RedX
Oct23-09, 09:55 PM
Both (i d/dx) and (-i d/dx ) are Hermitian. For some reason (-i d/dx ) is chosen to be the momentum operator, and the consequences are that [x,p]=ih (and not -ih), and that e^{ipx} is an eigenvalue of momentum p (and not -p).
Is there any fundamental reason why [x,p] can't be -ih, and e^{ipx} can't have an eigenvalue -p, so that the momentum operator can be (i d/dx) ?
When dealing with Fourier series, f(x)=\int d^3p \mbox{ } f(p) e^{-ipx} would be incorrect, right? It would have to be f(x)=\int d^3p \mbox{ } f(p) e^{ipx} if you choose (-i d/dx )?
Do most math books use f(x)=\int d^3p \mbox{ } f(p) e^{-ipx} or f(x)=\int d^3p \mbox{ } f(p) e^{ipx} for their definition of a Fourier series? Which convention do you use for a Fourier series?
Is there any fundamental reason why [x,p] can't be -ih, and e^{ipx} can't have an eigenvalue -p, so that the momentum operator can be (i d/dx) ?
When dealing with Fourier series, f(x)=\int d^3p \mbox{ } f(p) e^{-ipx} would be incorrect, right? It would have to be f(x)=\int d^3p \mbox{ } f(p) e^{ipx} if you choose (-i d/dx )?
Do most math books use f(x)=\int d^3p \mbox{ } f(p) e^{-ipx} or f(x)=\int d^3p \mbox{ } f(p) e^{ipx} for their definition of a Fourier series? Which convention do you use for a Fourier series?