Gibbs States on Random Configurations

Abstract

We study a class of Gibbs measures of classical particle spin systems with spin space S=Rm and unbounded pair interaction, living on a metric graph given by a typical realization γ of a random point process in Rn. Under certain conditions of growth of pair- and self-interaction potentials, we prove that the set G(Sγ) of all such Gibbs measures is not empty for almost all γ , and study support properties of γ∈ G(Sγ). Moreover we show the existence of measurable maps (selections) γ γ and derive the corresponding averaged moment estimates.