Persistent hyperdigraph homology and persistent hyperdigraph Laplacians

IF 1.7 Q2 MATHEMATICS, APPLIED
Dong Chen, Jian Liu, Jie Wu, Guo-Wei Wei
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引用次数: 9

Abstract

Hypergraphs are useful mathematical models for describing complex relationships among members of a structured graph, while hyperdigraphs serve as a generalization that can encode asymmetric relationships in the data. However, obtaining topological information directly from hyperdigraphs remains a challenge. To address this issue, we introduce hyperdigraph homology in this work. We also propose topological hyperdigraph Laplacians, which can extract both harmonic spectra and non-harmonic spectra from directed and internally organized data. Moreover, we introduce persistent hyperdigraph homology and persistent hyperdigraph Laplacians through filtration, enabling the capture of topological persistence and homotopic shape evolution of directed and structured data across multiple scales. The proposed methods offer new multiscale algebraic topology tools for topological data analysis.
持久超向位同调和持久超向位拉普拉斯算子
超图是描述结构化图成员之间复杂关系的有用数学模型,而超图则是一种概括,可以对数据中的不对称关系进行编码。然而,直接从超向图中获取拓扑信息仍然是一个挑战。为了解决这个问题,我们在本文中引入了超向位同调。我们还提出了拓扑超向拉普拉斯算子,它可以从有向和内部组织的数据中提取谐波谱和非谐波谱。此外,我们通过过滤引入了持续超有向图同调和持续超有向图拉普拉斯算子,从而实现了有向和结构化数据在多个尺度上的拓扑持久性和同调形状演化。提出的方法为拓扑数据分析提供了新的多尺度代数拓扑工具。
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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来源期刊
CiteScore
3.30
自引率
0.00%
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