Uniformization with Infinitesimally Metric Measures
Rajala, K., Rasimus, M., & Romney, M. (2021). Uniformization with Infinitesimally Metric Measures. Journal of Geometric Analysis, 31(11), 11445-11470. https://doi.org/10.1007/s12220-021-00689-y
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Journal of Geometric AnalysisDate
2021Discipline
Analyysin ja dynamiikan tutkimuksen huippuyksikköMatematiikkaAnalysis and Dynamics Research (Centre of Excellence)MathematicsCopyright
© The Author(s) 2021
We consider extensions of quasiconformal maps and the uniformization theorem to the setting of metric spaces X homeomorphic to R2R2. Given a measure μμ on such a space, we introduce μμ-quasiconformal maps f:X→R2f:X→R2, whose definition involves deforming lengths of curves by μμ. We show that if μμ is an infinitesimally metric measure, i.e., it satisfies an infinitesimal version of the metric doubling measure condition of David and Semmes, then such a μμ-quasiconformal map exists. We apply this result to give a characterization of the metric spaces admitting an infinitesimally quasisymmetric parametrization.
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SpringerISSN Search the Publication Forum
1050-6926Keywords
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Open access funding provided by University of Jyväskylä (JYU).License
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