Trace embeddings from zero surgery homeomorphisms

Pub Date : 2023-12-05 DOI:10.1112/topo.12319

Kai Nakamura

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引用次数: 4

Abstract

Manolescu and Piccirillo (2023) recently initiated a program to construct an exotic $S^{4}$ or $# n {CP}^{2}$ by using zero surgery homeomorphisms and Rasmussen's $s$ -invariant. They find five knots that if any were slice, one could construct an exotic $S^{4}$ and disprove the Smooth 4-dimensional Poincaré conjecture. We rule out this exciting possibility and show that these knots are not slice. To do this, we use a zero surgery homeomorphism to relate slice properties of two knots stably after a connected sum with some 4-manifold. Furthermore, we show that our techniques will extend to the entire infinite family of zero surgery homeomorphisms constructed by Manolescu and Piccirillo. However, our methods do not completely rule out the possibility of constructing an exotic $S^{4}$ or $# n {CP}^{2}$ as Manolescu and Piccirillo proposed. We explain the limits of these methods hoping this will inform and invite new attempts to construct an exotic $S^{4}$ or $# n {CP}^{2}$ . We also show that a family of homotopy spheres constructed by Manolescu and Piccirillo using annulus twists of a ribbon knot are all standard.

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从零手术同胚跟踪嵌入

Manolescu和Piccirillo(2023)最近发起了一个程序，利用零手术同胚和Rasmussen S构造一个奇异的S $S^4$或# n CP 2$ \# n \mathbb {CP}^2$$ s $ - 不变的。他们发现了5个节，如果其中任何一个是片状的，就可以构造一个奇异的S^4，从而推翻平滑四维庞卡罗猜想。我们排除了这种令人兴奋的可能性，并证明这些结不是切片的。为了做到这一点，我们使用零手术同胚来稳定地联系两个结点与某个4流形的连通和后的切片性质。此外，我们证明我们的技术将扩展到由Manolescu和Piccirillo构造的整个零手术同胚的无限族。然而，我们的方法并没有完全排除像Manolescu和Piccirillo提出的那样构造一个奇异的S 4$ S^4$或# n CP 2$ \# n \mathbb {CP}^2$的可能性。我们解释了这些方法的局限性，希望这将告知并邀请新的尝试来构造一个奇异的s4 $S^4$或# n CP 2$ \# n \mathbb {CP}^2$。我们还证明了Manolescu和Piccirillo用带结的环扭构造的同伦球族都是标准的。

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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