Deformation quantization of submanifolds and reductions via Duflo-Kirillov-Kontsevich map

Abstract

We propose the following receipt to obtain the quantization of the Poisson submanifold N defined by the equations fi=0 (where fi are Casimirs) from the known quantization of the manifold M: one should consider factor algebra of the quantized functions on M by the images of D(fi), where D: Fun(M) Fun(M) [] is Duflo-Kirillov-Kontsevich map. We conjecture that this algebra is isomorphic to quantization of Fun(N) with Poisson structure inherited from M. Analogous conjecture concerning the Hamiltonian reduction saying that "deformation quantization commutes with reduction" is presented. The conjectures are checked in the case of S2 which can be quantized as a submanifold, as a reduction and using recently found explicit star product. It's shown that all the constructions coincide.

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