arXiv:cond-mat/0309348 Abstract

arXiv:cond-mat/0309348Abstract References Reviews Resources

Maximum matching on random graphs

Published 2003-09-15Version 1

The maximum matching problem on random graphs is studied analytically by the cavity method of statistical physics. When the average vertex degree \mth{c} is larger than \mth{2.7183}, groups of max-matching patterns which differ greatly from each other {\em gradually} emerge. An analytical expression for the max-matching size is also obtained, which agrees well with computer simulations. Discussion is made on this {\em continuous} glassy phase transition and the absence of such a glassy phase in the related minimum vertex covering problem.

Comments: 7 pages with 2 eps figures included. Use EPL style. Submitted to Europhysics Letters

Categories: cond-mat.dis-nn, cond-mat.stat-mech

Keywords: random graphs, maximum matching, related minimum vertex covering problem, glassy phase transition, average vertex degree

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