I came across the following matrix while reading an article..Can you please help me to understand the following.
We are defining following form: $\sum_{i,j}\partial_{z_i}\partial_{\bar{z_j}}rdz_i\otimes d\bar{z_j}$
Where $r: M(\subset \mathbb C^2) \to \mathbb R$ is $C^2$ function.
1- Where this form acts[Domain]; I think $dz_i\otimes d\bar{z_i}$ should act on $\mathbb C\times \mathbb C$. But how does it act.. etc.
2- What does mean by eigen value of this form, what is typical eigen vector..
i am sorry if question are trivial... but can someone help me.