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Bell test experiments or Bell's inequality experiments are designed to demonstrate the real world existence of certain theoretical consequences of the phenomenon of entanglement in quantum mechanics which could not possibly occur according to a classical picture of the world, characterised by the notion of local realism. Under local realism, correlations between outcomes of different measurements performed on separated physical systems have to satisfy certain constraints, called Bell inequalities. John Bell derived the first inequality of this kind in his paper "On the Einstein-Podolsky-Rosen Paradox".[1] Bell's Theorem states that the predictions of quantum mechanics cannot be reproduced by any local hidden variable theory.

The term "Bell inequality" can mean any one of a number of inequalities satisfied by local hidden variables theories; in practice, in present day experiments, most often the CHSH; earlier the CH74 inequality. All these inequalities, like the original inequality of Bell, by assuming local realism, place restrictions on the statistical results of experiments on sets of particles that have taken part in an interaction and then separated. A Bell test experiment is one designed to test whether or not the real world satisfies local realism.

Conduct of optical Bell test experiments

In practice most actual experiments have used light, assumed to be emitted in the form of particle-like photons (produced by atomic cascade or spontaneous parametric down conversion), rather than the atoms that Bell originally had in mind. The property of interest is, in the best known experiments, the polarisation direction, though other properties can be used. Such experiments fall into two classes, depending on whether the analysers used have one or two output channels.

A typical CHSH (two-channel) experiment


Scheme of a "two-channel" Bell test
The source S produces pairs of "photons", sent in opposite directions. Each photon encounters a two-channel polariser whose orientation can be set by the experimenter. Emerging signals from each channel are detected and coincidences counted by the coincidence monitor CM.

The diagram shows a typical optical experiment of the two-channel kind for which Alain Aspect set a precedent in 1982.[2] Coincidences (simultaneous detections) are recorded, the results being categorised as '++', '+−', '−+' or '−−' and corresponding counts accumulated.

Four separate subexperiments are conducted, corresponding to the four terms E(a, b) in the test statistic S (equation (2) shown below). The settings a, a′, b and b′ are generally in practice chosen to be 0, 45°, 22.5° and 67.5° respectively — the "Bell test angles" — these being the ones for which the quantum mechanical formula gives the greatest violation of the inequality.

For each selected value of a and b, the numbers of coincidences in each category (N++, N--, N+- and N-+) are recorded. The experimental estimate for E(a, b) is then calculated as:

(1)        E = (N++ + N--N+-N-+)/(N++ + N-- + N+- + N-+).

Once all four E’s have been estimated, an experimental estimate of the test statistic

(2)        S = E(a, b) − E(a, b′) + E(a′, b) + E(a′, b′)

can be found. If S is numerically greater than 2 it has infringed the CHSH inequality. The experiment is declared to have supported the QM prediction and ruled out all local hidden variable theories.

A strong assumption has had to be made, however, to justify use of expression (2). It has been assumed that the sample of detected pairs is representative of the pairs emitted by the source. That this assumption may not be true comprises the fair sampling loophole.

The derivation of the inequality is given in the CHSH Bell test page.


A typical CH74 (single-channel) experiment
Setup for a "single-channel" Bell test
The source S produces pairs of "photons", sent in opposite directions. Each photon encounters a single channel (e.g. "pile of plates") polariser whose orientation can be set by the experimenter. Emerging signals are detected and coincidences counted by the coincidence monitor CM.In a later 1974 article, Clauser and Horne replaced this assumption by a much weaker, "no enhancement" assumption, deriving a modified inequality, see the page on Clauser and Horne's 1974 Bell test.[4]

Prior to 1982 all actual Bell tests used "single-channel" polarisers and variations on an inequality designed for this setup. The latter is described in Clauser, Horne, Shimony and Holt's much-cited 1969 article as being the one suitable for practical use.[3] As with the CHSH test, there are four subexperiments in which each polariser takes one of two possible settings, but in addition there are other subexperiments in which one or other polariser or both are absent. Counts are taken as before and used to estimate the test statistic.

(3)        S = (N(a, b) − N(a, b′) + N(a′, b) + N(a′, b′) − N(a′, ∞) − N(∞, b)) / N(∞, ∞),

where the symbol ∞ indicates absence of a polariser.

If S exceeds 0 then the experiment is declared to have infringed Bell's inequality and hence to have "refuted local realism". In order to derive (3), CHSH in their 1969 paper had to make an extra assumption, the so-called "fair sampling" assumption. This means that the probability of detection of a given photon, once it has passed the polarizer, is independent of the polarizer setting (including the 'absence' setting). If this assumption were violated, then in principle an LHV model could violate the CHSH inequality.

