A Lagrangian for Hamiltonian vector fields on singular Poisson manifolds |
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| Affiliation: | Université de Lorraine, Institut Elie Cartan de Lorraine UMR 7502, Metz, F-57045, France;Université de Monastir, Faculté des Sciences de Monastir, Avenue de l’Environnement 5019 Monastir, Tunisie |
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| Abstract: | On a manifold equipped with a bivector field, we introduce for every Hamiltonian a Lagrangian on paths valued in the cotangent space whose stationary points project onto Hamiltonian vector fields. We show that the remaining components of those stationary points tell whether the bivector field is Poisson or at least defines an integrable distribution—a class of bivector fields generalizing twisted Poisson structures that we study in detail. |
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| Keywords: | Differential geometry Poisson geometry Poisson sigma-models Hamiltonian systems |
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