Mixing time bounds for oriented kinetically constrained spin models
Abstract
We analyze the mixing time of a class of oriented kinetically constrained spin models (KCMs) on a d-dimensional lattice of sites. A typical example is the North-East model, a 0-1 spin system on the two-dimensional integer lattice that evolves according to the following rule: whenever a site's southerly and westerly nearest neighbours have spin 0, with rate one it resets its own spin by tossing a p-coin, at all other times its spin remains frozen. Such models are very popular in statistical physics because, in spite of their simplicity, they display some of the key features of the dynamics of real glasses. We prove that the mixing time is O(n log n) whenever the relaxation time is O(1). Our study was motivated by the "shape" conjecture put forward by G. Kordzakhia and S.P. Lalley.
Keywords
Cite
@article{arxiv.1212.5425,
title = {Mixing time bounds for oriented kinetically constrained spin models},
author = {Paul Chleboun and Fabio Martinelli},
journal= {arXiv preprint arXiv:1212.5425},
year = {2013}
}
Comments
10 pages, 1 figure; fixed typos, added acknowledgement