Lie algebroid structures on C^∞(M, g) induce Poisson brackets on C^∞(M × g*) that include but strictly exceed the Darboux and Lie-Poisson cases, with computational examples and central extensions studied.
Differential calculus on a Lie algebroid and Poisson manifolds
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abstract
A Lie algebroid over a manifold is a vector bundle over that manifold whose properties are very similar to those of a tangent bundle. Its dual bundle has properties very similar to those of a cotangent bundle: in the graded algebra of sections of its external powers, one can define an operator similar to the exterior derivative. We present in this paper the theory of Lie derivatives, Schouten-Nijenhuis brackets and exterior derivatives in the general setting of a Lie algebroid, its dual bundle and their exterior powers. All the results (which, for their most part, are already known) are given with detailed proofs. In the final sections, the results are applied to Poisson manifolds.
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math.DG 1years
2019 1verdicts
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On Poisson structures arising from a Lie group action
Lie algebroid structures on C^∞(M, g) induce Poisson brackets on C^∞(M × g*) that include but strictly exceed the Darboux and Lie-Poisson cases, with computational examples and central extensions studied.