Pósa's theorem: Difference between revisions

Template:Short description Template:Distinguish Pósa's theorem, in graph theory, is a sufficient condition for the existence of a Hamiltonian cycle based on the degrees of the vertices in an undirected graph. It implies two other degree-based sufficient conditions, Dirac's theorem on Hamiltonian cycles and Ore's theorem. Unlike those conditions, it can be applied to graphs with a small number of low-degree vertices. It is named after Lajos Pósa, a protégé of Paul Erdős born in 1947, who discovered this theorem in 1962.

The Pósa condition for a finite undirected graph ${\displaystyle G}$ having ${\displaystyle n}$ vertices requires that, if the degrees of the ${\displaystyle n}$ vertices in increasing order as

${\displaystyle d_1\le d_2\le ...\le d_n,}$

then for each index ${\displaystyle k<n/2}$ the inequality ${\displaystyle k<d_k}$ is satisfied.

Pósa's theorem states that if a finite undirected graph satisfies the Pósa condition, then that graph has a Hamiltonian cycle in it.

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• Katona–Recski–Szabó: A számítástudomány alapjai, Typotex, Budapest, 2003, (Hungarian undergraduate level course book).
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• About the Pósa theorem

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