$$f(t^2f(s))=s(f(t))^2$$

$$\mathbb{D}(f)\in\mathbb{N}\Rightarrow t=1 \Rightarrow f(f(s))=s(f(1))^2$$

$$f(1)=a,(\forall a\in\mathbb{N})\Rightarrow f(f(s))=a^2s$$

$$ s=1 \Rightarrow f(at^2)=(f(t))^2$$

$$t=s\Rightarrow \left\{ \begin{gathered} f(f(s))=a^2s \\ f(as^2)=(f(s))^2 \\ \end{gathered} \right. \Rightarrow f(x)=ax$$

$$f(1998)=1998a=\zeta(a)$$

$$\mathbb{D}(\zeta)\in\mathbb{N}\Rightarrow a=1\Rightarrow f_{min}(1998)=\zeta(1)=1998$$