Author:
GALLO SANDRO,TAKAHASHI DANIEL Y.
Abstract
AbstractWe prove that uniqueness of the stationary chain, or equivalently, of the$g$-measure, compatible with an attractive regular probability kernel is equivalent to either one of the following two assertions for this chain: (1) it is a finitary coding of an independent and identically distributed (i.i.d.) process with countable alphabet; (2) the concentration of measure holds at exponential rate. We show in particular that if a stationary chain is uniquely defined by a kernel that is continuous and attractive, then this chain can be sampled using a coupling-from-the-past algorithm. For the original Bramson–Kalikow model we further prove that there exists a unique compatible chain if and only if the chain is a finitary coding of a finite alphabet i.i.d. process. Finally, we obtain some partial results on conditions for phase transition for general chains of infinite order.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,General Mathematics
Reference30 articles.
1. On chains of infinite orde
2. The Ergodic Theory of Discrete Sample Paths
3. Non-ergodicity for ${C}^{1} $ expanding maps and $g$-measures;Quas;Ergod. Th. and Dynam. Sys.,1996
4. Strongly mixingg-measures
5. [1] N. Berger , C. Hoffman and V. Sidoravicius . Nonuniqueness for specifications in ${\ell }^{2+ \epsilon } $ . Preprint, 2005, arXiv:math/0312344.
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