Overview
- First book about Poisson structures giving a comprehensive introduction as well as solid foundations to the theory
- Unique structure of the volume tailored to graduate students or advanced researchers
- Provides examples and exercises?
Part of the book series: Grundlehren der mathematischen Wissenschaften (GL, volume 347)
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Table of contents (13 chapters)
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Front Matter
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Theoretical Background
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Front Matter
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Applications
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Front Matter
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Back Matter
Keywords
About this book
Reviews
From the book reviews:
“Each chapter contains a series of exercises as well as a number of notes aimed at giving further hints as to how the various items in the book are interrelated and, furthermore, at placing the material in the literature. … The book is a timely and courageous attempt to make accessible a flourishing research area to a wider audience in the form of a research monograph/textbook and as such it is very welcome.” (Johannes Huebschmann, Jahresbericht der Deutschen Mathematiker-Vereinigung, Vol. 116, 2014)
“This book is an excellent presentation of Poisson geometry, its applications and related topics. … This book is suitable for those who have a solid foundation of differential geometry and Lie algebras. The reader will understand why Poisson geometry is such an interesting and important subject.” (Zhuo Chen, zbMATH, Vol. 1284, 2014)
“This book provides a comprehensive introduction to Poisson structures. … Exercises are given at the end of each chapter … to help readers understand the basic theory. … This is a nice introductory book for both entry level graduate students and advanced researchers who are interested in the subject.” (Xiang Tang, Mathematical Reviews, August, 2013)
“The book under review deals with very exciting (and current) material presented from a fascinating vantage point and should be welcomed by any scholar whose work touches upon the matters … . its thirteen chapters are peppered with sets of exercises and each chapter comes equipped with supplemental notes that go a bit beyond the text, introduce some historical material, and point to other relevant sources.” (Michael Berg, MAA Reviews, November, 2012)
Authors and Affiliations
About the authors
C. Laurent-Gengoux research focus lies on Poisson geometry, Lie-groups and integrable systems. He is the author of 14 research articles. Furthermore, he is committed to teaching and set up several mathematics projects with local high schools. In 2002 he earned his doctorate in mathematics with a dissertation on " Quelques problèmes analytiques et géométriques sur les algèbres et superalgèbres de champs et superchamps de vecteurs”.
A. Pichereau earned her doctorate in mathematics with a dissertation on “Poisson (co)homology and isolated singularities in low dimensions, with an application in the theory of deformations” under the supervision of P. Vanheacke in 2006. She has since published four journal articles on Poisson structures and contributed to the Proceedings of "Algebraic and Geometric Deformation Spaces”.
P. Vanheacke’s research focus lies on integrable systems, Abelian varieties, Poisson algebra/geometry and deformation theory. In 1991 he earned his doctorate in mathematics with a dissertation on “Explicit techniques for studying two-dimensional integrable systems” and has published numerous research articles since.
Bibliographic Information
Book Title: Poisson Structures
Authors: Camille Laurent-Gengoux, Anne Pichereau, Pol Vanhaecke
Series Title: Grundlehren der mathematischen Wissenschaften
DOI: https://doi.org/10.1007/978-3-642-31090-4
Publisher: Springer Berlin, Heidelberg
eBook Packages: Mathematics and Statistics, Mathematics and Statistics (R0)
Copyright Information: Springer-Verlag Berlin Heidelberg 2013
Hardcover ISBN: 978-3-642-31089-8Published: 27 August 2012
Softcover ISBN: 978-3-642-43283-5Published: 20 September 2014
eBook ISBN: 978-3-642-31090-4Published: 27 August 2012
Series ISSN: 0072-7830
Series E-ISSN: 2196-9701
Edition Number: 1
Number of Pages: XXIV, 464
Topics: Analysis, Differential Geometry, Topological Groups, Lie Groups, Non-associative Rings and Algebras