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A BINARY INFINITESIMAL FORM OF TEICHMLLER METRIC AND ANGLES IN AN ASYMPTOTIC TEICHMLLER SPACE

A BINARY INFINITESIMAL FORM OF TEICHMLLER METRIC AND ANGLES IN AN ASYMPTOTIC TEICHMLLER SPACE
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摘要 The geometry of Teichmuller metric in an asymptotic Teichmuller space is studled in this article. First, a binary infinitesimal form of Teichmuller metric on AT(X) is proved. Then, the notion of angles between two geodesic curves in the asymptotic Teichmuller space AT(X) is introduced. The existence of such angles is proved and the explicit formula is obtained. As an application, a sufficient condition for non-uniqueness geodesics in AT(X) is obtained. The geometry of Teichmuller metric in an asymptotic Teichmuller space is studled in this article. First, a binary infinitesimal form of Teichmuller metric on AT(X) is proved. Then, the notion of angles between two geodesic curves in the asymptotic Teichmuller space AT(X) is introduced. The existence of such angles is proved and the explicit formula is obtained. As an application, a sufficient condition for non-uniqueness geodesics in AT(X) is obtained.
作者 吴艳 漆毅
机构地区 LMIB and School of Mathematics and Systems Science LMIB and School of Mathematical Science and Systems Science
出处 《Acta Mathematica Scientia》 SCIE CSCD 2016年第2期334-344,共11页 数学物理学报(B辑英文版)
基金 supported by National Natural Science Foundation of China(11371045,11301248)
关键词 Angles of asymptotic Teichmiiller space geodesic segment Finsler structure Boundary dilatation Angles of asymptotic Teichmiiller space geodesic segment Finsler structure Boundary dilatation
分类号 O186.12 [理学—基础数学]
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参考文献17

  • 1Earle C J. The Teichmiiller distance is differentiable. Duke Math J, 1977, 44:389-397.
  • 2Earle C J, Gardiner F P, Lakic N. Teichmiiller spaces with asymptotic conformal equivalence. No. IHES- M-95-60. SCAN-9507105, 1994.
  • 3Earle C J, Gardiner F P, Lakic N. Asymptotic Teichm/iller space. Part I: The complex structure, Contem- porary Math, 2000, 256:17-38.
  • 4Earle C J, Gardiner F P, Lakic N. Asymptotic Teichmiiller space. Part II: The metric structure, Contem- porary Math, 2004, 355:187-219.
  • 5Earle C J, Kra I, Krushkalc S L. Holomorphic Motions and Teichmtiller spaces. Trans Amer Math Soc, 1994,343:927-948.
  • 6Earle C J, Li Z. Isometrically ebmbeded polydisks in infinite-dimensional Teichm/iller spaces. Journal of Geometric Analysis, 1999, 9:51-71.
  • 7Fan J H. On geodesics in asymptotic Teichmiiller spaces. Math Z, 2011, 267:767-779.
  • 8Gardiner F P. Teichmiiller Theory and Quadratic Differentials. New York: John Wiley Sons, 1987.
  • 9Gardiner F P, Lakic N. Quasiconformal Teichmiiller Theory. New York: American Mathematical Society, 2000.
  • 10Gardiner F P, Sullivan D P. Symmetric structures on a closed curve. Amer J Math, 1992 114:683-736.
Acta Mathematica Scientia
2016年 第2期

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