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Bell's inequality
The history and physical implications of this derivation is discussed on EPR page.
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- Note that the inequality derived here is not the original discovered by John Bell, nor has it been used in any of the actual Bell test experiments.
In the latter, the tests used are based on the modified inequalites devised by Clauser et al., designed for use in the real
situation in which not all particles are detected (see CHSH or CH74 tests ). The CHSH inequality and related
ones are currently the ones in favour, though they are not applied in a way that the originators would have approved. Unless
detection efficiencies are very high they are subject to loopholes and are in danger of giving misleading results. Violation does not necessarily mean that no
"local hidden
variable" theory is possible.
Briefly: based on certain assumptions about the microscopic world, which include
- locality
- realism
- joint measurability
and other technical assumptions a mathematical relation (namely an inequality) is derived concerning the outcome of some
measurements of microsocopic particles. Experiments are currently
generally accepted as having violated that relation. The conclusion is often that those assumptions, and in particular realism
and locality, are not compatible, they cannot both be true in any theory based on quantum mechanics.
The following is a simplified description of the EPR scenario, developed
by Bohm and Wigner.
We follow the approach in Sakurai (1994).
Derivation of the inequality
Pick three arbitrary directions a, b, and c in which Alice and Bob can
measure the spins of each electron they receive. We assume three hidden variables on each electron, for the three direction
spins. We furthermore assume that these hidden variables are assigned to each electron pair in a consistent way at the time they
are emitted from the source, and don't change afterwards. We do not assume anything about the probabilities of the various hidden
variable values.
Alice and Bob are two spatially separated observers. Between them is an apparatus that
continuously produces pairs of electrons. One electron in each pair is sent towards
Alice, and the other towards Bob. The setup is shown below:
(This is just a thought-experiment, remember. Real experiments on pairs of electrons are not feasible and most "Bell test
experiments" have instead been based on either the polarisation direction or the frequency and phase of light, assumed to be in
"photons".) The electron pairs are specially prepared so that if both observers measure the spin of their electron along the same axis, then they will always get opposite results. For example,
suppose Alice and Bob both measure the z-component of the spins that they receive. According to quantum mechanics, each of
Alice's measurements will give either the value +1/2 or -1/2, with equal probability. For each result of +1/2 obtained by Alice,
Bob's result will inevitably be -1/2, and vice versa.
Mathematically, the state of each two-electron composite system can be described by the state vector
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.
Each ket is labelled by the direction in which the electron spin
points. The above state is known as a spin singlet. The z-component of the spin corresponds to the operator
(1/2)σz, where σz is the third Pauli
matrix. (The quantum mechanics of spin is discussed in the article spin (physics).)
Hidden variables
It is possible to explain this phenomenon without resorting to quantum mechanics. Suppose our electron-producing apparatus
assigns a parameter, known as a hidden variable, to each electron. It labels one electron "spin +1/2", and the other
"spin -1/2". The choice of which of the two electrons to send to Alice is decided by some classical random process. Thus,
whenever Alice measures the z-component spin and finds that it is +1/2, Bob will measure -1/2, simply because that is the label
assigned to his electron. This reproduces the effects of quantum mechanics, while preserving the locality principle.
The appeal of the hidden variables explanation dims if we notice that Alice and Bob are not restricted to measuring the
z-component of the spin. Instead, they can measure the component along any arbitrary direction, and the result of each
measurement is always either +1/2 or -1/2. Therefore, each electron must have an infinite number of hidden variables,
one for each measurement that could possibly be performed.
This is ugly, but not in itself fatal. However, Bell showed that by choosing just three directions in which to perform
measurements, Alice and Bob can differentiate hidden variables from quantum mechanics.
a b c a b c freq
+ + + - - - N1
+ + - - - + N2
+ - + - + - N3
+ - - - + + N4
- + + + - - N5
- + - + - + N6
- - + + + - N7
- - - + + + N8
Each row describes one type of electron pair, with their respective hidden variable values and their probabilites N. Suppose
Alice measures the spin in the a direction and Bob measures it in the b direction. Denote the
probability that Alice obtains +1/2 and Bob obtains +1/2 by
- P(a+, b+) = N3 + N4
Similarly, if Alice measures spin in a direction and Bob measures in c direction, the
probability that both obtain +1/2 is
- P(a+, c+) = N2 + N4
Finally, if Alice measures spin in c direction and Bob measures in b direction, the
probability that both obtain the value +1/2 is
- P(c+, b+) = N3 + N7
The probabilities N are always non-negative, and therefore:
- N3 + N4 ≤ N3 + N4 + N2 + N7
This gives
- P(a+, b+) ≤ P(a+, c+) + P(c+, b+)
which is known as a Bell inequality. It must be satisfied by any hidden variable theory obeying our very broad
locality assumptions. (Note, however, that these assumptions include one that Bell took for granted but which is not true in
optical Bell tests, namely that every single particle was detected. The failure of this assumption results in the best known
"loophole" that enables hidden variables to survive apparent
violations of the test.) We will now show that the predictions of quantum mechanics violate this inequality.
