On the conformal gauge of a compact metric space
Abstract
In this article we study the Ahlfors regular conformal gauge of a compact metric space (X,d), and its conformal dimension dimAR(X,d). Using a sequence of finite coverings of (X,d), we construct distances in its Ahlfors regular conformal gauge of controlled Hausdorff dimension. We obtain in this way a combinatorial description, up to bi-Lipschitz homeomorphisms, of all the metrics in the gauge. We show how to compute dimAR(X,d) using the critical exponent QN associated to the combinatorial modulus.
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