Bulk Mediated Surface Diffusion: Finite System Case
Abstract
We address the dynamics of adsorbed molecules (a fundamental issue in surface physics) within the framework of a Master Equation scheme, and study the diffusion of particles in a finite cubic lattice whose boundaries are at the z=1 and the z=L planes where L = 2,3,4,..., while the x and y directions are unbounded. As we are interested in the effective diffusion process at the interface z = 1, we calculate analytically the conditional probability for finding the system on the z=1 plane as well as the surface dispersion as a function of time and compare these results with Monte Carlo simulations finding an excellent agreement.
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