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Explore a mathematical conference talk that presents a significant theoretical result in differential geometry and statistics. Learn about the proof that the cut locus of a Fréchet mean of a random variable on a connected and complete Riemannian manifold has zero probability, addressing a conjecture that was previously known only in special cases. Discover how the proof employs both first-order and second-order considerations, with the latter building upon Générau's recent work on "Laplacians in the barrier sense." Gain insights into advanced concepts in geometric statistics, including Fréchet means on manifolds, cut loci, and their probabilistic properties. Understand the mathematical techniques used to establish this fundamental result that bridges probability theory and Riemannian geometry, presented by Stephan Huckemann from Georg-August Universität Göttingen at Harvard's Conference on Geometry and Statistics.
Syllabus
Stephan Huckemann | The Probability of the Cut Locus of a Fréchet Mean
Taught by
Harvard CMSA