Rational tangle replacements and knot Floer homology
Abstract
From the link Floer complex of a link K, we extract a lower bound tq'(K) for the rational unknotting number of K (i.e. the minimum number of rational replacements required to unknot K). Moreover, we show that the torsion obstruction tq(K)=t(K) from an earlier paper of Alishahi and the author is a lower bound for the proper rational unknotting number. Moreover, tq(K\#K')=\tq(K),tq(K')\ and t'q(K\#K')=\t'q(K),t'q(K')\. For the torus knot K=Tp,pk+1 we compute t'q(K)= p/2 and tq(K)=p-1.
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