In a later 1974 article, Clauser and Horne replaced this assumption by a much weaker, "no enhancement" assumption, deriving a modified inequality, see the page on Clauser and Horne's 1974 Bell test.[4]


Experimental assumptions

In addition to the theoretical assumptions made, there are practical ones. There may, for example, be a number of "accidental coincidences" in addition to those of interest. It is assumed that no bias is introduced by subtracting their estimated number before calculating S, but that this is true is not considered by some to be obvious. There may be synchronisation problems — ambiguity in recognising pairs due to the fact that in practice they will not be detected at exactly the same time.

Nevertheless, despite all these deficiencies of the actual experiments, one striking fact emerges: the results are, to a very good approximation, what quantum mechanics predicts. If imperfect experiments give us such excellent overlap with quantum predictions, most working quantum physicists would agree with John Bell in expecting that, when a perfect Bell test is done, the Bell inequalities will still be violated. This attitude has led to the emergence of a new sub-field of physics which is now known as quantum information theory. One of the main achievements of this new branch of physics is showing that violation of Bell's inequalities leads to the possibility of a secure information transfer, which utilizes the so-called quantum cryptography (involving entangled states of pairs of particles).

Notable experiments

Over the past thirty or so years, a great number of Bell test experiments have now been conducted. These experiments are subject to assumptions, in particular the ‘no enhancement’ hypothesis of Clauser and Horne (above). The experiments are commonly interpreted to rule out local hidden variable theories, though so far no experiment has been performed which is not subject to either the locality loophole or the detection loophole. An experiment free of the locality loophole is one where for each separate measurement and in each wing of the experiment, a new setting is chosen and the measurement completed before signals could communicate the settings from one wing of the experiment to the other. An experiment free of the detection loophole is one where close to 100% of the successful measurement outcomes in one wing of the experiment are paired with a successful measurement in the other wing. This percentage is called the efficiency of the experiment. Advancements in technology have led to significant improvement in efficiencies, as well as a greater variety of methods to test the Bell Theorem. The challenge is to combine high efficiency with rapid generation of measurement settings and completion of measurements.

Some of the best known:
Freedman and Clauser, 1972

This was the first actual Bell test, using Freedman's inequality, a variant on the CH74 inequality.[5]
Aspect, 1981-2

Alain Aspect and his team at Orsay, Paris, conducted three Bell tests using calcium cascade sources. The first and last used the CH74 inequality. The second was the first application of the CHSH inequality. The third (and most famous) was arranged such that the choice between the two settings on each side was made during the flight of the photons (as originally suggested by John Bell).[6][7]
Tittel and the Geneva group, 1998

The Geneva 1998 Bell test experiments showed that distance did not destroy the "entanglement". Light was sent in fibre optic cables over distances of several kilometers before it was analysed. As with almost all Bell tests since about 1985, a "parametric down-conversion" (PDC) source was used.[8][9]
Weihs' experiment under "strict Einstein locality" conditions

In 1998 Gregor Weihs and a team at Innsbruck, led by Anton Zeilinger, conducted an ingenious experiment that closed the "locality" loophole, improving on Aspect's of 1982. The choice of detector was made using a quantum process to ensure that it was random. This test violated the CHSH inequality by over 30 standard deviations, the coincidence curves agreeing with those predicted by quantum theory.[10]
Pan et al.'s (2000) experiment on the GHZ state

This is the first of new Bell-type experiments on more than two particles; this one uses the so-called GHZ state of three particles.[11]
Rowe et al. (2001) are the first to close the detection loophole

The detection loophole was first closed in an experiment with two entangled trapped ions, carried out in the ion storage group of David Wineland at the National Institute of Standards and Technology in Boulder. The experiment had detection efficiencies well over 90%.[12]
Gröblacher et al. (2007) test of Leggett-type non-local realist theories

A specific class of non-local theories suggested by Anthony Leggett is ruled out. Based on this, the authors conclude that any possible non-local hidden variable theory consistent with quantum mechanics must be highly counterintuitive.[13][14]
Salart et al. (2008) Separation in a Bell Test

This experiment filled a loophole by providing an 18 km separation between detectors, which is sufficient to allow the completion of the quantum state measurements before any information could have traveled between the two detectors.[15][16]
Ansmann et al. (2009) Overcoming the detection loophole in solid state

