What is predicted to happen for electron beams in the Stern-Gerlach experiment?

The Stern–Gerlach experiment has been carried out for silver and hydrogen atoms, with the result that the beams are deflected discretely rather than continuously by an inhomogenous magnetic field. What is theoretically predicted to happen for electron beams?

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They get split by spin... the Stern-Gerlach experiment is most commonly explained in terms of electrons (and I would be surprised if it wasn't originally carried out with electrons) –  Jerry Schirmer Oct 7 '12 at 20:53
@JerrySchirmer I don't think it's ever been carried out for electrons, hence the question but I could be wrong as usual ;) –  Larry Harson Oct 7 '12 at 20:55
Jerry, you should be surprised:-) It is not feasible to do SG with electrons, since they will deflect away due to Lorentz force. –  Ján Lalinský Jan 22 at 5:12

Electron beams cannot be split by a stern Gerlach apparatus, because the spin splitting and the orbital splitting cannot be practically separated. The orbital splitting in a constant magnetic field is exactly of the same magnitude as the spin splitting, meaning that the spin anti-aligned electron in a given Landau level is more or less precisely degenerate with the spin aligned electron in the previous Landau level. This means that you can't separate the velocity deflection of the electron from the spin deflection.

This is why Stern Gerlach experiments are only done on atomic beams. There is no simple practical known way to correct for this.

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There is a bit of trouble with using electrons since the magnetic field of the apparatus will cause them to turn thanks to the Lorentz force. You could, of course, build a device to account for the turning, and still split the electrons by spin at the end.

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No you can't build the apparatus to do this, because the orbital splitting can't be separated from the spin-splitting, because of the degeneracies in the Dirac equation. –  Ron Maimon Oct 7 '12 at 23:30
There is a simple way. Here're the animated results of a numerical computation of a gaussian two-dimensional spin-1/2 neutral particle in a Pauli equation, evolving in a Stern-Gerlach magnet magnetic field. If interesting, I can give the C code for generation of $\vec H$, $\psi$ and other parameters. –  Ruslan Jun 11 at 13:51