Effective Topological Complexity and Effective Lusternik-Schnirelmann Category
Offered By: Applied Algebraic Topology Network via YouTube
Course Description
Overview
Explore the concept of Effective Topological Complexity and its relation to motion planning problems in this lecture from the Applied Algebraic Topology Network. Delve into the impact of symmetries on configuration spaces and the development of equivariant versions of topological complexity. Learn about the Effective Lusternik-Schnirelmann category and investigate properties of both effective TC and cat, including their relationship with orbit projection maps and non-vanishing conditions. Gain insights from joint research by Arturo Espinosa Baro, Zbigniew Błaszczyk, and Antonio Viruel on reducing complexity in motion planning through symmetry recognition.
Syllabus
Arturo Espinosa Baro (3/28/24): Effective topological complexity and effective LS category
Taught by
Applied Algebraic Topology Network
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