Hamiltonian Actions on Homogeneous Bounded Domains
Abstract
We investigate Hamiltonian actions of non-compact Lie groups on a homogeneous bounded domain X. As a main result, we point out a Lie-theoretical condition for a closed Lie group H of the automorphism group of X which ensures that the symplectic reduction μ-1(0)/H with respect to the momentum map μ at hand, is a Stein manifold. Moreover, for the class of connected subgroups of translations the quotient (HC· X)/HC is realized as a Siegel domain and we show that the symplectic reduction μ-1(0)/H is biholomorphic to such a Stein quotient.
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