Ebook: Symplectic Geometry: An Introduction based on the Seminar in Bern, 1992
- Tags: Differential Geometry, Manifolds and Cell Complexes (incl. Diff.Topology)
- Series: Progress in Mathematics 124
- Year: 1994
- Publisher: Birkhäuser Basel
- Edition: 1
- Language: English
- pdf
The seminar Symplectic Geometry at the University of Berne in summer 1992 showed that the topic of this book is a very active field, where many different branches of mathematics come tog9ther: differential geometry, topology, partial differential equations, variational calculus, and complex analysis. As usual in such a situation, it may be tedious to collect all the necessary ingredients. The present book is intended to give the nonspecialist a solid introduction to the recent developments in symplectic and contact geometry. Chapter 1 gives a review of the symplectic group Sp(n,R), sympkctic manifolds, and Hamiltonian systems (last but not least to fix the notations). The 1Iaslov index for closed curves as well as arcs in Sp(n, R) is discussed. This index will be used in chapters 5 and 8. Chapter 2 contains a more detailed account of symplectic manifolds start ing with a proof of the Darboux theorem saying that there are no local in variants in symplectic geometry. The most important examples of symplectic manifolds will be introduced: cotangent spaces and Kahler manifolds. Finally we discuss the theory of coadjoint orbits and the Kostant-Souriau theorem, which are concerned with the question of which homogeneous spaces carry a symplectic structure.
Content:
Front Matter....Pages i-xii
Introduction....Pages 1-15
Darboux’ Theorem and Examples of Symplectic Manifolds....Pages 17-41
Generating Functions....Pages 43-64
Symplectic Capacities....Pages 65-78
Floer Homology....Pages 79-98
Pseudoholomorphic Curves....Pages 99-145
Gromov’s Compactness Theorem from a Geometrical Point of View....Pages 147-165
Contact structures....Pages 167-218
Back Matter....Pages 219-244
Content:
Front Matter....Pages i-xii
Introduction....Pages 1-15
Darboux’ Theorem and Examples of Symplectic Manifolds....Pages 17-41
Generating Functions....Pages 43-64
Symplectic Capacities....Pages 65-78
Floer Homology....Pages 79-98
Pseudoholomorphic Curves....Pages 99-145
Gromov’s Compactness Theorem from a Geometrical Point of View....Pages 147-165
Contact structures....Pages 167-218
Back Matter....Pages 219-244
....