TL;DRAbstract
Let Q: C ∞ (M)[[h]] → W D be a quantization map considered in the author’s papers [2, 3, 4]. Here M is a symplectic manifold of dimension 2n, W D the algebra of flat sections of the Weyl algebras bundle W with respect to an Abelian connection D on W. The coefficient bundle of W is supposed to be Hom(E,E) for some m-dimensional complex vector bundle E. The Abelian connection D depends thus on the symplectic connection ∂s on M and the connection ∂ E on E.
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Let Q: C ∞ (M)[[h]] → W D be a quantization map considered in the author’s papers [2, 3, 4]. Here M is a symplectic manifold of dimension 2n, W D the algebra of flat sections of the Weyl algebras bundle W with respect to an Abelian connection D on W. The coefficient bundle of W is supposed to be Hom(E,E) for some m-dimensional complex vector bundle E. The Abelian connection D depends thus on the symplectic connection ∂s on M and the connection ∂ E on E.
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