Every nD Persistence Module Is the Restriction of an (n+1)D Indecomposable Module
Applied Algebraic Topology Network via YouTube
Start speaking a new language. It’s just 3 weeks away.
PowerBI Data Analyst - 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 a constructive process for building (n+1)D indecomposable modules from nD persistence modules in this 30-minute conference talk by Mickaël Buchet for the Applied Algebraic Topology Network. Learn about the process of creating an (n+1)D indecomposable module that contains a given nD persistence module as a hyperplane restriction. Discover the implications and consequences of this process in the field of algebraic topology. Gain insights into advanced concepts in persistence modules and their dimensional relationships.
Syllabus
Mickaël Buchet: Every nD persistence module is the restriction of an (n+1)D indecomposable module.
Taught by
Applied Algebraic Topology Network