English

Realigned Hardy's Paradox

Quantum Physics 2022-11-28 v1

Abstract

Hardy's paradox provides an all-versus-nothing fashion to directly certify that quantum mechanics cannot be completely described by local realistic theory. However, when considering potential imperfections in experiments, like imperfect entanglement source and low detection efficiency, the original Hardy's paradox may induce a rather small Hardy violation and only be realized by expensive quantum systems. To overcome this problem, we propose a realigned Hardy's paradox. Compared with the original version of Hardy's paradox, the realigned Hardy's paradox can dramatically improve the Hardy violation. Then, we generalize the realigned Hardy's paradox to arbitrary even nn dichotomic measurements. For n=2n=2 and n=4n=4 cases, the realigned Hardy's paradox can achieve Hardy values P(00A1B1)P(00|A_1B_1) approximate 0.41400.4140 and 0.77340.7734 respectively compared with 0.090.09 of the original Hardy's paradox. Meanwhile, the structure of the realigned Hardy's paradox is simpler and more robust in the sense that there is only one Hardy condition rather than three conditions. One can anticipate that the realigned Hardy's paradox can tolerate more experimental imperfections and stimulate more fascinating quantum information applications.

Keywords

Cite

@article{arxiv.2211.13642,
  title  = {Realigned Hardy's Paradox},
  author = {Shuai Zhao and Qing Zhou and Si-Ran Zhao and Xin-Yu Xu and Wen-Zhao Liu and Li Li and Nai-Le Liu and Qiang Zhang and Jing-Ling Chen and Kai Chen},
  journal= {arXiv preprint arXiv:2211.13642},
  year   = {2022}
}

Comments

7 pages, 1 figure

R2 v1 2026-06-28T07:11:38.206Z