INTRO

1. Dynamical systems and geometry

  General

  Geometry and CM

  Variational principle - history

  Inverse problem

  Nambu mechanics

  Bi-Hamitonian mechanics

  Tangent structure

  Poisson manifolds

  Lie-Poisson structure

  R-matrix (Classical Yang-Baxter Eqns)

  Euler top, etc.

2. Other applications

  Shroedinger equation as a Hamiltonian system

  Thermodynamics, optics, etc

  Other

  More

3. Quantization

  Geometric quantization

  Moyal bracket

  Coherent states

  Aternative approaches

  Comparisons/ connections

  Semi-classical limit