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Revealing Quantum Secrets: Separability, Symmetries & Geometry in Entanglement

Delve into the world of quantum entanglement, symmetries, and geometry to understand separable and entangled states. Learn about matrix form symmetries, new parameters, and measures of entanglement. Explore how physical symmetries and geometrical interpretations shed light on entanglement phenomena. Discover the significance of distances, phase space, and negativity in characterizing quantum states. Unravel the complexities of multipartite systems and distinguish between entangled and separable states visually. This discourse offers insights into the fascinating realm of quantum information theory.

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Revealing Quantum Secrets: Separability, Symmetries & Geometry in Entanglement

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  1. Separability and entanglement: what symmetries and geometry can say Helena Braga, Simone Souza and Salomon S. Mizrahi Departamento de Física, CCET, Universidade Federal de São Carlos 11th ICSSUR/ 4th Feynman Festival , June 22- 26 2009, Palacký University, Olomouc– Czech Republic

  2. Introduction • Polarization vector, correlation matrix • Peres-Horodecki criterion • New parameters and symmetries • Phase space: entangled-like and separable-like regions • Distance, concurrence and negativity • Examples • Conclusions

  3. Paradigm of entanglement: the two-qubit system Bohm, two spin-1/2 particles: 1952 Lee and Yang, intrinsic parity Phys. Rev. 104, 822 (1956)

  4. General multipartite state Multipartite state up to 2nd order correlation: 4 X 4 matrix (15 parameters)

  5. In matrix form

  6. Separability

  7. Transposition and Peres-Horodecki criterion Reduction to seven parameters and the X-from

  8. Additional symmetries related to the eigenvalues of the transposed matrix The eigenvalues of the TM can be obtained from the original state by choosing six among different local reflections

  9. Introducing new parameters Eigenvalues of the original matrix Cond. of pos.

  10. Do the same with the transposed or locally reflected matrix According to PHC if both ‘distances’ of the locally reflected matrix are positive the state is separable otherwise it is entangled Define ‘phase spaces’: X X = 0 and = 0 define conic surfaces

  11. Phase space can be divided in two regions, one for the entangled-like states and the other for the separable-like Systems having the X-form are met in the literarature,

  12. Peres, PRL 77, 1413 (1996) • Horodeckis, PLA 223, 1 (1996) R.F. Werner, PRA 40, 4277 (1989) Peres-Horod state Werner state

  13. N. Gisin, Phys. Lett. A 210, 151 (1996)

  14. M.P. Almeida et al., Science 316, 579(2007) Experimental work, entangled photon polarization and simulating dynamical evolution

  15. S. Das and G.S. Agarwal, arXiv:0901.2114v2 [quant-ph] 20 May 2009

  16. Comparisons between entanglements measures 1. concurrence, 2. Vidal-Werner negativity 3. distance-negativity

  17. Peres, PRL 77, 1413 (1996) • Horodeckis, PLA 223, 1 (1996)

  18. R.F. Werner, PRA 40, 4277 (1989)

  19. N. Gisin, Phys. Lett. A 210, 151 (1996)

  20. M.P.Almeida et al., Science 316, 579(2007)

  21. S. Das and G.S. Agarwal, arXiv:0901.2114v2 [quant-ph] 20 May 2009

  22. Conclusions • Matrix form symmetries imply physical symmetries when expressed in terms of meaningful physical quantities. • Defining new parameters, a phase space and distances, the PHC acquires a geometrical meaning: one can follow the trajectories of states and to discern graphically between entangled and separable states. • The negative of squared distance (the distance negativity) can be used as a measure of entanglement, which is comparable to other measures.

  23. Thank you!

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