Outer-independent total Roman domination in graphs

Given a graph G with vertex set V, a function f:V→{0,1,2} is an outer-independent total Roman dominating function on G if •every vertex v∈V for which f(v)=0 is adjacent to at least one vertex u∈V such that f(u)=2,•every vertex x∈V for which f(x)≥1 is adjacent to at least one vertex y∈V such that f(y...

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Veröffentlicht in:Discrete Applied Mathematics 2019-09, Vol.269, p.107-119
Hauptverfasser: Cabrera Martínez, Abel, Kuziak, Dorota, Yero, Ismael G.
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Sprache:eng
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Zusammenfassung:Given a graph G with vertex set V, a function f:V→{0,1,2} is an outer-independent total Roman dominating function on G if •every vertex v∈V for which f(v)=0 is adjacent to at least one vertex u∈V such that f(u)=2,•every vertex x∈V for which f(x)≥1 is adjacent to at least one vertex y∈V such that f(y)≥1, and•any two different vertices a,b for which f(a)=f(b)=0 are not adjacent. The minimum weight ω(f)=∑w∈Vf(w) of any outer-independent total Roman dominating function on G is the outer-independent total Roman domination number, γoitR(G), of G. In this article, we introduce the concepts above and begin with the study of its combinatorial and computational properties. For instance, we give several closed relationships between this parameter and other ones related with domination in graphs. We prove that computing γoitR of a graph G is an NP-hard problem. In addition, we present some closed formulas for γoitR(G) in the cases G represents some special families of graphs.
ISSN:0166-218X
1872-6771
DOI:10.1016/j.dam.2018.12.018