Gibbs States and Gibbsian Specifications on the space RN

Abstract

We are interested in the study of Gibbs and equilbrium probabilities on the lattice RN. Consider the unilateral full-shift defined on the non-compact set RN and an α-H\"older continuous potential A from RN into R. From a suitable class of a priori probability measures (over the Borelian sets of R) we define the Ruelle operator associated to A (using an adequate extension of this operator to the compact set RN=(S1)N) and we show the existence of eigenfunctions, conformal probability measures and equilibrium states associated to A. We are also able to show several of the well known classical properties of Thermodynamic Formalism for both of these probability measures. The above, can be seen as a generalization of the results obtained in the compact case for the XY-model. We also introduce an extension of the definition of entropy and show the existence of A-maximizing measures (via ground states for A); we show the existence of the zero temperature limit under some mild assumptions. Moreover, we prove the existence of an involution kernel for A (this requires to consider the bilateral full-shift on RZ). Finally, we build a Gibbsian specification for the Borelian sets on the set RN and we show that this family of probability measures satisfies a FKG-inequality.