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Title: Violating Bell inequalities maximally for two d-dimensional systems
Authors: Chen, Jing-Ling
Wu, Chunfeng
Kwek, Leong Chuan
Oh, Choo Hiap
Ge, Mo-Lin
Issue Date: 2006
Publisher: American Physical Society
Citation: Chen, J. L., Wu, C., Kwek, L. C., Oh, C. H., & Ge, M. L. (2006). Violating Bell inequalities maximally for two d-dimensional systems. Physical Review A, 74(3), 032106.
Abstract: We show the maximal violation of Bell inequalities for two d-dimensional systems by using the method of the Bell operator. The maximal violation corresponds to the maximal eigenvalue of the Bell operator matrix. The eigenvectors corresponding to these eigenvalues are described by asymmetric entangled states. We estimate the maximum value of the eigenvalue for large dimension. A family of elegant entangled states app that violate Bell inequality more strongly than the maximally entangled state but are somewhat close to these eigenvectors is presented. These approximate states can potentially be useful for quantum cryptography as well as many other important fields of quantum information.
ISSN: 1050-2947
Other Identifiers: 10.1103/PhysRevA.74.032106
Appears in Collections:Journal Articles

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