X-states from a finite geometric perspective
| Affiliation auteurs | Affiliation ok |
| Titre | X-states from a finite geometric perspective |
| Type de publication | Journal Article |
| Year of Publication | 2021 |
| Auteurs | Kelleher C, Holweck F, Levay P, Saniga M |
| Journal | RESULTS IN PHYSICS |
| Volume | 22 |
| Pagination | 103859 |
| Date Published | MAR |
| Type of Article | Article |
| ISSN | 2211-3797 |
| Mots-clés | entanglement, Non-locality, Point-line geometry, Symplectic polar space, Two-qubit operators, X-states |
| Résumé | It is found that 15 different types of two-qubit X-states split naturally into two sets (of cardinality 9 and 6) once their entanglement properties are taken into account. We characterize both the validity and entangled nature of the X-states with maximally-mixed subsystems in terms of certain parameters and show that their properties are related to a special class of geometric hyperplanes of the symplectic polar space of order two and rank two. Finally, we introduce the concept of hyperplane-states and briefly address their non-local properties. |
| DOI | 10.1016/j.rinp.2021.103859 |