Action-angle coordinates and KAM theory for singular symplectic manifolds
Abstract: This monograph explores classification and perturbation problems for integrable systems on a class of Poisson manifolds called $bm$-Poisson manifolds. Even if the class of $bm$-Poisson manifolds is not ample enough to represent general Poisson manifolds, this investigation can be seen as a first step for the study of perturbation theory for general Poisson manifolds. We prove an action-angle coordinate and a KAM theorem for $bm$-Poisson manifolds which improves the one obtained for $b$-Poisson manifolds for $m=1$ in [KMS16]. As an outcome of this result together with the extension of the desingularization techniques of Guillemin-Miranda-Weitsman to the realm of integrable systems, we obtain a KAM theorem for folded symplectic manifolds. We also obtain a new KAM theorem for symplectic manifolds where the perturbation keeps track of a distinguished hypersurface. In several problems in celestial mechanics, this distinguished hypersurface can be the line at infinity or can represent the collision set.
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