Voter Model on Heterogeneous Graphs

Abstract

We study the voter dynamics model on heterogeneous graphs. We exploit the non-conservation of the magnetization to characterize how consensus is reached on networks with different connectivity patterns. For a network of N sites with an arbitrary degree distribution, we show that the mean time to reach consensus TN scales as N mu12/mu2, where muk is the kth moment of the degree distribution. For a power-law degree distribution nk k-nu, we thus find that TN scales as N for nu>3, as N/ln N for nu=3, as N(2nu-4)/(nu-1) for 2<nu<3, as (ln N)2 for nu=2, and as order one for nu<2.

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