Necessary Condition for Local Distinguishability of Maximally Entangled States: Beyond Orthogonality Preservation

Abstract

The (im)possibility of local distinguishability of orthogonal multipartite quantum states still remains an intriguing question. Beyond C33, the problem remains unsolved even for maximally entangled states (MES). So far, the only known condition for the local distinguishability of states is the well-known orthogonality preservation (OP). Using an upper bound on the locally accessible information for bipartite states, we derive a very simple necessary condition for any set of pairwise orthogonal MES in Cd Cd to be perfectly locally distinguishable. This condition is seen to be stronger than the OP condition. This is particularly so for any set of d number of pairwise orthogonal MES in Cd Cd. When testing this condition for the local distinguishability of all sets of four generalized Bell states in C4 C4, we find that it is not only necessary but also sufficient to determine their local distinguishability. This demonstrates that the aforementioned upper-bound may play a significant role in the general scenario of local distinguishability of bipartite states.