Dyson Indices and Hilbert-Schmidt Separability Functions and Probabilities

Abstract

A confluence of numerical and theoretical results leads us to conjecture that the Hilbert-Schmidt separability probabilities of the 15- and 9-dimensional convex sets of complex and real two-qubit states (representable by 4 x 4 density matrices rho) are 8/33 and 8/17, respectively. Central to our reasoning are the modifications of two ansatze, recently advanced (quant-ph/0609006), involving incomplete beta functions Bnu(a,b), where nu= (rho11 rho44)/(rho22 rho33). We, now, set the separability function Sreal(nu) propto Bnu(nu,1/2,2) =(2/3) (3-nu) sqrtnu. Then, in the complex case -- conforming to a pattern we find, manifesting the Dyson indices (1, 2, 4) of random matrix theory-- we take Scomplex(nu) propto Sreal2 (nu). We also investigate the real and complex qubit-qutrit cases. Now, there are two Bloore ratio variables, nu1= (rho11 rho55)(rho22 rho44), nu2= (rho22 rho66)(rho33 rho55), but they appear to remarkably coalesce into the product, eta = nu1 nu2 = rho11 6633 44, so that the real and complex separability functions are again univariate in nature.