Surgeries, sharp 4-manifolds and the Alexander polynomial

Abstract

Work of Ni and Zhang has shown that for the torus knot Tr,s with r>s>1 every surgery slope p/q ≥ 3067(r2-1)(s2-1) is a characterizing slope. In this paper, we show that this can be lowered to a bound which is linear in rs, namely, p/q≥ 434(rs-r-s). The main technical ingredient in this improvement is to show that if Y is an L-space bounding a sharp 4-manifold which is obtained by p/q-surgery on a knot K in S3 and p/q exceeds 4g(K)+4, then the Alexander polynomial of K is uniquely determined by Y and p/q. We also show that if p/q-surgery on K bounds a sharp 4-manifold, then S3p'/q'(K) bounds a sharp 4-manifold for all p'/q'≥ p/q.