Tripartite entropic uncertainty relation under phase decoherence
Abstract We formulate the tripartite entropic uncertainty relation and predict its lower bound in a three-qubit Heisenberg XXZ spin chain when measuring an arbitrary pair of incompatible observables on one qubit while the other two are served as quantum memories. Our study reveals that the entanglem...
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Nature Publishing Group
2021-06-01
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| Series: | Scientific Reports |
| Online Access: | https://doi.org/10.1038/s41598-021-90689-3 |
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doaj-9f350cd9daff4d558f91a417f8d7fd4a2021-06-06T11:36:41ZengNature Publishing GroupScientific Reports2045-23222021-06-0111111110.1038/s41598-021-90689-3Tripartite entropic uncertainty relation under phase decoherenceR. A. Abdelghany0A.-B. A. Mohamed1M. Tammam2Watson Kuo3H. Eleuch4Physics Department, Faculty of Science, Al-Azhar UniversityDepartment of Mathematics, College of Science and Humanities, Prince Sattam Bin Abdulaziz UniversityPhysics Department, Faculty of Science, Al-Azhar UniversityDepartment of Physics, National Chung Hsing UniversityDepartment of Applied Physics and Astronomy, University of SharjahAbstract We formulate the tripartite entropic uncertainty relation and predict its lower bound in a three-qubit Heisenberg XXZ spin chain when measuring an arbitrary pair of incompatible observables on one qubit while the other two are served as quantum memories. Our study reveals that the entanglement between the nearest neighbors plays an important role in reducing the uncertainty in measurement outcomes. In addition we have shown that the Dolatkhah’s lower bound (Phys Rev A 102(5):052227, 2020) is tighter than that of Ming (Phys Rev A 102(01):012206, 2020) and their dynamics under phase decoherence depends on the choice of the observable pair. In the absence of phase decoherence, Ming’s lower bound is time-invariant regardless the chosen observable pair, while Dolatkhah’s lower bound is perfectly identical with the tripartite uncertainty with a specific choice of pair.https://doi.org/10.1038/s41598-021-90689-3 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
R. A. Abdelghany A.-B. A. Mohamed M. Tammam Watson Kuo H. Eleuch |
| spellingShingle |
R. A. Abdelghany A.-B. A. Mohamed M. Tammam Watson Kuo H. Eleuch Tripartite entropic uncertainty relation under phase decoherence Scientific Reports |
| author_facet |
R. A. Abdelghany A.-B. A. Mohamed M. Tammam Watson Kuo H. Eleuch |
| author_sort |
R. A. Abdelghany |
| title |
Tripartite entropic uncertainty relation under phase decoherence |
| title_short |
Tripartite entropic uncertainty relation under phase decoherence |
| title_full |
Tripartite entropic uncertainty relation under phase decoherence |
| title_fullStr |
Tripartite entropic uncertainty relation under phase decoherence |
| title_full_unstemmed |
Tripartite entropic uncertainty relation under phase decoherence |
| title_sort |
tripartite entropic uncertainty relation under phase decoherence |
| publisher |
Nature Publishing Group |
| series |
Scientific Reports |
| issn |
2045-2322 |
| publishDate |
2021-06-01 |
| description |
Abstract We formulate the tripartite entropic uncertainty relation and predict its lower bound in a three-qubit Heisenberg XXZ spin chain when measuring an arbitrary pair of incompatible observables on one qubit while the other two are served as quantum memories. Our study reveals that the entanglement between the nearest neighbors plays an important role in reducing the uncertainty in measurement outcomes. In addition we have shown that the Dolatkhah’s lower bound (Phys Rev A 102(5):052227, 2020) is tighter than that of Ming (Phys Rev A 102(01):012206, 2020) and their dynamics under phase decoherence depends on the choice of the observable pair. In the absence of phase decoherence, Ming’s lower bound is time-invariant regardless the chosen observable pair, while Dolatkhah’s lower bound is perfectly identical with the tripartite uncertainty with a specific choice of pair. |
| url |
https://doi.org/10.1038/s41598-021-90689-3 |
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