Thermodynamic Formalism for a family of cellular automata and duality with the shift

Abstract

We will consider a family of cellular automata : \1,2,...,r\N that are not of algebraic type. Our first goal is to determine conditions that result in the identification of probabilities that are at the same time σ-invariant and -invariant, where σ is the full shift. Via the use of versions of the Ruelle operator LA,σ and LB, we will show that there is an abundant set of measures with this property; they will be equilibrium probabilities for different Lispchitz potentials A,B and for the corresponding dynamics σ and . Via the use of a version of the involution kernel W for a (σ,)-mixed skew product : \1,2,...,r\Z, given A one can determine B, in such way that the integral kernel eW produce a duality between eigenprobabilities A for (LA,σ)* and eigenfunctions B for LB,. In another direction, considering the non-mixed extension n : \1,2,...,r\Z of , given a Lispchitz potential A : \1,2,...,r\Z R, we can identify a Lipschitz potential A:\1,2,...,r\N R , in such away that relates the variational problem of n-Topological Pressure for A with the -Topological Pressure for A. We also present a version of Livsic's Theorem. Whether or not (or ) can eventually be conjugated with another shift of finite type is irrelevant in our context.

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