How can we explicitly calculate the norm of a differential form?
For example let $(X, \omega) $ be a complex manifold such that locally $$ \omega(z) =i\sum_{k,j} h_{k, j} (z) dz_k\wedge d\overline {z_j}\, , $$ and let $\alpha $ be a $(p, q)-$form. How we can calculate the norm of $\alpha $ with respect to the metric $\omega$?
Let $h^{\overline{i}j}$ be the inverse components, so that $h^{\overline{i}j}h_{j\overline{k}}=\delta_{\overline{k}}^{\overline{i}}$. If $\alpha$ is a (2,1)-form then $|\alpha|^2=h^{\overline{i}j}h^{\overline{k}l}h^{\overline{p}q}\alpha_{jl\overline{p}}\overline{\alpha_{ik\overline{q}}}$. Follow the same pattern for a $(p,q)$-form.
