Let $f: \mathbb R^2 \rightarrow \mathbb R$ be a smooth strictly convex function with unique minimum at $0$ such that all level sets $A_x:=\left\{z ; f(z) \le x \right\}$ are compact. Imagine something like $f(z)=\Vert z \Vert^2.$ Define the integral function $$F(x):=\int_{A_x} g(z) dz$$ where $g$ is as smooth as you like. *Question: Is there a way to analytically determine an expression for $F''(x)$?*