Perturbation analysis in thermodynamics using matrix representations of Ruelle transfer operators

Abstract

We study perturbations of topological pressures, Gibbs measures and measure-theoretic entropies of these measures concerning perturbed potentials defined on topologically transitive subshift of finite type. The subshift with respect to non-perturbed system is assumed to be no topologically transitive. Therefore, the subshift of the perturbed systems and the subshift of the unperturbed system are different. We reduce this situation to a perturbation problem of certain irreducible nonnegative matrices generated by Ruelle transfer operators. Consequently, under suitable conditions of potentials, we characterize the limit points of those thermodynamics and give a necessary and sufficient condition for convergence of Gibbs measures and the measure-theoretic entropy of this measure when the subshift of the non-perturbed system has 2 or 3 transitive components with the maximal pressure. Finally, we illustrate the relation between potentials and convergence of Gibbs measures by using asymptotic expansion techniques for eigenvalues of Ruelle transfer operators.