I think the right statement is $0 \leq F(c) \leq k$. In that case it is from ISL 1997. Pierre.

I'm also confuse about that, anyone know the original problem? i solve it by assuming the pbornsztein's restrcition. so the problem is need to be corrected?

I have checked and Pierre is right $0\leq F(c)\leq k$

Find all positive integers $k$ for which the following assertion holds: If $F(x)$ is polynomial with integer coefficients ehich satisfies $0 \leq F(c) \leq k$ for all $c \in \{0,1, \cdots,k+1 \}$, then \[F(0)= F(1) = \cdots =F(k+1).\]