Look Inside Monopoles and Three-Manifolds

Monopoles and Three-Manifolds

Part of New Mathematical Monographs

Authors:
Peter Kronheimer, Harvard University, Massachusetts
Tomasz Mrowka, Massachusetts Institute of Technology

Date Published: November 2010
availability: Temporarily unavailable - available from TBC
format: Paperback
isbn: 9780521184762

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Description

Originating with Andreas Floer in the 1980s, Floer homology has proved to be an effective tool in tackling many important problems in three- and four-dimensional geometry and topology. This 2007 book provides a comprehensive treatment of Floer homology, based on the Seiberg–Witten monopole equations. After first providing an overview of the results, the authors develop the analytic properties of the Seiberg–Witten equations, assuming only a basic grounding in differential geometry and analysis. The Floer groups of a general three-manifold are then defined and their properties studied in detail. Two final chapters are devoted to the calculation of Floer groups and to applications of the theory in topology. Suitable for beginning graduate students and researchers, this book provides a full discussion of a central part of the study of the topology of manifolds.
- First comprehensive treatment of Seiberg–Witten Floer homology
- Offers a clear overview of recent developments in topology originating from the material presented
- The treatment of underlying techniques will provide students with skills applicable elsewhere in geometry and topology
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Reviews & endorsements
'… there are mathematics books that are classics; these are books that tell a particular story in the right way. As such, they will never go out of date and never be bettered. Kronheimer and Mrowka's book is almost surely such a book. If you want to learn about Floer homology in the Seiberg–Witten context, you will do no better than to read Kronheimer and Mrowka's masterpiece Monopoles and Three-Manifolds.' Clifford Henry Taubes, Bulletin of the American Mathematical Society
'This long-awaited book is a complete and detailed exposition of the Floer theory for Seiberg-Witten invariants. It is very nicely written and contains all proofs of results. This makes the book an essential tool for both researchers and students working in this area of mathematics.' Mathematical Reviews
'This book is the definitive bible for anyone wanting to learn the full story of the various Seiberg-Witten Floer homology theories … There are mathematics books that are classics. As such, they will never go out of date and never be improved. The present masterpiece is almost surely such a book.' Alexander Felshtyn, Zentralblatt MATH
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Product details
- Date Published: November 2010
- format: Paperback
- isbn: 9780521184762
- length: 808 pages
- dimensions: 228 x 152 x 41 mm
- weight: 1.16kg
- contains: 12 b/w illus.
- availability: Temporarily unavailable - available from TBC
Table of Contents
Preface
1. Outlines
2. The Seiberg–Witten equations and compactness
3. Hilbert manifolds and perturbations
4. Moduli spaces and transversality
5. Compactness and gluing
6. Floer homology
7. Cobordisms and invariance
8. Non-exact perturbations
9. Calculations
10. Further developments
References
Glossary of notation
Index.
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Authors
Peter Kronheimer, Harvard University, Massachusetts
Peter Kronheimer is William Caspar Graustein Professor in the Department of Mathematics at Harvard University. He is a Fellow of the Royal Society and has been awarded several distinguished prizes including the 2007 Oswald Veblen Prize. He is co-author, with S. K. Donaldson, of The Geometry of Four-Manifolds. His research interests are gauge theory, low-dimensional topology and geometry.
Tomasz Mrowka, Massachusetts Institute of Technology
Tomasz Mrowka is Professor of Mathematics at Massachusetts Institute of Technology. He holds the James and Marilyn Simons Professorship of Mathematics and is a Member of the American Academy of Arts and Sciences. He was a joint recipient (with Peter Kronheimer) of the 2007 Oswald Veblen Prize. His research interests are low-dimensional topology, partial differential equations and mathematical physics.