minkwe wrote:Even the "locality loophole" is a sham as well since it is often assumed that the inequalities would not be violated if we simply brought the stations within each other's light-cone.
This assumption would be, of course, nonsensical. The point is that this is irrelevant, because there is no doubt that with communication between A and B allowed one can easily violated Bell's inequalities. So, there is no point in saying QM violates Bell's inequalities A in the future or past lightcone of B, the reaction would be "so what", and to construct local realistic models would be unproblematic.
minkwe wrote:But the derivation of inequalities do not care how close together the stations are because no locality assumption is required to obtain the inequalities.
Of course, there may be other sets of assumptions which allow to derive the Bell inequalities. Who cares? This would certainly not invalidate Bell's proof which starts with these assumptions. Simply omitting them would invalidate the proof. The freedom to invent other assumptions which allow to prove the inequalities is not at all questioned by Bell. Feel free to prove such theorem.
minkwe wrote:It is very relevant, because it tells you clearly that such theories are also forbidden. If Bell's argument is true, then such non-local theories are also forbidden.
Ok, if you invent some other conditions, which allow to derive the inequalities, non-local theories which fulfill these conditions would be impossible too. Which is quite irrelevant. Except if you want to claim that, say, de Broglie-Bohm theory is impossible. It is a non-local realistic theory. Thus, some non-local theories may be forbidden, other non-local theories theories not.
minkwe wrote:Now that the "locality assumption" is put to rest, let us examine the so-called "counterfactual definiteness" (CFD) or "realism". It is defined variously in the literature as follows:
Now let us revisit Bell's paragraph 2 of page 1, first three sentences. Assume that you have a single pair of spin-half particles heading in opposite directions to space-like separated stations. Alice orients her magnet along axis "a" and measures +1 (now pay particular attention to the next sentence, remembering the meaning of counterfactual definiteness), if measurement by Alice along axis "a" produces outcome +1 (measurement already performed), then according to quantum mechanics, measurement by Bob along axis "b" must produce outcome -1 and vice versa (measurement yet to be performed).
Why is that not counterfactual definiteness in Quantum Mechanics?
Because there is no counterfactual definiteness in QM. Counterfactual definiteness requires that the outcome of unperformed experiments exists, is well-defined even befor the measurement. But the derivation that of counterfactual definiteness in Bell's argument uses the EPR argument, which requires locality.
In a nonlocal world, the outcomes may not be predefined. If A(a) is "measured", some random process, depending also on hidden variables of the measurement device, may define its result. Then, this result is transferred to B, so that after this the resultat of B(a) is defined as -A(a). But in this case the result B(a) was not predefined, but becomes defined only at the moment of measurement of A(a). All other measurement results B(c), for all c=/=a, remain undefined until the experiment is done, and those of A(c) for all c=/=a, remain undefined forever. This is what happens in dBB theory, where the "measurement result" is, in fact, the result of an interaction, which depends on the hidden variable of the particle as well as of the hidden variable of the measurement device.
