Heawood graph

Other names:    F014A       torus-h-1-3       Levi graph of Fano plane       GH(1,2)   


Heawood graph diagram, © Wikipedia
Heawood graph diagram, © N.S.Wedd
Heawood graph diagram, © N.S.Wedd

Statistics

It has degree 3, with 14 vertices and 21 edges.
It has girth 6, diameter 3 and radius 3.
Its symmetry group is PGL(2,7), with 336 elements.
It is bipartite.
It is Hamiltonian.
It is symmetric.
It is 4-arc-transitive.
Its distance-list is 1,3,6,4.

Link

http://en.wikipedia.org/wiki/Heawood_graph

Regular maps

Heawood graph is the skeleton of the Heawood map
Heawood graph is the skeleton of S3:{14,3}a
Heawood graph is the skeleton of C8.1 with muliplicity 2
Heawood graph is the skeleton of C22.6′ with muliplicity 3
Heawood graph is the skeleton of C29.3′ with muliplicity 4
Heawood graph is the skeleton of C22.5 with muliplicity 4
Heawood graph is the skeleton of C29.2 with muliplicity 5
Heawood graph is the skeleton of C43.10′ with muliplicity 5
Heawood graph is the skeleton of C50.7′ with muliplicity 6
Heawood graph is the skeleton of C64.20′ with muliplicity 7
Heawood graph is the skeleton of C43.7 with muliplicity 7
Heawood graph is the skeleton of C64.18 with muliplicity 8
Heawood graph is the skeleton of C71.9′ with muliplicity 8
Heawood graph is the skeleton of C50.6 with muliplicity 8
Heawood graph is the skeleton of C71.10′ with muliplicity 8
Heawood graph is the skeleton of C85.14′ with muliplicity 9
Heawood graph is the skeleton of C92.10′ with muliplicity 10
Heawood graph is the skeleton of C64.12 with muliplicity 10
Heawood graph is the skeleton of C71.4 with muliplicity 11
Heawood graph is the skeleton of C85.9 with muliplicity 13
Heawood graph is the skeleton of C92.7 with muliplicity 14

Dual graphs

Heawood graph is the dual of K7 in the torus


For copyright details of Wikipedia image see   Heawood_Graph.svg.


Lists of Graphs
Index to Regular Maps