I am studying the Faddeev-Popov procedure for quantizing Gauge fields. I am stuck in the step where it says that the measure is gauge invariant for the $U(1)$ case.
I came across this question on stackexchange: How to apply the Faddeev-Popov method to a simple integral
Here OP says in the question that ${\cal D}\omega\omega' = {\cal D}\omega$, for fixed $\omega'$, which follows from the product rule, but I don't see how. I figured:
$D\omega\omega' = \omega'{\cal D}\omega + \omega {\cal D}\omega'$, where the second term goes to zero as $\omega'$ is just a fixed gauge transformation. But then ${\cal D}\omega\omega' = \omega'{\cal D}\omega$.
So, what am I missing here?
