Proper actions of high-dimensional groups on complex manifolds

Abstract

We explicitly classify all pairs (M,G), where M is a connected complex manifold of dimension n 2 and G is a connected Lie group acting properly and effectively on M by holomorphic transformations and having dimension dG satisfying n2+2 dG<n2+2n. These results extend -- in the complex case -- the classical description of manifolds admitting proper actions of groups of sufficiently high dimensions. They also generalize some of the author's earlier work on Kobayashi-hyperbolic manifolds with high-dimensional holomorphic automorphism group.

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