Wild Knots as limit sets of Kleinian Groups

Abstract

In this paper we study kleinian groups of Schottky type whose limit set is a wild knot in the sense of Artin and Fox. We show that, if the ``original knot'' fibers over the circle then the wild knot also fibers over the circle. As a consequence, the universal covering of S3- is R3. We prove that the complement of a dynamically-defined fibered wild knot can not be a complete hyperbolic 3-manifold.

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