Dynamic Scaling of Width Distribution in Edwards--Wilkinson Type Models of Interface Dynamics
Abstract
Edwards--Wilkinson type models are studied in 1+1 dimensions and the time-dependent distribution, PL(w2,t), of the square of the width of an interface, w2, is calculated for systems of size L. We find that, using a flat interface as an initial condition, PL(w2,t) can be calculated exactly and it obeys scaling in the form <w2>∞ PL(w2,t) = Phi(w2 / <w2>∞, t/L2) where <w2>∞ is the stationary value of w2. For more complicated initial states, scaling is observed only in the large- time limit and the scaling function depends on the initial amplitude of the longest wavelength mode. The short-time limit is also interesting since PL(w2,t) is found to closely approximate the log-normal distribution. These results are confirmed by Monte Carlo simulations on a `roof-top' model of surface evolution.
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