We give a simple proof of Kolmogorov's theorem on the persistence of a
quasiperiodic invariant torus in Hamiltonian systems. The theorem is first
reduced to a well-posed inversion problem (Herman's normal form) by switching
the frequency obstruction from one side of the conjugacy to another. Then the
proof consists in applying a simple, well suited, inverse function theorem in
the analytic category, which itself relies on the Newton algorithm and on
interpolation inequalities. A comparison with other proofs is included in
appendix

Féjoz, Jacques

English

arXiv

We give a simple proof of Kolmogorov's theorem on the persistence of a quasiperiodic invariant torus in Hamiltonian systems. The theorem is first reduced to a well-posed inversion problem (Herman's normal form) by switching the frequency obstruction from one side of the conjugacy to another. Then the proof consists in applying a simple, well suited, inverse function theorem in the analytic category, which itself relies on the Newton algorithm and on interpolation inequalities. A comparison with other proofs is included in appendix

Hal-Diderot

A simple proof of the invariant torus theorem

Jaques Fejoz

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A SIMPLE PROOF OF THE INVARIANT TORUS THEOREM

We give a simple proof of Kolmogorov's theorem on the persistence of a quasiperiodic invariant torus in Hamiltonian systems. The theorem is first reduced to a well-posed inversion problem (Herman's normal form) by switching the frequency obstruction from one side of the conjugacy to another. Then the proof consists in applying a simple, well suited, inverse function theorem in the analytic category, which itself relies on the Newton algorithm and on interpolation inequalities. A comparison with other proofs is included in appendix.ou

Base de publications de l'université Paris-Dauphine

International audienceWe give a simple proof of Kolmogorov's theorem on the persistence of a quasiperiodic invariant torus in Hamiltonian systems. The theorem is first reduced to a well-posed inversion problem (Herman's normal form) by switching the frequency obstruction from one side of the conjugacy to another. Then the proof consists in applying a simple, well suited, inverse function theorem in the analytic category, which itself relies on the Newton algorithm and on interpolation inequalities. A comparison with other proofs is included in appendix

Fejoz, Jacques

HAL-OBSPM

We give a simple proof of Kolmogorov’s theorem on the persistence of a quasiperiodic invariant torus in Hamiltonian systems. The theorem is first reduced to a well-posed inversion problem (Herman’s normal form) by switching the frequency obstruction from one side of the conjugacy to another. Then the proof consists i

HAL-INSU

http://hal-obspm.ccsd.cnrs.fr/docs/00/48/36/06/PDF/simpleKam.pdf

A simple proof of the invariant torus theorem

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Hal-Diderot

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Base de publications de l'université Paris-Dauphine

HAL-OBSPM

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