Non-equilibrium dynamics in a three state opinion formation model with stochastic extreme switches

Abstract

We investigate the non-equilibrium dynamics of a three state kinetic exchange model of opinion formation, where switches between extreme states are possible, depending on the value of a parameter q. The mean field dynamical equations are derived and analysed for any q. The fate of the system under the evolutionary rules used in BCS shows that it is dependent on the value of q and the initial state in general. For q=1, which allows the extreme switches maximally, a quasi-conservation in the dynamics is obtained which renders it equivalent to the voter model. For general q values, a "frozen" disordered fixed point is obtained which acts as an attractor for all initially disordered states. For other initial states, the order parameter grows with time t as [α(q) t] where α = 1-q3-q for q≠ 1 and follows a power law behaviour for q=1. Numerical simulations using a fully connected agent based model provide additional results like the system size dependence of the exit probability and consensus times that further accentuate the different behaviour of the model for q=1 and q≠ 1. The results are compared with the non-equilibrium phenomena in other well known dynamical systems.