Gaps between consecutive untwisting numbers

Abstract

For p≥ 1 one can define a generalization of the unknotting number tup called the pth untwisting number which counts the number of null-homologous twists on at most 2p strands required to convert the knot to the unknot. We show that for any p≥ 2 the difference between the consecutive untwisting numbers tup-1 and tup can be arbitrarily large. We also show that torus knots exhibit arbitrarily large gaps between tu1 and tu2.