Logarithmic Clustering in Submonolayer Epitaxial Growth
Abstract
We investigate submonolayer epitaxial growth with a fixed monomer flux and irreversible aggregation of adatom islands due to their effective diffusion. When the diffusivity Dk of an island of mass k is proportional to k-μ, a Smoluchowski rate equation approach predicts steady behavior for 0<μ<1, with the concentration ck of islands of mass k varying as k-(3-μ)/2. For μ>1, continuous evolution occurs in which ck(t)~( t)-(2k-1)μ/2, while the total island density increases as N(t)~( t)μ/2. Monte Carlo simulations support these predictions.
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