Noise driven dynamic phase transition in a a one dimensional Ising-like model

Abstract

The dynamical evolution of a recently introduced one dimensional model in biswas-sen (henceforth referred to as model I), has been made stochastic by introducing a parameter β such that β =0 corresponds to the Ising model and β ∞ to the original model I. The equilibrium behaviour for any value of β is identical: a homogeneous state. We argue, from the behaviour of the dynamical exponent z,that for any β ≠ 0, the system belongs to the dynamical class of model I indicating a dynamic phase transition at β = 0. On the other hand, the persistence probabilities in a system of L spins saturate at a value Psat(β, L) = (β/L)αf(β), where α remains constant for all β ≠ 0 supporting the existence of the dynamic phase transition at β =0. The scaling function f(β) shows a crossover behaviour with f(β) = constant for β <<1 and f(β) β-α for β >>1.