Symplectic reduction of Sasakian manifolds
Abstract
When a complex semisimple group G acts holomorphically on a K\"ahler manifold (X,ω) such that a maximal compact subgroup K⊂ G preserves the symplectic form ω, a basic result of symplectic geometry says that the corresponding categorical quotient X/G can be identified with quotient of the zero-set of the moment map by the action of K. We extend this to the context of a semisimple group acting on a Sasakian manifold.
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