Applying min-max to find a critical point in a ball

Question

Let $\mathbb B^n$ be an open unit ball in $\mathbb R^n$ and let $F$ be a smooth function on it. Let $\frac{1}{2}\mathbb B^n\subset \mathbb B^n$ be an open ball or radius $\frac{1}{2}$. Let $\mathbb B^k$ be an open unit ball in $\mathbb R^k$, and $\frac{1}{2}\mathbb B^n\subset \mathbb B^n$ be an open ball or radius $\frac{1}{2}$.

Question. Is it true that $F$ has a critical point in $\mathbb B^n$ if there exists a smooth surjective map $\varphi:\mathbb B^n\to \mathbb B^k$, that has the following property:

1) For any $y\in \frac{1}{2}\mathbb B^k $ the strict minimum $$\min_{x\in \varphi^{-1}(y)} F(x)$$ is attained in $\mathbb B^n$ at some point ${\bf x}\in \frac{1}{2}\mathbb B^n$. In particular, $\inf F$ on $(\varphi^{-1}(y)\cap (\mathbb B^n\setminus \frac{1}{2}\mathbb B^n))$ is smaller than $\min_{x\in \varphi^{-1}(y)} F(x)=F({\bf x})$ (if such an intersection is non-empty).

2) The point ${\bf y}\in \mathbb B_k$ where the maximum of $$\max_{y\in \mathbb B^k}\min_{x\in \varphi^{-1}(y)} F(x)$$ is attained lies in $\frac{1}{2}\mathbb B^k.$

Comment. This is a largely rewritten formulation. I hope that the answer is positive if the differential of $\varphi$ is surjective on the whole ball $\mathbb B^n$

I would be grateful for a reference (or a counter-example...).

Answer 1

It seems to me, unfortunately, that I found my own very simple counterexample to the claim (as Fedja was suggesting)

Counter-example. Instead of $\mathbb B^n$ we will consider the square $[-2,2]\times [-2,2]\subset \mathbb R^2$. And $\mathbb B^k=[-2,2]\subset \mathbb R^1$. The map $\varphi$ is just the projection (on the $x$ axis).

The function $F$ has the following shape: $$F(x,y)=(y-1)^2(y+1)^2+xf(y).$$

Hence, $F(x,y)$ is affine on each horizontal interval. Let us define by $f(y)$ a monotonous $C^{\infty}$ function, that has the following properties:

1) $f(y)=-1$ for $y\in [-2,-1]$. 2) $f(y)=1$ for $y\ge 0$. 3) $f(y)$ is strictly increasing on $[-1,0]$, attains its single zero at $y=-\frac{1}{2}$ and $f'(-\frac{1}{2})=f''(-\frac{1}{2})=0$.

It is not hard to check that all the required conditions hold, and $F$ doesn't have any critical point in $[-2,2]\times [-2,2]$. What happens here, is that $F$ has two local minima on each interval $x=const$ at points $y=\pm 1$. One of these minima is global for $x\le 0$ and the other for $x\ge 1$...