One-sided continuity properties for the Schonmann projection
Abstract
We consider the plus-phase of the two-dimensional Ising model below the critical temperature. In Schonmann proved that the projection of this measure onto a one-dimensional line is not a Gibbs measure. After many years of continued research which have revealed further properties of this measure, the question whether or not it is a Gibbs measure in an almost sure sense remains open. In this paper we study the same measure by interpreting it as a temporal process. One of our main results is that the Schonmann projection is almost surely a regular -measure. That is, it does possess the corresponding one-sided notion of almost Gibbsianness. We further deduce strong one-sided mixing properties which are of independent interest. Our proofs make use of classical coupling techniques and some monotonicity properties which are known to hold for one-sided, but not two-sided conditioning for FKG measures.
Keywords
Cite
@article{arxiv.1802.02059,
title = {One-sided continuity properties for the Schonmann projection},
author = {Stein Andreas Bethuelsen and Diana Conache},
journal= {arXiv preprint arXiv:1802.02059},
year = {2018}
}
Comments
19 pages