Boundary slopes (nearly) bound exceptional slopes

Abstract

For a hyperbolic knot in S3, Dehn surgery along slope r ∈ \10\ is exceptional if it results in a non-hyperbolic manifold. We say meridional surgery, r = 10, is trivial as it recovers the manifold S3. We provide evidence in support of two conjectures. The first (inspired by a question of Professor Motegi) states that there are boundary slopes b1 < b2 such that all non-trivial exceptional surgeries occur, as rational numbers, in the interval [b1,b2]. We say a boundary slope is NIT if it is non-integral or toroidal. Second, when there are non-trivial exceptional surgeries, we conjecture there are NIT boundary slopes b1 ≤ b2 so that the exceptional surgeries lie in [b1,b2]. Moreover, if b1 ≤ b2, the integers in the interval [ b1, b2 ] are all exceptional surgeries.