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In mathematics, a Poisson ring is a commut … In mathematics, a Poisson ring is a commutative ring on which an anticommutative and distributive binary operation satisfying the Jacobi identity and the product rule is defined. Such an operation is then known as the Poisson bracket of the Poisson ring. Many important operations and results of symplectic geometry and Hamiltonian mechanics may be formulated in terms of the Poisson bracket and, hence, apply to Poisson algebras as well. This observation is important in studying the classical limit of quantum mechanics—the non-commutative algebra of operators on a Hilbert space has the Poisson algebra of functions on a symplectic manifold as a singular limit, and properties of the non-commutative algebra pass over to corresponding properties of the Poisson algebra.ponding properties of the Poisson algebra.
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4287020
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, http://dbpedia.org/resource/Symplectic_manifold +
, http://dbpedia.org/resource/Mathematics +
, http://dbpedia.org/resource/Algebra_of_smooth_functions +
, http://dbpedia.org/resource/Ring_isomorphism +
, http://dbpedia.org/resource/Poisson_bracket +
, http://dbpedia.org/resource/Jacobi_identity +
, http://dbpedia.org/resource/Anticommutativity +
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, http://dbpedia.org/resource/Category:Symplectic_geometry +
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6414
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| http://dbpedia.org/property/title
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If the algebra of functions on a manifold is a Poisson ring then the manifold is symplectic
, Poisson Ring
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IfTheAlgebraOfFunctionsOnAManifoldIsAPoissonRingThenTheManifoldIsSymplectic
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| rdfs:comment |
In mathematics, a Poisson ring is a commutative ring on which an anticommutative and distributive binary operation satisfying the Jacobi identity and the product rule is defined. Such an operation is then known as the Poisson bracket of the Poisson ring.
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| rdfs:label |
Poisson ring
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