Convergence of the Birkhoff normal form sometimes implies convergence of a normalizing transformation
Abstract
Consider an analytic Hamiltonian system near its analytic invariant torus T0 carrying zero frequency. We assume that the Birkhoff normal form of the Hamiltonian at T0 is convergent and has a particular form: it is an analytic function of its non-degenerate quadratic part. We prove that in this case there is an analytic canonical transformation -- not just a formal power series -- bringing the Hamiltonian into its Birkhoff normal form.
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