Maximal Height Scaling of Kinetically Growing Surfaces

Abstract

The scaling properties of the maximal height of a growing self-affine surface with a lateral extent L are considered. In the late-time regime its value measured relative to the evolving average height scales like the roughness: h*L Lα. For large values its distribution obeys P(h*L) -A(h*L/Lα)a, charaterized by the exponential-tail exponent a. In the early-time regime where the roughness grows as tβ, we find h*L tβ[L-(β α)t + C]1/b where either b=a or b is the corresponding exponent of the velocity distribution. These properties are derived from scaling and extreme-values arguments. They are corroborated by numerical simulations and supported by exact results for surfaces in 1D with the asymptotic behavior of a Brownian path.

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