Solid--on--Solid Model for Adsorption on Self--Affine Substrate: A Transfer Matrix Approach
Abstract
We study a d=2 discrete solid--on--solid model of complete wetting of a rough substrate with random self--affine boundary, having roughness exponent ζs. A suitable transfer matrix approach allows to discuss adsorption isotherms, as well as geometrical and thermal fluctuations of the interface. For ζs≤ 1/2 the same wetting exponent =1/3 as for flat substrate is obtained for the dependence of the coverage, θ, on the chemical potential, h (θ h- for h 0). The expected existence of a zero temperature fixed point, leading to =ζs /(2-ζs) for ζs>1/2, is verified numerically in spite of an unexpected, very slow convergence to asymptotics.
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