A general renormalization procedure on the one-dimensional lattice and decay of correlations

Abstract

We present a general form of Renormalization operator R acting on potentials V:\0,1\N R. We exhibit the analytical expression of the fixed point potential V for such operator R. This potential can be expressed in a naturally way in terms of a certain integral over the Hausdorff probability on a Cantor type set on the interval [0,1]. This result generalizes a previous one by A. Baraviera, R. Leplaideur and A. Lopes where the fixed point potential V was of Hofbauer type. For the potentials of Hofbauer type (a well known case of phase transition) the decay is like n-γ, γ>0. Among other things we present the estimation of the decay of correlation of the equilibrium probability associated to the fixed potential V of our general renormalization procedure. In some cases we get polynomial decay like n-γ, γ>0, and in others a decay faster than n \,e -\, n, when n ∞. The potentials g we consider here are elements of the so called family of Walters potentials on \0,1\N which generalizes the potentials considered initially by F. Hofbauer. For these potentials some explicit expressions for the eigenfunctions are known. In a final section we also show that given any choice dn 0 of real numbers varying with n ∈ N there exist a potential g on the class defined by Walters which has a invariant probability with such numbers as the coefficients of correlation (for a certain explicit observable function).