Metric geometry of spaces of persistence diagrams.

Journal of applied and computational topology Pub Date : 2024-01-01 Epub Date: 2024-09-03 DOI:10.1007/s41468-024-00189-2

Mauricio Che, Fernando Galaz-García, Luis Guijarro, Ingrid Amaranta Membrillo Solis

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Abstract

Persistence diagrams are objects that play a central role in topological data analysis. In the present article, we investigate the local and global geometric properties of spaces of persistence diagrams. In order to do this, we construct a family of functors $D_{p}$ , $1 \leq p \leq \infty$ , that assign, to each metric pair (X, A), a pointed metric space $D_{p} (X, A)$ . Moreover, we show that $D_{\infty}$ is sequentially continuous with respect to the Gromov-Hausdorff convergence of metric pairs, and we prove that $D_{p}$ preserves several useful metric properties, such as completeness and separability, for $p \in [1, \infty)$ , and geodesicity and non-negative curvature in the sense of Alexandrov, for $p = 2$ . For the latter case, we describe the metric of the space of directions at the empty diagram. We also show that the Fréchet mean set of a Borel probability measure on $D_{p} (X, A)$ , $1 \leq p \leq \infty$ , with finite second moment and compact support is non-empty. As an application of our geometric framework, we prove that the space of Euclidean persistence diagrams, $D_{p} (R^{2 n}, Δ_{n})$ , $1 \leq n$ and $1 \leq p < \infty$ , has infinite covering, Hausdorff, asymptotic, Assouad, and Assouad-Nagata dimensions.

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持久图空间的度量几何。

持久图是拓扑数据分析中的核心对象。在本文中，我们将研究持久图空间的局部和全局几何特性。为此，我们构建了一系列函数 D p , 1 ≤ p ≤ ∞ , 为每个度量对 (X, A) 分配一个尖度量空间 D p ( X , A ) 。此外，我们证明 D ∞ 在度量对的格罗莫夫-豪斯多夫收敛性方面是连续的，并证明 D p 保留了几个有用的度量特性，如对于 p∈ [ 1 , ∞ ) 的完备性和可分性，以及大地性和非大地性。的情况下，D p 保留了几个有用的度量特性，如完整性和可分性；在 p = 2 的情况下，D p 保留了大地性和亚历山德罗夫意义上的非负曲率。对于后一种情况，我们描述了空图处方向空间的度量。我们还证明了在 D p ( X , A ) 上的博尔概率度量的弗雷谢特均值集，1 ≤ p ≤ ∞，具有有限第二矩和紧凑支持，是非空的。作为几何框架的一个应用，我们证明了欧氏持久图空间 D p ( R 2 n , Δ n ) , 1 ≤ n 且 1 ≤ p ∞ 具有无限覆盖维、豪斯多夫维、渐近维、阿苏阿德维和阿苏阿德-纳加塔维。

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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