Quasiconformal mapping
In mathematical complex analysis, a quasiconformal mapping, introduced by and named by , is a homeomorphism between plane domains which to first order takes small circles to small ellipses of bounded eccentricity. Intuitively, let f : D → D′ be an orientation-preserving homeomorphism between open sets in the plane. If f is continuously differentiable, then it is K-quasiconformal if the derivative of f at every point maps circles to ellipses with eccentricity bounded by K.
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Quasiconformal mapping
In mathematical complex analysis, a quasiconformal mapping, introduced by and named by , is a homeomorphism between plane domains which to first order takes small circles to small ellipses of bounded eccentricity. Intuitively, let f : D → D′ be an orientation-preserving homeomorphism between open sets in the plane. If f is continuously differentiable, then it is K-quasiconformal if the derivative of f at every point maps circles to ellipses with eccentricity bounded by K.
has abstract
En mathématiques, une applicat ...... uady, John H. Hubbard et (en).
@fr
In mathematical complex analys ...... ith eccentricity bounded by K.
@en
擬共形映射又稱擬保角映射,原本是複分析中的一套技術手段,現已 ...... 。 擬共形映射的定義也可以延伸至較高維度或非連續可微的情形。
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first
V. A.
@en
id
Q/q076430
@en
last
Zorich
@en
title
Quasi-conformal mapping
@en
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comment
En mathématiques, une applicat ...... uady, John H. Hubbard et (en).
@fr
In mathematical complex analys ...... ith eccentricity bounded by K.
@en
擬共形映射又稱擬保角映射,原本是複分析中的一套技術手段,現已 ...... 。 擬共形映射的定義也可以延伸至較高維度或非連續可微的情形。
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label
Application quasi conforme
@fr
Quasiconformal mapping
@en
Quasikonforme Abbildung
@de
拟共形映射
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