Stability of Rips-Type Ellipsoid Complexes
Applied Algebraic Topology Network via YouTube
Become an AI & ML Engineer with Cal Poly EPaCE — IBM-Certified Training
Power BI Fundamentals - Create visualizations and dashboards from scratch
Overview
Google, IBM & Meta Certificates – 40% Off
One plan covers every Professional Certificate on Coursera.
Unlock All Certificates
Explore the theoretical foundations of Rips-type ellipsoid complexes in this 43-minute conference talk that addresses limitations of standard persistent homology methods. Learn how traditional Vietoris-Rips complexes based on Euclidean balls often fail to capture local geometry of data sampled from manifolds, and discover an innovative solution using ellipsoid complexes that employ local PCA to align filtration elements with estimated tangent spaces. Examine the mathematical construction of these complexes through a self-contained introduction before delving into the primary focus on theoretical guarantees. Understand the stability proof that demonstrates how persistence barcodes vary continuously with input data under mild assumptions on underlying point clouds, providing crucial theoretical backing for this advanced topological data analysis technique.
Syllabus
Niklas Canova (02/18/26): Stability of Rips-Type Ellipsoid Complexes
Taught by
Applied Algebraic Topology Network