Integrably asymptotic affine homeomorphisms of the circle and Teichmüller spaces 被引量：9

Integrably asymptotic affine homeomorphisms of the circle and Teichmüller spaces

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摘要 A quasisymmetric homeomorphism of the unit circle S1 is called integrably asymptotic affine if it admits a quasiconformal extension into the unit disk so that its complex dilatation is square in-tegrable in the Poincare metric on the unit disk. Let QS* ( S1) be the space of such maps. Here we give some characterizations and properties of maps in QS* (S1). We also show that QS, (S1)/Moo (S1) is the completion of Diff( S1)/M6b( S1) in the Weil-Petersson metric. A quasisymmetric homeomorphism of the unit circle S1 is called integrably asymptotic affine if it admits a quasiconformal extension into the unit disk so that its complex dilatation is square integrable in the Poincaré metric on the unit disk. Let QS* (s1) be the space of such maps. Here we give some characterizations and properties of maps in QS* (S1). We also show that QS* (S1)/M?b (S1) is the completion of Diff(S1)/M?b(S1) in the Weil-Petersson metric.

作者崔贵珍

机构地区 Institute of Mathematics

出处《Science China Mathematics》 SCIE 2000年第3期267-279,共13页 中国科学：数学（英文版）

关键词 Teichmttller space Weii-Petersson metric. Teichmüller space Weil-Petersson metric

分类号 O186.13 [理学—基础数学]

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参考文献6

1Kari Astala,Michel Zinsmeister.Teichmüller spaces and BMOA[J].Mathematische Annalen.1991(1)
2Subhashis Nag,Alberto Verjovsky.Diff (S 1) and the Teichmüller spaces[J].Communications in Mathematical Physics.1990(1)
3Adrien Douady,Clifford J. Earle.Conformally natural extension of homeomorphisms of the circle[J].Acta Mathematica.1986(1)
4Jochen Becker,Christian Pommerenke.über die quasikonforme Fortsetzung schlichter Funktionen[J].Mathematische Zeitschrift.1978(1)
5Lennart Carleson.On mappings, conformal at the boundary[J].Journal d’Analyse Mathématique.1967(1)
6Choquet,G.Sur un type de transformation analytique gnralisant la reprsentation conforme et dfinie au moyen de foctions harmoniques, Bull[].Sci Math.

同被引文献16

1SHEN YuLiang Department of Mathematics, Soochow University, Suzhou 215006, China.Faber polynomials with applications to univalent functions with quasiconformal extensions[J].Science China Mathematics,2009,52(10):2121-2131. 被引量：2
2Guizhen Cui.Integrably asymptotic affine homeomorphisms of the circle and Teichmüller spaces[J].Science in China Series A: Mathematics.2000(3)
3I. V. Zhuravlev.Model of the universal Techüller space[J].Siberian Mathematical Journal.1986(5)
4Ahlfors,L. Lecture on quasiconformal mappings . 1966
5Astala,K.,Zinsmeister,M.Teichmüller spaces and BMOA[].Mathematische Annalen.1991
6Cui Guizhen,Zinsmeister Michel.BMO-Teichmiiller spaces[].Illinois Journal of Mathematics.2004
7Lehto,O. Univalent Functions and Teichmüller Spaces . 1987
8J.R(a|¨)tty(a|¨).n-th derivative characterizations,mean growth of derivatives and F(p,q,s)[].Bulletin of the Australian Mathematical Society.2003
9Takhtajan L,Teo Lee-Peng.Weil-Petersson metric on the universal Teichm(u|¨)ller space[].Memoirs of the American Mathematical Society.2006
10Gallardo-Gutirrez E,Gonza′lez M,Prez-Gonz′alez F, et al.Locally univalent functions, VMOA and the Dirichlet space[]..

引证文献9

1Yu-liang SHEN.On Grunsky operator[J].Science China Mathematics,2007,50(12):1805-1817. 被引量：2
2沈玉良.Grunsky算子[J].中国科学（A辑）,2007,37(10):1181-1192.
3WU Chong.The cross-ratio distortion of integrably asymptotic affine homeomorphism of unit circle[J].Science China Mathematics,2012,55(3):625-632.
4TANG ShuAn.Some characterizations of the integrable Teichmller space[J].Science China Mathematics,2013,56(3):541-551. 被引量：2
5Shu-an TANG.On F(p,s)-Teichmüller Space[J].Journal of Mathematical Research with Applications,2020,40(4):381-386.
6Li WU,Yuliang SHEN.On the Compactness of Grunsky Differential Operators[J].Chinese Annals of Mathematics,Series B,2020,41(4):559-572.
7唐树安,冯小高.调和映射的可积拟共形延拓[J].数学杂志,2020,40(5):593-599.
8唐树安.渐近共形曲线与渐近光滑曲线的若干几何刻画[J].数学进展,2020,49(6):685-692.
9王念军,张庭,唐树安.关于一个核函数的一些注记[J].兰州工业学院学报,2024,31(3):103-106.

二级引证文献4

1沈玉良.Faber多项式及其在具有拟共形延拓的单叶函数中的应用[J].中国科学（A辑）,2009,39(11):1299-1308.
2唐树安,吴冲,冯小高.Grunsky算子的本性模[J].数学学报（中文版）,2017,60(2):253-260.
3Shu-an TANG.On F(p,s)-Teichmüller Space[J].Journal of Mathematical Research with Applications,2020,40(4):381-386.
4唐树安,冯小高.调和映射的可积拟共形延拓[J].数学杂志,2020,40(5):593-599.

1LI ZhongDepartment of Mathematics, Peking University, Beijing 100871, China.On the boundary value problem for harmonic maps of the Poincaré disc[J].Chinese Science Bulletin,1997,42(24):2025-2045. 被引量：1
2漆毅.A problem in extremal quasiconformal extensions[J].Science China Mathematics,1998,41(11):1135-1141. 被引量：2
3Sheng Jin HUO,Sheng Jian WU.Hausdorff Dimensions of Quasilines and Differentiability of Quasisymmetric Homeomorphisms[J].Acta Mathematica Sinica,English Series,2016,32(4):499-506.
4Chen, JX,Chen, ZG.A remark on "an approximation condition and extremal quasiconformal extension[J].Chinese Science Bulletin,1997,42(21):1765-1767. 被引量：8
5WU Zemin 1 and LAI Wancai 2 1. Department of Applied Mathematics, Shanghai Jiaotong University, Shanghai 200240, China,2. Department of Mathematics, Huaqiao University, Quanzhou 362011, China.Quasisymmetric boundary correspondence and Grtzsch problem[J].Chinese Science Bulletin,1998,43(12):992-994. 被引量：1
6Qing Jin CHENG,Yun Bai DONG.Uniform Homeomorphisms of Unit Spheres and Property H of Lebesgue–Bochner Function Spaces[J].Acta Mathematica Sinica,English Series,2017,33(5):681-690. 被引量：2
7沈玉良.A counterexample theorem in quasiconformal mapping theory[J].Science China Mathematics,2000,43(9):929-936. 被引量：3
8郭辉.Integrable Teichmüller spaces[J].Science China Mathematics,2000,43(1):47-58. 被引量：2
9漆毅,伍胜健.Non-Strebel points and variability sets[J].Science China Mathematics,2003,46(4):525-529.
10方爱农.Generalized Beurling-Ahlfors'Theorem[J].Science China Mathematics,1995,38(9):1060-1069.

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Integrably asymptotic affine homeomorphisms of the circle and Teichmüller spaces 被引量：9

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