This is a 3-regular (cubic) graph with 56 vertices and 84 edges, named after Felix Klein.

It is Hamiltonian, has chromatic number 3, chromatic index 3, radius 6, diameter 6 and girth 7. It is also a 3-vertex-connected and a 3-edge-connected graph. It has book thickness 3 and queue number 2.^[1]

It can be embedded in the genus-3 orientable surface (which can be represented as the Klein quartic), where it forms the Klein map with 24 heptagonal faces, Schläfli symbol {7,3}₈.

According to the Foster census, the Klein graph, referenced as F056B, is the only cubic symmetric graph on 56 vertices which is not bipartite.^[2]

It can be derived from the 28-vertex Coxeter graph.^[3]

Algebraic properties

The automorphism group of the Klein graph is the group PGL₂(7) of order 336, which has PSL₂(7) as a normal subgroup. This group acts transitively on its half-edges, so the Klein graph is a symmetric graph.

The characteristic polynomial of this 56-vertex Klein graph is equal to ${\displaystyle x^{7}\,(x-3)\,(x+2)^{6}\left(x^{2}-2\right)^{6}\left(x^{2}+x-4\right)^{7}\left(x^{2}-2x-1\right)^{8}}$ 

This is a 7-regular graph with 24 vertices and 84 edges, named after Felix Klein.

It is Hamiltonian, has chromatic number 4, chromatic index 7, radius 3, diameter 3 and girth 3.

It can be embedded in the genus-3 orientable surface, where it forms the dual of the Klein map, with 56 triangular faces, Schläfli symbol {3,7}₈.^[4]

It is the unique distance-regular graph with intersection array ${\displaystyle \{7,4,1;1,2,7\}}$ ; however, it is not a distance-transitive graph.^[5]

Algebraic properties

The automorphism group of the 7-valent Klein graph is the same group of order 336 as for the cubic Klein map, likewise acting transitively on its half-edges.

The characteristic polynomial of this 24-vertices Klein graph is equal to ${\displaystyle (x-7)(x+1)^{7}(x^{2}-7)^{8}}$ .^[6]