Quadruple Roman Domination in Trees

Kou, Zheng; Kosari, Saeed; Hao, Guoliang; Amjadi, Jafar; Khalili, N.

doi:10.3390/sym13081318

Cited by 7 publications

(1 citation statement)

References 22 publications

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“…The triple Roman domination, by Ahangar et al [3] and the quadruple Roman domination in graphs, by Amjadi et. al [4,5].…”

Section: Introductionmentioning

confidence: 99%

The [k]-multiple Roman domination in Graphs

Valenzuela-Tripodoro,

Mateos-Camacho,

Cera

et al. 2023

Preprint

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In 2016, Beeler et al. introduced the double Roman domination as a variation of Roman domination and recently Abdollahzadeh et al. (resp. Amjadi et al.) initiated the study of triple (resp. quadruple) Roman domination in graphs. Given any labeling of the vertices of a graph, AN(v) stands for the set of neighbors of a vertex v having a positive label. In this paper we generalize these concepts by studying the [k]-multiple Roman domination functions ([k]-MRDF) in graphs which coincides with the previous versions when 2 ≤ k ≤ 4. Namely, f is a [k]-MRDF if f(N[v]) ≥ k + |AN(v)| for all v. We approach the complexity of the associate decision problem and we also give sharp bounds and exact values for several classes of graphs.

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“…The triple Roman domination, by Ahangar et al [3] and the quadruple Roman domination in graphs, by Amjadi et. al [4,5].…”

Section: Introductionmentioning

confidence: 99%

The [k]-multiple Roman domination in Graphs

Valenzuela-Tripodoro,

Mateos-Camacho,

Cera

et al. 2023

Preprint

View full text Add to dashboard Cite

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Further Results on the [k]-Roman Domination in Graphs

Valenzuela-Tripodoro,

Mateos-Camacho,

Cera Lopez

et al. 2024

Bull. Iran. Math. Soc.

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In 2016, Beeler et al. defined the double Roman domination as a variation of Roman domination. Sometime later, in 2021, Ahangar et al. introduced the concept of [k]-Roman domination in graphs and settled some results on the triple Roman domination case. In 2022, Amjadi et al. studied the quadruple version of this Roman-domination-type problem. Given any labeling of the vertices of a graph, AN(v) stands for the set of neighbors of a vertex v having a positive label. In this paper we continue the study of the [k]-Roman domination functions ([k]-RDF) in graphs which coincides with the previous versions when $$2\le k \le 4$$ 2 ≤ k ≤ 4 . Namely, f is a [k]-RDF if $$f(N[v])\ge k+|AN(v)|$$ f ( N [ v ] ) ≥ k + | A N ( v ) | for all v. We prove that the associate decision problem is NP-complete even when restricted to star convex and comb convex bipartite graphs and we also give sharp bounds and exact values for several classes of graphs.

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