Explore the isoperimetric inequality for Hausdorff contents and compact metric spaces in Banach spaces, including infinite-dimensional ones, in this 54-minute lecture. Delve into the implications for systolic geometry, focusing on new types of systolic inequalities applicable to a broader range of non-simply connected Riemannian manifolds than Gromov's classical systolic inequality. Gain insights from the joint work of Alexander Nabutovsky, Y. Liokumovich, B. Lishak, and R. Rotman, presented by Nabutovsky for the Applied Algebraic Topology Network.
Isoperimetric Inequality for Hausdorff Contents and Its Applications
Applied Algebraic Topology Network via YouTube
Overview
Syllabus
Alexander Nabutovsky (5/13/22): Isoperimetric inequality for Hausdorff contents and its applications
Taught by
Applied Algebraic Topology Network
Related Courses
-
New Isoperimetric Inequalities and Their Applications to Systolic Geometry and Minimal Surfaces
-
Yevgeny Liokumovich - Urysohn Width, Isoperimetric Inequalities and Scalar Curvature
-
A Sharp Isoperimetric-Type Inequality for Lorentzian Spaces Satisfying Time-Like Ricci Curvature Lower Bounds
-
Mapping Riemannian Manifolds in Metric Spaces
-
Functional Analysis
-
Discrete Homotopy Theory and Applications
