Formulas for Rational-Valued Separability Probabilities of Random Induced Generalized Two-Qubit States

Abstract

Previously, a formula, incorporating a 5F4 hypergeometric function, for the Hilbert-Schmidt-averaged determinantal moments PT n k / k of 4 × 4 density-matrices (), and their partial transposes (PT|) was applied with k=0 to the generalized two-qubit separability-probability question. The formula can, further, be viewed we note here, as an averaging over "induced measures in the space of mixed quantum states". The associated induced-measure separability probabilities (k =1, 2,…) are found-- via a high-precision density approximation procedure--to assume interesting, relatively simple rational values in the two-re[al]bit (α = 12), (standard) two-qubit (α = 1) and two-quater[nionic]bit (α =2) cases. We deduce rather simple companion (rebit, qubit, quaterbit,…) formulas that successfully reproduce the rational values assumed for general k. These formulas are observed to share certain features, possibly allowing them to be incorporated into a single master formula.