Apologies for delay, I am back to this again.
Nugatory said:
I don't understand what you're saying here. Several points of confusion:
First you say "I am failing to see how the probability distribution of photon emissions would make a difference on the expected probability of photon detections at the detectors if nothing changed with regards to the source/detectors locations or anything around them". Then in the very next sentence you explain how that happens: "of course the distribution of detections with respect to time [will change]".
What I meant here is that the form of PDF of arrivals at each detector can be any and depends on the properties of the source and its PDF of emissions but the expected value of the PDF of arrivals at each detector will not change as long as locations of the source and the detectors have not changed.
Second, you're still speaking in terms of "photon emission". But the source cannot be made to emit photons in a controlled way; as I explained a few posts back, it's just a very dim light illuminating the detectors when it's on. If you want anything more interesting than that, you have to specify exactly how and when you're turning the source on and off to get that more interesting distribution.
Sure, the source cannot be controlled precisely but I think we have already established that it is possible to have a source that has some PDF of emissions with 1 expected emission during the 10 minute interval after being switched on.
Third, you say "the form [of the probability distribution] will depend on it but the expected value will converge to the same one regardless". That's confusing in several ways:
-The expected value doesn't "converge", it's something that we calculate directly by integrating the PDF across a particular time interval. When we do a large number of measurements, our results will approach the expected value - that's what makes it "expected".
-Different PDFs can produce the same expected value across a particular time interval, but that doesn't make them the same PDF, and we can distinguish them experimentally by measuring across other time intervals. Five minutes of high intensity followed by five minutes of low intensity has the same expectation value as ten minutes of moderate intensity over a ten minute period, but will produce very different results if we sample across five minutes instead.
Sure, all that is correct. By "converging" I meant that during the experiment the number of arrivals at each detector divided by the number of times the source is switched on (since it is switched on every two hours it will be total running time in hours divided by 2) will converge to some value which is the expected value of the PDF of arrivals for a particular detector or the probability of arrival at each detector.
So, to re-iterate what we have been talking about here are some statements:
1. We are in a patch of our universe extremely remote from anything and all around is just vacuum of space.
2. We have a source which is switched on every two hours by a precise timer and switched off 10 minutes after. The source has some PDF of emissions within that 10 minute interval with expected value 1.
3. We have detectors located at various distances from the source but they are all around 1 to 1.2 light-hours away from the source, let call the set of such locations as L1
4. We run experiment for a sufficient period of time to observe probabilities of arrival at each detector in L1, let's call them P1
5. We move detectors to another location L2 but still having them between 1 and 1.2 light-hours away from the source, and run the experiment again to observe new set of probabilities P2
6. We know that there is an expected one photon emission within 10 minute interval past every two hours and since detectors are located 1-1.2 light-hours away we can assume that each photon "travels" for at least 1 hour but not more than 1.2 hours before it reaches a detector.
7. What I would like to know is, given our setup, what existing QM theories would predict with regards to probabilities of arrivals observed at the detectors if during 1 hour after 10 minutes past every two hours (i.e. after the source being on for 10 minutes) we move detectors from L1 (where probabilities of arrival are P1) to L2 (where probabilities of arrival are P2). Then 0.2 hours later we move detectors back to L1 and they stay there waiting for the next time the source is turned on/off.
The timing of detector moves is controlled by second timer which is initially synchronised with the timer controlling the source.
In my understanding, if outcome is created at the measurement, all theories should predict that probabilities will be P2 because when each of our photons reaches the detectors they will be at L2 (even though at time of emission detectors were at L1) and we know that at L2 probabilities are P2.
Is this correct and this is what QM would predict?
I understand relativity may have something to say about this too, can someone explain what effect might be observed here?
