Global properties of integrable Hamiltonian systems |
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| Authors: | O V Lukina F Takens H W Broer |
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| Institution: | (1) Institute for Mathematics and Computer Science, University of Groningen, P.O. Box 407, 9700 AK Groningen, The Netherlands;(2) Present address: Department of Mathematics, University of Leicester, University Road, LE1 7RH Leicester, UK |
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| Abstract: | This paper deals with Lagrangian bundles which are symplectic torus bundles that occur in integrable Hamiltonian systems.
We review the theory of obstructions to triviality, in particular monodromy, as well as the ensuing classification problems
which involve the Chern and Lagrange class. Our approach, which uses simple ideas from differential geometry and algebraic
topology, reveals the fundamental role of the integer affine structure on the base space of these bundles. We provide a geometric
proof of the classification of Lagrangian bundles with fixed integer affine structure by their Lagrange class.
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| Keywords: | integrable Hamiltonian system global action-angle coordinates symplectic topology monodromy Lagrange class classification of integrable systems |
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