Walther graph

Walther graph
Walther graph
	Walther graph
Named after	Hansjoachim Walther
Vertices	25
Edges	31
Radius	5
Diameter	8
Girth	3
Automorphisms	1
Chromatic number	2
Chromatic index	3
Properties	Bipartite; Planar
	Table of graphs and parameters

In the mathematical field of graph theory, the Walther graph, also called the Tutte fragment, is a planar bipartite graph with 25 vertices and 31 edges named after Hansjoachim Walther.^[1] It has chromatic index 3, girth 3 and diameter 8.

If the single vertex of degree 1 whose neighbour has degree 3 is removed, the resulting graph has no Hamiltonian path. This property was used by Tutte when combining three Walther graphs to produce the Tutte graph,^[2] the first known counterexample to Tait's conjecture that every 3-regular polyhedron has a Hamiltonian cycle.^[3]

Algebraic properties[edit]

The Walther graph is an identity graph; its automorphism group is the trivial group.

The characteristic polynomial of the Walther graph is :

{\begin{aligned}x^{3}\left(x^{22}\right.&{}-31x^{20}+411x^{18}-3069x^{16}+14305x^{14}-43594x^{12}\\&\left.{}+88418x^{10}-119039x^{8}+103929x^{6}-55829x^{4}+16539x^{2}-2040\right)\end{aligned}}

References[edit]

^ Weisstein, Eric W. "Walther Graph". MathWorld.
^ Tutte, W. T. (1946), "On Hamiltonian circuits" (PDF), Journal of the London Mathematical Society, 21 (2): 98–101, doi:10.1112/jlms/s1-21.2.98
^ Tait, P. G. (1884), "Listing's Topologie", Philosophical Magazine, 5th Series, 17: 30–46. Reprinted in Scientific Papers, Vol. II, pp. 85–98.

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[1] Weisstein, Eric W. "Walther Graph". MathWorld.

[2] Tutte, W. T. (1946), "On Hamiltonian circuits" (PDF), Journal of the London Mathematical Society, 21 (2): 98–101, doi:10.1112/jlms/s1-21.2.98

[3] Tait, P. G. (1884), "Listing's Topologie", Philosophical Magazine, 5th Series, 17: 30–46. Reprinted in Scientific Papers, Vol. II, pp. 85–98.

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