Comparison with quantum mechanics
Suppose a, b, and c lie nearly on the x-z plane (in fact, they need to be
linear independent and therefore can't lie exactly on a plane), and c lies on the z-axis bisecting
a and b with angle θ. We can calculate each of the probabilities with the help of the
rotation operator. Consider P(c+, b+), which in Quantum Mechanics
is equal to the squared scalar product between the above mentioned initial state |ψ〉 =
1/√2 ( |c+, c-〉 - |c-, c+〉 ) and the final state |c+,
b+〉:
where we used the special definition of the scalar product
-
if the tensor product
-
is involved. In addition, we used 〈ci |cj〉 = δij (the |zi〉 are a orthonormal base of
eigenstates of the spin operator Sz with eigenvalues ±hbar/2), the expansion of ex as a power series, unitarity of
σy, and that σy |c+〉 = i |c-〉.
This last equation can be obtained from the following standard QM results:
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-
-
-
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σy is the second Pauli matrix, which generates the
rotation operator D(y, θ) = exp(- i θ/2
σy). The other two probabilities can be obtained with similar calculations. Bell's inequality then becomes:
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But this inequality is violated for:
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If Alice and Bob actually perform the experiment exactly as described above using three axes that are separated by angles
within the above interval and obtain the probabilities predicted by quantum mechanics, then their results will violate Bell's
inequality. This would falsify the class of local hidden variable theories which we considered.
Implications of violation of Bell's inequality
There are several popular responses to this situation:
The first is to simply assume that quantum mechanics is wrong. However, this can be experimentally tested and experiments have
supported quantum mechanics: Alice and Bob will indeed measure the predicted probabilities.
The second is to abandon the notion of hidden variables and to argue that the wave function does not contain any
information about the outcome of the measurement of the values in the particles. This corresponds to the Copenhagen interpretation of quantum
mechanics.
One may also give up locality: the violation of Bell's inequality can be explained by a non-local hidden variable
theory, in which the particles exchange information about their states. This is the basis of the Bohm interpretation of quantum mechanics. However, this type of
interpretation is regarded as inelegant, since it requires all particles in the universe to be able to instantaneously exchange
information with all other particles in the universe.
Finally, one subtle assumption of the Bell's inequality is counterfactual definiteness. In reality, one can only measure the particles once without
collapsing the wave function, and yet Bell's inequality involves talking about alternative measurements that cannot be performed
and assuming that these would result in well defined outcomes. But relaxing this assumption one can also resolve Bell's
inequality. In the Everett
many-worlds interpretation, the assumption of counterfactual definiteness is abandoned because this interpretation assumes
that the universe branches into many different observers each which measures a different observation.
One active area of theoretical research is to attempt to find other hidden assumptions in Bell's inequality.
Related thought experiments
The CHSH inequality, developed in 1969 by Clauser, Horne, Shimony,
and Holt, generalizes Bell's inequality to arbitrary observables. It is expressed in a form more suitable for performing actual
experimental tests.
Bell's thought experiment is statistical: Alice and Bob must carry out
several measurements to obtain P(a+,b+), and the other probabilities. In 1989 Greenberger, Horne, and Zeilinger produced an
alternative to the Bell setup, known as the GHZ experiment. It uses
three observers and three electrons, and is able to distinguish hidden variables from quantum mechanics in a single set of
observations.
In 1993 Hardy proposed a situation where nonlocality can be inferred
without using inequalities.
Experimental confirmation
Beginning with the Kocher and Commins experiment in 1967, many "Bell test" experiments
have been carried, almost all giving violations of the inequality tested. The latter, though, is not in practice the one derived
above but usually the CHSH or related inequality. This has on
occasion been violated by tens of standard deviations, but the
presence of loopholes means the possibility of a "local hidden
variable" explanation has not finally been ruled out.
In 1982 Alain Aspect and his team conducted an experiment in which the detector settings were switched during the flight of
the photons, so that there was no time for even a light signal to propagate from one observation event to the other. In 1998
Weihs, Jennewein, et al. at the University of
Innsbruck further demonstrated the violation for space-like separated
observations.
See also
References
- Bell, John S.: On the Einstein-Podolsky-Rosen paradox, Physics 1, 195 (1964), reproduced as Ch. 2, pp 14-21, of J.
S. Bell, Speakable and Unspeakable in Quantum Mechanics, (Cambridge University Press 1987).
- J. F. Clauser, M. A. Horne, A. Shimony and R. A. Holt, Proposed experiment to test local hidden-variable theories,
Physical Review Letters 23, 880-884 (1969)
- Hardy, L.: Nonlocality for 2 particles without inequalities for almost all entangled states. Physical Review Letters
71: (11) pp. 1665-1668 (1993)
- Sakurai, J.J.: Modern Quantum Mechanics. Addison-Wesley, USA 1994, pp. 174-187, 223-232
- Quantum entanglement and Bell's Theorem
- A. Aspect et al.: Experimental Test of Bell's Inequalities Using
Time-Varying Analyzers , Physical Review Letters
49, 1804 (1982)
- Weihs, Gregor et al., Violation of Bell’s inequality under strict Einstein locality
conditions , Physical Review Letters 81,
5039 (1998)
- A. Aspect: Bell's inequality test: more ideal than ever. Nature, vol 398, 18 March 1999. http://www-ece.rice.edu/~kono/ELEC565/Aspect_Nature.pdf
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