基础持久路径同源性：加权数图的稳定拓扑描述符

IF 2.5 1区数学 Q2 COMPUTER SCIENCE, THEORY & METHODS

Foundations of Computational Mathematics Pub Date : 2024-08-23 DOI:10.1007/s10208-024-09679-2

Thomas Chaplin, Heather A. Harrington, Ulrike Tillmann

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引用次数: 0

摘要

加权数图被用于模拟各种自然系统，并能在各种尺度上表现出有趣的结构。为了理解和比较这些系统，我们需要稳定、可解释的多尺度描述符。为此，我们提出了接地持久路径同源性（GrPPH）--一种新的、函数式的拓扑描述符，通过持久性条形码来描述边缘加权数图的结构。我们证明了可以选择图形的电路基础，从而为条形码中的特征提供几何上可解释的代表。此外，我们还证明了条形码在瓶颈距离上对数值和结构扰动都是稳定的。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

Grounded Persistent Path Homology: A Stable, Topological Descriptor for Weighted Digraphs

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Grounded Persistent Path Homology: A Stable, Topological Descriptor for Weighted Digraphs

Weighted digraphs are used to model a variety of natural systems and can exhibit interesting structure across a range of scales. In order to understand and compare these systems, we require stable, interpretable, multiscale descriptors. To this end, we propose grounded persistent path homology (GrPPH)—a new, functorial, topological descriptor that describes the structure of an edge-weighted digraph via a persistence barcode. We show there is a choice of circuit basis for the graph which yields geometrically interpretable representatives for the features in the barcode. Moreover, we show the barcode is stable, in bottleneck distance, to both numerical and structural perturbations.

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来源期刊

Foundations of Computational Mathematics 数学-计算机：理论方法

CiteScore

6.90

自引率

3.30%

发文量

审稿时长

>12 weeks

期刊介绍： Foundations of Computational Mathematics (FoCM) will publish research and survey papers of the highest quality which further the understanding of the connections between mathematics and computation. The journal aims to promote the exploration of all fundamental issues underlying the creative tension among mathematics, computer science and application areas unencumbered by any external criteria such as the pressure for applications. The journal will thus serve an increasingly important and applicable area of mathematics. The journal hopes to further the understanding of the deep relationships between mathematical theory: analysis, topology, geometry and algebra, and the computational processes as they are evolving in tandem with the modern computer. With its distinguished editorial board selecting papers of the highest quality and interest from the international community, FoCM hopes to influence both mathematics and computation. Relevance to applications will not constitute a requirement for the publication of articles. The journal does not accept code for review however authors who have code/data related to the submission should include a weblink to the repository where the data/code is stored.