Topological Methods in Machine Learning: A Tutorial for Practitioners

Baris Coskunuzer, Cüneyt Gürcan Akçora
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Abstract

Topological Machine Learning (TML) is an emerging field that leverages techniques from algebraic topology to analyze complex data structures in ways that traditional machine learning methods may not capture. This tutorial provides a comprehensive introduction to two key TML techniques, persistent homology and the Mapper algorithm, with an emphasis on practical applications. Persistent homology captures multi-scale topological features such as clusters, loops, and voids, while the Mapper algorithm creates an interpretable graph summarizing high-dimensional data. To enhance accessibility, we adopt a data-centric approach, enabling readers to gain hands-on experience applying these techniques to relevant tasks. We provide step-by-step explanations, implementations, hands-on examples, and case studies to demonstrate how these tools can be applied to real-world problems. The goal is to equip researchers and practitioners with the knowledge and resources to incorporate TML into their work, revealing insights often hidden from conventional machine learning methods. The tutorial code is available at https://github.com/cakcora/TopologyForML
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机器学习中的拓扑方法:从业人员教程
拓扑机器学习(TML)是一个新兴领域,它利用代数拓扑学的技术,以传统机器学习方法无法捕捉的方式分析复杂的数据结构。本教程全面介绍了两种关键的拓扑机器学习技术--持久同源性(persistententhomology)和映射器算法(Mapper algorithm),并重点介绍了实际应用。持久同源性可以捕捉多尺度拓扑特征,如集群、环路和空洞,而映射器算法则可以创建可解释的图,汇总高维数据。为了增强可读性,我们采用了以数据为中心的方法,使读者能够获得将这些技术应用于相关任务的实践经验。我们提供了分步解释、实现方法、实践示例和案例研究,以演示如何将这些工具应用于实际问题。我们的目标是为研究人员和从业人员提供知识和资源,以便将 TML 纳入他们的工作中,揭示传统机器学习方法中经常隐藏的洞察力。教程代码可从以下网址获取:https://github.com/cakcora/TopologyForML
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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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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