English

The Toom Interface Via Coupling

Mathematical Physics 2018-01-16 v3 math.MP Probability

Abstract

We consider a one dimensional interacting particle system which describes the effective interface dynamics of the two dimensional Toom model at low temperature and noise. We prove a number of basic properties of this model. First we consider the dynamics on a half open finite interval [1,N)[1, N), bounding the mixing time from above by 2N2N. Then we consider the model defined on the integers. Due to infinite range interaction, this is a non-Feller process that we can define starting from product Bernoulli measures with density p(0,1)p \in (0, 1), but not from arbitrary measures. We show, under a modest technical condition, that the only possible invariant measures are those product Bernoulli measures. We further show that the unique stationary measure on [k,)[-k, \infty) converges weakly to a product Bernoulli measure on Z\mathbb{Z} as kk \rightarrow \infty.

Keywords

Cite

@article{arxiv.1501.04746,
  title  = {The Toom Interface Via Coupling},
  author = {Nick Crawford and Gady Kozma and Wojciech de Roeck},
  journal= {arXiv preprint arXiv:1501.04746},
  year   = {2018}
}

Comments

Version 3, 49 pages, Exposition cleaned up, Figures added

R2 v1 2026-06-22T08:06:44.139Z