Lectures on Symplectic Geometry

The goal of these notes is to provide a fast introduction to symplectic geometry for graduate students with some knowledge of differential geometry, de Rham theory and classical Lie groups. This text covers symplectomorphisms, local forms, contact manifold, compatible almost complex structures, Kaeh

The first six sections of these notes contain a description of some of the basic constructions and results on symplectic manifolds and lagrangian submanifolds. Section 7, on intersections of largrangian submanifolds, is still mostly internal to symplectic geometry, but it contains some applications

Contents1. Introduction 1.1 Newtonian mechaics 1.2 Lagrangian mechanics 1.3 The equationsof Hamilton 2. Sympletic spaces 2.1 Sympletic vector spaces 2.2 Sympletic manifolds 2.3 Local description of sympletic manifolds 2.4 Hamiltonian vector fields and Poisson bracket 2.5 Coadjoint orbits 2.6 homogen

The book ends with a very rich bibliography containing 310 titles of important papers relating to the subject. Taking into account the very rigorous and didactic presentation of the contents, as well as the importance of the subject, we consider this book to be a valuable contribution to present ma