Quasisymmetric embeddings of slit Sierpi\'nski carpets

Abstract

We study the problem of quasisymmetrically embedding spaces homeomorphic to the Sierpi\'nski carpet into the plane. In the case of so called dyadic slit carpets, several characterizations are obtained. One characterization is in terms of a Transboundary Loewner Property (TLP) which is a transboundary analogue of the Loewner property of Heinonen and Koskela. We show that a dyadic slit carpet can be quasisymmetrically embedded into the plane if and only if it is TLP. Moreover, every dyadic slit carpet X can be associated to a "pillowcase sphere" X which is a metric space homeomorphic to the sphere S2. We show that X quasisymmetrically embeds into the plane if and only if X is quasisymmetric to S2 if and only if X is Ahlfors 2-regular.