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On partially directed geodetic graphs. (English) Zbl 0492.05045

05C38 Paths and cycles
05C99 Graph theory
05C35 Extremal problems in graph theory
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[1] BOSÁK J.: Partially directed Moore gtaphs. Math. Slovaca, 29, 1979, 181-196.
[2] BOSÁK J.: Geodetic graphs. Combinatorics (Proc. Colloq. Keszthely 1976), North Holland, Amsterdam 1978, 151-172.
[3] BOSÁK J.: Graphs with unique walks, trails or paths of given lengths. Theory and Applications of Graphs (Proc. Conf. Kalamazoo 1976), Springer-Verlag, Berlin 1978, 75-85.
[4] BOSÁK J.: On the k-index of graphs. Discrete Math., 1, 1971, 133-146. · Zbl 0219.05079
[5] BOSÁK J., KOTZIG A., ZNÁM Š.: Strongly geodetic graphs. J. Combinat. Theory, 5, 1968. 170-176. · Zbl 0165.26602
[6] PLESNIK J.: Two construction of geodetic graphs. Math. Slovaca, 27, 1977, 65-71. · Zbl 0347.05113
[7] STEMPLE. J. G., WATKINS M. E.: On planar geodetic graphs. J. Combinat. Theory, 4, 1968, 101-117. · Zbl 0153.54004
[8] STEMPLE J. G.: Geodetic graphs homeomorphic to a complete graph. Notices Amer. Math. Soc. 24, 1977, No. 5, A 417. · Zbl 0481.05057
[9] ZELINKA B.: Geodetic graphs which are homeomorphic to complete graphs. Math. Slovaca, 27, 129-132. · Zbl 0362.05070
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