通过超凸嵌入看 $(\mathbb{R}^n, \ell_1)$ 中密集子集的 Vietoris-Rips 复合物的可收缩性

arXiv - MATH - Algebraic Topology Pub Date : 2024-06-12 DOI:arxiv-2406.08664

Qingsong Wang

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摘要

我们考虑了具有足够大尺度的$(\mathbb{R}^n,\ell_1)$的致密子集的Vietoris-Rips复合体的可收缩性。这是由马修-扎伦斯基（Matthew Zaremsky）提出的一个问题引起的，即对于每一个 $n$ 自然数，是否存在一个 $r_n>0$ 使得尺度为 $r$ 的 $(\mathbb{Z}^n,\ell_1)$的 Vietoris-Rips 复集对于所有 $r\geq r_n$ 都是可收缩的。我们利用与度量空间 $X$ 的超凸度量空间嵌入邻域及其与 $X$ 的 Vietoris-Rips 复数的联系有关的结果来探讨这个问题。通过这种方法，我们对 $n=2$ 和 $3$ 的情况给出了上述问题的肯定答案。

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Contractibility of Vietoris-Rips Complexes of dense subsets in $(\mathbb{R}^n, \ell_1)$ via hyperconvex embeddings

We consider the contractibility of Vietoris-Rips complexes of dense subsets of $(\mathbb{R}^n,\ell_1)$ with sufficiently large scales. This is motivated by a question by Matthew Zaremsky regarding whether for each $n$ natural there is a $r_n>0$ so that the Vietoris-Rips complex of $(\mathbb{Z}^n,\ell_1)$ at scale $r$ is contractible for all $r\geq r_n$. We approach this question using results that relates to the neighborhood of embeddings into hyperconvex metric space of a metric space $X$ and its connection to the Vietoris-Rips complex of $X$. In this manner, we provide positive answers to the question above for the case $n=2$ and $3$.

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arXiv - MATH - Algebraic Topology

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