2009
DOI: 10.1103/revmodphys.81.1727
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Colloquium: The Einstein-Podolsky-Rosen paradox: From concepts to applications

Abstract: This Colloquium examines the field of the Einstein, Podolsky, and Rosen ͑EPR͒ gedanken experiment, from the original paper of Einstein, Podolsky, and Rosen, through to modern theoretical proposals of how to realize both the continuous-variable and discrete versions of the EPR paradox. The relationship with entanglement and Bell's theorem are analyzed, and the progress to date towards experimental confirmation of the EPR paradox is summarized, with a detailed treatment of the continuous-variable paradox in lase… Show more

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Cited by 649 publications
(768 citation statements)
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“…Since the off-diagonal elements of the position operatorx = √ C(â +â † ) in the number basis are real we have Γ[X] = X. In contrast, the off-diagonal elements of the momentum operatorp = √ C(â −â † )/i in the number basis are pure imaginary, and we thus have 2 , we can estimate the left-hand side of Eq. (8) as …”
Section: Separable Conditions With the Epr-like Uncertaintiesmentioning
confidence: 99%
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“…Since the off-diagonal elements of the position operatorx = √ C(â +â † ) in the number basis are real we have Γ[X] = X. In contrast, the off-diagonal elements of the momentum operatorp = √ C(â −â † )/i in the number basis are pure imaginary, and we thus have 2 , we can estimate the left-hand side of Eq. (8) as …”
Section: Separable Conditions With the Epr-like Uncertaintiesmentioning
confidence: 99%
“…This type of seeming inconsistency between the quantum correlation and the canonical uncertainty relation is often termed as the EPR paradox and has been providing insightful aspects on foundations of quantum physics and theory of entanglement [2][3][4][5]. The EPR-type correlation is normally described by the variances of the EPR-type operatorsx A −x B and p A +p B , and the measured uncertainties can be a signature of quantum entanglement.…”
Section: Introductionmentioning
confidence: 99%
“…This is how it is a generalization. Form (29) of expansion in a subsystem basis is relevant for Schrödinger's steering discussed in detail in §6.3 below.…”
Section: Correlated Schmidt Decompositionmentioning
confidence: 99%
“…(iv) Remark 6 and relation (29) below open the way for a more fruitful application of (1), particularly for Schrödinger's important concept of steering (cf §6.3).…”
Section: Expansion In a Subsystem Basismentioning
confidence: 99%
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