alexepascual said:
Do you have a copy (electronic) of the paper?. I read that Zeilinger had it in his university website but it looks like it has been removed now. If you have it I would appreciate it if you attached it to this thread or sent it to me by email.
Well, no. I always had a look at it at the Homepages of the universities of Vienna or Innsbruck. Maybe I have a copy somewhere on my office computer. I will check. Unfortunately I am attending a conference next week, so it might take some time.
alexepascual said:
I guess you mean "distance between slits" right?
I haven't gone back to take a look at my optics book, but it looks to me that this is an approximation. With the screen at a reasonable distance from the slits, the coherence length should be able to be smaller than the distance between slits and be limited by the difference in path. (in order to get interference, of course)
Yes, distance between slits. Also maybe my usage of coherence length was a bit unclear I suppose as this is sometimes also defined has coherence time times speed of light. So to be more exact, both slits must lie within the coherence volume of the light. Btw, this does not depend on the distance between slits and screen, but between the light source and the slits.
alexepascual said:
I would guess you are talking about longitudinal coherence right?
No, longitudinal/temporal coherence are defined by the spectral width of the light. Coherence time is the decay time of the autocorrelation. The autocorrelation is the Fourier transform of the spectral power density.
Spatial coherence (or transverse coherence) are defined by the spread of wavevectors. Collecting a small solid angle of a light source therefore leads to high spatial coherence. This is foe example, why starlight has rather high spatial coherence. This property was used to measure star diameters back in the 50s.
alexepascual said:
I assume here you are referring exclusively about the SPDC process. The angle of emission for each photon is related to the magnitude of it's momentum. Therefore, to small difference in angle corresponds small spread in momentum. Did I interpret you correctly?
Yes, but this is not limited to SPDC processes.
alexepascual said:
According to Dopfer, you do see an interference pattern in D1 when you place the detector at the focal distance of the lens. You loose which-way information. On the other hand, if you place the detector at a distance of 2f, it is as if you were looking directly at the slits on the other arm. Then you get which-way information and interference is lost.
The reason you do see interference on D1 is that you are looking at the photons that are entangled with those that went through the slit on the other side. If you wanted, you could screen out all the photons in the upper arm that are entangled with photons in the lower arm that did not make it through the slits.
Well, you do not see a pattern in D1, you see one in the coincidence counts.
Just screening out those photons, which do not make it through the slits, is not enough. The important, but often overlooked fact is, that D1 is a small detector. It is smaller than the beam is, so there are also photons, which do not hit D1. If you replace it by a larger detector, also the interference pattern in the coincidences will vanish. In the focal plane each possible position of the detector corresponds to a small spread of momentum eigenstates. This small spread shows interference in coincidence counts. The whole spread does not (due to low spatial coherence) and therefore there is also no interference in a single arm.
alexepascual said:
The frequency is proportional to the photon's energy. Now, if we consider both photons (entangled) as a single thing; should the frequency be that obtained by adding the energy of both photons?. I don't think so, unless the assumption that each photon's wavelength is twice that of the original photon is wrong. Now, if the frequency of each photon is what we would expect from its energy, why would the phase in a single arm change very fast?
I am not sure, why you bring up frequency here. However, indeed the wavelength is not necessarily exactly doubled. You get a rather broad peak of resulting wavelengths. The peak is of course indeed ad the doubled wavelength. The SPDC process can be considered as a process, which is stimulated by random vacuum fluctuations and is comparable to spontaneous emission in these terms. Therefore the phase changes just as fast as in any spontaneous emission process. In processes, where you have a well defined phase (lasing for example) most of the emission processes are stimulated emission processes. You have one well defined field and any stimulated emission process is caused by this field and "happens in phase with it". In spontaneous emission processes you have some field, but all subsequent emission processes are independent of each other because the "stimulation" happens by vacuum field fluctuations here. These happen at a random time with a random phase. As a result, the emitted light is pretty incoherent. Try for example to feed from a light bulb to a double slit and see interference. You will not see anything unless you use another single slit in front of the double slit to increase spatial coherence.
