多元邻域与Adjamagbo的一个猜想

Q4 Mathematics New Zealand Journal of Mathematics Pub Date : 2021-09-19 DOI:10.53733/131

D. Gauld

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引用次数: 0

摘要

我们验证了P. Adjamagbo的一个猜想，即如果流形的一个相对紧子集$V_0$的边界是子流形，则存在一个由正实数索引的相对紧开集的递增族$\{V_r\}$，使得每个子集的边界都是子流形，它们的并集是整个流形，并且对于每个$r\ge 0$，以$(r,\infty)$为索引的子族是$r^{\rm th}$集闭集的邻域基。我们在微分范畴中使用平滑环，在分段线性范畴中使用正则邻域，在拓扑范畴中使用柄体。

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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Manifold Neighbourhoods and a Conjecture of Adjamagbo

We verify a conjecture of P. Adjamagbo that if the frontier of a relatively compact subset $V_0$ of a manifold is a submanifold then there is an increasing family $\{V_r\}$ of relatively compact open sets indexed by the positive reals so that the frontier of each is a submanifold, their union is the whole manifold and for each $r\ge 0$ the subfamily indexed by $(r,\infty)$ is a neighbourhood basis of the closure of the $r^{\rm th}$ set. We use smooth collars in the differential category, regular neighbourhoods in the piecewise linear category and handlebodies in the topological category.

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