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Main Authors: Diao, Yuanan, Ernst, Claus, Hetyei, Gabor
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2403.14094
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author Diao, Yuanan
Ernst, Claus
Hetyei, Gabor
author_facet Diao, Yuanan
Ernst, Claus
Hetyei, Gabor
contents The determination of the braid index of an oriented link is generally a hard problem. In the case of alternating links, some significant progresses have been made in recent years which made explicit and precise braid index computations possible for links from various families of alternating links, including the family of all alternating Montesinos links. However, much less is known for non-alternating links. For example, even for the non-alternating pretzel links, which are special (and simpler) Montesinos links, the braid index is only known for a very limited few special cases. In this paper and its sequel, we study the braid indices for all non-alternating pretzel links by a systematic approach. We classify the pretzel links into three different types according to the Seifert circle decompositions of their standard link diagrams. More specifically, if $D$ is a standard diagram of an oriented pretzel link $\mathcal{L}$, $S(D)$ is the Seifert circle decomposition of $D$, and $C_1$, $C_2$ are the Seifert circles in $S(D)$ containing the top and bottom long strands of $D$ respectively, then $\mathcal{L}$ is classified as a Type 1 (Type 2) pretzel link if $C_1\not=C_2$ and $C_1$, $C_2$ have different (identical) orientations. In the case that $C_1=C_2$, then $\mathcal{L}$ is classified as a Type 3 pretzel link. In this paper, we present the results of our study on Type 1 and Type 2 pretzel links. Our results allow us to determine the precise braid index for any non-alternating Type 1 or Type 2 pretzel link. Since the braid indices are already known for all alternating pretzel links from our previous work, it means that we have now completely determined the braid indices for all Type 1 and Type 2 pretzel links.
format Preprint
id arxiv_https___arxiv_org_abs_2403_14094
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle The Braid Indices of Pretzel Links: A Comprehensive Study, Part I
Diao, Yuanan
Ernst, Claus
Hetyei, Gabor
Geometric Topology
Algebraic Topology
2010. Primary: 5725, Secondary: 5727
The determination of the braid index of an oriented link is generally a hard problem. In the case of alternating links, some significant progresses have been made in recent years which made explicit and precise braid index computations possible for links from various families of alternating links, including the family of all alternating Montesinos links. However, much less is known for non-alternating links. For example, even for the non-alternating pretzel links, which are special (and simpler) Montesinos links, the braid index is only known for a very limited few special cases. In this paper and its sequel, we study the braid indices for all non-alternating pretzel links by a systematic approach. We classify the pretzel links into three different types according to the Seifert circle decompositions of their standard link diagrams. More specifically, if $D$ is a standard diagram of an oriented pretzel link $\mathcal{L}$, $S(D)$ is the Seifert circle decomposition of $D$, and $C_1$, $C_2$ are the Seifert circles in $S(D)$ containing the top and bottom long strands of $D$ respectively, then $\mathcal{L}$ is classified as a Type 1 (Type 2) pretzel link if $C_1\not=C_2$ and $C_1$, $C_2$ have different (identical) orientations. In the case that $C_1=C_2$, then $\mathcal{L}$ is classified as a Type 3 pretzel link. In this paper, we present the results of our study on Type 1 and Type 2 pretzel links. Our results allow us to determine the precise braid index for any non-alternating Type 1 or Type 2 pretzel link. Since the braid indices are already known for all alternating pretzel links from our previous work, it means that we have now completely determined the braid indices for all Type 1 and Type 2 pretzel links.
title The Braid Indices of Pretzel Links: A Comprehensive Study, Part I
topic Geometric Topology
Algebraic Topology
2010. Primary: 5725, Secondary: 5727
url https://arxiv.org/abs/2403.14094