This was the first experiment testing Bell inequalities with solid-state qubits (superconducting Josephson phase qubits were used). This experiment surmounted the detection loophole using a pair of superconducting qubits in an entangled state. However, the experiment still suffered from the locality loophole because the qubits were only separated by a few millimeters.[17]
Giustina et al. (2013) Overcoming the detection loophole for photons

The detection loophole for photons has been closed for the first time in a group by Anton Zeilinger, using highly efficient detectors. This makes photons the first system for which all of the main loopholes have been closed, albeit in different experiments. [18]
Loopholes
Main article: Loopholes in Bell test experiments

Though the series of increasingly sophisticated Bell test experiments has convinced the physics community in general that local realism is untenable, it remains true that the outcome of every single experiment done so far that violates a Bell inequality can still theoretically be explained by local realism, by exploiting the detection loophole and/or the locality loophole. The locality (or communication) loophole means that since in actual practice the two detections are separated by a time-like interval, the first detection may influence the second by some kind of signal. To avoid this loophole, the experimenter has to ensure that particles travel far apart before being measured, and that the measurement process is rapid. More serious is the detection (or unfair sampling) loophole, due to the fact that particles are not always detected in both wings of the experiment. It can be imagined that the complete set of particles would behave randomly, but instruments only detect a subsample showing quantum correlations, by letting detection be dependent on a combination of local hidden variables and detector setting. Experimenters have repeatedly stated that loophole-free tests can be expected in the near future.[19] On the other hand, some researchers point out the logical possibility that quantum physics itself prevents a loophole-free test from ever being implemented.[20][21]
See also

