Sungkyung Kang, JungHwan Park, Masaki Taniguchi
Published 2024-05-15Version 1
We prove that the $(2n,1)$-cable of the figure-eight knot is not smoothly slice when $n$ is odd, by using the real Seiberg-Witten Fr{\o}yshov invariant of Konno-Miyazawa-Taniguchi. For the computation, we develop an $O(2)$-equivariant version of the lattice homotopy type, originally introduced by Dai-Sasahira-Stoffregen. This enables us to compute the real Seiberg-Witten Floer homotopy type for a certain class of knots. Additionally, we present some computations of Miyazawa's real framed Seiberg-Witten invariant for 2-knots.
Comments: 31 pages, 1 figure
Smooth concordance of cables of the figure-eight knot
The colored Jones polynomial of the figure-eight knot and an $\operatorname{SL}(2;\mathbb{R})$-representation
The $(2,1)$-cable of the figure-eight knot is not smoothly slice
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