Ilja said:
No. Think about the meaning of realism. In fact, realism (in the extremely weak sense of realism used in Bell's theorem) reduces to the idea of the existence of realistic explanations for observed correlations. One can say that "realism" specifies only what is the meaning of a "realistic explanation", and, then postulates that a realistic explanation always has to exist.
If you follow this definition of realism, then giving up realism means giving up the idea that explanations exist, and leave the Bell correlations unexplained.
According to some authors, realism is not actually an additional assumption of Bell's theorem (as applied to EPR), but is a derivable consequence of EPR's perfect correlations. In E, P, and R wrote in their 1935 paper: (as found on Dr. Chinese' web site)
http://www.drchinese.com/David/EPR.pdf
If, without in any way disturbing a system, we can predict with certainty...the value of a physical quantity, then there exists an element of physical reality corresponding to this physical quantity.
I think that the way I would put it is this:
If without disturbing a system S we can predict with certainty the outcome q of a measurement on S, then there is an objective property of S corresponding to q.
I'm not sure whether this should be considered an assumption of "realism", or not. It's extremely weak; it doesn't even assume that systems necessarily have objective properties, in general. It only assumes that IF something about a system is predictable with absolute certainty, then that something corresponds to an objective, pre-existing property of the system. In Laudisa's paper here:
http://arxiv.org/ftp/arxiv/papers/0811/0811.2862.pdf, this principle is called "
Property Definiteness", and he says about it:
It is worth stressing that this condition amounts not to assuming the existence of objective properties, but rather to giving a sufficient condition for a property of a physical system to be ‘objective’.
So, as Laudisa says, it might be a mistake to think of Bell's proof as suggesting that either locality or realism must be given up in the face of QM. The only realism that is assumed is Property Definiteness. So if someone hopes to escape from Bell's proof by rejecting realism, rather than locality, he needs to think long and hard about what it means to reject Property Definiteness.
So in a twin-photon EPR experiment, Alice observes that her photon passes a polarizing filter oriented at angle A. Assuming that Bob has not yet measured his photon's polarization, Alice can predict with certainty that Bob's photon will also pass a polarizing filter at angle A. The assumption of Property Definiteness would associate this with Bob's photon. What is the alternative to property definiteness? The conclusion, that Bob's photon will pass through a filter at angle A, seems like an objective fact about the universe. It seems like to me, the only leeway that we have is whether to associate this fact with Bob's photon, or alternatively, it's just a fact about the universe as a whole, not particularly about Bob's photon. But the second alternative seems like a rejection of locality, not a rejection of realism: If we assume that the fact that Bob's photon will pass his filter (set at angle A, by assumption) is a fact about the universe at large, then it means that the result of Bob's local experiment depends on nonlocal facts, which seems like a rejection of locality.
So, to me, Bell's theorem, plus its violation by QM, leads to a different set of alternatives than "nonlocal or nonrealistic. I think there are two ways of escape the "nonlocal" conclusion: (1) Reject (contrary to experience) the assumption that a measurement produces a single outcome (this is the MWI approach), or (2) reject the assumption that Alice and Bob could potentially choose an arbitrary angle for their filters. To explain this: If Alice tested her photon at angle A, she concludes that there is an "element of reality" associated with Bob's photon that determines its potential to pass through a filter at angle A. At this point, Alice could reason: Since I could have measured my photon at any other angle, A', then it must be that there are elements of reality associated with every possible angle. But maybe Alice is wrong about this. Maybe she was somehow predestined to set her filter at angle A, and so there wasn't a possibility of her choosing a different angle. So the EPR argument would not imply that there were elements of reality at EVERY angle, only at the ones that are actually measured. The Bell's theorem would not go through.
So, I think that the alternatives are not "nonlocal or nonrealistic". I think that the alternatives are:
- Nonlocal
- Indefinite outcomes (more than one outcome, a la MWI)
- Superdeterminism (detectors are not freely choosable)
