PlanetMath: Hamiltonian graph

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Hamiltonian graph

(Definition)

A graph is Hamiltonian if it has a Hamiltonian cycle.

A useful condition both necessary and sufficient for a graph to be Hamiltonian is not known. Ore's theorem and the Bondy and Chvátal theorem give sufficient conditions, while a necessary condition follows quickly from the definition, namely:

Let be a graph of order at least 3. If is Hamiltonian, then for every proper subset of , the subgraph induced by has at most $\vert U\vert$ components.

"Hamiltonian graph" is owned by drini. [ full author list (3) | owner history (2) ]

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See Also: Hamiltonian cycle, Hamiltonian path, Ore's theorem, Bondy and Chvátal theorem, Petersen graph, traceable

Other names:

Hamiltonian

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Cross-references: components, induced, subgraph, proper subset, order, necessary, sufficient, Bondy and Chvátal theorem, Ore's theorem, necessary and sufficient, Hamiltonian cycle, graph
There are 18 references to this entry.

This is version 8 of Hamiltonian graph, born on 2001-10-24, modified 2006-10-23.
Object id is 474, canonical name is HamiltonianGraph.
Accessed 8544 times total.

Classification:

05C45 (Combinatorics :: Graph theory :: Eulerian and Hamiltonian graphs)

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