Schneibster
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- Oct 4, 2005
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I'll start far afield. This should be fun and informative.
First of all, let's understand that quantum mechanics makes some really strange claims about reality at its most basic level, but it also claims that reality changes when we deal with enough quanta that we have a statistical universe into the classical physics that we observe in everyday life. Basically, individual quanta behave in ways that are impossible for everyday objects, but it is necessary that quanta do so in order that everyday objects do what they do.
Physicists have been struggling with these concepts since the quantum theory was first proposed. It's worth taking a moment to understand what the quantum theory is. The quantum theory is a theory that energy doesn't just flow out continuously from objects that emit it, or into objects that absorb it; instead, it comes in little "packets," of a determined size, one at a time. Max Planck came up with this idea to explain the blackbody radiation, as follows: the blackbody radiation is emitted at all frequencies. Now, if all frequencies are emitted with equal probability, this would obviously result in hot objects immediately radiating all their energy in gamma rays, with almost nothing lower down, because so much energy would be so easily radiated. Lord Kelvin referred to this as the "ultraviolet catastrophe," because nothing of the kind is observed. It is therefore obvious that there must be a higher probability for lower frequencies to be emitted by a hot body, and a lower probability for higher ones. Max Planck theorized that hot atoms emitted quanta of radiation, and that the energy to build one had to be collected up before it could be emitted; obviously, the quantum would be more likely to be emitted when the amount of energy was still small, rather than waiting until there is enough to make a big one. This accounted for the observed radiation peak of blackbody radiation with temperature quite nicely, but many physicists ignored it because it didn't do much else.
All that changed when Einstein came along. Einstein realized while he was considering something called the photoelectric effect that this too could be explained by quanta. What happens is that metals exposed to light form an electric charge. Now, the amount of charge varies with the amount of light; but the voltage, which is the push behind the charge, does not. Why is this? Einstein theorized that electrons were being knocked out of the atoms and this formed the charge. But he went further. He showed that the fact that below a certain frequency of light, there was no effect, but as the frequency increased, at first there was a charge that varied with the amount of light, but whose voltage was very low; as the frequency increased, the voltage increased along with it, irrespective of the amount of charge built up. Einstein thought about this and realized that below a certain frequency, the quanta didn't have enough kick to knock the electrons free, but once they did, everything above that in terms of frequency would increase the velocity of the electrons, but not their quantity; only the light intensity would increase the quantity, and only the frequency would effect their voltage. Suddenly, instead of explaining only one phase of energy transmission, quantum theory explained both emission and absorption, and from there on, it was an accepted theory. Einstein won his Nobel Prize for this, not for Relativity.
Now, with all of this going on, Schroedinger had come up with wave functions, and Max Born had proposed that they represented the probability of the quantum being at a particular location or having a particular other parameter at a particular value. Soon, Louis de Broglie (pronounced "de-broy-ah" with the "ah" rather strangled and almost silent) proposed that not only energy had waves, but matter did too. Now, quantum theory was the theory of all matter and all energy, and the fun really started.
So the quantum theory is the theory that all matter and all energy are made up of indivisible elementary particles called "quanta," and that all of physics can be explained in terms of interactions of these quanta. So far it has been incredibly successful; only gravity remains outside its grasp. A "quantum mechanics" is a description of the interactions of various quanta with one another. Generally, the quantum mechanical theories are divided into one for each force; the mechanics describes the interaction of the quanta of that force with matter and with other forces' quanta. There is also a field theory for each force, with electromagnetism and gravity the best-understood ones; finally, for electromagnetism, there is also a quantum-field theory, the most advanced type of theory which can theoretically completely describe the interaction of the quanta of that force with all other quanta, and their operation as a field.
The whole of this edifice is generally described as "quantum mechanics" to non-physicists.
OK, so Heisenberg proposed that there were certain parameters of quanta that could not be simultaneously measured. At first, he was a proponent of the idea that this was because the measurement of one quantity would disturb the measurement of another, but soon the math told him and others that in fact, those other values simply didn't exist. It had to be that way.
Einstein hated this. He believed that this showed that quantum mechanics could not be a complete and consistent description of reality, rather an ironic position since he was one of the inventors of the theory and had won a Nobel Prize for it. He famously asked if the Moon existed when no one was looking at it, and went about trying to prove that Heisenberg and the others were wrong, and that these parameters had values even though we could not measure them. He came up with a series of gedankenexperimenten (thought or mind experiments) devised to show inconsistencies in quantum mechanics, or at least incompletenesses; Niels Bohr rather famously (at least in physics circles) managed to answer every one. The last and most effective of these, however, although Bohr had an answer, turned out to be deeper than anyone had expected. This one Einstein didn't invent on his own, but in collaboration with a pair of students named Podolsky and Rosen. The gedankenexperiment is therefore called the "EPR" experiment.
Here is a generalized and simplified explanation. Einstein, Podolsky, and Rosen proposed that one consider a pair of photons emitted simultaneously from an atom under very carefully controlled conditions. Because of these conditions, they could show that the spins of the two photons had to be opposite from one another, due to conservation of angular momentum; only in this way could they add up to zero and account for the lack of change in the momentum of the atom, a necessary condition.
