Strong quantum nonlocality for multipartite entangled states

Abstract

Recently, Halder et al. [S. Halder et al., Phys. Rev. Lett. 122, 040403 (2019)] present two sets of strong nonlocality of orthogonal product states based on the local irreducibility. However, for a set of locally indistinguishable orthogonal entangled states, the remaining question is whether the states can reveal strong quantum nonlocality. Here we present a general definition of strong quantum nonlocality based on the local indistinguishability. Then, in 2 2 2 quantum system, we show that a set of orthogonal entangled states is locally reducible but locally indistinguishable in all bipartitions, which means the states have strong nonlocality. Furthermore, we generalize the result in N-qubit quantum system, where N≥slant 3. Finally, we also construct a class of strong nonlocality of entangled states in d d ·s d, d≥slant 3. Our results extend the phenomenon of strong nonlocality for entangled states.