ACTA MATHEMATICA UNIVERSITATIS COMENIANAE
Vol. 66, 1 (1997)
pp. 21-32
GRAPHS RELATED TO DIAMETER AND CENTER
F. GLIVIAK and P. KYS
Abstract.
A graph is said to be an $L$-graph if all its paths of diametral length contain a central vertex of $G$. Using an earlier result we show that any graph can be embedded to an $L$-graph of radius a and diameter $b$, where $a\le b\le 2a$. We show that the known bounds of the number of edges and the maximum degree of the graphs of diameter $d\ge 2$ are sharp for $L$-graphs, too. Then we estimate the minimum degree of $L$-graphs. Finally we estimate the number of central vertices in $L$-graphs; all bounds are best possible.
AMS subject classification.
Keywords.
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