Continuous Universality in non-equilibrium relaxational dynamics of O(2) symmetric systems

Abstract

We elucidate a non-conserved relaxational nonequilibrium dynamics of a O(2) symmetric model. We drive the system out of equilibrium by introducing a non-zero noise cross-correlation of amplitude D× in a stochastic Langevin description of the system, while maintaining the O(2) symmetry of the order parameter space. By performing dynamic renormalization group calculations in a field-theoretic set up, we analyze the ensuing nonequilibrium steady states and evaluate the scaling exponents near the critical point, which now depend explicitly on D×. Since the latter remains unrenormalized, we obtain universality classes varying continuously with D×. More interestingly, by changing D× continuously from zero, we can make our system move away from its equilibrium behavior (i.e., when D×=0) continuously and incrementally.