Concordance invariants of doubled knots and blowing up

Abstract

Let be either the Ozsv\'ath-Szab\'o τ-invariant or the Rasmussen s-invariant, suitably normalized. For a knot K, Livingston and Naik defined the invariant t(K) to be the minimum of k for which of the k-twisted positive Whitehead double of K vanishes. They proved that t(K) is bounded above by -TB(-K), where TB is the maximal Thurston-Bennequin number. We use a blowing up process to find a crossing change formula and a new upper bound for t in terms of the unknotting number. As an application, we present infinitely many knots K such that the difference between Livingston-Naik's upper bound -TB(-K) and t(K) can be arbitrarily large.