Random walks and induced Dirichlet forms on compact spaces of homogeneous type

Abstract

We extend our study of random walks and induced Dirichlet forms on self-similar sets [arXiv:1604.05440, 1612.01708] to compact spaces of homogeneous type (K, ,μ). A successive partition on K brings a natural augmented tree structure (X, E) that is Gromov hyperbolic, and the hyperbolic boundary is H\"older equivalent to K. We then introduce a class of transient reversible random walks on (X, E) with return ratio λ. Using Silverstein's theory of Markov chains, we prove that the random walk induces an energy form on K with EK [u] K× K |u() - u(η)|2V(, η) (, η)β dμ() dμ(η), where V(, η) is the μ-volume of the ball centered at with radius (, η), is the diagonal, and β depends on λ. In particular, for an α-set in Rd, the kernel of the energy form is of order 1|-η|α +β. We also discuss conditions for this energy form to be a non-local regular Dirichlet form.