Explore new isoperimetric inequalities and their applications in systolic geometry and minimal surfaces in this 52-minute lecture from the Colloque des sciences mathématiques du Québec. Delve into Yevgeny Liokumovich's Aisenstadt Prize-winning research, which introduces two novel isoperimetric inequalities for k-dimensional submanifolds in R^n or Banach spaces. Discover how these inequalities lead to a new systolic inequality, confirming Larry Guth's conjecture, and an asymptotic formula for minimal submanifold volumes, validating Mikhail Gromov's prediction. Gain insights into collaborative work with Boris Lishak, Alexander Nabutovsky, Regina Rotman, Fernando Marques, Andre Neves, and Larry Guth, advancing understanding in mathematical geometry and topology.
New Isoperimetric Inequalities and Their Applications to Systolic Geometry and Minimal Surfaces
Centre de recherches mathématiques - CRM via YouTube
Overview
Syllabus
Yevgeny Liokumovich: New isoperimetric inequalities & their applications to systolic geometry [...]
Taught by
Centre de recherches mathématiques - CRM
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