Anomalous Transport in Complex Networks

Abstract

To study transport properties of complex networks, we analyze the equivalent conductance G between two arbitrarily chosen nodes of random scale-free networks with degree distribution P(k) k-λ in which each link has the same unit resistance. We predict a broad range of values of G, with a power-law tail distribution SF(G) G-gG, where gG=2λ -1, and confirm our predictions by simulations. The power-law tail in SF(G) leads to large values of G, thereby significantly improving the transport in scale-free networks, compared to Erdos-R\'enyi random graphs where the tail of the conductivity distribution decays exponentially. Based on a simple physical ``transport backbone'' picture we show that the conductances are well approximated by ckAkB/(kA+kB) for any pair of nodes A and B with degrees kA and kB. Thus, a single parameter c characterizes transport on scale-free networks.

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