@article{CMJ_2000_50_1_a15,
author = {Nebesk\'y, Ladislav},
title = {A theorem for an axiomatic approach to metric properties of graphs},
journal = {Czechoslovak Mathematical Journal},
pages = {121--133},
year = {2000},
volume = {50},
number = {1},
mrnumber = {1745467},
zbl = {1033.05033},
language = {en},
url = {http://geodesic.mathdoc.fr/item/CMJ_2000_50_1_a15/}
}
Nebeský, Ladislav. A theorem for an axiomatic approach to metric properties of graphs. Czechoslovak Mathematical Journal, Tome 50 (2000) no. 1, pp. 121-133. http://geodesic.mathdoc.fr/item/CMJ_2000_50_1_a15/
[1] H.-J. Bandelt, M. van de Vel and E. Verheul: Modular interval spaces. Math. Nachr. 163 (1993), 177–201. | DOI | MR
[2] G. Chartrand and L. Lesniak: Graphs & Digraphs. Third edition. Chapman & Hall, London, 1996. | MR
[3] H. M. Mulder: The Interval Function of a Graph. Mathematisch Centrum, Amsterdam, 1980. | MR | Zbl
[4] L. Nebeský: A characterization of the set of all shortest paths in a connected graph. Math. Bohem. 119 (1994), 15–20. | MR
[5] L. Nebeský: A characterization of the interval function of a connected graph. Czechoslovak Math. J. 44 (119) (1994), 173–178. | MR
[6] L. Nebeský: Geodesics and steps in a connected graph. Czechoslovak Math. J. 47 (122) (1997), 149–161. | DOI | MR
[7] L. Nebeský: An axiomatic approach to metric properties of connected graphs. Czechoslovak Math. J. 50(125) (2000), 3–14. | DOI | MR
[8] L. Nebeský: A new proof of a characterization of the set of all geodesics in a connected graph. Czechoslovak Math. J. 48(123) (1998), 809–813. | DOI | MR