Transactions of the American Mathematical Society

Author(s): Ken'ichi Ohshika
Journal: Trans. Amer. Math. Soc. 350 (1998), 3989-4022.
MSC (1991): Primary 57M50; Secondary 30F40
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Abstract: Minsky proved that two Kleinian groups

and

are quasi-conformally conjugate if they are freely indecomposable, the injectivity radii at all points of $\bold{H}^3/G_1$ , $\bold{H}^3/G_2$ are bounded below by a positive constant, and there is a homeomorphism

from a topological core of $\bold{H}^3/G_1$ to that of $\bold{H}^3/G_2$ such that

and $h^{-1}$ map ending laminations to ending laminations. We generalize this theorem to the case when

and

are topologically tame but may be freely decomposable under the same assumption on the injectivity radii. As an application, we prove that if a Kleinian group is topologically conjugate to another Kleinian group which is topologically tame and not a free group, and both Kleinian groups satisfy the assumption on the injectivity radii as above, then they are quasi-conformally conjugate.

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