I read multiple sources about raising and lowering indices and Einstein summary notation but am having problems doing it.
Here is an example. I am trying to derive Maxwell's inhomogeneous equations in the Minkowski vacuum \begin{equation} \partial_\mu F^{\mu\nu} = 0 \end{equation} using the alternative form in curved space: \begin{equation} \frac{1}{\sqrt{-g}}\partial_\mu\Bigg[(\sqrt{-g\,}g^{\mu\alpha}g^{\nu\beta}F_{\alpha\beta}\Bigg] = 0 \end{equation} Substituting $g^{\phi\theta} = \eta^{\phi\theta} = \text{diag} (+,-,-,-)$: \begin{equation} \partial_\mu F_{\alpha\beta} = 0 \end{equation}
What is the proper way to convert this to $\partial_\mu F^{\mu\nu} = 0$ or $\partial_\alpha F^{\alpha\beta} = 0$ or $\partial_\lambda F^{\lambda\kappa} = 0$? I keep getting a mess.
edit:
I am at a level of trying to make sure I am doing the mechanics properly. I think in the back of my mind I knew I could contract indices to get your alternative form. Here is my messy approach: \begin{equation} \eta_{\mu\phi} \: \partial^\phi F_\alpha \, ^\rho \: \eta_{\beta\rho} = 0 \end{equation} \begin{equation} \eta_{\mu\phi} \: \eta^{\phi\sigma} \: \partial_\sigma F_\alpha \, ^\rho \: \eta_{\beta\rho} = 0 \end{equation} \begin{equation} \eta_{\mu\phi} \: \eta^{\phi\sigma} \: \partial_\sigma \: \eta_{\lambda\alpha} \: F^{\lambda\rho} \: \eta_{\beta\rho} = 0 \end{equation} Substituting $\eta^{\phi\theta} = \text{diag} (+,-,-,-)$: \begin{equation} \partial_\sigma F^{\lambda\rho} = 0 \end{equation} Then I would keep raising and lowering and substituting until I get the preferred form, if ever. I assume I am missing the proper approach.
