Topologically conjugate Kleinian groups

Abstract:

Two Kleinian groups $\Gamma _1$ and $\Gamma _2$ are said to be topologically conjugate when there is a homeomorphism $f:S^2 \rightarrow S^2$ such that $f \Gamma _1 f^{-1}= \Gamma _2$. It is conjectured that if two Kleinian groups $\Gamma _1$ and $\Gamma _2$ are topologically conjugate, one is a quasi-conformal deformation of the other. In this paper generalizing Minsky’s result, we shall prove that this conjecture is true when $\Gamma _1$ is finitely generated and freely indecomposable, and the injectivity radii of all points of $\mathbf {H}^3/\Gamma _1$ and $\mathbf {H}^3/\Gamma _2$ are bounded below by a positive constant.