Cut open null-bordisms and derivatives of slice knots
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In the 60's Levine proved that if $R$ is a slice knot, then on any genus $g$ Seifert surface for $R$ there is a $g$ component link $J$, called a derivative of $R$, on which the Seifert form vanishes. Many subsequent obstructions to $R$ being slice are given in terms of slice obstructions of $J$. Many of these obstructions can be derived from a 4-manifold called a null-bordism. Recently the authors proved that that it is possible for $R$ to be slice without $J$ being slice, disproving a conjecture of Kauffmann from the 80's. In this paper we cut open these null-bordisms in order to derive new obstructions to being the derivative of a slice knot. As a proof of the strength of this approach we re-derive a signature condition due to Daryl Cooper. Our results also apply to doubling operators, giving new evidence for their weak injectivity. We close with a new sufficient condition for a genus 1 algebraically slice knot to be $1.5$-solvable.
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