Explore the algebraic stability of zigzag persistence modules in this comprehensive lecture by Michael Lesnick. Delve into key concepts including persistence modules, interval decomposable modules, and the Cross-Smith Theorem. Examine examples, applications, and advanced topics such as block blocks, opposite processes, and index persons modules. Investigate level sets, index modules, bottleneck systems, persistence diagrams, and candy bar codes. Learn about the algebraic stability theorem and its implications for multidimensional stability. Engage with quizzes on matching between barcodes and dimensional bottleneck distance. Conclude with an exploration of the Block Italy Theorem and its relevance to algebraic stability in topological data analysis.
Michael Lesnick - Algebraic Stability of Zigzag Persistence Modules
Applied Algebraic Topology Network via YouTube
Overview
Syllabus
Introduction
Results
Applications
Persistence Modules
Examples
CrossSmith Theorem
Interval Decomposable Module
Are Persistence Modules Decomposable
Persistence Modes
Block Blocks
Opposite Process
Index Persons Module
Level Set
Index Modules
bottleneck systems
persistence diagrams
candy bar codes
algebraic stability theorem
multidimensional stability
Quiz
Matching between barcodes
Dimensional bottleneck distance
Block Italy Theorem
Algebraic Stability
Taught by
Applied Algebraic Topology Network
