Strong nonlocal sets of UPB

Abstract

The unextendible product bases (UPBs) are interesting members from the family of orthogonal product states. In this paper, we investigate the construction of 3-qubit UPB with strong nonlocality of different sizes. First, a UPB set in C3 C3 C3 of size 12 is presented based on the Shifts UPB, the structure of which is described by mapping the system to a 3× 3× 3 Rubik's Cube. After observing the orthogonal graph of each qubit, we provide a general method of constructing UPB in Cd Cd Cd of size ( d-1 )3+3( d-2 )+1. Second, for the more general case where the dimensions of qubits are different, we extend the tile structure to 3-qubit system and propose a Tri-tile structure for 3-qubit UPB. Then, by means of this structure, a C4 C4 C5 system of size 30 is obtained based on a C3 C3 C4 system. Similarly, we generalize this approach to Cd1 Cd2 Cd3 system which has a similar composition to Cd Cd Cd. Our research provides a positive answer to the open questions raised in [Halder, et al., PRL, 122, 040403 (2019)], indicating that there do exist multi-qubit UPBs that can exhibit strong quantum nonlocality without entanglement.

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