Harries–Wong graph

In the mathematical field of graph theory, the HarriesWong graph is a 3-regular undirected graph with 70 vertices and 105 edges.[1]

HarriesWong graph
The HarriesWong graph
Vertices70
Edges105
Radius6
Diameter6
Girth10
Automorphisms24 (S4)
Chromatic number2
Chromatic index3
Book thickness3
Queue number2
PropertiesCubic
Cage
Triangle-free
Hamiltonian
Table of graphs and parameters

The HarriesWong graph has chromatic number 2, chromatic index 3, radius 6, diameter 6, girth 10 and is Hamiltonian. It is also a 3-vertex-connected and 3-edge-connected non-planar cubic graph. It has book thickness 3 and queue number 2.[2]

The characteristic polynomial of the Harries–Wong graph is

History

In 1972, A. T. Balaban published a (3-10)-cage graph, a cubic graph that has as few vertices as possible for girth 10.[3] It was the first (3-10)-cage discovered but it was not unique.[4]

The complete list of (3-10)-cages and the proof of minimality was given by O'Keefe and Wong in 1980.[5] There exist three distinct (3-10)-cage graphs—the Balaban 10-cage, the Harries graph and the HarriesWong graph.[6] Moreover, the HarriesWong graph and Harries graph are cospectral graphs.

References

  1. Weisstein, Eric W. "HarriesWong Graph". MathWorld.
  2. Jessica Wolz, Engineering Linear Layouts with SAT. Master Thesis, University of Tübingen, 2018
  3. A. T. Balaban, A trivalent graph of girth ten, J. Combin. Theory Ser. B 12, 15. 1972.
  4. Pisanski, T.; Boben, M.; Marušič, D.; and Orbanić, A. "The Generalized Balaban Configurations." Preprint. 2001. .
  5. M. O'Keefe and P.K. Wong, A smallest graph of girth 10 and valency 3, J. Combin. Theory Ser. B 29 (1980) 91105.
  6. Bondy, J. A. and Murty, U. S. R. Graph Theory with Applications. New York: North Holland, p. 237, 1976.
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