Lipschitz functions have \(L_{p}\)-stable persistence

Topological data analysis of single-trial electroencephalographic signals, Nonparametric Estimation of Probability Density Functions of Random Persistence Diagrams, Relation between total variation and persistence distance and its application in signal processing, Signal classification with a point process distance on the space of persistence diagrams, How Many Directions Determine a Shape and other Sufficiency Results for Two Topological Transforms, Persistent Homology: A Topological Tool for Higher-Interaction Systems, Universality of persistence diagrams and the bottleneck and Wasserstein distances, Unnamed Item, A framework for differential calculus on persistence barcodes, Geometry Helps to Compare Persistence Diagrams, Persistence curves: a canonical framework for summarizing persistence diagrams, Atom-specific persistent homology and its application to protein flexibility analysis, A gradient sampling algorithm for stratified maps with applications to topological data analysis, Robust statistics, hypothesis testing, and confidence intervals for persistent homology on metric measure spaces, Mini-workshop: A geometric fairytale full of spectral gaps and random fruit. Abstracts from the mini-workshop held November 27 -- December 3, 2022, Stabilizing the unstable output of persistent homology computations, Topological learning for brain networks, Topological analysis of simple segmentation maps, Exact weights, path metrics, and algebraic Wasserstein distances, Stable comparison of multidimensional persistent homology groups with torsion, Embeddings of persistence diagrams into Hilbert spaces, Evolutionary homology on coupled dynamical systems with applications to protein flexibility analysis, Topological data analysis for true step detection in periodic piecewise constant signals, Persistent homology and the upper box dimension, A stable cardinality distance for topological classification, Hierarchies and Ranks for Persistence Pairs, Persistent Intersection Homology for the Analysis of Discrete Data, Topological Machine Learning with Persistence Indicator Functions, Utilizing Topological Data Analysis for Studying Signals of Time-Delay Systems, Understanding the topology and the geometry of the space of persistence diagrams via optimal partial transport, Kernel method for persistence diagrams via kernel embedding and weight factor, Comparison of persistent homologies for vector functions: from continuous to discrete and back, Topological Analysis of Variance and the Maxillary Complex, Confidence sets for persistence diagrams, Topological pattern recognition for point cloud data, Exploring uses of persistent homology for statistical analysis of landmark-based shape data, Stable length estimates of tube-like shapes, Critical transitions in a model of a genetic regulatory system, On the distribution of local extrema in quantum chaos, A persistence landscapes toolbox for topological statistics, Topology and data, Fréchet means for distributions of persistence diagrams, Persistence barcodes and Laplace eigenfunctions on surfaces, The reflection distance between zigzag persistence modules, On the choice of weight functions for linear representations of persistence diagrams, Local versus global distances for zigzag and multi-parameter persistence modules, Fractal dimension and the persistent homology of random geometric complexes, Betti numbers in multidimensional persistent homology are stable functions, Virtual persistence diagrams, signed measures, Wasserstein distances, and Banach spaces, The theory of the interleaving distance on multidimensional persistence modules, Sliding windows and persistence: an application of topological methods to signal analysis

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• Stability of persistence diagrams
• Extending persistence using Poincaré and Lefschetz duality
• Computing persistent homology
• Topological persistence and simplification