Quasiconformal almost parametrizations of metric surfaces

Damaris Meier; Stefan Wenger

doi:10.4171/jems/1470

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Quasiconformal almost parametrizations of metric surfaces

Damaris Meier
University of Fribourg, Fribourg, Switzerland
Stefan Wenger
University of Fribourg, Fribourg, Switzerland

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Abstract

We look for minimal conditions on a two-dimensional metric surface $X$ of locally finite Hausdorff 2-measure under which $X$ admits an (almost) parametrization with good geometric and analytic properties. Only assuming that $X$ is locally geodesic, we show that Jordan domains in $X$ of finite boundary length admit a quasiconformal almost parametrization. If $X$ satisfies some further conditions, then such an almost parametrization can be upgraded to a geometrically quasiconformal homeomorphism or a quasisymmetric homeomorphism. In particular, we recover Rajala’s recent quasiconformal uniformization theorem in the special case that $X$ is locally geodesic as well as Bonk–Kleiner’s quasisymmetric uniformization theorem. On the way, we establish the existence of Sobolev discs spanning a given Jordan curve in $X$ under nearly minimal assumptions on $X$ and prove the continuity of energy minimizers.

Cite this article

Damaris Meier, Stefan Wenger, Quasiconformal almost parametrizations of metric surfaces. J. Eur. Math. Soc. (2024), published online first

DOI 10.4171/JEMS/1470