Critical exponents of induced Dirichlet forms on self-similar sets

Abstract

In a previous paper [arXiv:1604.05440], we studied certain random walks on the hyperbolic graphs X associated with the self-similar sets K, and showed that the discrete energy EX on X has an induced energy form EK on K that is a Gagliardo-type integral. The domain of EK is a Besov space α, β/22,2 where α is the Hausdorff dimension of K and β is a parameter determined by the "return ratio" of the random walk. In this paper, we study the functional relationship of EX and EK. In particular, we investigate the critical exponents of the β in the domain α, β/22,2 in order for EK to be a regular Dirichlet form. We provide some criteria to determine the critical exponents through the effective resistance of the random walk on X, and make use of certain electrical network techniques to calculate the exponents for some concrete examples.