Kinetics of step bunching during growth: A minimal model

Abstract

We study a minimal stochastic model of step bunching during growth on a one-dimensional vicinal surface. The formation of bunches is controlled by the preferential attachment of atoms to descending steps (inverse Ehrlich-Schwoebel effect) and the ratio d of the attachment rate to the terrace diffusion coefficient. For generic parameters (d > 0) the model exhibits a very slow crossover to a nontrivial asymptotic coarsening exponent β 0.38. In the limit of infinitely fast terrace diffusion (d=0) linear coarsening (β = 1) is observed instead. The different coarsening behaviors are related to the fact that bunches attain a finite speed in the limit of large size when d=0, whereas the speed vanishes with increasing size when d > 0. For d=0 an analytic description of the speed and profile of stationary bunches is developed.

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