Gehér, György Pál, Hrušková, Aranka, Titkos, Tamás and Virosztek, Dániel ORCID: https://orcid.org/0000-0003-1109-5511 (2025) Isometric rigidity of Wasserstein spaces over Euclidean spheres. Journal of Mathematical Analysis and Applications, 542 (2). DOI 10.1016/j.jmaa.2024.128810
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Official URL: https://doi.org/10.1016/j.jmaa.2024.128810
Abstract
We study the structure of isometries of the quadratic Wasserstein space W2(Sn, · )over the sphere endowed with the distance inherited from the norm of Rn+1. We prove that W2(Sn, · )is isometrically rigid, meaning that its isometry group is isomorphic to that of (Sn, · ). This is in striking contrast to the non-rigidity of its ambient space W2 (Rn+1, · ) but in line with the rigidity of the geodesic space W2(Sn,∢). One of the key steps of the proof is the use of mean squared error functions to mimic displacement interpolation in W2 (Sn, · ). A major difficulty in proving rigidity for quadratic Wasserstein spaces is that one cannot use the Wasserstein potential technique. To illustrate its general power, we use it to prove isometric rigidity of Wp (S1, · ) for 1 ≤ p < 2.
Item Type: | Article |
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Uncontrolled Keywords: | Wasserstein space ; Isometric rigidity |
Divisions: | Institute of Data Analytics and Information Systems |
Subjects: | Mathematics, Econometrics |
Funders: | Hungarian National Research, Development and Innovation Office, Momentum Program of the Hungarian Academy of Sciences, ERC Consolidator Grant |
Projects: | K115383, KKP139502, LP2021-15/2021, 772466 |
DOI: | 10.1016/j.jmaa.2024.128810 |
ID Code: | 10300 |
Deposited By: | MTMT SWORD |
Deposited On: | 09 Sep 2024 14:04 |
Last Modified: | 09 Sep 2024 14:07 |
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