透镜空间中的代数连杆

arXiv: Geometric Topology Pub Date : 2020-02-24 DOI:10.1142/s0219199720500662

E. Horvat

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引用次数: 1

摘要

透镜空间$L_{p,q}$是$\mathbb{Z}_{p}$-作用在三球面上的轨道空间。我们研究了在此作用下不变的两个复变量的多项式，从而定义了$L_{p,q}$中的链接。我们研究了这些连杆的性质，以及它们与经典代数连杆的关系。证明了透镜空间中所有代数连杆都是纤维状的，并得到了它们的Seifert属的一些结果。我们在透镜空间中找到了一些代数结的例子，它们在球面上的升力是环面连杆。

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Algebraic links in lens spaces

The lens space $L_{p,q}$ is the orbit space of a $\mathbb{Z}_{p}$-action on the three sphere. We investigate polynomials of two complex variables that are invariant under this action, and thus define links in $L_{p,q}$. We study properties of these links, and their relationship with the classical algebraic links. We prove that all algebraic links in lens spaces are fibered, and obtain results about their Seifert genus. We find some examples of algebraic knots in lens spaces, whose lift in the $3$-sphere is a torus link.

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arXiv: Geometric Topology

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