Introduction to double coalitions in graphs

Abstract

Let G(V, E) be a finite, simple, isolate-free graph. A set D of vertices of a graph G with the vertex set V is a double dominating set of G, if every vertex v∈ D has at least one neighbor in D and every vertex v ∈ V D has at least two neighbors in D. A double coalition consists of two disjoint sets of vertices V1 and V2, neither of which is a double dominating set but their union V1 V2 is a double dominating set. A double coalition partition of a graph G is a partition = \V1, V2,..., Vk \ of V such that no subset of is a double dominating set of G, but for every set Vi ∈ , there exists a set Vj ∈ such that Vi and Vj form a double coalition. In this paper, we study properties of double coalitions in graphs.

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