SIMPLE LOOPS ON 2-BRIDGE SPHERES IN HECKOID ORBIFOLDS FOR 2-BRIDGE LINKS

Donghi Lee, M. Sakuma
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引用次数: 5

Abstract

Following Riley's work, for each $2$-bridge link $K(r)$ of slope $r∈\mathbb{R}$ and an integer or a half-integer $n$ greater than $1$, we introduce the Heckoid orbifold $S(r;n)$ and the Heckoid group $G(r;n)=\pi_1(S(r;n))$ of index $n$ for $K(r)$ . When $n$ is an integer, $S(r;n)$ is called an even Heckoid orbifold; in this case, the underlying space is the exterior of $K(r)$, and the singular set is the lower tunnel of $K(r)$ with index $n$. The main purpose of this note is to announce answers to the following questions for even Heckoid orbifolds. (1) For an essential simple loop on a $4$-punctured sphere $S$ in $S(r;n)$ determined by the $2$-bridge sphere of $K(r)$, when is it null-homotopic in $S(r;n)$? (2) For two distinct essential simple loops on $S$, when are they homotopic in $S(r;n)$? We also announce applications of these results to character varieties, McShane's identity, and epimorphisms from $2$-bridge link groups onto Heckoid groups.
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双桥连杆中双桥球面上的简单环
根据Riley的工作,对于斜率$r∈\mathbb{r}$的每个$2$-桥链$K(r)$和一个大于$1$的整数或半整数$n$,我们引入了$K(r)$索引$n$的Heckoid轨道$S(r;n)$和Heckoid群$G(r;n)=\pi_1(S(r;n))$。当$n$为整数时,$S(r;n)$称为偶赫柯德轨道;在这种情况下,底层空间是$K(r)$的外部,奇异集是$K(r)$索引为$n$的下隧道。这篇文章的主要目的是公布以下问题的答案,这些问题适用于偶数赫柯德轨道。(1)对于由$K(r)$的$2$桥球确定的$S(r;n)$ S(r;n)$中的$4$穿孔球$S$上的一个基本简单环,它在$S(r;n)$中何时为零同伦?(2)对于$S$上两个不同的本质简单循环,它们在$S(r;n)$中何时是同伦的?我们还宣布了这些结果在从$2$-桥连接群到Heckoid群的属性变异、McShane的同一性和外胚上的应用。
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来源期刊
CiteScore
0.90
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0
审稿时长
>12 weeks
期刊介绍: Electronic Research Archive (ERA), formerly known as Electronic Research Announcements in Mathematical Sciences, rapidly publishes original and expository full-length articles of significant advances in all branches of mathematics. All articles should be designed to communicate their contents to a broad mathematical audience and must meet high standards for mathematical content and clarity. After review and acceptance, articles enter production for immediate publication. ERA is the continuation of Electronic Research Announcements of the AMS published by the American Mathematical Society, 1995—2007
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