Phase transition and correlation decay in Coupled Map Lattices

A. de Maere; A. Lasota; C. Boldrighini; C. Boldrighini; C. Ionescu Tulcea; C. Liverani; C. Maes; E. Giusti; E. Järvenpää; F. Schmüser; G. Gielis; G. Keller; G. Keller; G. Keller; G. Keller; G. Vitali; H. Hennion; J. Bricmont; J. Bricmont; J. Bricmont; J. Miller; J.-B. Bardet; K. Kaneko; K. Kaneko; L. Bunimovich; M. Blank; M. Jiang; O. Stavskaya; V. Baladi; W. Just; W. Ziemer; Y.B. Pesin

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Phase transition and correlation decay in Coupled Map Lattices

Authors: A. de Maere
A. Lasota
C. Boldrighini
C. Boldrighini
C. Ionescu Tulcea
C. Liverani
C. Maes
E. Giusti
E. Järvenpää
F. Schmüser
G. Gielis
G. Keller
G. Keller
G. Keller
G. Keller
G. Vitali
H. Hennion
J. Bricmont
J. Bricmont
J. Bricmont
J. Miller
J.-B. Bardet
K. Kaneko
K. Kaneko
L. Bunimovich
M. Blank
M. Jiang
O. Stavskaya
V. Baladi
W. Just
W. Ziemer
Y.B. Pesin
Publication date: 1 January 2010
Publisher: 'Springer Science and Business Media LLC'
Doi

Abstract

For a Coupled Map Lattice with a specific strong coupling emulating Stavskaya's probabilistic cellular automata, we prove the existence of a phase transition using a Peierls argument, and exponential convergence to the invariant measures for a wide class of initial states using a technique of decoupling originally developed for weak coupling. This implies the exponential decay, in space and in time, of the correlation functions of the invariant measures

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