Volumes of conditioned bipartite state spaces

Abstract

We analyse the metric properties of conditioned quantum state spaces M(n× m)η. These spaces are the convex sets of nm × nm density matrices that, when partially traced over m degrees of freedom, respectively yield the given n× n density matrix η. For the case n=2, the volume of M(2× m)η equipped with the Hilbert-Schmidt measure is a simple polynomial of the radius of η in the Bloch-Ball. Remarkably, the probability psep(2× m)(η) to find a separable state in M(2× m)η is independent of η (except for η pure). Both these results are proven analytically for the case of the family of 4× 4 X-states, and thoroughly numerically investigated for the general case. The important implications of these results for the clarification of open problems in quantum theory are pointed out and discussed.