Complete Condensation in a Zero Range Process on Scale-Free Networks
Abstract
We study a zero range process on scale-free networks in order to investigate how network structure influences particle dynamics. The zero range process is defined with the particle jumping rate function p(n)=nδ. We show analytically that a complete condensation occurs when δ ≤ δc 1/(γ-1) where γ is the degree distribution exponent of the underlying networks. In the complete condensation, those nodes whose degree is higher than a threshold are occupied by macroscopic numbers of particles, while the other nodes are occupied by negligible numbers of particles. We also show numerically that the relaxation time follows a power-law scaling τ Lz with the network size L and a dynamic exponent z in the condensed phase.
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