Fedosov manifold

 In mathematics, a Fedosov manifold is a symplectic manifold with a compatible torsion-free connection, that is, a triple (M, ω, ∇), where (M, ω) is a symplectic manifold (i.e., ω is a symplectic form, a non-degenerate closed exterior 2-form, on a C^∞-manifold M), and ∇ is a symplectic torsion-free connection on M.^[1] (A connection ∇ is called compatible or symplectic if X ⋅ ω(Y,Z) = ω(∇_XY,Z) + ω(Y,∇_XZ) for all vector fields X,Y,Z ∈ Γ(TM). In other words, the symplectic form is parallel with respect to the connection, i.e., its covariant derivative vanishes.) Note that every symplectic manifold admits a symplectic torsion-free connection. Cover the manifold with Darboux charts and on each chart define a connection ∇ with Christoffel symbol . Then choose a partition of unity (subordinate to the cover) and glue the local connections together to a global connection which still preserves the symplectic form. The famous result of Boris Vasilievich Fedosov gives a canonical deformation quantization of a Fedosov manifold.^[2]

ExamplesEdit

For example, ${\displaystyle \mathbb {R} ^{2n}}$ with the standard symplectic form ${\displaystyle dx_{i}\wedge dy_{i}}$ has the symplectic connection given by the exterior derivative ${\displaystyle d}$. Hence, ${\displaystyle (\mathbb {R} ^{2n},\omega ,d)}$ is a Fedosov manifold.

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