Generic scale of the "scale-free" growing networks

Abstract

We show that the connectivity distributions P(k,t) of scale-free growing networks (t is the network size) have the generic scale -- the cut-off at kcut tβ. The scaling exponent β is related to the exponent γ of the connectivity distribution, β=1/(γ-1). We propose the simplest model of scale-free growing networks and obtain the exact form of its connectivity distribution for any size of the network. We demonstrate that the trace of the initial conditions -- a hump at kh kcut tβ -- may be found for any network size. We also show that there exists a natural boundary for the observation of the scale-free networks and explain why so few scale-free networks are observed in Nature.

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