Transitions in a Probabilistic Interface Growth Model
Abstract
We study a generalization of the Wolf-Villain (WV) interface growth model based on a probabilistic growth rule. In the WV model, particles are randomly deposited onto a substrate and subsequently move to a position nearby where the binding is strongest. We introduce a growth probability which is proportional to a power of the number of bindings of the site : . Through extensively simulations, in -dimensions, we find three behavior depending of the value: {\it i}) if is small, a crossover from the Mullins-Hering to the Edwards-Wilkinson (EW) universality class; {\it ii}) for intermediate values of , a crossover from the EW to the Kardar-Parisi-Zhang (KPZ) universality class; {\it iii}) and, finally, for large values, the system is always in the KPZ class. In -dimensions, we obtain three different behaviors: {\it i}) a crossover from the Villain-Lai-Das Sarma to the EW universality class, for small values; {\it ii}) the EW class is always present, for intermediate values; {\it iii}) a deviation from the EW class is observed, for large values.
Cite
@article{arxiv.1104.0575,
title = {Transitions in a Probabilistic Interface Growth Model},
author = {S G Alves and J G Moreira},
journal= {arXiv preprint arXiv:1104.0575},
year = {2015}
}
Comments
9 pages, 6 figures, published in JSTAT