Levi's problem for complex homogeneous manifolds
Abstract
Suppose G is a connected complex Lie group and H is a closed complex subgroup. Then there exists a closed complex subgroup J of G containing H such that the fibration π:G/H G/J is the holomorphic reduction of G/H, i.e., G/J is holomorphically separable and O(G/H) π* O(G/J). In this paper we prove that if G/H is pseudoconvex, i.e., if G/H admits a continuous plurisubharmonic exhaustion function, then G/J is Stein and J/H has no non--constant holomorphic functions.
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