Study programme 2022-2023 | Français | ||
Classic Mechanics II | |||
Learning Activity |
Code | Lecturer(s) | Associate Lecturer(s) | Subsitute Lecturer(s) et other(s) | Establishment |
---|---|---|---|---|
S-PHYS-017 |
|
|
Language of instruction | Language of assessment | HT(*) | HTPE(*) | HTPS(*) | HR(*) | HD(*) | Term |
---|---|---|---|---|---|---|---|
Français | Français | 25 | 25 | 0 | 0 | 0 | Q1 |
Content of Learning Activity
Variational principles, Hamilton and Lagrangian formalisms, Hamilton-Jacobi equation, integrability, action-angle variables
Required Learning Resources/Tools
Lecture notes of the teacher, made available on Moodle/Teams
Recommended Learning Resources/Tools
V. Arnold, Mathematical methods of classical mechanics, Springer-Verlag 1989;
Ph. Spindel, Mécanique analytique, Volume II, Editeur(s) : Paris : Contemporary publishing international-GB sciencepublishers, 2002
Other Recommended Reading
L. Landau and E. Lifchitz, Vol 1 Mecanique, MIR Moscou, 1982
Mode of delivery
Type of Teaching Activity/Activities
Evaluations
The assessment methods of the Learning Activity (AA) are specified in the course description of the corresponding Educational Component (UE)