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Beschreibung
Among all the Hamiltonian systems, the integrable ones have special geometric properties; in particular, their solutions are very regular and quasi-periodic. The quasi-periodicity of the solutions of an integrable system is a result of the fact that the system is invariant under a (semi-global) torus action. It is thus natural to investigate the symplectic manifolds that can be endowed with a (global) torus action. This leads to symplectic toric manifolds (Part B of this book). Physics makes a surprising come-back in Part A: to describe Mirror Symmetry, one looks for a special kind of Lagrangian submanifolds and integrable systems, the special Lagrangians. Furthermore, integrable Hamiltonian systems on punctured cotangent bundles are a starting point for the study of contact toric manifolds (Part C of this book).
Details
| Verlag | Springer Basel |
| Ersterscheinung | 24. April 2003 |
| Maße | 24.4 cm x 17 cm |
| Gewicht | 422 Gramm |
| Format | Softcover |
| ISBN-13 | 9783764321673 |
| Seiten | 226 |