Ergodicity of PCA : equivalence between spatial and temporal mixing conditions

Louis, Pierre-Yves

January 2004

For a general attractive Probabilistic Cellular Automata on S-Zd, we prove that the (time-) convergence towards equilibrium of this Markovian parallel dynamics, exponentially fast in the uniform norm, is equivalent to a condition (A). This condition means the exponential decay of the influence from the boundary for the invariant measures of the system restricted to finite boxes. For a class of reversible PCA dynamics on {1,+1}(Zd), wit a naturally associated Gibbsian potential rho, we prove that a (spatial-) weak mixing condition (WM) for rho implies the validity of the assumption (A); thus exponential (time-) ergodicity of these dynamics towards the unique Gibbs measure associated to rho hods. On some particular examples we state that exponential ergodicity holds as soon as there is no phase transition.

Wahrscheinlichkeitstheorie

Wechselwirkende Teilchensysteme

Stochastische Zellulare Automaten

Interacting particle systems

Probabilistic Cellular Automata

ERgodicity of Markov Chains

Gibbs measures

Mathematics