1549055384-Symplectic_Geometry_and_Topology__Eliashberg_

(jair2018) #1

Contents


Preface

Introduction

Dusa McDuff, Introduction to Symplectic Topology
Introduction

Lecture 1. Basics
Existence of Many Symplectomorphisms
Linear Symplectic Geometry
The Cotangent Bundle

Lecture 2. Moser's Argument

Lecture 3. The Linear Theory
w-Compatible Almost Complex Structures
Vector Bundles
The Lagrangian Grassmannian
The Maslov Index

Lecture 4. The Nonsqueezing Theorem and Capacities
Preliminaries on J-Holomorphic Curves

Lecture 5. Sketch Proof of the Nonsqueezing Theorem
Fredholm Theory
Compactness

Bibliography

Helmut Hofer, Holomorphic Curves and Dynamics in Dimension
Three

Lecture 1. Problems, Basic Concepts and Overview
Periodic Orbits of Smooth Vector Fields on Three-Manifolds
Holomorphic Curves and Dynamics
Finer Aspects of Reeb Dynamics and Topology


Lecture 2. Analytical Tools
A Priori Estimates
Bubbling-off Analysis
Behaviour near a Puncture


vii

Xlll

1

5
7

9
9
10
12

13

17
19
19
20
21

23
26

29
30
31

33

35

37

37

43

46

55
55
58
59
Free download pdf