Structure of Growing Networks: Exact Solution of the Barabasi--Albert's Model

Abstract

We generalize the Barab\'asi--Albert's model of growing networks accounting for initial properties of sites and find exactly the distribution of connectivities of the network P(q) and the averaged connectivity q(s,t) of a site s in the instant t (one site is added per unit of time). At long times P(q) q-γ at q ∞ and q(s,t) (s/t)-β at s/t 0, where the exponent γ varies from 2 to ∞ depending on the initial attractiveness of sites. We show that the relation β(γ-1)=1 between the exponents is universal.

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