Fast Condensation in a tunable Backgammon model
Abstract
We present a Monte Carlo study of the Backgammon model, at zero temperature, in which a departure box is chosen at random with a probability proportional to , where is the number of particles in the departure box and is the total number of particles (equivalently, boxes) in the system. The parameter tunes the dynamics from being slow () to being fast (). This parametrization tacitly assumes a two-box representation for the system at any instant of time and is formally related to the 'memory' parameter of a correlated binary sequence. For , the system undergoes a fast condensation beyond a certain time that depends on and the system size . This condensation provides an interesting contrast to that studied with Zeta Urn model in that the probability that a box contains particles evolves differently in the model discussed here.
Cite
@article{arxiv.cond-mat/0601532,
title = {Fast Condensation in a tunable Backgammon model},
author = {S. L. Narasimhan},
journal= {arXiv preprint arXiv:cond-mat/0601532},
year = {2007}
}
Comments
Five page RevTeX file, seven eps figures