Some inequalities between Ahlfors regular conformal dimension and spectral dimensions for resistance forms

Abstract

Quasisymmetric maps are well-studied homeomorphisms between metric spaces preserving annuli, and the Ahlfors regular conformal dimension ARC(X,d) of a metric space (X,d) is the infimum over the Hausdorff dimensions of the Ahlfors regular images of the space by quasisymmetric transformations. For a given regular Dirichlet form with the heat kernel, the spectral dimension ds is an exponent which indicates the short-time asymptotic behavior of the on-diagonal part of the heat kernel. In this paper, we consider the Dirichlet form induced by a resistance form on a set X and the associated resistance metric R. We prove ARC(X,R) ds<2 for ds, a variation of ds defined through the on-diagonal asymptotics of the heat kernel. We also give an example of a resistance form whose spectral dimension ds satisfies the opposite inequality ds<ARC(X,R)<2.

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