This course on integrable models will cover aspects of classical and
quantum integrable Hamiltonian systems. Examples for such systems are the
nonlinear Schroedinger, Korteweg-de Vries and Toda equation on the
classical side, or spin chains on the quantum side. Several methods to
solve nonlinear differential equations that display solitonic behaviour
are introduced.
Prequisits are Theory I - III, in particular classical and quantum
mechanics. Although we will also discuss modern applications in
statistical mechanics and quantum field theory these are not mandatory.
A. Das: Integrable models
World Scientific, Singapore 1989, 342 pages
L.D. Faddeev: Les Houches lecture notes, arXiv:hep-th/9605187v1
Modul | Veranstaltung | Leistungen | |
---|---|---|---|
28-M-VP Vertiefung | Vertiefung (B.2) | benotete Prüfungsleistung
|
Studieninformation |
Die verbindlichen Modulbeschreibungen enthalten weitere Informationen, auch zu den "Leistungen" und ihren Anforderungen. Sind mehrere "Leistungsformen" möglich, entscheiden die jeweiligen Lehrenden darüber.