs: advanced topics. Marcel Dekker, New York
Li ZP, Zhu EQ, Shao ZH, Xu J (2016) On dominating sets of maximal outerplanar and planar graphs. Discrete Appl Math 198:164–169
Liedloff M, Kloks T, Liu J et al (2008) Efficient algorithms for Roman domination on some classes of graphs. Discrete Appl Math 156(18):3400–3415
Matheson LR, Tarjan RE (1996) Dominating sets in planar graphs. Eur J Combin 17:565–568
Shao ZH, Liang MN, Yin C et al (2014) On rainbow domination numbers of graphs. Inf Sci 254:225–234
Stȩpień Z, Zwierzchowski M (2014) 2-Rainbow domination number of Cartesian products: \(C_n\Box C_3\) and \(C_n\Box C_5\). J Combin Optim 28:748–755
Stȩpień Z, Szymaszkiewicz A, Szymaszkiewicz L, Zwierzchowski M (2014) 2-Rainbow domination number of \(C_n\Box C_5\). Discrete Appl Math 170:113–116
Stȩpień Z, Szymaszkiewicz L, Zwierzchowski M (2015) The Cartesian product of cycles with small \(2\)-rainbow domination number. J Combin Optim 30(3):668–674
Wang YL, Wu KH (2013) A tight upper bound for \(2\)-rainbow domination in generalized Petersen graphs. Discrete Appl Math 161:2178–2188
Wu Y, Rad NJ (2010) Bounds on the \(2\)-rainbow domination number of graphs. Graphs Combin 29(4):1125–1133
Acknowledgements
The authors thank anonymous referees sincerely for their helpful suggestions to improve this work. This work was supported by the National Key Research and Development Project of China under Grant 2016YFB0800700, the National Natural Science Foundation of China under Grants 61672050, 61632002, 61572046, 61309015 and the Applied Basic Research (Key Project) of Sichuan Province under Grant 2017JY0096.
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Li, Z., Shao, Z. & Xu, J. Weak {2}-domination number of Cartesian products of cycles. J Comb Optim 35, 75–85 (2018). https://doi.org/10.1007/s10878-017-0157-6
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DOI: https://doi.org/10.1007/s10878-017-0157-6