Strongest nonlocal sets with minimum cardinality in tripartite systems

Abstract

Strong nonlocality, proposed by Halder et al. [https://doi.org/10.1103/PhysRevLett.122.040403Phys. Rev. Lett. 122, 040403 (2019)], is a stronger manifestation than quantum nonlocality. Subsequently, Shi et al. presented the concept of the strongest nonlocality [https://doi.org/10.22331/q-2022-01-05-619Quantum 6, 619 (2022)]. Recently, Li and Wang [https://doi.org/10.22331/q-2023-09-07-1101Quantum 7, 1101 (2023)] posed the conjecture about a lower bound to the cardinality of the strongest nonlocal set S in i=1nCdi, i.e., |S|≤ i\Πj=1ndj/di+1\. In this work, we construct the strongest nonlocal set of size d2+1 in Cd Cd Cd. Furthermore, we obtain the strongest nonlocal set of size d2d3+1 in Cd1 Cd2 Cd3. Our construction reaches the lower bound, which provides an affirmative solution to Li and Wang's conjecture. In particular, the strongest nonlocal sets we present here contain the least number of orthogonal states among the available results.

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