Large deviations of the interface height in the Golubovi\'c-Bruinsma model of stochastic growth

Abstract

We study large deviations of the one-point height distribution, P(H,T), of a stochastic interface, governed by the Golubovi\'c-Bruinsma equation ∂th=-∂x4h+λ2(∂xh)2+D\,(x,t)\,, where h(x,t) is the interface height at point x and time t, and (x,t) is the Gaussian white noise. The interface is initially flat, and H is defined by the relation h(x=0,t=T)=H. Using the optimal fluctuation method (OFM), we focus on the short-time limit. Here the typical fluctuations of H are Gaussian, and we evaluate the strongly asymmetric and non-Gaussian tails of P(H,T). We show that the upper tail scales as - P(H,T) H11/6/T5/6. The lower tail, which scales as - P(H,T) H5/2/T1/2, coincides with its counterpart for the Kardar-Parisi-Zhang equation, and we uncover a simple physical mechanism behind this universality. Finally, we verify our asymptotic results for the tails, and compute the large deviation function of H, numerically.