Convexity in High Dimensions

Convexity in High Dimensions

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Bo'az Klartag, Weizmann Institute of Science and Minerva Distinguished Visitor
Fine Hall 314

In-Person and Online Talk 

We will discuss recent progress in the understanding of the isoperimetric problem for high-dimensional convex sets, and the resolution up to polylogarithmic factors of Bourgain's slicing problem and Kannan-Lovasz-Simonovits isoperimetric conjecture. The first of the five lectures will be an introduction to this research direction and to its main theme, that convexity in high dimension is a source of regularity, comparable to statistical independence. The remaining lectures will be devoted to proofs and to techniques that are useful in convex geometry (and beyond!), such as convex localization, optimal transport with the Monge cost, Bochner identities and curvature, heat flow, and Eldan's stochastic localization.