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Teichmüller Theory in Riemannian Geometry

  • Book
  • © 1992

Overview

Authors:
  1. Anthony J. Tromba

    1. Mathematisches Institut, Ludwig-Maximilians-Universität München, München 2, Germany
      Department of Mathematics, University of California, Santa Cruz, USA

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    You can also search for this author in PubMed   Google Scholar

Part of the book series: Lectures in Mathematics. ETH Zürich (LM)

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Table of contents (7 chapters)

  1. Front Matter

    Pages ii-5
    Download chapter PDF

  2. Mathematical Preliminaries

    • Anthony J. Tromba
    Pages 6-13

  3. The Manifolds of Teichmüller Theory

    • Anthony J. Tromba
    Pages 14-35

  4. The Construction of Teichmüller Space

    • Anthony J. Tromba
    Pages 36-62

  5. T(M) is a Cell

    • Anthony J. Tromba
    Pages 63-82

  6. The Complex Structure on Teichmüller Space

    • Anthony J. Tromba
    Pages 83-95

  7. Properties of the Weil-Petersson Metric

    • Anthony J. Tromba
    Pages 96-122

  8. The Pluri-Subharmonicity of Dirichlet’s Energy on T(M); T(M) is a Stein Manifold

    • Anthony J. Tromba
    Pages 123-154

  9. Back Matter

    Pages 155-220
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Keywords

About this book

These lecture notes are based on the joint work of the author and Arthur Fischer on Teichmiiller theory undertaken in the years 1980-1986. Since then many of our colleagues have encouraged us to publish our approach to the subject in a concise format, easily accessible to a broad mathematical audience. However, it was the invitation by the faculty of the ETH Ziirich to deliver the ETH N achdiplom-Vorlesungen on this material which provided the opportunity for the author to develop our research papers into a format suitable for mathematicians with a modest background in differential geometry. We also hoped it would provide the basis for a graduate course stressing the application of fundamental ideas in geometry. For this opportunity the author wishes to thank Eduard Zehnder and Jiirgen Moser, acting director and director of the Forschungsinstitut fiir Mathematik at the ETH, Gisbert Wiistholz, responsible for the Nachdiplom Vorlesungen and the entire ETH faculty for their support and warm hospitality. This new approach to Teichmiiller theory presented here was undertaken for two reasons. First, it was clear that the classical approach, using the theory of extremal quasi-conformal mappings (in this approach we completely avoid the use of quasi-conformal maps) was not easily applicable to the theory of minimal surfaces, a field of interest of the author over many years. Second, many other active mathematicians, who at various times needed some Teichmiiller theory, have found the classical approach inaccessible to them.

Authors and Affiliations

  • Mathematisches Institut, Ludwig-Maximilians-Universität München, München 2, Germany

    Anthony J. Tromba

  • Department of Mathematics, University of California, Santa Cruz, USA

    Anthony J. Tromba

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