Almost symplectic manifold

In differential geometry, an almost symplectic structure on a differentiable manifold $M$ is a two-form $\omega$ on $M$ that is everywhere non-singular.^[1] If in addition $\omega$ is closed then it is a symplectic form.

An almost symplectic manifold is an Sp-structure; requiring $\omega$ to be closed is an integrability condition.

References[]

^ Ramanan, S. (2005), Global calculus, Graduate Studies in Mathematics, vol. 65, Providence, RI: American Mathematical Society, p. 189, ISBN 0-8218-3702-8, MR 2104612.

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