Spectral Density Scaling of Fluctuating Interfaces

Abstract

Covariance matrix of heights measured relative to the average height of a growing self-affine surface in the steady state are investigated in the framework of random matrix theory. We show that the spectral density of the covariance matrix scales as (λ) λ- deviating from the prediction of random matrix theory and has a scaling form, (λ, L) = λ- f(λ / Lφ) for the lateral system size L, where the scaling function f(x) approaches a constant for x 1 and zero for x 1. The obtained values of exponents by numerical simulations are ≈ 1.73 and φ ≈ 1.40 for the Edward-Wilkinson class and ≈ 1.64 and φ ≈ 1.79 for the Kardar-Parisi-Zhang class, respectively. The distribution of the largest eigenvalues follows a scaling form as (λmax, L) = 1/Lb fmax ((λmax -La)/Lb), which is different from the Tracy-Widom distribution of random matrix theory while the exponents a and b are given by the same values for the two different classes.