Eppley and Hannah



Every now and then somebody asks if it is really necessary to find a quantum theory of gravitation. After all, it is most likely not possible to detect single gravitons, following an argument of Freeman Dyson (because one would need a detector of planetary size for it).

Of course there are many good reasons why one would like to find a way to quantize gravity like all other fields [1, 2, 3]. But I was never worried about this sort of debate, because I knew that there was a thought experiment, published in the '70s or '80s, which settled this issue once and for all: Consistency requires that gravitation must be quantized. I remember that I read the argument and that I found it convincing at the time.



Recently, I was asked about this whole issue and I mentioned the thought experiment and that paper. Finally I promised that I would dig out the reference and I actually did.

K. Eppley and E. Hannah, Found. Phys. 7, 51 (1977)



The reason it was relatively easy to find the reference was that almost thirty years later somebody checked the argument and found that it was flawed. The problem is that the thought experiment asks for a detector so large and heavy that it cannot be built, somehow closing the circle back to Dyson's argument.


order!



Continuing a previous theme, let me ask this: So why don't they put their house in order? Seriously.

via Cosma



many verses



The main motivation of no-collapse interpretations is to emphasize that the unitary Schroedinger evolution is all there is.



In order to reconcile this with our experience a description considering 'many worlds' or 'many minds' and the 'splitting' of the universe into different 'branches' is often used:
The physicist does not kill the cat but really creates two worlds and then repeating this experiment doubles the number again and again.

It seems that the number N of 'branches' or different 'minds' etc. increases like N(t) ~ wt where w is some unknown constant. Now one can calculate something like an entropy S from it as S = log(N) and therefore S ~ t; time really is 'm.w.i entropy'.



But how does one reconcile all this with the time-reversible Schroedinger evolution?