Percolation in the Harmonic Crystal and Voter Model in three dimensions

Abstract

We investigate the site percolation transition in two strongly correlated systems in three dimensions: the massless harmonic crystal and the voter model. In the first case we start with a Gibbs measure for the potential, U=J2 Σ<x,y> (φ(x) - φ(y))2, x,y ∈ Z3, J > 0 and φ(x) ∈ R, a scalar height variable, and define occupation variables h(x) =1,(0) for φ(x) > h (<h). The probability p of a site being occupied, is then a function of h. In the voter model we consider the stationary measure, in which each site is either occupied or empty, with probability p. In both cases the truncated pair correlation of the occupation variables, G(x-y), decays asymptotically like |x-y|-1. Using some novel Monte Carlo simulation methods and finite size scaling we find accurate values of pc as well as the critical exponents for these systems. The latter are different from that of independent percolation in d=3, as expected from the work of Weinrib and Halperin [WH] for the percolation transition of systems with G(r) r-a [A. Weinrib and B. Halperin, Phys. Rev. B 27, 413 (1983)]. In particular the correlation length exponent is very close to the predicted value of 2 supporting the conjecture by WH that = 2a is exact.

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