David Bachman
Published 1998-06-04, updated 2004-05-07Version 3
This paper generalizes the definition of a Heegaard splitting to unify Scharlemann and Thomspon's concept of thin position for 3-manifolds, Gabai's thin position for knots, and Rubinstein's almost normal surface theory. This gives generalizations of theorems of Scharlemann, Thompson, Rubinstein, and Stocking. In the final section, we use this machinery to produce an algorithm to determine the bridge number of a knot, provided thin position for the knot coincides with bridge position. We also present several finiteness and algorithmic results about Dehn fillings with "small" Heegaard genus.
Comments: 33 pages, 13 figures; New 13 page erratum giving a complete proof of Theorem 6.3 has been added
Journal: Topology and its Applications 116 (2001) 153-184
Algorithmically detecting the bridge number of hyperbolic knots
Heegaard splittings of knot exteriors
Stabilization, amalgamation, and curves of intersection of Heegaard splittings
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