同质辫在视觉上是质数

arXiv - MATH - Geometric Topology Pub Date : 2024-08-28 DOI:arxiv-2408.15730

Peter Feller, Lukas Lewark, Miguel Orbegozo Rodriguez

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引用次数: 0

摘要

我们证明了同质辫的闭包在视觉上是素数，从而解决了克伦威尔的一个问题。证明的关键技术工具是关于开卷的原始性的下列判据，我们认为它具有独立的意义。对于三芒星开卷，如果原始开卷的垂线区域向左偏离，那么在严格向右偏离的开卷的本质村杉和下，具有无固定本质弧的性质将得到保留。我们还提供了 S^3 中开卷的例子，证明在本质村杉和下，甚至在稳定化（又称霍普夫垂线）下，原始性并不一定得到保留。此外，我们还发现三叶垂线不一定能保留原始性。与此相反，我们发现图八节垂线确实保留了原始性。

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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Homogeneous braids are visually prime

We show that closures of homogeneous braids are visually prime, addressing a question of Cromwell. The key technical tool for the proof is the following criterion concerning primeness of open books, which we consider to be of independent interest. For open books of 3-manifolds the property of having no fixed essential arcs is preserved under essential Murasugi sums with a strictly right-veering open book, if the plumbing region of the original open book veers to the left. We also provide examples of open books in S^3 demonstrating that primeness is not necessarily preserved under essential Murasugi sum, in fact not even under stabilizations a.k.a. Hopf plumbings. Furthermore, we find that trefoil plumbings need not preserve primeness. In contrast, we establish that figure-eight knot plumbings do preserve primeness.

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arXiv - MATH - Geometric Topology

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