超立方体的Vietoris--Rips复合体中的刻面

Joseph Briggs, Ziqin Feng, Chris Wells
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引用次数: 0

摘要

在本文中,我们研究了 Vietoris--Rips complex$mathcal{VR}(Q_n; r)$ 的面,其中 $Q_n$ 表示 $n$ 维超立方。我们对那些与维数 $n$ 无关的面特别感兴趣。利用哈达玛矩阵,我们证明了在假设 $n$ 足够大的情况下,这种面的不同维数是尺度 $r$ 的超多项式函数。我们还证明,当$n$足够大时,只要阶数为$2r$的哈达玛矩阵存在,复数$\mathcal{VR}(Q_n; r)$的$(2r-1)$三维同调就不是三维的。
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Facets in the Vietoris--Rips complexes of hypercubes
In this paper, we investigate the facets of the Vietoris--Rips complex $\mathcal{VR}(Q_n; r)$ where $Q_n$ denotes the $n$-dimensional hypercube. We are particularly interested in those facets which are somehow independent of the dimension $n$. Using Hadamard matrices, we prove that the number of different dimensions of such facets is a super-polynomial function of the scale $r$, assuming that $n$ is sufficiently large. We show also that the $(2r-1)$-th dimensional homology of the complex $\mathcal{VR}(Q_n; r)$ is non-trivial when $n$ is large enough, provided that the Hadamard matrix of order $2r$ exists.
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