Closures of 1-tangles and annulus twists

Abstract

A 1-tangle is a properly embedded arc in an unknotted solid torus V in S3. Attaching an arc φ in the complementary solid torus W to its endpoints creates a knot K(φ) called the closure of . We show that for a given nontrivial 1-tangle there exist at most two closures that are the unknot. We give a general method for producing nontrivial 1-tangles admitting two distinct closures and show that our construction accounts for all such examples. As an application, we show that if we twist an unknot q ≠ 0 times around an unknotted sufficiently incompressible annulus intersecting it exactly once, then there is at most one q such that the resulting knot is unknotted and, if there is such, then q = 1. With additional work, we also show that the Krebes 1-tangle does not admit an unknot closure. Our key tools are the ``wrapping index'' which compares how two complementary 1-tangles φ1 and φ2 wrap around W, a theorem of the author's from sutured manifold theory, and theorems of Gabai and Scharlemann concerning band sums.