Exclusive Sum Labeling of Graphs: A Survey
نویسنده
چکیده
All sum graphs are disconnected. In order for a connected graph to bear a sum labeling, the graph is considered in conjunction with a number of isolated vertices, the labels of which complete the sum labeling for the disjoint union. The smallest number of isolated vertices that must be added to a graph H to achieve a sum graph is called the sum number of H; it is denoted by σ(H). A sum labeling which realizes H ∪ Kσ(G) as a sum graph is called an optimal sum labeling of H. In this paper we survey a new type of labeling based on summation, the exclusive sum labeling. A sum labeling L is called exclusive sum labeling with respect to a subgraph H of G if L is a sum labeling of G where H contains no working vertex. The exclusive sum number (H) of a graph H is the smallest number r such that there exists an exclusive sum labeling L which realizes H ∪Kr as a sum graph. A labeling L is an optimal exclusive sum labeling of a graph H if L is a sum labeling of H ∪K (H) and H contains no working vertex.
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