Once again KAM theory is committed in the context of nearly integrable Hamiltonian systems. While elliptic and hyperbolic tori determine the distribution of maximal invariant tori, they themselves form n-parameter families. Hence, without the need for untypical conditions or external parameters, torus bifurcations of high co-dimension may be found in a single given Hamiltonian system. The text moves gradually from the integrable case, in which symmetries allow for reduction to bifurcating equilibria, to non-integrability, where smooth parametrisations have to be replaced by Cantor sets. Planar singularities and their versal unfoldings are an important ingredient that helps to explain the underlying dynamics in a transparent way.
Author(s): Heinz HanĪ²mann (auth.)
Series: Lecture Notes in Mathematics 1893
Edition: 1
Publisher: Springer-Verlag Berlin Heidelberg
Year: 2007
Language: English
Pages: 242
Tags: Dynamical Systems and Ergodic Theory;Ordinary Differential Equations;Global Analysis and Analysis on Manifolds;Mathematical and Computational Physics
Front Matter....Pages I-XV
Introduction....Pages 1-15
Bifurcations of Equilibria....Pages 17-89
Bifurcations of Periodic Orbits....Pages 91-107
Bifurcations of Invariant Tori....Pages 109-142
Perturbations of Ramified Torus Bundles....Pages 143-159
Planar Singularities....Pages 161-165
Stratifications....Pages 167-171
Normal Form Theory....Pages 173-184
Proof of the Main KAM Theorem....Pages 185-200
Proofs of the Necessary Lemmata....Pages 201-206
Back Matter....Pages 207-241
