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I should have clarified that the symmetry remains in the Lagrangian but is broken in the ground state.
samalkhaiat said:(Dirac) Lagrangian is invariant under the continuous group U(1)
ftr said:As an internal symmetry the U(1) still indicates an interaction, Otherwise U(1) is global and it only indicates conserved probability, correct?
Thanks Sam. I had a definite suspicion I was on the wrong track.samalkhaiat said:Charge-conjugation is not the correct operation to consider here, because [...]

strangerep said:Hopefully all these sorts of things will be explained in your (eventual) book?![]()
Of course, this global U(1) symmetry defines, as any continuous global symmetry, a conserved charge, called the Noether charge of the corresponding symmetry. It's the starting point to define interactions via gauge theory, i.e., you make this global symmetry local, which means to introduce a vector gauge boson (which is massless in the most simple realization of the gauge principle). The result is, roughly speeking, QED. Of course, the global symmetry is still a symmetry, and thus the Noether charge is still conserved, and indeed now that we coupled the photon to the Dirac field, it's interpreted as the electric charge, and its conservation is necessary for local gauge invariance, as is also known from classical electrodynamics, where the Maxwell equations alone imply necessarily charge conservation as an integrability condition, i.e., it follows without using the equations of motion for the charges.PeterDonis said:This is true of any quantum theory--multiplying everything by a constant phase changes nothing. So if that's what's meant by global U(1) symmetry, I don't see how the concept is of any use. I also don't see how you get a conserved charge from it.
Yeah, to keep everyone happy and to avoid harsh criticism from my colleagues, the trade dinosaursstrangerep said:Hopefully all these sorts of things will be explained in your (eventual) book?![]()
I send you a signed copy when it is ready.bhobba said:I think I will want a copy to.
I wish I can.I just wish Samalkhaiat would post more
samalkhaiat said:I send you a signed copy when it is ready.
Thanks for adding the twist. I always loved the song by King Crimson "Confusion will be my epitaph"bhobba said:Not taking that things like mass and charge in fact depend on that, which mathematically means you are introducing a cutoff in your theory, is what lead to the infinities that plagues QED. Once you introduce a cutoff, then get rid of the cutoff terms by replacing them with actually measured values (called the re-normalized values) by the trick in my paper on simple re-normalization you can get finite answers in your calculations.
. Earlier, I was reading about why charge has the same value in different frames of reference and then I was about to ask about your twist the energy dependence. It is not clear to me if the values(for both mass and charge) are "cut off" dependent i.e. technical or "true" energy dependent. Although it is clear how mass is treated by making it invariant by doing away with initial Einstein's relativistic mass. But the charge, well, it seems to be less of an intrinsic (interaction) as relative to mass.vanhees71 said:That's why mass is exclusively defined as the invariant mass.