Ozsvath-Szabo and Rasmussen invariants of doubled knots

Abstract

Let be any integer-valued additive knot invariant that bounds the smooth 4-genus of a knot K, |(K)| <= g4(K), and determines the 4-ball genus of positive torus knots, (Tp,q) = (p-1)(q-1)/2. Either of the knot concordance invariants of Ozsvath-Szabo or Rasmussen, suitably normalized, have these properties. Let D(K,t) denote the positive or negative t-twisted double of K. We prove that if (D+(K,t)) = 1, then (D-(K,t)) = 0. It is also shown that (D+(K,t))= 1 for all t <= TB(K) and (D+(K, t)) = 0 for all t -TB(-K), where TB(K) denotes the Thurston-Bennequin number. A realization result is also presented: for any 2g × 2g Seifert matrix A and integer a, |a| <= g, there is a knot with Seifert form A and (K) = a.

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