Linear theory of unstable growth on rough surfaces

Abstract

Unstable homoepitaxy on rough substrates is treated within a linear continuum theory. The time dependence of the surface width W(t) is governed by three length scales: The characteristic scale l0 of the substrate roughness, the terrace size lD and the Ehrlich-Schwoebel length lES. If lES lD (weak step edge barriers) and l0 lm lD lD/lES, then W(t) displays a minimum at a coverage θ min (lD/lES)2, where the initial surface width is reduced by a factor l0/lm. The r\ole of deposition and diffusion noise is analyzed. The results are applied to recent experiments on the growth of InAs buffer layers [M.F. Gyure et al., Phys. Rev. Lett. 81, 4931 (1998)]. The overall features of the observed roughness evolution are captured by the linear theory, but the detailed time dependence shows distinct deviations which suggest a significant influence of nonlinearities.

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