Bell's theorem/Probability

Bell's theorem/Introduction         Bell's theorem/Probability         Bell's theorem/Inequality

Defining the variables (X, Y, Z) of a Bell's theorem experiment

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Never speak the name the remote photon's hidden variables.[1]
 
X refers to a measurement on the local photon, but a measurement on the remote photon can predict X as follows: X= +1 if the remote photon passes, and X= −1 if the remote photon is blocked. The anticorrelation of linear polarization used here corresponds to atomic state that change their parity, forcing the entangled pair of photons to have odd parity.

A Bell's theorem experiment establishes that nature violates Bell's inequality.

Bell's theorem is a proof by contradiction, or something that seems to "prove" something that is not true, presumably because the theorem is based on false assumption(s).[2] We begin our proof by assuming the existence of variables that arguably don't exist. A simple configuration that is a predecessor to the Bell's theorem experiment[3] is shown to the right. A single atom emits a pair of photons whose polarization is always measured to be at perpendicular angles.

The "local" photon passes if and only if the "remote" photon passes, as shown in cases (a) and (b).[4]

Therefore, it is reasonable to assume that the "local" photon's value of X can be measured by observing the "remote" photon.

This is depicted in case (c), where we have attributed the value X=1 to the local photon even though no measurement has been made on it. By permitting these two de facto polarization measurements on the local photon, data is generated in the laboratory that will be shown in the next section to be "impossible".[5]

A simple Bell's theorem configuration

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Though not optimal for disproving hidden variable theory, this symmetric configuration simplifies the calculation.

A simple experimental test of Bell's theorem for photons uses two sets of three polarizing filters, each set with the three orientations shown in the figure. All three lines of polarization are 60 degrees apart, in a symmetry deliberately chosen to simplify the analysis.

polarizer
angle
hidden
variable
photon
passed
photon
blocked
   0      X   X = 1   X = −1
   +60°      Y   Y = 1   Y = −1
   −60°      Z   Z = 1   Z = −1

The measurement consists of placing the polarizer in front of the photon and detecting whether it was blocked or passed by the filter as it is detected.[6] Since there are two entangled photons, the experiment can measure two variables. There are, in fact, a total of 6 variables if you include the remote photon. However, great simplification results from focusing our attention on the "local" photon. By properly rotating the orientation of the "remote" filter, we can use that measurement to ascertain the value of corresponding variable (X,Y,or Z) of the "local" photon.

Key ideas:
  1. We know by observation that the measurement on the "remote" photon always predicts the polarization of the "local" photon
  2. This permits us to effectively measure two of the three variables associated with the "local" photon. These variables (X,Y,Z) specify whether or not the "local" photon would pass a filter at the specified orientation.
  3. Although measurements on the "remote" and "local" photons allow a de facto measurement of two of the three variables, they do not permit us to measure all three (X,Y,Z) variables for a given photon.

Do variables exist if they are not observed?

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Since Bell's theorem is violated by experiment, we must seek a false assumption that would render the theorem invalid. That assumption seems to be the existence of the variables (X,Y,Z). Since we can only measure two of them, the third might not exist. Moreover, it is not known at the time of creation which of the two measurements will be made of the entangled photons. So if X, Y, and Z don't exist until they are measured, they somehow "pop" into existence the instant a photon strikes the detector. This resource makes no claim to understanding what it means for a variable to "exist" or "not exist".

Doctor Who fans know that a Weeping Angel does not exist while being observed. In contrast, (X,Y,Z) only exist if they are observed, which suggests that hidden variables and weeping angles are complementary entities.[7]

If you think you understand most of this you are ready for Bell's theorem/Inequality

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Bell's theorem/Introduction         Bell's theorem/Probability         Bell's theorem/Inequality

References and footnotes

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  1. Defining the remote hidden variables creates algebraic complexity not needed for an introductory discussion. For more about Qed-her, see Bell's_theorem/Qed-her
  2. The false assumption being that photon behavior can be modeled by "hidden variables", or equivalently that each photon carries with it the information needed to predict outcomes of polarization measurements.
  3. It is associated with the w:EPR paradox
  4. This occurs 100% of the time only in an ideal experimental setup. But the devices are claimed be to working sufficiently well that Bell's theorem is violated.
  5. A more rigorous analysis distinguishes between the de facto and actual measurement by labeling the measurements in a way that is more difficult for a first time reader to follow.
  6. The detection must occur whether or not the photon was blocked.
  7. If weeping angels and hidden variables are always created in equal numbers, then we must immediately cease all Bell's theory experiments.