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Joined: 06 Oct 2005
Posts: 602
Location: Toon Town
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The DOUBLE NONLOCAL PAIR OF FRINGES in the ENTANGLED STATE I has the form
Cab*Ca'b'<a|x><x|a'><b|x'><x'|b'> + cc II
Therefore there is no local fringe pattern at either end no matter what
changes are made to the apparati because e.g. the local fringe pattern
at x is the integral of the above formula over all x'. The result is
zero for one of two reasons
<b|b'> = 0 III
and
Integral of |x'><x'| = 1 IV
That is, if III is true and if IV is true, then there are no local
fringes at x no matter what is done either at x' or x if no correlation
analysis is made.
On the other hand if |x'> is not complete for some "new physics" reason
so that
Integral of |x'><x'| = 1 + Y
Then Integral of <b|x'><x'|b'> = <b|Y|b'> =/= 0
would allow entanglement communication AKA "signal nonlocality"
violating orthodox QM. |
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