On the Kauffman-Jones Polynomial for Virtual Singular Links

IF 0.4 Q4 MATHEMATICS

Missouri Journal of Mathematical Sciences Pub Date : 2019-05-01 DOI:10.35834/MJMS/1559181628

C. Caprau, Kelsey Friesen

引用次数: 0

Abstract

We extend the Kamada-Miyazawa polynomial to virtual singular links, which is valued in $\mathbb{Z}[A^2, A^{-2}, h]$. The decomposition of the resulting polynomial into two components, one in $\mathbb{Z}[A^2, A^{-2}]$ and the other in $\mathbb{Z}[A^2, A^{-2}]h$ yields the decomposition of the Kauffman-Jones polynomial of virtual singular links into two components, one in $\mathbb{Z}[A^2, A^{-2}]$ and the other in $\mathbb{Z}[A^2, A^{-2}]A^2$, where both components are invariants for virtual singular links.

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关于虚拟奇异链路的Kauffman-Jones多项式

我们将Kamada Miyazawa多项式推广到虚拟奇异链路，其值为$\mathbb｛Z｝[A^2，A^｛-2｝，h]$。将所得多项式分解为两个分量，一个在$\mathbb｛Z｝[A^2，A^｛-2｝]$中，另一个在$\mathbb{Z｝[A^2，阿^｛-2｝]h$中，得到了虚拟奇异链路的Kauffman-Jones多项式分解成两个分量的结果，一个是在$\math bb｛Z｝[A^ 2，阿^{-2｝]$中；另一个是$\mathbb{Z}[A^2，A^｛-2｝]A^ 2$中，其中两个分量都是虚拟奇异链接的不变量。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Missouri Journal of Mathematical Sciences MATHEMATICS-

CiteScore

0.90

自引率

0.00%

发文量

期刊介绍： Missouri Journal of Mathematical Sciences (MJMS) publishes well-motivated original research articles as well as expository and survey articles of exceptional quality in mathematical sciences. A section of the MJMS is also devoted to interesting mathematical problems and solutions.