Around the stability of KAM-tori

Abstract

We show that an analytic invariant torus 0 with Diophantine frequency 0 is never isolated due to the following alternative. If the Birkhoff normal form of the Hamiltonian at 0 satisfies a R\"ussmann transversality condition, the torus 0 is accumulated by KAM tori of positive total measure. If the Birkhoff normal form is degenerate, there exists a subvariety of dimension at least d+1 that is foliated by analytic invariant tori with frequency 0. For frequency vectors 0 having a finite uniform Diophantine exponent (this includes a residual set of Liouville vectors), we show that if the Hamiltonian H satisfies a Kolmogorov non degeneracy condition at 0, then 0 is accumulated by KAM tori of positive total measure. In 4 degrees of freedom or more, we construct for any 0 ∈ d, C∞ (Gevrey) Hamiltonians H with a smooth invariant torus 0 with frequency 0 that is not accumulated by a positive measure of invariant tori.