|
|
Contents
|
|
| Week 1: |
Vector spaces, subspaces, linear transformations |
| Week 2: |
Dual spaces, multilinear functionals |
| Week 3: |
Symplectic vector spaces |
| Week 4: |
Symplectic transformations |
| Week 5: |
Hamilton’s equations |
| Week 6: |
Hamiltonian flows |
| Week 7: |
Poisson brackets |
| Week 8: |
KdV Eq., Wave Eq., |
| Week 9: |
Schrödinger Eq., Sine-Gordon Eq. Midterm Exam. |
| Week 10: |
Manifolds |
| Week 11: |
Vector fields and differential forms |
| Week 12: |
Symplectic manifolds, Hamiltonian systems, Canonical maps |
| Week 13: |
Poisson brackets on symplectic manifolds |
| Week 14: |
The canonical Hamiltonian systems on cotangent bundles |
| Week 15*: |
- |
| Week 16*: |
Final Exam. |
| Textbooks and materials: |
• Marsden, J. E., & Ratiu, T. (1999), Introduction to mechanics and symmetry, Second
edition, Texts in Applied Mathematics 17, Springer-Verlag, New York.
• Libermann, P., & Marle, C. M. (2012), Symplectic geometry and analytical mechanics (Vol. 35), Springer.
• Abraham, R. & Marsden, J. E. (1978), Foundations of mechanics, Benjamin/Cummings Publishing Company, Reading, Massachusetts.
|
| Recommended readings: |
• Arnold, V.I. (2013) Mathematical methods of classical mechanics (Vol. 60), Springer
• Holm, D.D. (2008) Geometric Mechanics. Part I and Part II, Imperial College Press, London,
• Holm, D.D., Schmah, T. & Stoica C. (2009) Geometric Mechanics and Symmetry. From Finite to Infinite Dimensions, Oxford University Press,
|
|
|
* Between 15th and 16th weeks is there a free week for students to prepare for final exam.
|
|
