Non-local Dirichlet forms, Gibbs measures, and a cohomological Dirichlet principle for Cantor sets

Abstract

In this paper I study properties of the generators γ of non-local Dirichlet forms Eμγ on ultrametric spaces which are the path space of simple stationary Bratteli diagrams. The measures used to define the Dirichlet forms are taken to be the Gibbs measures μψ associated to Hölder continuous potentials ψ for one-sided shifts. I also define a cohomology Hlc(XB) for XB which can be seen as dual to the homology of Bowen and Franks. Besides studying spectral properties of γ, I show that for γ large enough (with sharp bounds depending on the diagram and the measure theoretic entropy hμψ of μψ) there is a unique Eμγ-minimizing representative of any class c∈ Hlc(XB).