Length filtration of the separable states

Abstract

We investigate the separable states of an arbitrary multipartite quantum system with Hilbert space of dimensionin d. The length L() of is defined as the smallest number of pure product states having as their mixture. The length filtration of the set of separable states, , is the increasing chain ⊂'1⊂eq'2⊂eq·s, where 'i=\∈:L() i\. We define the maximum length, L max=∈ L(), critical length, L crit, and yet another special length, Lc, which was defined by a simple formula in one of our previous papers. The critical length indicates the first term in the length filtrartion whose dimension is equal to . We show that in general d Lc L crit L max d2. We conjecture that the equality L crit=Lc holds for all finite-dimensional multipartite quantum systems. Our main result is that L crit=Lc for the bipartite systems having a single qubit as one of the parties. This is accomplished by computing the rank of the Jacobian matrix of a suitable map having as its range.