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Ore's theorem - Wikipedia, the free encyclopedia

Ore's theorem

From Wikipedia, the free encyclopedia

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For Ore's Theorem in ring theory, see Ore condition.

Ore's Theorem is a result in graph theory due to Øystein Ore (1960). It gives a sufficient condition for a graph to be Hamiltonian. Essentially it says that if a graph is "connected enough" then it must have a Hamilton cycle; in particular, we consider the number of edges incident to non-adjacent vertices.

[edit] Statement of the theorem

If G is a simple graph with n vertices, where n\ge 3, and if for each pair of non-adjacent vertices v and w, deg(v)+deg(w)\ge n, then G is Hamiltonian.

Ore's Theorem is a generalisation of Dirac's Theorem; further generalisation leads to the Bondy-Chvátal theorem.

[edit] See also

Retrieved from "http://en.wikipedia.org../../../o/r/e/Ore%27s_theorem.html"

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