Hardy's paradox for high-dimensional systems

Jing-Ling Chen, Adán Cabello, Zhen-Peng Xu, Hong-Yi Su, Chunfeng Wu, and L. C. Kwek

Phys. Rev. A 88, 062116 – Published 30 December 2013

Abstract

Hardy's proof is considered the simplest proof of nonlocality. Here we introduce an equally simple proof that (i) has Hardy's as a particular case, (ii) shows that the probability of nonlocal events grows with the dimension of the local systems, and (iii) is always equivalent to the violation of a tight Bell inequality. Our proof has all the features of Hardy's and adds the only ingredient of the Einstein-Podolsky-Rosen scenario missing in Hardy's proof: It applies to measurements with an arbitrarily large number of outcomes.

Received 22 August 2013

DOI:https://doi.org/10.1103/PhysRevA.88.062116

Authors & Affiliations

Jing-Ling Chen^1,2,*, Adán Cabello^3,†, Zhen-Peng Xu¹, Hong-Yi Su¹, Chunfeng Wu⁴, and L. C. Kwek^2,5,‡

¹Theoretical Physics Division, Chern Institute of Mathematics, Nankai University, Tianjin 300071, People's Republic of China
²Centre for Quantum Technologies, National University of Singapore, 3 Science Drive 2, Singapore 117543
³Departamento de Física Aplicada II, Universidad de Sevilla, E-41012 Sevilla, Spain
⁴Pillar of Engineering Product Development, Singapore University of Technology and Design, 20 Dover Drive, Singapore 138682
⁵National Institute of Education and Institute of Advanced Studies, Nanyang Technological University, 1 Nanyang Walk, Singapore 637616

^*chenjl@nankai.edu.cn
^†adan@us.es
^‡cqtklc@nus.edu.sg

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Issue

Vol. 88, Iss. 6 — December 2013

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