Determinism – Quantum world
Quantum indeterminacy

References

J.S. Bell (1964), Physics 1: 195–200 Missing or empty |title= (help)
Alain Aspect, Philippe Grangier, Gérard Roger (1982), "Experimental Realization of Einstein-Podolsky-Rosen-Bohm Gedankenexperiment: A New Violation of Bell's Inequalities", Phys. Rev. Lett. 49 (2): 91–4, Bibcode:1982PhRvL..49...91A, doi:10.1103/PhysRevLett.49.91
J.F. Clauser, M.A. Horne, A. Shimony, R.A. Holt (1969), "Proposed experiment to test local hidden-variable theories", Phys. Rev. Lett. 23 (15): 880–4, Bibcode:1969PhRvL..23..880C, doi:10.1103/PhysRevLett.23.880
J.F. Clauser, M.A. Horne (1974), "Experimental consequences of objective local theories", Phys. Rev. D 10 (2): 526–35, Bibcode:1974PhRvD..10..526C, doi:10.1103/PhysRevD.10.526
S.J. Freedman, J.F. Clauser (1972), "Experimental test of local hidden-variable theories", Phys. Rev. Lett. 28 (938), Bibcode:1972PhRvL..28..938F, doi:10.1103/PhysRevLett.28.938
Alain Aspect, Philippe Grangier, Gérard Roger (1981), "Experimental Tests of Realistic Local Theories via Bell's Theorem", Phys. Rev. Lett. 47 (7): 460–3, Bibcode:1981PhRvL..47..460A, doi:10.1103/PhysRevLett.47.460
Alain Aspect, Jean Dalibard, Gérard Roger (1982), "Experimental Test of Bell's Inequalities Using Time-Varying Analyzers", Phys. Rev. Lett. 49 (25): 1804–7, Bibcode:1982PhRvL..49.1804A, doi:10.1103/PhysRevLett.49.1804
W. Tittel, J. Brendel, B. Gisin, T. Herzog, H. Zbinden, N. Gisin (1998), "Experimental demonstration of quantum-correlations over more than 10 kilometers", Physical Review A 57: 3229, arXiv:quant-ph/9707042, Bibcode:1998PhRvA..57.3229T, doi:10.1103/PhysRevA.57.3229
W. Tittel, J. Brendel, H. Zbinden, N. Gisin (1998), "Violation of Bell inequalities by photons more than 10 km apart", Physical Review Letters 81: 3563-6, arXiv:quant-ph/9806043, Bibcode:1998PhRvL..81.3563T, doi:10.1103/PhysRevLett.81.3563
G. Weihs, T. Jennewein, C. Simon, H. Weinfurter, A. Zeilinger (1998), "Violation of Bell's inequality under strict Einstein locality conditions", Phys. Rev. Lett. 81: 5039, arXiv:quant-ph/9810080, Bibcode:1998PhRvL..81.5039W, doi:10.1103/PhysRevLett.81.5039
Jian-Wei Pan, D. Bouwmeester, M. Daniell, H. Weinfurter & A. Zeilinger (2000). "Experimental test of quantum nonlocality in three-photon GHZ entanglement". Nature 403 (6769): 515–519. Bibcode:2000Natur.403..515P. doi:10.1038/35000514.
M.A. Rowe, D. Kielpinski, V. Meyer, C.A. Sackett, W.M. Itano, C. Monroe, D.J. Wineland (2001), "Experimental violation of a Bell's inequality with efficient detection", Nature 409 (6822): 791–94, Bibcode:2001Natur.409..791K, doi:10.1038/35057215
Quantum physics says goodbye to reality, physicsworld.com, 2007
S Gröblacher, T Paterek, Rainer Kaltenbaek, S Brukner, M Zdotukowski, M Aspelmeyer, A Zeilinger (2006), "An experimental test of non-local realism", Nature 446: 871–5, arXiv:0704.2529, Bibcode:2007Natur.446..871G, doi:10.1038/nature05677, PMID 17443179
Salart, D.; Baas, A.; van Houwelingen, J. A. W.; Gisin, N.; and Zbinden, H. (2008), "Spacelike Separation in a Bell Test Assuming Gravitationally Induced Collapses", Physical Review Letters 100 (22): 220404, arXiv:0803.2425, Bibcode:2008PhRvL.100v0404S, doi:10.1103/PhysRevLett.100.220404
World's Largest Quantum Bell Test Spans Three Swiss Towns, phys.org, 2008-06-16
Ansmann, Markus; H. Wang, Radoslaw C. Bialczak, Max Hofheinz, Erik Lucero, M. Neeley, A. D. O'Connell, D. Sank, M. Weides, J. Wenner, A. N. Cleland, John M. Martinis (2009-09-24). "Violation of Bell's inequality in Josephson phase qubits". Nature 461 (504-6): 2009. Bibcode:2009Natur.461..504A. doi:10.1038/nature08363.
Giustina, Marissa; Alexandra Mech, Sven Ramelow, Bernhard Wittmann, Johannes Kofler, Jörn Beyer, Adriana Lita, Brice Calkins, Thomas Gerrits, Sae Woo Nam, Rupert Ursin & Anton Zeilinger (2013-04-14). "Bell violation using entangled photons without the fair-sampling assumption". Nature 497 (7448): 227-30. arXiv:1212.0533. Bibcode:2013Natur.497..227G. doi:10.1038/nature12012.
R. García-Patrón, J. Fiurácek, N. J. Cerf, J. Wenger, R. Tualle-Brouri, Ph. Grangier (2004), "Proposal for a Loophole-Free Bell Test Using Homodyne Detection", Phys. Rev. Lett. 93 (13): 130409, arXiv:quant-ph/0403191, Bibcode:2004PhRvL..93m0409G, doi:10.1103/PhysRevLett.93.130409
Richard D. Gill (2003), "Time, Finite Statistics, and Bell's Fifth Position", Foundations of Probability and Physics - 2 (Vaxjo Univ. Press): 179–206, arXiv:quant-ph/0301059, Bibcode:2003quant.ph..1059G

Emilio Santos (2005), "Bell's theorem and the experiments: Increasing empirical support to local realism", Studies In History and Philosophy of Modern Physics 36 (3): 544–65, arXiv:quant-ph/0410193, doi:10.1016/j.shpsb.2005.05.007

Further reading

J. Barrett, D. Collins, L. Hardy, A. Kent, S. Popescu (2002), "Quantum Nonlocality, Bell Inequalities and the Memory Loophole", Phys. Rev. A 66 (4): 042111, arXiv:quant-ph/0205016, Bibcode:2002PhRvA..66d2111B, doi:10.1103/PhysRevA.66.042111
J. S. Bell (1987), Speakable and Unspeakable in Quantum Mechanics, Cambridge University Press
D. Kielpinski, A. Ben-Kish, J. Britton, V. Meyer, M.A. Rowe, C.A. Sackett, W.M. Itano, C. Monroe, D.J. Wineland (2001), Recent Results in Trapped-Ion Quantum Computing, arXiv:quant-ph/0102086, Bibcode:2001quant.ph..2086K
P.G. Kwiat, E. Waks, A.G. White, I. Appelbaum, P.H. Eberhard (1999), "Ultrabright source of polarization-entangled photons", Physical Review A 60 (2): R773–6, arXiv:quant-ph/9810003, Bibcode:1999PhRvA..60..773K, doi:10.1103/PhysRevA.60.R773

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