Efficient k-limited Dominating Broadcasts in Product Graphs
Abstract
In a graph G , a subset of vertices S is called an efficient dominating set (EDS) if every vertex in the graph is uniquely dominated by exactly one vertex in S . A graph is said to be efficiently dominatable if it contains an EDS. Additionally, a function f: V(G) → \0, 1, 2, …, k\ is termed a k -limited dominating broadcast if, for every vertex u ∈ V(G) , there exists a vertex v , with f(v) ≥ 1 such that d(u, v) ≤ f(v) . A vertex u is said to be dominated by a vertex v. In this work, we unify these two concepts to explore the notion of efficient k-limited broadcast domination in graphs. A k -limited dominating broadcast f is called an efficient k-limited dominating broadcast (k-ELDB) if each vertex in the graph is dominated exactly once. The minimum value of k for which the given graph G has k-ELDB is defined as mcr(G). We prove determining mcr(G) is NP-Complete for general graphs and explore the mcr(G) values and other related parameters on standard graphs and their products.
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