Integrable perturbations of polynomial Hamiltonian systems
Abstract
We consider a Hamiltonian system on the symplectic space (R2n, dy dx) with a real-analytic Hamiltonian H : R2n R. We assume that the system has a non-degenerate equilibrium position at the origin. Under some nonresonance assumptions we prove the following. For any positive integer M there exists a real-analytic function F:R2nR such that (1) F = O( (|x|+|y|)M+1 ) at the origin, (2) the system with Hamiltonian H+F is completely integrable in R2n.
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