Bi-Lipschitz Maps in Q-regular Loewner Spaces

Bi-Lipschitz Maps in Q-regular Loewner Spaces

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摘要 By applying the theory of quasiconformal maps in measure metric spaces that was introduced by Heinonen-Koskela, we characterize bi-Lipschitz maps by modulus inequalities of rings and maximal, minimal derivatives in Q-regular Loewner spaces. Meanwhile the sufficient and necessary conditions for quasiconformal maps to become bi-Lipschitz maps are also obtained. These results generalize Rohde’s theorem in ? n and improve Balogh’s corresponding results in Carnot groups. By applying the theory of quasiconformal maps in measure metric spaces that was introduced by Heinonen-Koskela, we characterize bi-Lipschitz maps by modulus inequalities of rings and maximal, minimal derivatives in Q-regular Loewner spaces. Meanwhile the sufficient and necessary conditions for quasiconformal maps to become bi-Lipschitz maps are also obtained. These results generalize Rohde’s theorem in ? n and improve Balogh’s corresponding results in Carnot groups.

作者 Ke Ying CHEN Ai Nong FANG Department of Mathematics,Shanghai Jiaotong University,Shanghai 200240,P.R.China

出处《Acta Mathematica Sinica,English Series》 SCIE CSCD 2008年第9期1555-1568,共14页 数学学报（英文版）

基金 China NSF(Grant No.10271077)

关键词 Quasiconformal maps BI Lipschitz maps Loewner spaces MODULUS Quasiconformal maps bi Lipschitz maps Loewner spaces modulus

分类号 O177 [理学—基础数学]

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Acta Mathematica Sinica,English Series

2008年第9期

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Bi-Lipschitz Maps in Q-regular Loewner Spaces

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