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Measurement blah blah position harumph velocity mumble mumble; we all know the score by now.So, in a neutron star there are all these neutrons (hardly surprising really). They're squeezed together very tightly by gravity; even tighter than Graham Norton and his "friend" at a Village People concert. Now if they're being squeezed together like that, surely it must restrict their movement somewhat. But do they have less freedom of position and velocity than ordinary neutrons at the centre of an atom? Could there come a point where their movement is so restricted by being squeezed together that the Uncertainty Principle either no longer applies or, at least, needs modifying?
Neutrons are bosons so Pauli doesn't apply to them. Nicht War?
Quote from: sophiecentaur on 11/11/2008 19:51:12Neutrons are bosons so Pauli doesn't apply to them. Nicht War?Neutrons are fermions, not bosons:http://en.wikipedia.org/wiki/Fermion
Owch!What can I have been thinking of?
DoctorBeaver,With all repect to th great Pauli, how do we know his exclusion principle is fact?Alan
Because we can't walk through walls?
Anyway, so Pauli supports Heisenberg. But it is possible that under extreme conditions like those in a neutron star (where densities can reach 5.9 × 1017 kg/m³) the difference in quantum states can be almost infinitely small?
Quote from: DoctorBeaver on 12/11/2008 08:16:04Anyway, so Pauli supports Heisenberg. But it is possible that under extreme conditions like those in a neutron star (where densities can reach 5.9 × 1017 kg/m³) the difference in quantum states can be almost infinitely small?You don't have to go to a neutron star to get into the realm of energy bands. Solid state physics works with them all the time - i.e. assuming a continuum of states.The Hydrogen Atom is not always a lot of help with working out the situation in anything other than a gas. And the Hydrogen atom is the most often quoted or implied in this sort of topic.