Persistence of Kardar-Parisi-Zhang Interfaces

Abstract

The probabilities P(t0,t) that a growing Kardar-Parisi-Zhang interface remains above or below the mean height in the time interval (t0, t) are shown numerically to decay as P (t0/t)θ with θ+ = 1.18 0.08 and θ- = 1.64 0.08. Bounds on θ are derived from the height autocorrelation function under the assumption of Gaussian statistics. The autocorrelation exponent λ for a d--dimensional interface with roughness and dynamic exponents β and z is conjectured to be λ = β + d/z. For a recently proposed discretization of the KPZ equation we find oscillatory persistence probabilities, indicating hidden temporal correlations.

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