On Self-Centeredness of Product of Graphs

On Self-Centeredness of Product of Graphs

A graph G is said to be a self-centered graph if the eccentricity of every vertex of the graph is the same. In other words, a graph is a self-centered graph if radius and diameter of the graph are equal. In this paper, self-centeredness of strong product, co-normal product, and lexicographic product...

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Veröffentlicht in:International journal of combinatorics 2016-01, Vol.2016, p.1-4
Hauptverfasser: Singh, Priyanka, Panigrahi, Pratima
Format: Artikel
Sprache:eng
Schlagworte:
Combinatorial analysis
Computation
Eccentricity
Graphs
Mathematical analysis
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Zusammenfassung:A graph G is said to be a self-centered graph if the eccentricity of every vertex of the graph is the same. In other words, a graph is a self-centered graph if radius and diameter of the graph are equal. In this paper, self-centeredness of strong product, co-normal product, and lexicographic product of graphs is studied in detail. The necessary and sufficient conditions for these products of graphs to be a self-centered graph are also discussed. The distance between any two vertices in the co-normal product of a finite number of graphs is also computed analytically.
ISSN:1687-9163
1687-9171
DOI:10.1155/2016/2508156