About: Almost symplectic manifold

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In differential geometry, an almost symplectic structure on a differentiable manifold is a two-form on that is everywhere non-singular. If in addition is closed then it is a symplectic form. An almost symplectic manifold is an Sp-structure; requiring to be closed is an integrability condition.

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  • In differential geometry, an almost symplectic structure on a differentiable manifold is a two-form on that is everywhere non-singular. If in addition is closed then it is a symplectic form. An almost symplectic manifold is an Sp-structure; requiring to be closed is an integrability condition. (en)
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  • In differential geometry, an almost symplectic structure on a differentiable manifold is a two-form on that is everywhere non-singular. If in addition is closed then it is a symplectic form. An almost symplectic manifold is an Sp-structure; requiring to be closed is an integrability condition. (en)
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  • Almost symplectic manifold (en)
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