Pretzel knots up to nine crossings

被引:0
|
作者
Diaz, R.
Manchon, P. M. G. [1 ,2 ]
机构
[1] Univ Complutense Madrid, Fac Matemat, Dept Algebra Geometry & Topol, Madrid, Spain
[2] Univ Politecn Madrid, ETSIDI, Dept Appl Math Ind Engn, Madrid, Spain
来源
TOPOLOGY AND ITS APPLICATIONS | 2023年 / 339卷
关键词
Pretzel link; Kauffman bracket; Jones polynomial; Span;
D O I
10.1016/j.topol.2023.108583
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
There are infinitely many pretzel links with the same Alexander polynomial (actually with trivial Alexander polynomial). By contrast, in this note we revisit the Jones polynomial of pretzel links and prove that, given a natural number S, there is only a finite number of pretzel links whose Jones polynomials have span S. More concretely, we provide an algorithm useful for deciding whether or not a given knot is pretzel. As an application we identify all the pretzel knots up to nine crossings, proving in particular that 812 is the first non-pretzel knot. (c) 2023 Elsevier B.V. All rights reserved.
引用
收藏
页数:11
相关论文
共 50 条
  • [31] ON JONES POLYNOMIALS OF ALTERNATING PRETZEL KNOTS
    Hara, Masao
    Yamamoto, Makoto
    JOURNAL OF KNOT THEORY AND ITS RAMIFICATIONS, 2012, 21 (14)
  • [32] A PARTIAL ORDER ON THE SET OF PRIME KNOTS WITH UP TO 11 CROSSINGS
    Horie, Keiichi
    Kitano, Teruaki
    Matsumoto, Mineko
    Suzuki, Masaaki
    JOURNAL OF KNOT THEORY AND ITS RAMIFICATIONS, 2011, 20 (02) : 275 - 303
  • [33] PRIME KNOTS WITH ARC INDEX 12 UP TO 16 CROSSINGS
    Tin, Gyo Taek
    Kim, Hyuntae
    Lee, Seungwoo
    Myung, Hun Joo
    JOURNAL OF THE KOREAN MATHEMATICAL SOCIETY, 2021, 58 (04) : 967 - 976
  • [34] A note on the involutive invariants of certain pretzel knots
    Hendricks, Kristen
    Issac, Matthew
    McConnell, Nicholas
    JOURNAL OF KNOT THEORY AND ITS RAMIFICATIONS, 2022, 31 (07)
  • [35] CHARACTER VARIETIES OF EVEN CLASSICAL PRETZEL KNOTS
    Chen, Haimiao
    STUDIA SCIENTIARUM MATHEMATICARUM HUNGARICA, 2019, 56 (04) : 510 - 522
  • [36] On nugatory crossings for knots
    Torisu, I
    TOPOLOGY AND ITS APPLICATIONS, 1999, 92 (02) : 119 - 129
  • [37] Pretzel Knots with L-Space Surgeries
    Lidman, Tye
    Moore, Allison H.
    MICHIGAN MATHEMATICAL JOURNAL, 2016, 65 (01) : 105 - 130
  • [38] Pretzel knot compared with standard suture knots
    Karahan, Mustafa
    Akgun, Umut
    Turkoglu, Ahu
    Nuran, Rustu
    Ates, Filiz
    Yucesoy, Can A.
    KNEE SURGERY SPORTS TRAUMATOLOGY ARTHROSCOPY, 2012, 20 (11) : 2302 - 2306
  • [39] Colored HOMFLY polynomials for the pretzel knots and links
    A. Mironov
    A. Morozov
    A. Sleptsov
    Journal of High Energy Physics, 2015
  • [40] Character varieties of odd classical pretzel knots
    Chen, Haimiao
    INTERNATIONAL JOURNAL OF MATHEMATICS, 2018, 29 (09)
12345