A Sharp Isoperimetric Gap Theorem in Non-Positive Curvature
Hausdorff Center for Mathematics via YouTube
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This lecture explores isoperimetric inequalities for null-homotopies of Lipschitz 2-spheres in proper CAT(0) spaces, presenting joint research by Urs Lang, Cornelia Drutu, Panos Papasoglu, and Stephan Stadler. Discover how their work establishes a significant gap theorem in higher dimensions that yields exponents approaching 1, analogous to known results in one dimension less where quadratic inequalities below the sharp threshold of 1/(4Ï€) imply Gromov hyperbolicity and linear inequalities. Learn about their proof of a previously undocumented Euclidean isoperimetric inequality for null-homotopies of 2-spheres and the introduction of minimal tetrahedra that satisfy a linear inequality.
Syllabus
Urs Lang: A sharp isoperimetric gap theorem in non-positive curvature
Taught by
Hausdorff Center for Mathematics