| 区域的对数导数单叶性内径 |
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| 引用本文: | 张思汇,陈纪修.区域的对数导数单叶性内径[J].中国科学:数学,2010,40(10):951-958. |
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| 作者姓名: | 张思汇 陈纪修 |
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| 作者单位: | 复旦大学数学科学学院, 上海200433 |
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| 基金项目: | 国家自然科学基金(批准号:10871047); 复旦大学第九批研究生创新基金(批准号:EYH1411041)资助项目 |
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| 摘 要: | 在万有Teichmller空间的对数导数嵌入模型T1(△)中,我们证明了存在无穷多个点h]∈LT1(△),h(△)相互不Mbius等价,它们到边界的距离均为1,而在万有Teichmller空间的Schwarz导数嵌入模型T(△)中,只有一个点Sid具有类似性质.论文还得到了万有Teichmller空间两类嵌入模型的测地线的一些新的性质.
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| 关 键 词: | 对数导数 Schwarz导数 单叶性内径 闭测地线 |
The inner radius of univalency by pre-Schwarzian derivative |
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| ZHANG SiHui & CHEN JiXiu.The inner radius of univalency by pre-Schwarzian derivative[J].Scientia Sinica Mathemation,2010,40(10):951-958. |
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| Authors: | ZHANG SiHui & CHEN JiXiu |
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| Institution: | ZHANG SiHui & CHEN JiXiu |
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| Abstract: | In this paper, we find that in the pre-Schwarzian derivative embedding model of universal Teichmller space T1(△), there are infinitely many h] ∈ L■T1(△) such that h(△) are not Mbius equivalent to each other and the distance from each point h] to the boundary of T1(△) is equal to 1, while in the Schwarzian derivative embedding model of universal Teichmller space, only Sid has the analogous property. Some other properties of the Schwarzian derivative embedding model and the pre-Schwarzian derivative embedding model of universal Teichmller space are also discussed. |
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| Keywords: | pre-Schwarzian derivative Schwarzian derivative inner radius of univalency closed geodesic |
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