TL;DR
This paper provides an accessible overview of persistent homology, reviews computational methods, benchmarks state-of-the-art software, and offers guidelines for practitioners in topological data analysis.
Contribution
It introduces theory and computational techniques for persistent homology and benchmarks current software implementations for diverse data sets.
Findings
Identifies the most efficient algorithms for different data types.
Provides a comprehensive benchmark of existing software tools.
Offers practical guidelines for computing persistent homology.
Abstract
Persistent homology (PH) is a method used in topological data analysis (TDA) to study qualitative features of data that persist across multiple scales. It is robust to perturbations of input data, independent of dimensions and coordinates, and provides a compact representation of the qualitative features of the input. The computation of PH is an open area with numerous important and fascinating challenges. The field of PH computation is evolving rapidly, and new algorithms and software implementations are being updated and released at a rapid pace. The purposes of our article are to (1) introduce theory and computational methods for PH to a broad range of computational scientists and (2) provide benchmarks of state-of-the-art implementations for the computation of PH. We give a friendly introduction to PH, navigate the pipeline for the computation of PH with an eye towards applications,…
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