On the P-representable subset of all bipartite Gaussian separable states
arXiv:quant-ph/0401056 · doi:10.1103/PhysRevA.70.034303
Abstract
P-representability is a necessary and sufficient condition for separability of bipartite Gaussian states only for the special subset of states whose covariance matrix are $Sp(2,R)\otimes Sp(2,R)$ locally invariant. Although this special class of states can be reached by a convenient $Sp(2,R)\otimes Sp(2,R)$ transformation over an arbitrary covariance matrix, it represents a loss of generality, avoiding inference of many general aspects of separability of bipartite Gaussian states.
Final version with new results added. Slightly more detailed than the accepted manuscript (to appear in Phys. Rev. A)