In the archetypal EPR scenario, the interaction point is stationary and the two objects move in opposite directions:
A(n, l): (E3(v>0) sub M4) * L -> S2 sub S3
B(n, l): (E3(-v) sub M4) * L -> S2 sub S3
The condition E3(v>0) sub M4 adds the minimum dynamics condition to Joy's analysis - and adds Relativity - where constraints on the expectation value integral (eqn 3.2 in Joy's book) or normalisation of the 'hidden' variable should make it possible to turn Bell's 'locality' condition of factorisation (eqn 4) into the space-time separation condition v<c (v parameterises E3 and c is in M4). My work predicts that this should be the case, because I identify a scenario with a suitable conspiracy of Nature that gives a hidden domain L.
Any observable (A, B) is ultimately based upon some particle reaction which will take some minimum time t_min to occur, so if the local causation of the domain L occurs on times scales t<t_min then it will be hidden from all possible observation. This will be the case for a particle with a physical scale of the Planck length and internal dynamics that occur on a time-scale set by the Planck time - which is the case in my model where particles are Planck holes with radius of the Planck length. Furthermore, as every observation takes so long that very many cycles of the local dynamics on the time-scale of the hidden domain L occur within the measurement time-scale, the calculation of all observables *must* take an average over the domain L (such as eqns 5 and 6).
However, for the hidden domain being that of a black hole particle on the Planck scale, the rotation causes a maximal ergo-region where the metric signature of Minkowski space-time M4 is reversed, ie. (-,+,+,+) -> (+,+,+,+). This means that there will be one more +1 or -1 issue in Joy's analysis, where the prediction of my work is that averaging over this metric reversal in the hidden domain L is the *source* of the illusion of non-locality in QT. I would expect that extending Joy's work by applying it to the correct physical space E3(v) sub M4 would explicitly show this - and in so doing snooker Joy's critics (even if they all don't register it). Being brutally accurate about the applicability of Bell's analysis to the spaces of physics would score him as 0 for 3.
Joy's flatness condition on the topological spaces S3 and S7 is actually in agreement with my results - despite appearances given by previous discussion. The issue is that the flatness condition doesn't technically apply to empty space, as that would mean there were no particles in the EPR scenario - so nothing happened! EPR requires 2 particles to dynamically interact, and so the flatness condition applies to the space in the vicinity of the 2 particles - this is *not* the same thing as empty space. The particles of my work are topological defects in the structure of space, which necessarily will give a torsion in the space around them - torsions in space is how the particle forces arise in a Kaluza-Klein style theory. In my work, I show that the formalism of QT is an *approximation* that is required to get a scientifically complete theory because the physically-real classical physics theory is mathematically incomplete, and that the approximation *only* holds in the limit of point-like particles and flat space-time. This approximation limit effectively integrates over the region of space of the ergo-region and gravitational curvature, and this gives the origin of the hidden domain L.
My flatness condition is a local condition - as in only applies in the local vicinity of particles - and not a global condition on all of space ie. the universe isn't required to be flat. Joy's flatness condition is also such a local condition that doesn't necessarily imply that the whole universe is flat - if it did that would imply teleparallel gravity. But as a local condition, it just implies that the particle forces are associated with torsions in space - which is the case in my work - and gravity is left being due to curvature of space. This distinction would naturally explain the difference between the forces of gravity (curvature) and particles (torsion).