Abstract
Let [Formula: see text] be a compact connected orientable Cauchy–Riemann (CR) manifold with the action of a compact Lie group [Formula: see text]. Under natural pseudoconvexity assumptions we show that the CR Guillemin–Sternberg map is an isomorphism at the level of Sobolev spaces of CR functions, modulo a finite-dimensional subspace. As application we study this map for holomorphic line bundles which are positive near the inverse image of [Formula: see text] by the momentum map. We also show that “quantization commutes with reduction” for Sasakian manifolds.
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