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Geometric Theory of Singular Phenomena in Partial Differential Equations

Geometric Theory of Singular Phenomena in Partial Differential Equations

Part of Symposia Mathematica

F. Labourie, A. M. Nadel, R. Mazzeo, D. Pollack, L. Habermann, J. Jost, F. Catanese, S. Manfredini, P. de Bartolomeis, A. Nannicini, M. Giaquinta, G. Modica, J. Soucek
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  • Date Published: May 1998
  • availability: Out of stock in print form with no current plan to reprint
  • format: Hardback
  • isbn: 9780521632461

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  • Featuring contributions from a group of outstanding mathematicians, this book covers the most recent advances in the geometric theory of singular phenomena of partial differential equations occurring in real and complex differential geometry. Gathering together papers from a workshop held in Cortona, Italy, this volume will be of great interest to all those whose research interests lie in real and complex differential geometry, partial differential equations, and gauge theory.

    • Up to date
    • Excellent contributors
    • Of interest to a wide spread of mathematicians
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    Reviews & endorsements

    'Gathering together papers from a workshop held in Cortona, Italy, this volume will be of interest to all those whose research interests lie in real and complex differential geometry, partial differential equations, and gauge theory.' L'Enseignement Mathématique

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    Product details

    • Date Published: May 1998
    • format: Hardback
    • isbn: 9780521632461
    • length: 192 pages
    • dimensions: 235 x 158 x 16 mm
    • weight: 0.38kg
    • contains: 1 b/w illus.
    • availability: Out of stock in print form with no current plan to reprint
  • Table of Contents

    Preface
    1. Problèmes de Monge-Ampère, courbes pseudo-holomorphes F. Labourie
    2. Multiplier ideal sheaves and Futaki's invariant A. M. Nadel
    3. Gluing and moduli for non-compact geometric problems R. Mazzeo and D. Pollack
    4. Metrics on Tiemann surfaces and the geometry of moduli spaces L. Habermann and J. Jost
    5. The orbifold fundamental group of Persson-Noether-Horikawa surfaces F. Catanese and S. Manfredini
    6. Introduction to differential geometry of twistor spaces P. de Bartolomeis and A. Nannicini
    7. Energy minimizing maps from a domain of R3 into S2 M. Giaquinta, G. Modica and J. Soucek.

  • Editors

    Jean Pierre Bourguignon, IHES, Bur-sur-Yvette, France

    Paolo de Bartolomeis, Università degli Studi di Firenze, Italy

    Mariano Giaquinta, Università degli Studi, Pisa

    Contributors

    F. Labourie, A. M. Nadel, R. Mazzeo, D. Pollack, L. Habermann, J. Jost, F. Catanese, S. Manfredini, P. de Bartolomeis, A. Nannicini, M. Giaquinta, G. Modica, J. Soucek

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