强塌缩和持久同源性

IF 0.5 3区 数学 Q3 MATHEMATICS
J. Boissonnat, Siddharth Pritam, Divyansh Pareek
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引用次数: 1

摘要

本文介绍了一种计算简单配合物序列的持久同源性(PH)的快速、高效的方法。其基本思想是通过Barmak和Miniam [DCG(2012)]引入的强崩塌来简化输入序列的复合体,并计算与初始PH相同的简化复合体诱导序列的PH。我们的方法与以前的工作有几个显著的区别。它并不局限于过滤(即嵌套的简单子复合体序列),但也适用于其他类型的序列,如塔和之字形。为了强坍缩一个简单复合体,我们只需要存储该复合体的最大简单点,而不是其所有简单点的全部集合,这节省了大量的空间和时间。此外,序列中的配合物可以独立地或平行地强崩塌。我们还重点讨论了旗塔的持久同源性的计算问题,即由简单映射连接的一系列旗塔。我们表明,如果我们将简单配合物的类别限制为标志配合物,我们可以在时间和空间复杂性方面取得相对于以前工作的决定性改进。此外,我们可以只知道它的1-骨架就强瓦解一个标志复合体,得到的复合体也是一个标志复合体。当我们对旗塔中的复合体进行强折叠时,我们得到一个简化序列,它也是一个旗塔,我们称之为核心旗塔。然后,我们将核心旗塔转换为等效过滤以计算其ph。这里,我们只使用配合物的1-骨架。所得方法简单,效率极高。结果,正如在公开可用数据集上进行的大量实验所证明的那样,我们的方法在实践中非常快速且内存高效。最后,我们可以通过选择我们强坍缩序列的简单复合体的数目来折衷精度和时间。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Strong collapse and persistent homology
In this paper, we introduce a fast and memory efficient approach to compute the Persistent Homology (PH) of a sequence of simplicial complexes. The basic idea is to simplify the complexes of the input sequence by using strong collapses, as introduced by Barmak and Miniam [DCG (2012)], and to compute the PH of an induced sequence of reduced simplicial complexes that has the same PH as the initial one. Our approach has several salient features that distinguishes it from previous work. It is not limited to filtrations (i.e. sequences of nested simplicial subcomplexes) but works for other types of sequences like towers and zigzags. To strong collapse a simplicial complex, we only need to store the maximal simplices of the complex, not the full set of all its simplices, which saves a lot of space and time. Moreover, the complexes in the sequence can be strong collapsed independently and in parallel. We also focus on the problem of computing persistent homology of a flag tower, i.e. a sequence of flag complexes connected by simplicial maps. We show that if we restrict the class of simplicial complexes to flag complexes, we can achieve decisive improvement in terms of time and space complexities with respect to previous work. Moreover we can strong collapse a flag complex knowing only its 1-skeleton and the resulting complex is also a flag complex. When we strong collapse the complexes in a flag tower, we obtain a reduced sequence that is also a flag tower we call the core flag tower. We then convert the core flag tower to an equivalent filtration to compute its PH. Here again, we only use the 1-skeletons of the complexes. The resulting method is simple and extremely efficient. As a result and as demonstrated by numerous experiments on publicly available data sets, our approach is extremely fast and memory efficient in practice. Finally, we can compromise between precision and time by choosing the number of simplicial complexes of the sequence we strong collapse.
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来源期刊
CiteScore
1.50
自引率
0.00%
发文量
13
审稿时长
>12 weeks
期刊介绍: This journal is devoted to topology and analysis, broadly defined to include, for instance, differential geometry, geometric topology, geometric analysis, geometric group theory, index theory, noncommutative geometry, and aspects of probability on discrete structures, and geometry of Banach spaces. We welcome all excellent papers that have a geometric and/or analytic flavor that fosters the interactions between these fields. Papers published in this journal should break new ground or represent definitive progress on problems of current interest. On rare occasion, we will also accept survey papers.
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