Surgeries, sharp 4-manifolds and the Alexander polynomial

Duncan McCoy

arXiv:1412.0572·math.GT·November 10, 2021

Surgeries, sharp 4-manifolds and the Alexander polynomial

Duncan McCoy

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TL;DR

This paper improves bounds on surgery slopes for torus knots that guarantee the resulting 3-manifold characterizes the knot, using properties of sharp 4-manifolds and Alexander polynomials.

Contribution

It introduces a linear bound in rs for characterizing slopes and links Alexander polynomial determination to the existence of sharp 4-manifolds after surgery.

Findings

01

Lowered the surgery slope bound from quadratic to linear in rs.

02

Connected Alexander polynomial uniqueness to bounds on sharp 4-manifolds.

03

Showed stability of sharp 4-manifold bounds under increasing surgery slopes.

Abstract

Work of Ni and Zhang has shown that for the torus knot $T_{r, s}$ with $r > s > 1$ every surgery slope $p / q \geq \frac{30}{67} (r^{2} - 1) (s^{2} - 1)$ is a characterizing slope. In this paper, we show that this can be lowered to a bound which is linear in $r s$ , namely, $p / q \geq \frac{43}{4} (r s - r - s)$ . 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 $S^{3}$ and $p / q$ exceeds $4 g (K) + 4$ , 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 $S_{p^{'} / q^{'}}^{3} (K)$ bounds a sharp 4-manifold for all $p^{'} / q^{'} \geq p / q$ .

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