Effect of long-range interactions on the phase transition of Axelrod's model

Abstract

Axelrod's model with F=2 cultural features, where each feature can assume k states drawn from a Poisson distribution of parameter q, exhibits a continuous nonequilibrium phase transition in the square lattice. Here we use extensive Monte Carlo simulations and finite size scaling to study the critical behavior of the order parameter , which is the fraction of sites that belong to the largest domain of an absorbing configuration averaged over many runs. We find that it vanishes as (qc0 - q )β with β ≈ 0.25 at the critical point qc0 ≈ 3.10 and that the exponent that measures the width of the critical region is 0 ≈ 2.1. In addition, we find that introduction of long-range links by rewiring the nearest-neighbors links of the square lattice with probability p turns the transition discontinuous, with the critical point qcp increasing from 3.1 to 27.17, approximately, as p increases from 0 to 1. The sharpness of the threshold, as measured by the exponent p ≈ 1 for p>0, increases with the square root of the number of nodes of the resulting small-world network.