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Research Report MRR99-026
On the Automorphism Groups of Hyperbolic Manifolds
Alexander V. Isaev, Steven G. Krantz
Abstract:
We show that there does not exist a Kobayashi hyperbolic
complex manifold of dimension n\ne 3, whose group of holomorphic
automorphisms has dimension n2+1 and that, if a 3-dimensional
connected hyperbolic complex manifold has automorphism group of
dimension 10, then it is holomorphically equivalent to the Siegel
space. These results complement earlier theorems of the authors
on the possible dimensions of automorphism groups of domains in
complex space.
The paper also contains a proof of our earlier result on
characterizing n-dimensional hyperbolic complex manifolds with
automorphism groups of dimensions \ge n2+2.
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