Seifert vs slice genera of knots in twist families and a characterization of braid axes

Abstract

Twisting a knot K in S3 along a disjoint unknot c produces a twist family of knots \Kn\ indexed by the integers. Comparing the behaviors of the Seifert genus g(Kn) and the slice genus g4(Kn) under twistings, we prove that if g(Kn) - g4(Kn) < C for some constant C for infinitely many integers n > 0 or g(Kn) / g4(Kn) 1 as n ∞, then either the winding number of K about c is zero or the winding number equals the wrapping number. As a key application, if \Kn\ or the mirror twist family \Kn\ contains infinitely many tight fibered knots, then the latter must occur. We further develop this to show that c is a braid axis of K if and only if both \Kn\ and \Kn\ each contain infinitely many tight fibered knots. We also give a necessary and sufficient condition for \ Kn \ to contain infinitely many L-space knots, and show (modulo a conjecture) that satellite L-space knots are braided satellites.