Scaling Limits of a Weakly Perturbed Random Interface Model

Abstract

We consider a random interface model on the discrete torus with 2n sites, obtained from the classical corner flip dynamics but with a weak global perturbation, namely an asymmetry of order n-γ of the direction of growth that switches direction based on the sign of the total area under the interface. The slopes of this model can be viewed as a non-simple exclusion process at half filling with globally dependent rates. We show that, for γ=1, the hydrodynamic equation of the empirical density is given by a time concatenation of the viscous Burgers equation and the heat equation. Moreover, for n prime and γ>67, we establish convergence in law of the equilibrium fluctuations to an infinite-dimensional Ornstein-Uhlenbeck process.

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