Two-Qubit Separability Probabilities as Joint Functions of the Bloch Radii of the Qubit Subsystems

Abstract

We detect a certain pattern of behavior of separability probabilities p(rA,rB) for two-qubit systems endowed with Hilbert-Schmidt, and more generally, random induced measures, where rA and rB are the Bloch radii (0 ≤ rA,rB ≤ 1) of the qubit reduced states (A,B). We observe a relative repulsion of radii effect, that is p(rA,rA) < p(rA,1-rA), except for rather narrow "crossover" intervals [rA,12]. Among the seven specific cases we study are, firstly, the "toy" seven-dimensional X-states model and, then, the fifteen-dimensional two-qubit states obtained by tracing over the pure states in 4 × K-dimensions, for K=3, 4, 5, with K=4 corresponding to Hilbert-Schmidt (flat/Euclidean) measure. We also examine the real (two-rebit) K=4, the X-states K=5, and Bures (minimal monotone)--for which no nontrivial crossover behavior is observed--instances. In the two X-states cases, we derive analytical results, for K=3, 4, we propose formulas that well-fit our numerical results, and for the other scenarios, rely presently upon large numerical analyses. The separability probability crossover regions found expand in length (lower rA) as K increases. This report continues our efforts (arXiv:1506.08739) to extend the recent work of Milz and Strunz (J. Phys. A: 48 [2015] 035306) from a univariate (rA) framework---in which they found separability probabilities to hold constant with rA---to a bivariate (rA,rB) one. We also analyze the two-qutrit and qubit-qutrit counterparts reported in arXiv:1512.07210 in this context, and study two-qubit separability probabilities of the form p(rA,12).