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https://doi.org/10.1080/17476938708814226
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Cite Publication Date: Apr 1, 1987 | |
 Citations: 2 |
Affiliation: University College London, University of Michigan–Ann Arbor
Suppose that the quasiconformal homeomorphism fof the complex plane fixes the point at infinity, is conformal in the exterior of the unit disk, and that the complex dilatation μ of f satisfies for some positive δ. It is shown that then fmaps the unit circle onto a rectifiable quasicircle.
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