莫尔斯理论信号压缩与链复合物重建

Stefania Ebli, Celia Hacker, Kelly Maggs
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引用次数: 0

摘要

在拓扑数据分析(TDA)和机器学习的交叉点上,细胞信号处理领域近年来发展迅速。在这种情况下,复数单元上的每个信号都要利用组合拉普拉斯和由此产生的霍奇分解进行处理。与此同时,离散莫尔斯理论已被广泛应用,在保持复数全局拓扑特性的同时,通过减小复数的大小来加快计算速度。在本文中,我们提供了一种利用代数离散莫尔斯理论工具在链复数上进行信号压缩和重建的方法。其主要目标是通过变形回缩来缩小和重建基于链复数及其单元上的信号集,同时尽可能保留复数和信号的全局拓扑结构。我们首先证明,基于实度的有限维链复数的任何变形回缩都等价于莫尔斯匹配。然后,我们将研究信号在特定类型的莫尔斯匹配下是如何变化的,并证明其重构误差在霍奇分解的特定成分上是微不足道的。此外,我们还提供了一种以最小重构误差计算莫尔斯匹配的算法。
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Morse theoretic signal compression and reconstruction on chain complexes.

At the intersection of Topological Data Analysis (TDA) and machine learning, the field of cellular signal processing has advanced rapidly in recent years. In this context, each signal on the cells of a complex is processed using the combinatorial Laplacian, and the resultant Hodge decomposition. Meanwhile, discrete Morse theory has been widely used to speed up computations by reducing the size of complexes while preserving their global topological properties. In this paper, we provide an approach to signal compression and reconstruction on chain complexes that leverages the tools of algebraic discrete Morse theory. The main goal is to reduce and reconstruct a based chain complex together with a set of signals on its cells via deformation retracts, preserving as much as possible the global topological structure of both the complex and the signals. We first prove that any deformation retract of real degree-wise finite-dimensional based chain complexes is equivalent to a Morse matching. We will then study how the signal changes under particular types of Morse matchings, showing its reconstruction error is trivial on specific components of the Hodge decomposition. Furthermore, we provide an algorithm to compute Morse matchings with minimal reconstruction error.

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