A reduction of the separability problem to SPC states in the filter normal form

Abstract

It was recently suggested that a solution to the separability problem for states that remain positive under partial transpose composed with realignment (the so-called symmetric with positive coefficients states or simply SPC states) could shed light on entanglement in general. Here we show that such a solution would solve the problem completely. Given a state in Mkm, we build a SPC state in Mk+mk+m with the same Schmidt number. It is known that this type of state can be put in the filter normal form retaining its type. A solution to the separability problem in Mkm could be obtained by solving the same problem for SPC states in the filter normal form within Mk+mk+m. This SPC state can be built arbitrarily close to the projection on the symmetric subspace of Ck+mk+m. All the information required to understand entanglement in Mst (s+t≤ k+m) lies inside an arbitrarily small ball around that projection. We also show that the Schmidt number of any state γ∈Mnn which commutes with the flip operator and lies inside a small ball around that projection cannot exceed n2.