非零平方的对偶

IF 0.6 3区数学 Q3 MATHEMATICS

Mathematical Research Letters Pub Date : 2020-12-10 DOI:10.4310/mrl.2022.v29.n1.a8

Hannah R. Schwartz

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引用次数: 1

摘要

在这个简短的注释中，对于每个非零整数n，我们构造了一个4-流形，它包含一对光滑一致的球面，具有一个平方n的公共对偶，但没有将一个球面带到另一个球面的自同构。我们的例子，除了表明对偶的平方零假设在Gabai和Scheniederman-Teichner版本的4D灯泡定理中都是必要的之外，还有一个有趣的特征，那就是这对球体的Freedman-Quinn和Kervaire-Milnor不变量都消失了。该证明对Akbulut Matveyev和Auckly Kim Melvin Ruberman关于著名的马祖软木的结果进行了令人惊讶的应用。

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Duals of non-zero square

In this short note, for each non-zero integer n we construct a 4-manifold containing a smoothly concordant pair of spheres with a common dual of square n but no automorphism carrying one sphere to the other. Our examples, besides showing that the square zero assumption on the dual is necessary in both Gabai's and Scheniederman-Teichner's version of the 4D Light Bulb Theorem, have the interesting feature that both the Freedman-Quinn and Kervaire-Milnor invariant of the pair of spheres vanishes. The proof gives a surprising application of results due to Akbulut-Matveyev and Auckly-Kim-Melvin-Ruberman pertaining to the well-known Mazur cork.

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来源期刊

Mathematical Research Letters 数学-数学

CiteScore

1.40

自引率

0.00%

发文量

审稿时长

6.0 months

期刊介绍： Dedicated to publication of complete and important papers of original research in all areas of mathematics. Expository papers and research announcements of exceptional interest are also occasionally published. High standards are applied in evaluating submissions; the entire editorial board must approve the acceptance of any paper.