Thursday, November 20, 2025 - 16:15 in V3-201
Quantified Cramer-Wold continuity theorem for Kantorovich and Zolotarev distances
A talk in the Oberseminar Probability Theory and Mathematical Statistics series by
Sergey Bobkov from University of Minnesota
| Abstract: |
Upper bounds for the Kantorovich and Zolotarev distances for probability measures on multidimensional Euclidean spaces are given in terms of similar distances between one dimensional projections of the measures. This quantifies the Cramer-Wold continuity theorem about the weak convergence of probability measures. This is a joint work with Friedrich Götze.
Within the CRC this talk is associated to the project(s): B10 |
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