"Symmetries in Physics" is an incredibly rich subject.
This lecture aims to provide the tools how symmetries can be put in use
in both fundamental physics (particle physics, relativity) and in applications
in classical and quantum physics.
Content:
1) Introduction: Examples of Symmetries in Physics
2) Group Theory
- Axioms and Defnitions
- Relations Between Groups
- Finite Groups
- Continuous Groups
3) Applications of Group Theory
- Galilei, Lorentz and Poincare Group
- Relativistic Field Theory
4) Representation Theory
- Reducible and Irreducible Representations
- Tensor Product Representations
- Characters and Lemma of Schur
- Representations of Finite Groups
- Representations of Lie Groups
5) Applications of Representation Theory
- Quantum Mechanics
- Hadrons, Particle Physics
The course material and exerises are provided in Lernraum Plus
Classical Mechanics
Quantum Mechanics
H.F. Jones, Groups, Representations and Physics, Taylor & Francis 1998.
J.F. Cornwell, Group Theory in Physics, Vol. I and II, Academic Press 1984.
W. Ludwig and C. Falter, Symmetries in Physics, Springer 1995.
H.Georgi, Lie Algebras in Particle Physics, Reading, Benjamin 1982
W.K. Tung, Group Theory in Physics, World Scientific, 1985
Frequency | Weekday | Time | Format / Place | Period |
---|
Date | Time | Format / Room | Comment about examination |
---|
Show passed examination dates >>
Module | Course | Requirements | |
---|---|---|---|
28-M-MP Mathematische Physik | Mathematische Physik | Graded examination
|
Student information |
28-M-VP Vertiefung | Vertiefung (A.1) | Graded examination
|
Student information |
The binding module descriptions contain further information, including specifications on the "types of assignments" students need to complete. In cases where a module description mentions more than one kind of assignment, the respective member of the teaching staff will decide which task(s) they assign the students.