Roman \2\-domination in graphs and graph products
Abstract
For a graph G=(V,E) of order n, a Roman \2\-dominating function f:V→\0,1,2\ has the property that for every vertex v∈ V with f(v)=0, either v is adjacent to a vertex assigned 2 under f, or v is adjacent to least two vertices assigned 1 under f. In this paper, we classify all graphs with Roman \2\-domination number belonging to the set \2,3,4,n-2,n-1,n\. Furthermore, we obtain some results about Roman \2\-domination number of some graph operations.
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