Thanks for the clarification! I still have a few questions, but that is because I lack a good intuitive understanding.
Physics Monkey said:
Take a free scalar. The current is proportional to J^0 \propto -i( \phi^* \partial_t \phi - \partial_t \phi^* \phi )= -i(\phi^* \pi^* - \pi \phi)... and the commutator [ \int d^d x J^0(x) \alpha(x) , \phi(y) ] = \alpha(y) \phi(y). Using these facts you should be able to conclude that the unitary operator I wrote above implements the transformation \phi(y) \rightarrow e^{i \alpha(y)} \phi(y) i.e. a local gauge transformation.
Ah ok. I see what you mean (the integrated Ward identity). But I have never gone beyond the leading term - I always though it doesn't work for the exponential map.
For example, even at the next order, there is an additional unwanted term:
[\frac{1}{2!} A^2, B] = \frac{1}{2!}* \left( 2i \alpha(y) AB + (\alpha (y))^2 B \right)
where, A = i \int d^d x J^0(x) \alpha(x) and B = \phi(y)
[STRIKE]Also, the above current is not the full current right? There should have been a term, J_\mu = \partial^\nu (F_{\mu \nu}\ \alpha(x)\ ) (from the pure-gauge term in the Lagrangian) which is the only culprit in making the charge non-gauge-invariant (and also another term, \propto 2i A_\mu |\phi|^2, but this is relatively harmless)[/STRIKE]
Physics Monkey said:
Bulk charge is fine so long as you remember that it sources a field. Useful exercise: use the fact that the vector potential acts like a creation operator for electric fields (they are conjugate) to show that the operator defined by creating a charge and its corresponding Coulomb field is locally gauge invariant and sensitive only to the global gauge transformation. Basically you can show that creating the charge plus its field is like sending a Wilson line to infinity.
Interesting.
[STRIKE]Here, you mean the total total charge, including the "culprit term"?[/STRIKE] Is the operator you have in mind the creation operator of something like F_{0i}(x)\ J^0(x)? (As an aside, isn't electric polarization the classical dual of electric field?)
Physics Monkey said:
Not sure exactly what you meant here. The bulk gauge field has two "fall offs" near the boundary. One is the source i.e. the thing that couples to the operator J^\mu in the action. You get to choose this should you want to put your theory in some background fields. The other is the vev i.e. the expectation value of J^\mu.
Is this dual "fall off" restricted only to adjoint gauge fields in the bulk? What about supersymmetric adjoint spinor fields?
ie. For example, for bulk fundamental matter fields, the corresponding boundary operator has no such obvious (as for bulk gauge fields) connections to the bulk? So, for these bulk fields, the only "fall off" is that their boundary value sources the corresponding boundary operator?
Addendum: I was just now told that the charge corresponding to local gauge symmetry is truly conserved (and gauge invariant) by itself, according to the relatively unknown Noether's 2nd theorem. I am not sure what this means for the above discussion.
