Rational-Valued, Small-Prime-Based Qubit-Qutrit and Rebit-Retrit Rank-4/Rank-6 Conjectured Hilbert-Schmidt Separability Probability Ratios

Abstract

We implement a procedure-based on the Wishart-Laguerre distribution-recently outlined by \.Zyczkowski and Khvedelidze, Rogojin and Abgaryan, for the generation of random (complex or real) N × N density matrices of rank k ≤ N with respect to Hilbert-Schmidt (HS) measure. In the complex case, one commences with a Ginibre matrix A of dimensions k × k+ 2 (N-k), while for a real scenario, one employs a Ginibre matrix B of dimensions k × k+1+ 2 (N-k). Then, the k × k product A A or B BT is diagonalized-padded with zeros to size N × N-and rotated, obtaining a random density matrix. Implementing the procedure for rank-4 rebit-retrit states, for 800 million Ginibre-matrix realizations, 6,192,047 were found separable, for a sample probability of .00774006-suggestive of an exact value 3875000 =32 · 4323 · 54=.0774. A conjecture for the HS separability probability of rebit-retrit systems of full rank is 8606561 =22 · 5 · 4338 ≈ 0.1310775 (the two-rebit counterpart has been proven to be 2964=2926). Subject to these conjectures, the ratio of the rank-4 to rank-6 probabilities would be 590491000000=31026 · 56 ≈ 0.059049, with the common factor 43 cancelling. As to the intermediate rank-5 probability, a 2006 theorem of Szarek, Bengtsson and \.Zycskowski informs us that it must be one-half the rank-6 probability-itself conjectured to be 271000 =3323 · 53, while for rank 3 or less, the associated probabilities must be 0 by a 2009 result of Ruskai and Werner. We are led to re-examine a 2005 qubit-qutrit analysis of ours, in these regards, and now find evidence for a 702673=2 · 5 · 7 35 · 11 ≈ 0.0261878 rank-4 to rank-6 probability ratio.