Bunth, Gergely, Pitrik, József, Titkos, Tamás and Virosztek, Dániel (2024) Metric property of quantum Wasserstein divergences. Physical Review A, 110 (2). DOI https://doi.org/10.1103/PhysRevA.110.022211
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Official URL: https://doi.org/10.1103/PhysRevA.110.022211
Abstract
Quantum Wasserstein divergences are modified versions of quantum Wasserstein distances defined by channels, and they are conjectured to be genuine metrics on quantum state spaces by De Palma and Trevisan. We prove triangle inequality for quantum Wasserstein divergences for every quantum system described by a separable Hilbert space and any quadratic cost operator under the assumption that a particular state involved is pure, and all the states have finite energy. We also provide strong numerical evidence suggesting that the triangle inequality holds in general, for an arbitrary choice of states.
| Item Type: | Article |
|---|---|
| Uncontrolled Keywords: | quantum optimal transport, metric property |
| Divisions: | Institute of Data Analytics and Information Systems |
| Subjects: | Mathematics, Econometrics |
| Funders: | Momentum Program of the Hungarian Academy of Science, esearch Excellence Programme of the Hungarian National Re- search, Development and Innovation Offic |
| Projects: | LP2021- 15/2021, KKP133827, NKFIH K115383 |
| DOI: | https://doi.org/10.1103/PhysRevA.110.022211 |
| ID Code: | 10466 |
| Deposited By: | Ádám Hoffmann |
| Deposited On: | 29 Oct 2024 09:41 |
| Last Modified: | 29 Oct 2024 09:41 |
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