Average path length in random networks

Abstract

Analytic solution for the average path length in a large class of random graphs is found. We apply the approach to classical random graphs of Erd\"os and R\'enyi (ER) and to scale-free networks of Barab\'asi and Albert (BA). In both cases our results confirm previous observations: small world behavior in classical random graphs lER N and ultra small world effect characterizing scale-free BA networks lBA N/ N. In the case of scale-free random graphs with power law degree distributions we observed the saturation of the average path length in the limit of N∞ for systems with the scaling exponent 2< α <3 and the small-world behaviour for systems with α>3.

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