Explore a comprehensive lecture on l_p-metrics for multiparameter persistence modules in topological data analysis. Delve into the generalization of p-Wasserstein distance on barcodes to multi-parameter persistence modules, introducing two key generalizations: d_I^p and d_M^p. Examine how these distances relate to the interleaving and matching distances, and discover their valuable properties. Investigate the continuity of 2-parameter multicover persistent homology, uncovering nuances in the stability theory not captured by the interleaving distance alone. Learn about the collaborative work with Havard Bjerkevik and gain insights from this talk, which was part of the "Topological Data Analysis - Theory and Applications" workshop supported by the Tutte Institute and Western University.
Overview
Syllabus
Michael Lesnick (5/3/21): l_p-Metrics on Multiparameter Persistence Modules
Taught by
Applied Algebraic Topology Network
Related Courses
-
Oliver Vipond - Local Equivalence of Metrics for Multiparameter Persistence Modules
-
Why Should Q=P in the Wasserstein Distance Between Persistence Diagrams?
-
Edit Distance and Persistence Diagrams Over Lattices
-
Ephemeral Persistence Modules and Distance Comparison
-
Ulrich Bauer - Persistence Diagrams as Diagrams
-
Michael Lesnick - Algebraic Stability of Zigzag Persistence Modules
