Georgi Popov
Published 2003-05-19Version 1
We consider Gevrey perturbations $H$ of a completely integrable Gevrey Hamiltonian $H_0$. Given a Cantor set $\Omega_\kappa$ defined by a Diophantine condition, we find a family of KAM invariant tori of $H$ with frequencies $\omega\in \Omega_\kappa$ which is Gevrey smooth in a Whitney sense. Moreover, we obtain a symplectic Gevrey normal form of the Hamiltonian in a neighborhood of the union $\Lambda$ of the invariant tori. This leads to effective stability of the quasiperiodic motion near $\Lambda$.
On approximation of homeomorphisms of a Cantor set
KAM theorem on modulus of continuity about parameter
On the structure of $λ$-Cantor set with overlaps
![QR code for arXiv:math/0305264 [math.DS]](http://oss.arxitics.com/images/favicon.svg)