One would expect that upon measuring the spin on one photon, one would always measure the opposite spin in the same axis on the other. This is easily accounted for by conservation of momentum. However, what EPR proposed involved far more than this.
Spin on different axes, as I have mentioned elsewhere, is complementary under uncertainty. What EPR proposed was that we measure the spin on different axes in the two photons. And what they asserted was that because the relation between the photons guaranteed opposite spins on the same axis, this was tantamount to measuring the spin of each photon on two axes, thus violating uncertainty. Furthermore, they asserted that any other position proposed to violate conservation of angular momentum, which would threaten the foundations of all of physics, not just quantum mechanics. They hoped by this to show that despite the fact that we could not measure them, conjugate parameters had real values.
Unbeknownst to either EPR or for that matter anyone else, they had devised the first hidden variables interpretation of quantum mechanics. This turned out to be very important later on.
Bohr answered that in fact, the parameters did not have any value, and asserted that their complementarity ensured it, and that since they could not be measured, there was no paradox. EPR responded that in the absence of any value until a measurement was carried out, there was no explanation other than what Einstein denigratingly called "spooky action at a distance" for the correlation between the spins when measurements were made in only one axis; for these parameters to have no value until they were measured, the second photon's spin had to "spring into existence" instantaneously at the moment the first was measured, in violation of locality and relativistic causality. Bohr basically ignored this.
Now, this led to a long debate over the meaning of wave function collapse, and the reality of the wave function, and the importance or lack thereof of measurement. All of this was lumped together in the minds of many physicists as the "measurement problem," and it was very much in vogue among the QM community to assert that all of this fussing over interpretations was meaningless and that the only proper description of reality lay in the equations. This debate continued until John Bell came on the scene in the 1960s.
Bell considered the situation in EPR carefully and realized that everyone had missed something important. What he showed was that although the spin on a second axis was not completely dependent upon the spin on the first, the probability of a certain spin was different if the other spin had some known value than if it did not have any value. In other words, Bell figured out how to tell whether the second spin had any value, or whether the distribution of spins on the first axis was totally random. This opened a whole new door for quantum mechanics, and has resulted in a complete questioning of the nature of reality as a result. This indirect measurement was and is not dependent upon uncertainty; it is, in fact, a direct measurement of the existence or nonexistence of a value, not a determination of that value in violation of the uncertainty principle.
This opened a door; physicists could not yet step through it, because the equipment wasn't sufficiently precise, but the door was open. And some of them knew it. A theoretical physicist named John Clauser began thinking about it, and pretty soon he was working with a friend named Michael Horne; before they were done, they had added Abner Shimony and Richard Holt, and they were doing EPR experiments in real labs instead of in their heads. These early attempts had holes in the data that were collected, and many physicists, both theorists and experimenters, dismissed their results. But they did accomplish an important task: they showed that there was a precise way to interpret Bell's Theorem that allowed the use of inequalities to measure the existence or non-existence of conjugate parameters under uncertainty. Bell had shown the way, and had said that he knew how to do this, but had not shown the way before he passed away (it was an untimely death). They had also constrained the situation fairly closely; there was only a small chance left that EPR were right, and that these parameters had real values. Their tests and inequalities are often called "CHSH" referring to their initials.
In 1982, the time was finally ripe. Alain Aspect had an idea for a test of the CHSH inequality derived from Bell's Theorem. He enacted it, and proved beyond reasonable doubt that in fact the distribution of values on the measured axis was inconsistent with the existence of a real value consistent with the value measured on the other photon for that axis. The value did not exist, in other words; and "spooky action at a distance" was in fact reality.
So something about EPR's assumptions had to be wrong. Of course, none of the three ever imagined that anyone would find a way to constrain the unmeasurable; Bell did that. And they never even dreamed that their experiment would become possible, and would actually measure the existence or non-existence of definite values where those values could not be measured. But their assumptions were these:
1. Locality, or relativistic causality; that is, that local causes have local effects, that no cause can have an effect outside its light cone.
2. Local realism; that is, that all parameters have actual values whether they can be measured or not; that reality has independent existence apart from whether it is (or can be) observed. This is very closely related to counter-factual definiteness.
3. Completeness; that is, that quantum mechanics is a complete description of quantum reality.
EPR, of course, hoped to prove that the last was inconsistent with the facts; however, Bell opened the way to differentiate between the first and second assumptions, and the third, and test them. And what Aspect showed, using CHSH's inequalities and Bell's test, was that either the first or second had to be wrong. Either influences could reach out beyond the light cone, or unmeasurable complementary values of measured parameters were not merely unmeasurable but non-existent.
One of the differences between the interpretations is how they deal with this situation. Consistent histories merely asserts that these values do not exist, just as strict Copenhagen and decoherent Copenhagen do; Many Worlds asserts that the parameters have values but only in other worlds where their complements were not measured; Bohm asserts that an actual physical but undetectable influence, the pilot wave, connects these events at superluminal speed, violating locality but invisibly so as not to violate causality; TI asserts that unmeasurable causality violations occur backwards in time. All of these violate either causality or local reality. It is a conjecture of mine that any interpretation consistent with measured reality will violate one of these two in some way.
I'll address the DCQE next, and finally move on to Afshar's experiment.
