Persistence in the Voter model: continuum reaction-diffusion approach

Abstract

We investigate the persistence probability in the Voter model for dimensions d≥ 2. This is achieved by mapping the Voter model onto a continuum reaction-diffusion system. Using path integral methods, we compute the persistence probability r(q,t), where q is the number of ``opinions'' in the original Voter model. We find r(q,t) exp[-f2(q)(ln t)2] in d=2; r(q,t) exp[-fd(q)t(d-2)/2] for 2<d<4; r(q,t) exp[-f4(q)t/ln t] in d=4; and r(q,t) exp[-fd(q)t] for d>4. The results of our analysis are checked by Monte Carlo simulations.

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