Let $f,g:\mathbb{R}^2\to\mathbb{R}$ be smooth functions and let $H_f, H_g$ be their Hessians. Is anything known about the differential equation $H_f H_g=H_g H_f$? Or, in higher dimensions, let $F=(f_1,\dots, f_n): \mathbb{R}^m\to \mathbb{R}^n$ and consider the system $H_{f_i}H_{f_j} = H_{f_j}H_{f_i}$ for all $i$ and $j$.
I've found some simple families of solutions ($f = c g$ for some constant; or $f=a(x)+b(y)$, $g = c(x) + d(y)$) but I'd like to know if there are more. I'm particularly interested in extension problems, for instance:
- Suppose that $f$ and $g$ are defined on a line segment. When can they be extended to a solution in a neighborhood of the segment?
- Suppose that $f$ and $g$ satisfy the equation on a neighborhood of the boundary of a circle. Can the solution be extended to the disc?
I don't know enough about PDEs to have an idea of where to start looking, so any thoughts or references would be helpful.
