期刊文献+
共找到3篇文章
< 1 >
每页显示 20 50 100
Extremal Quasiconformal Mappings Compatible with Fuchsian Groups 被引量:1
1
作者 Shen Yuliang, Department of Mathematics Peking University Beijing, 100871 ChinaPresent address: Department of Mathematics Suzhou University Suzhou, 215006 China 《Acta Mathematica Sinica,English Series》 SCIE CSCD 1996年第3期285-291,共7页
For every torsion free Fuchsian group F with Poincaré’s -operator norm ║г║=1, it is proved that there exists an extremal Beltrami differential of F which is also extremal under its own boundary correspondence... For every torsion free Fuchsian group F with Poincaré’s -operator norm ║г║=1, it is proved that there exists an extremal Beltrami differential of F which is also extremal under its own boundary correspondence. It is also proved that the imbedding of the Teichmüller space T(Γ) into the universal Teichmüller space T is not a global isometry unless Γ is an elementary group. 展开更多
关键词 extremal quasiconformal mapping extremal Beltrami differential Fuchsian group Poincaré operater
原文传递
An Explicit Example of a Reich Sequence for a Uniquely Extremal Quasiconformal Mapping
2
作者 Xue MENG Sihui ZHANG 《Chinese Annals of Mathematics,Series B》 SCIE CSCD 2021年第3期327-332,共6页
An explicit example of a Reich sequence for a uniquely extremal quasiconformal mapping in a borderline case between uniqueness and non-uniqueness is given.
关键词 quasiconformal mapping Uniquely extremal quasiconformal mapping Reich sequence
原文传递
Quadrilaterals, extremal quasiconformal extensions and Hamilton sequences
3
作者 CHEN Zhi-guo ZHENG Xue-liang YAO Guo-wu 《Applied Mathematics(A Journal of Chinese Universities)》 SCIE CSCD 2010年第2期217-226,共10页
The relationship between Strebel boundary dilatation of a quasisymmetric function h of the unit circle and the dilatation indicated by the change in the modules of the quadrilaterals with vertices on the circle intrig... The relationship between Strebel boundary dilatation of a quasisymmetric function h of the unit circle and the dilatation indicated by the change in the modules of the quadrilaterals with vertices on the circle intrigues many mathematicians. It had been a conjecture for some time that the dilatations Ko(h) and K1(h) of h are equal before Anderson and Hinkkanen disproved this by constructing concrete counterexamples. The independent work of Wu and of Yang completely characterizes the condition for Ko(h) = K1 (h) when h has no substantial boundary point. In this paper, we give a necessary and sufficient condition to determine the equality for h admitting a substantial boundary point. 展开更多
关键词 extremal quasiconformal mapping quasisymmetric mapping Hamilton sequence substantial boundary point.
下载PDF
上一页 1 下一页 到第
使用帮助 返回顶部