Destruction of Lagrangian torus for positive definite Hamiltonian systems
Abstract
For an integrable Hamiltonian H0=1/2Σi=1dyi2 (d≥ 2), we show that any Lagrangian torus with a given unique rotation vector can be destructed by arbitrarily C2d-δ-small perturbations. In contrast with it, it has been shown that KAM torus with constant type frequency persists under C2d+δ-small perturbations.
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