Random Deposition Model with a Constant Capture Length

P. Politi, Y. Saito
2005 Progress of theoretical physics  
We introduce a sequential model for the deposition and aggregation of particles in the submonolayer regime. Once a particle has been randomly deposited on the substrate, it sticks to the closest atom or island within a distance \ell, otherwise it sticks to the deposition site. We study this model both numerically and analytically in one dimension. A clear comprehension of its statistical properties is provided, thanks to capture equations and to the analysis of the island-island distance distribution.
doi:10.1143/ptp.113.15 fatcat:5s27yrcxwjckbgqaskar3i5sq4