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QI: Fachverband Quanteninformation

QI 5: Entanglement Theory

QI 5.3: Talk

Monday, March 18, 2024, 15:45–16:00, HFT-FT 101

Concurrence of entangled states in d× d dimensions with relaxed axisymmetry — •Juan Arnaudas¹ and Jens Siewert^2,3 — ¹BCAM - Basque Center for Applied Mathematics, E-48009 Bilbao, Spain — ²University of the Basque Country UPV/EHU, E-48080 Bilbao, Spain — ³Ikerbasque, Basque Foundation for Science, E-48013 Bilbao, Spain

Families of highly symmetric states are an interesting playground for entanglement theory, because sometimes an exact solution to the entanglement problem is possible for them. This way they reveal the structure of the space of entangled states and may serve as a benchmark for other methods, e.g., for entanglement witnesses. An interesting example of such a family are the bipartite states with relaxed axisymmetry, in particular, because a fraction of them are entangled with a positive partial transpose (PPT). For a facet of this family the separability problem could be solved for any finite dimension d [1], and for d=3 a numerically exact solution for the concurrence was presented [2], thereby exactly quantifying also the PPT entanglement. In this work we explore the possibility of analytically proving the d=3 result and to extend it to higher dimensions.
[1] M. Seelbach Benkner et al., Phys. Rev. A 106, 022415 (2022).
[2] G. Sentís et al., Phys. Rev. A 94, 020302(R) (2016).

Keywords: bipartite entanglement; positive partial transpose; entanglement measures