The degree of the Alexander polynomial is an upper bound for the topological slice genus
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Publication:309044
DOI10.2140/gt.2016.20.1763zbMath1386.57008arXiv1504.01064OpenAlexW1907033550MaRDI QIDQ309044
Publication date: 7 September 2016
Published in: Geometry \& Topology (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1504.01064
Related Items (10)
On classical upper bounds for slice genera ⋮ Slice knots and knot concordance ⋮ The \(\mathbb{Z}\)-genus of boundary links ⋮ A note on the concordance \(\mathbb{Z}\)-genus ⋮ The four-genus of a link, Levine–Tristram signatures and satellites ⋮ On Calculating the Slice Genera of 11- and 12-Crossing Knots ⋮ Null-homologous twisting and the algebraic genus ⋮ A lower bound for the double slice genus ⋮ On the topological 4-genus of torus knots ⋮ Embedding spheres in knot traces
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