Randomly Coloring Constant Degree Graphs

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We study a simple Markov chain, known as the Glauber dynamics, for generating a random k-coloring of a n-vertex graph with maximum degree . We prove that, for every > 0, the dynamics converges to a random coloring within O(n log n) steps assuming k k0() and either: (i) k/ > + where

Martin E. Dyer, Alan M. Frieze, Thomas P. Hayes, E

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FOCS 2004 | Glauber Dynamics | Random K-coloring | Simple Markov Chain | Theoretical Computer Science |

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Added	20 Aug 2010
Updated	20 Aug 2010
Type	Conference
Year	2004
Where	FOCS
Authors	Martin E. Dyer, Alan M. Frieze, Thomas P. Hayes, Eric Vigoda

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Randomly Coloring Constant Degree Graphs

FOCS 2004 | Glauber Dynamics | Random K-coloring | Simple Markov Chain | Theoretical Computer Science |

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