Abstract
The algebraic genus of a knot is an invariant that arises when one considers upper bounds for the topological slice genus coming from Freedman’s theorem that Alexander polynomial one knots are topologically slice. This paper develops null-homologous twisting operations as a tool for studying the algebraic genus and, consequently, for bounding the topological slice genus above. As applications we give new upper bounds on the algebraic genera of torus knots and satellite knots.
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