Total restrained coalitions in graphs

Abstract

A set S⊂eq V in an isolate-free graph G is a total restrained dominating set, abbreviated TRD-set, if every vertex in V is adjacent to a vertex in S, and every vertex in V S is adjacent to a vertex in V S. A total restrained coalition is made up of two disjoint sets of vertices X and Y of G, neither of which is a TRD-set but their union X Y is a TRD-set. A total restrained coalition partition of a graph G is a partition =\V1, V2,…,Vk\ such that for all i ∈ [k], the set Vi forms a total restrained coalition with another set Vj for some j, where j∈ [k]i. The total restrained coalition number Ctr(G) in G equals the maximum order of a total restrained coalition partition in G. In this work, we initiate the study of total restrained coalition in graphs and its properties.

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