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Спецсеминар "Кольца, модули и матрицы"
Семинар проходит по понедельникам в ауд. 13-02 Главного здания, начало в 18:30.
Наш семинар в весеннем семестре 2020г. начинает работу 17 февраля. В связи с праздничными днями следующие заседания планируются 2 марта и 16 марта.
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17 февраля
Докладчик: Tamas Titkos (Renyi Institute). Совместная работа с Gyorgy Pal Geher (University of Reading), Daniel Virosztek (IST Austria)
Название доклада: «Isometries of Wasserstein spaces»
Аннотацияpdf: Due to its nice theoretical properties and an astonishing number of applications via optimal transport problems, probably the most intensively studied metric nowadays is the p-Wasserstein metric. Given a complete and separable metric space X and a real number p belonging to [1,∞), one defines the p-Wassersteinspace W_p(X) as the collection of Borel probability measures with finite p-th moment, endowed with a distance which is calculated by means of transport plans. The main aim of our research project is to reveal the structure of the isometry group Isom(W_p(X)). Although Isom(X) embeds naturally into Isom(W_p(X)) by push-forward, and this embedding turned out to be surjective in many cases (see e.g. [1]), these two groups are not isomorphic in general. Kloeckner computed in [2] the isometry group of the quadratic Wasserstein space over the real line. It turned out that this group is extremely rich: it contains a flow of wild behaving isometries that distort the shape of measures. Following this line of investigation, we computed Isom(W_p(R)) and Isom(W_p([0,1]) for all p in [1,∞). In this talk, I will survey first some of the earlier results in the subject, and then I will present the key results of our recent manuscript [3]. Joint work with György Pál Gehér (University of Reading) and Dániel Virosztek (IST Austria).
[1] J. Bertrand and B. Kloeckner, A geometric study of Wasserstein spaces: isometric rigidity in negative curvature, International Mathematics Research Notices, 2016 (5), 1368-1386.
[2] B. Kloeckner, A geometric study of Wasserstein spaces: Euclidean spaces, Annali della Scuola Normale Superiore di Pisa – Classe di Scienze, Serie 5, Tome 9 (2010) no. 2, 297-323.
[3] Gy. P. Gehér, T. Titkos, D. Virosztek, Isometric study of Wasserstein spaces – the real line, Manuscript under revision. Available at https://research-explorer.app.ist.ac.at/record/7389
24 февраля семинар не проводится.
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