4球波切特手术

IF 0.7 3区数学 Q2 MATHEMATICS

Pacific Journal of Mathematics Pub Date : 2022-05-12 DOI:10.2140/pjm.2023.324.371

T. Uzuki, M. Angé, Matthias Aschenbrenner, Robert Lipshitz, Paul Balmer, Kefeng Liu, Paul Yang, Vyjayanthi Chari, S. Popa

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引用次数: 1

摘要

Iwase和Matsumoto将“pochette外科”定义为沿着等价于$S^2 \vee S^1$的4-流形上的剪切和粘贴。第一作者在[10]中研究了通过波切特运算得到的无穷多个同伦论4-球。本文利用pochette嵌入的“连接数”计算了任意同调4球的pochette运算的同调性。我们证明了用琐碎的脊髓进行波切手术不会改变异型性类型或进行Gluck手术。我们还证明了在4球体上存在波切特手术，该手术具有非平凡的核心球体和非平凡的绳索，使得手术产生4球体。

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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Pochette surgery of 4-sphere

Iwase and Matsumoto defined `pochette surgery' as a cut-and-paste on 4-manifolds along a 4-manifold homotopy equivalent to $S^2\vee S^1$. The first author in [10] studied infinitely many homotopy 4-spheres obtained by pochette surgery. In this paper we compute the homology of pochette surgery of any homology 4-sphere by using `linking number' of a pochette embedding. We prove that pochette surgery with the trivial cord does not change the diffeomorphism type or gives a Gluck surgery. We also show that there exist pochette surgeries on the 4-sphere with a non-trivial core sphere and a non-trivial cord such that the surgeries give the 4-sphere.

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来源期刊

Pacific Journal of Mathematics 数学-数学

CiteScore

1.30

自引率

0.00%

发文量

审稿时长

4-8 weeks

期刊介绍： Founded in 1951, PJM has published mathematics research for more than 60 years. PJM is run by mathematicians from the Pacific Rim. PJM aims to publish high-quality articles in all branches of mathematics, at low cost to libraries and individuals. The Pacific Journal of Mathematics is incorporated as a 501(c)(3) California nonprofit.