On the purity of the free boundary condition Potts measure on random trees

Marco Formentin; Christof Kulske

doi:10.1016/j.spa.2009.03.008

On the purity of the free boundary condition Potts measure on random trees

Marco Formentin, Christof Kulske^*

^*Corresponding author for this work

Research output: Contribution to journal › Article › Academic › peer-review

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Abstract

We consider the free boundary condition Gibbs measure of the Potts model on a random tree. We provide an explicit temperature interval below the ferromagnetic transition temperature for which this measure is extremal, improving older bounds of Mossel and Peres. In information theoretic language extremality of the Gibbs measure corresponds to non-reconstructability for symmetric q-ary channels. The bounds for the corresponding threshold value of the inverse temperature are optimal for the Ising model and differ from the Kesten Stigum bound by only 1.50% in the case q = 3 and 3.65% for q = 4, independently of d. Our proof uses an iteration of random boundary entropies from the outside of the tree to the inside, along with a symmetrization argument. (C) 2009 Elsevier B.V. All rights reserved.

Original language	English
Pages (from-to)	2992-3005
Number of pages	14
Journal	Stochastic processes and their applications
Volume	119
Issue number	9
DOIs	https://doi.org/10.1016/j.spa.2009.03.008
Publication status	Published - Sept-2009

Keywords

Potts model
Gibbs measures
Random tree
Reconstruction problem
Free boundary condition
ISING-MODEL
DISORDERED STATE
BETHE LATTICE
RECONSTRUCTION
EXTREMALITY

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title = "On the purity of the free boundary condition Potts measure on random trees",

abstract = "We consider the free boundary condition Gibbs measure of the Potts model on a random tree. We provide an explicit temperature interval below the ferromagnetic transition temperature for which this measure is extremal, improving older bounds of Mossel and Peres. In information theoretic language extremality of the Gibbs measure corresponds to non-reconstructability for symmetric q-ary channels. The bounds for the corresponding threshold value of the inverse temperature are optimal for the Ising model and differ from the Kesten Stigum bound by only 1.50% in the case q = 3 and 3.65% for q = 4, independently of d. Our proof uses an iteration of random boundary entropies from the outside of the tree to the inside, along with a symmetrization argument. (C) 2009 Elsevier B.V. All rights reserved.",

keywords = "Potts model, Gibbs measures, Random tree, Reconstruction problem, Free boundary condition, ISING-MODEL, DISORDERED STATE, BETHE LATTICE, RECONSTRUCTION, EXTREMALITY",

author = "Marco Formentin and Christof Kulske",

note = "Relation: http://www.rug.nl/informatica/organisatie/overorganisatie/iwi Rights: University of Groningen, Research Institute for Mathematics and Computing Science (IWI)",

year = "2009",

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doi = "10.1016/j.spa.2009.03.008",

language = "English",

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TY - JOUR

T1 - On the purity of the free boundary condition Potts measure on random trees

AU - Formentin, Marco

AU - Kulske, Christof

N1 - Relation: http://www.rug.nl/informatica/organisatie/overorganisatie/iwi Rights: University of Groningen, Research Institute for Mathematics and Computing Science (IWI)

PY - 2009/9

Y1 - 2009/9

N2 - We consider the free boundary condition Gibbs measure of the Potts model on a random tree. We provide an explicit temperature interval below the ferromagnetic transition temperature for which this measure is extremal, improving older bounds of Mossel and Peres. In information theoretic language extremality of the Gibbs measure corresponds to non-reconstructability for symmetric q-ary channels. The bounds for the corresponding threshold value of the inverse temperature are optimal for the Ising model and differ from the Kesten Stigum bound by only 1.50% in the case q = 3 and 3.65% for q = 4, independently of d. Our proof uses an iteration of random boundary entropies from the outside of the tree to the inside, along with a symmetrization argument. (C) 2009 Elsevier B.V. All rights reserved.

AB - We consider the free boundary condition Gibbs measure of the Potts model on a random tree. We provide an explicit temperature interval below the ferromagnetic transition temperature for which this measure is extremal, improving older bounds of Mossel and Peres. In information theoretic language extremality of the Gibbs measure corresponds to non-reconstructability for symmetric q-ary channels. The bounds for the corresponding threshold value of the inverse temperature are optimal for the Ising model and differ from the Kesten Stigum bound by only 1.50% in the case q = 3 and 3.65% for q = 4, independently of d. Our proof uses an iteration of random boundary entropies from the outside of the tree to the inside, along with a symmetrization argument. (C) 2009 Elsevier B.V. All rights reserved.

KW - Potts model

KW - Gibbs measures

KW - Random tree

KW - Reconstruction problem

KW - Free boundary condition

KW - ISING-MODEL

KW - DISORDERED STATE

KW - BETHE LATTICE

KW - RECONSTRUCTION

KW - EXTREMALITY

U2 - 10.1016/j.spa.2009.03.008

DO - 10.1016/j.spa.2009.03.008

M3 - Article

SN - 0304-4149

VL - 119

SP - 2992

EP - 3005

JO - Stochastic processes and their applications

JF - Stochastic processes and their applications

IS - 9

ER -

On the purity of the free boundary condition Potts measure on random trees

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Keywords

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