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Constant Mean Curvature Surfaces, Harmonic Maps and Integrable Systems
Author
Title
Constant Mean Curvature Surfaces, Harmonic Maps and Integrable Systems [electronic resource] / by Frédéric Hélein.
ISBN
9783034883306
Published
Basel : Birkhäuser Basel : Imprint: Birkhäuser, 2001.
Physical Description
1 online resource.
Local Notes
Access is available to the Yale community.
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Access restricted by licensing agreement.
Summary
This book intends to give an introduction to harmonic maps between a surface and a symmetric manifold and constant mean curvature surfaces as completely integrable systems. The presentation is accessible to undergraduate and graduate students in mathematics but will also be useful to researchers. It is among the first textbooks about integrable systems, their interplay with harmonic maps and the use of loop groups, and it presents the theory, for the first time, from the point of view of a differential geometer. The most important results are exposed with complete proofs (except for the last two chapters, which require a minimal knowledge from the reader). Some proofs have been completely rewritten with the objective, in particular, to clarify the relation between finite mean curvature tori, Wente tori and the loop group approach - an aspect largely neglected in the literature. The book helps the reader to access the ideas of the theory and to acquire a unified perspective of the subject.
Variant and related titles
Springer ebooks.
Other formats
Printed edition:
Format
Books / Online
Language
English
Added to Catalog
February 05, 2013
Series
Lectures in Mathematics. ETH Zürich
Subjects
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