Physics – Quantum Physics
Scientific paper
2009-09-25
Physics
Quantum Physics
10 pages, 6 figures
Scientific paper
We seek to derive the probability--expressed in terms of the Hilbert-Schmidt (Euclidean or flat) metric--that a generic (nine-dimensional) real two-qubit system is separable, by implementing the well-known Peres-Horodecki test on the partial transposes (PTs) of the associated 4 x 4 density matrices. But the full implementation of the test--requiring that the determinant of the PT be nonnegative for separability to hold--appears to be, at least presently, computationally intractable. So, we have previously implemented--using the auxiliary concept of a diagonal-entry-parameterized separability function (DESF)--the weaker implied test of nonnegativity of the six 2 x 2 principal minors of the PT. This yielded an exact upper bound on the separability probability of 1024/(135 Pi^2) = 0.76854. Here, we extend this line of work by requiring that the four 3 x 3 principal minors of the PT be nonnegative, giving us an improved/reduced upper bound of 22/35 = 0.628571. Numerical simulations--as opposed to exact symbolic calculations--indicate, on the other hand, that the true probability is certainly less than 1/2. Our combined analyses lead us to suggest a possible form for the true DESF, yielding a separability probability of 29/64 = 0.453125, while the best exact lower bound established so far is (6928-2205 Pi)/2^(9/2) = 0.0348338.
Slater Paul B.
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