Last updated
2025-04-11T10:06:10.757+01:00
Abstract
We show that, for any given 3-manifold M, there are at most finitely many
hyperbolic knots K in the 3-sphere and fractions p/q (with q > 22), such that M
is obtained by p/q surgery along K. This is a corollary of the following
result. If M is obtained by Dehn filling the cusps of a hyperbolic 3-manifold
X, where each filling slope has length more than 2 \pi + \epsilon, then, for
any given M and \epsilon > 0, there are only finitely many possibilities for X
and for the filling slopes. In this paper, we also investigate the length of
boundary slopes, and sequences of negatively curved metrics on a given
3-manifold.
hyperbolic knots K in the 3-sphere and fractions p/q (with q > 22), such that M
is obtained by p/q surgery along K. This is a corollary of the following
result. If M is obtained by Dehn filling the cusps of a hyperbolic 3-manifold
X, where each filling slope has length more than 2 \pi + \epsilon, then, for
any given M and \epsilon > 0, there are only finitely many possibilities for X
and for the filling slopes. In this paper, we also investigate the length of
boundary slopes, and sequences of negatively curved metrics on a given
3-manifold.
Symplectic ID
20789
Download URL
http://arxiv.org/abs/math/9811082v1
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Publication type
Journal Article
Publication date
12 Nov 1998