One-two descriptor of graphs

K. CH. Das; I. Gutman; D. Vukičević

Displaying similar documents to “One-two descriptor of graphs”

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Hopkins, Glenn, Staton, William (1989)

International Journal of Mathematics and Mathematical Sciences

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Distance in graphs

Roger C. Entringer, Douglas E. Jackson, D. A. Snyder (1976)

Czechoslovak Mathematical Journal

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Radius-invariant graphs

Vojtech Bálint, Ondrej Vacek (2004)

Mathematica Bohemica

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The eccentricity $e (v)$ of a vertex $v$ is defined as the distance to a farthest vertex from $v$ . The radius of a graph $G$ is defined as a $r (G) = {min}_{u \in V (G)} {e (u)}$ . A graph $G$ is radius-edge-invariant if $r (G - e) = r (G)$ for every $e \in E (G)$ , radius-vertex-invariant if $r (G - v) = r (G)$ for every $v \in V (G)$ and radius-adding-invariant if $r (G + e) = r (G)$ for every $e \in E (\bar{G})$ . Such classes of graphs are studied in this paper.

On a quasiordering of bipartite graphs.

Gutman, Ivan, Fuji, Zhang (1986)

Publications de l'Institut Mathématique. Nouvelle Série

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Disconnected neighbourhood graphs

Bohdan Zelinka (1986)

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