On maximizing private neighbors in graphs
Abstract
Given a set U ⊂ V of vertices in a graph G = (V, E), a private neighbor with respect to the set U is any vertex w ∈ V having precisely one neighbor, say v, in U. If w ∈ V - U, then w is called an external private neighbor of v with respect to U. If w ∈ U then w is called an internal private neighbor of v with respect to U. We also add one special case: if w ∈ U and N(w) U = , then we say that w is a self private neighbor with respect to U. By definition, a self private neighbor with respect to U is an isolated vertex in the subgraph of G induced by U. In this paper we consider the general problems of trying to find sets of vertices which maximize the number of private neighbors of specific types in a graph. In the process of doing this we define several new maximization parameters of graphs which generalize some known and well-studied parameters of graphs relating to vertex and edge independence, domination and irredundance in graphs.
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