English

Fast Condensation in a tunable Backgammon model

Statistical Mechanics 2007-05-23 v1

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 (2ω1)k+(1ω)N(2\omega - 1)k + (1 - \omega)N, where kk is the number of particles in the departure box and NN is the total number of particles (equivalently, boxes) in the system. The parameter ω[0,1]\omega \in [0,1] tunes the dynamics from being slow (ω=1\omega = 1) to being fast (ω=0\omega = 0). This parametrization tacitly assumes a two-box representation for the system at any instant of time and ω\omega is formally related to the 'memory' parameter of a correlated binary sequence. For ω<1/2\omega < 1/2, the system undergoes a fast condensation beyond a certain time that depends on ω\omega and the system size NN. This condensation provides an interesting contrast to that studied with Zeta Urn model in that the probability that a box contains kk particles evolves differently in the model discussed here.

Keywords

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