MATHEMATICS OF RANDOM GROWING INTERFACES
By Mathew D. Penrose and J.E. Yukich
We establish a thermodynamic limit and Gaussian fluctuations for
the height and surface width of the random interface formed by
the deposition of particles on surfaces. The results hold for the
standard ballistic deposition model as well as the surface
relaxation model in the off-lattice setting. The results are
proved with the aid of general limit theorems for stabilizing
functionals of marked Poisson point processes.