Exceptional surgeries on hyperbolic fibered knots

Abstract

Let K⊂ S3 be a hyperbolic fibered knot such that S3p/q(K), the pq--surgery on K, is non-hyperbolic. We prove that if the monodromy of K is right-veering, then 0 pq 4g(K). The upper bound 4g(K) cannot be attained if S3p/q(K) is a small Seifert fibered L-space. If the monodromy of K is neither right-veering nor left-veering, then |q|3. As a corollary, for any given positive torus knot T, if p/q4g(T)+4, then p/q is a characterizing slope. This improves earlier bounds of Ni--Zhang and McCoy. We also prove that some finite/cyclic slopes are characterizing. More precisely, 14 is characterizing for T4,3, 17 is characterizing for T5,3, and 4n+1 is characterizing for T2n+1,2 except when n=5. By a recent theorem of Tange, this shows that T2n+1,2 is the only knot in S3 admitting a lens space surgery while the Alexander polynomial has the form tn-tn-1+tn-2+lower order terms. In the appendix, we prove that if the rank of the second term of the knot Floer homology of a fibered knot is 1, then the monodromy is either right-veering or left-veering.