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Symplectic Singularities and Solvable Hamiltonian Mappings
Abstract: Abstract. We study singularities of smooth mappings F of lR 2 n into symplectic space (R 2 n , w) by their isotropic liftings to the corresponding symplectic tangent bundle (TJR 2 n,w) . Using the notion of local solvability of lifting as a generalized Hamiltonian system, we introduce new symplectic invariants and explain their geometric meaning. We prove that a basic local algebra of singularity is a space of generating functions of solvable isotropic mappings over F endowed with a natural Poisson structure. …
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