正交阿波罗包装中的链接

IF 1 3区数学 Q1 MATHEMATICS

European Journal of Combinatorics Pub Date : 2024-06-28 DOI:10.1016/j.ejc.2024.104017

Jorge L. Ramírez Alfonsín , Iván Rasskin

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引用次数: 0

摘要

在本文中，我们建立了阿波罗填料与结理论之间的联系。我们引入了在规则晶体学球状堆积的切线图中实现的链接的新表示。特别是，我们证明了任何代数链接都可以在正交阿波罗填料的立方体部分中实现。我们利用这些表示改进了交替代数链接无穷族的球数上限。此外，这些表征还让我们重新解释了有理切线与有理数的对应关系，并揭示了 Diophantine 方程 x4+y4+z4=2t2 的几何原始解。

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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Links in orthoplicial Apollonian packings

In this paper, we establish a connection between Apollonian packings and knot theory. We introduce new representations of links realized in the tangency graph of the regular crystallographic sphere packings. Particularly, we prove that any algebraic link can be realized in the cubic section of the orthoplicial Apollonian packing. We use these representations to improve the upper bound on the ball number of an infinite family of alternating algebraic links. Furthermore, the later allow us to reinterpret the correspondence of rational tangles and rational numbers and to reveal geometrically primitive solutions for the Diophantine equation $x^{4} + y^{4} + z^{4} = 2 t^{2}$ .

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来源期刊

European Journal of Combinatorics 数学-数学

CiteScore

2.10

自引率

10.00%

发文量

124

审稿时长

4-8 weeks

期刊介绍： The European Journal of Combinatorics is a high standard, international, bimonthly journal of pure mathematics, specializing in theories arising from combinatorial problems. The journal is primarily open to papers dealing with mathematical structures within combinatorics and/or establishing direct links between combinatorics and other branches of mathematics and the theories of computing. The journal includes full-length research papers on important topics.