Critical Dynamical Exponent of the Two-Dimensional Scalar φ4 Model with Local Moves

Abstract

We study the scalar one-component two-dimensional (2D) φ4 model by computer simulations, with local Metropolis moves. The equilibrium exponents of this model are well-established, e.g. for the 2D φ4 model γ= 1.75 and = 1. The model has also been conjectured to belong to the Ising universality class. However, the value of the critical dynamical exponent zc is not settled. In this paper, we obtain zc for the 2D φ4 model using two independent methods: (a) by calculating the relative terminal exponential decay time τ for the correlation function φ(t)φ(0), and thereafter fitting the data as τ Lzc, where L is the system size, and (b) by measuring the anomalous diffusion exponent for the order parameter, viz., the mean-square displacement (MSD) φ2(t) tc as c=γ/( zc), and from the numerically obtained value c≈ 0.80, we calculate zc. For different values of the coupling constant λ, we report that zc=2.170.03 and zc=2.190.03 for the two methods respectively. Our results indicate that zc is independent of λ, and is likely identical to that for the 2D Ising model. Additionally, we demonstrate that the Generalised Langevin Equation (GLE) formulation with a memory kernel, identical to those applicable for the Ising model and polymeric systems, consistently capture the observed anomalous diffusion behavior.