The realization problem for non-integer Seifert fibered surgeries

Abstract

Conjecturally, the only knots in S3 with non-integer surgeries producing Seifert fibered spaces are torus knots and cables of torus knots. In this paper, we make progress on the associated realization problem. Let Y be a small Seifert fibered space arising by p/q-surgery on a knot in S3, where p/q is positive and a non-integer. Let e denote the weight of the central vertex in the minimal star-shaped plumbing that Y bounds. We show that if e≤ -2 or e≥ 3, then Y can be obtained by p/q-surgery on a torus knot or a cable of a torus knot.