Gehér, G.P. and Titkos, Tamás and Virosztek, Dániel (2023) On the exotic isometry flow of the quadratic Wasserstein space over the real line. LINEAR ALGEBRA AND ITS APPLICATIONS. ISSN 0024-3795
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Abstract
Kloeckner discovered that the quadratic Wasserstein space over the real line (denoted by W2(R)) is quite peculiar, as its isometry group contains an exotic isometry flow. His result implies that it can happen that an isometry Φ fixes all Dirac measures, but still, Φ is not the identity of W2(R). This is the only known example of this surprising and counterintuitive phenomenon. Kloeckner also proved that the image of each finitely supported measure under these isometries (and thus under all isometry) is a finitely supported measure. Recently we showed that the exotic isometry flow can be represented as a unitary group on L2((0,1)). In this paper, we calculate the generator of this group, and we show that every exotic isometry (and thus every isometry) maps the set of all absolutely continuous measures belonging to W2(R) onto itself. © 2023 Elsevier Inc.
| Item Type: | Article |
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| Uncontrolled Keywords: | Unitary group; Real line; Isometric embeddings; Isometric embeddings; Wasserstein space; Counter-intuitive phenomenon; isometric rigidity; isometric rigidity; Exotic isometry flow; Exotic isometry flow; Dirac measures; Wasserstein spaces; |
| Subjects: | Q Science / természettudomány > QA Mathematics / matematika |
| SWORD Depositor: | MTMT SWORD |
| Depositing User: | MTMT SWORD |
| Date Deposited: | 07 Sep 2023 15:26 |
| Last Modified: | 07 Sep 2023 15:26 |
| URI: | http://real.mtak.hu/id/eprint/172988 |
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