Scale-free random branching tree in supercritical phase
Abstract
We study the size and the lifetime distributions of scale-free random branching tree in which k branches are generated from a node at each time step with probability qk k-γ. In particular, we focus on finite-size trees in a supercritical phase, where the mean branching number C=Σk k qk is larger than 1. The tree-size distribution p(s) exhibits a crossover behavior when 2 < γ < 3; A characteristic tree size sc exists such that for s sc, p(s) s-γ/(γ-1) and for s sc, p(s) s-3/2(-s/sc), where sc scales as (C-1)-(γ-1)/(γ-2). For γ > 3, it follows the conventional mean-field solution, p(s) s-3/2(-s/sc) with sc (C-1)-2. The lifetime distribution is also derived. It behaves as (t) t-(γ-1)/(γ-2) for 2 < γ < 3, and t-2 for γ > 3 when branching step t tc (C-1)-1, and (t) (-t/tc) for all γ > 2 when t tc. The analytic solutions are corroborated by numerical results.
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