The Dual Degree Cech Bifiltration

Morten Brun
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Abstract

In topological data analysis (TDA), a longstanding challenge is to recognize underlying geometric structures in noisy data. One motivating examples is the shape of a point cloud in Euclidean space given by image. Carlsson et al. proposed a method to detect topological features in point clouds by first filtering by density and then applying persistent homology. Later more refined methods have been developed, such as the degree Rips complex of Lesnick and Wright and the multicover bifiltration. In this paper we introduce the dual Degree Cech bifiltration, a Prohorov stable bicomplex of a point cloud in a metric space with the point cloud itself as vertex set. It is of the same homotopy type as the Measure Dowker bifiltration of Hellmer and Spali\'nski but it has a different vertex set. The dual Degree Cech bifiltration can be constructed both in an ambient and an intrinsic way. The intrinsic dual Degree Cech bifiltration is a $(1,2)$-intereaved with the ambent dual Degree Cech bifiltration in the distance parameter. This interleaving can be used to leverage a stability result for the intrinsically defined dual Degree Cech bifiltration. This stability result recently occured in work by Hellmer and Spali\'nski.
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双度 Cech 双滤技术
在拓扑数据分析(TDA)中,一个长期存在的挑战是识别噪声数据中潜在的几何结构。其中一个激励性的例子是图像给出的欧几里得空间中点云的形状。Carlsson 等人提出了一种检测点云拓扑特征的方法,首先通过密度过滤,然后应用持久同源性。后来,人们又开发出了更精细的方法,如莱斯尼克和赖特的度里普斯复合法以及多覆盖分层法。在本文中,我们介绍了对偶度 Cech 双分层,即以点云本身为顶点集的对称空间中点云的普罗霍罗夫稳定双复数。它与赫尔默和斯帕利斯基的度量道克二分层属于同一同调类型,但它的顶点集不同。对偶 Degree Cech 双分层可以通过环境和内在两种方式构造。内在的对偶 Degree Cech 双分层与外在的对偶 Degree Cech 双分层在距离参数上是$(1,2)$交错的。这种交错可以用来利用内在定义的双度切赫分层的稳定性结果。这一稳定性结果最近出现在 Hellmer 和 Spali\'nski 的研究中。
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Tensor triangular geometry of modules over the mod 2 Steenrod algebra Ring operads and symmetric bimonoidal categories Inferring hyperuniformity from local structures via persistent homology Computing the homology of universal covers via effective homology and discrete vector fields Geometric representation of cohomology classes for the Lie groups Spin(7) and Spin(8)
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