Equivariant algebraic concordance of strongly invertible knots

IF 0.8 2区数学 Q2 MATHEMATICS Journal of Topology Pub Date : 2024-11-12 DOI:10.1112/topo.70006

Alessio Di Prisa

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引用次数: 0

Abstract

By considering a particular type of invariant Seifert surfaces we define a homomorphism $Φ$ from the (topological) equivariant concordance group of directed strongly invertible knots $\tilde{C}$ to a new equivariant algebraic concordance group ${\tilde{G}}^{Z}$ . We prove that $Φ$ lifts both Miller and Powell's equivariant algebraic concordance homomorphism (J. Lond. Math. Soc. (2023), no. 107, 2025-2053) and Alfieri and Boyle's equivariant signature (Michigan Math. J. 1 (2023), no. 1, 1–17). Moreover, we provide a partial result on the isomorphism type of ${\tilde{G}}^{Z}$ and obtain a new obstruction to equivariant sliceness, which can be viewed as an equivariant Fox–Milnor condition. We define new equivariant signatures and using these we obtain novel lower bounds on the equivariant slice genus. Finally, we show that $Φ$ can obstruct equivariant sliceness for knots with Alexander polynomial one.

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强反转结的等变代数一致性

通过考虑一种特殊类型的不变塞弗特曲面，我们定义了一个从有向强可逆结的（拓扑）等变协整群 C ∼ $\widetilde{\mathcal {C}}$ 到一个新的等变代数协整群 G ∼ Z $\widetilde{\mathcal {G}}^\mathbb {Z}$ 的同态关系 Φ $\Phi$ 。我们证明 Φ $\Phi$ 既提升了 Miller 和 Powell 的等变代数和同态 (J. Lond. Math.Math.Soc. (2023), no. 107, 2025-2053) 以及 Alfieri 和 Boyle 的等变签名 (Michigan Math.J. 1 (2023)，第 1 期，1-17）。此外，我们还提供了关于 G ∼ Z $\widetilde\{mathcal {G}}^\mathbb {Z}$ 的同构类型的部分结果，并得到了等变切片性的新障碍，它可以看作是等变 Fox-Milnor 条件。我们定义了新的等变签名，并利用这些签名得到了等变切片属的新下限。最后，我们证明了 Φ $\Phi$ 可以阻碍亚历山大多项式为一的结的等变切片性。

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来源期刊

Journal of Topology 数学-数学

CiteScore

2.00

自引率

9.10%

发文量

审稿时长

>12 weeks

期刊介绍： The Journal of Topology publishes papers of high quality and significance in topology, geometry and adjacent areas of mathematics. Interesting, important and often unexpected links connect topology and geometry with many other parts of mathematics, and the editors welcome submissions on exciting new advances concerning such links, as well as those in the core subject areas of the journal. The Journal of Topology was founded in 2008. It is published quarterly with articles published individually online prior to appearing in a printed issue.