Poisson manifold

A Poisson manifold is a differential manifold M such that the algebra of smooth functions over it, C^infty(M) is equipped with a bilinear map called the Poisson bracket turning it into a Poisson algebra.

Related Topics:
Differential manifold - Smooth function - Bilinear map - Poisson bracket - Poisson algebra

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Every symplectic manifold is a Poisson manifold but not vice versa.

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A manifold M with a smooth bivector field η can be turned into a Poisson manifold via {f,g}=η(df,dg) provided η(η(df,dg),dh)+η(η(dg,dh),df)+η(η(dh,df),dg) = 0 for all f, g, h. For a symplectic manifold, η is nothing other than the inverse of the symplectic form ω, which exists because it is invertible.

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See also Poisson supermanifold, Nambu-Poisson manifold

Related Topics:
Poisson supermanifold - Nambu-Poisson manifold

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