Algebraic independence of certain values implies algebraic independence of functions?

Question

It is quite general and elementary question.

Is it possible that some holomorphic functions $f_1,\cdots,f_m $ on a region $\Omega $ of $\mathbb C$ satisfies:

Whenever $(f_1(z), \cdots, f_m (z)) $ is a zero of some polynomial $p \in \mathbb Q [x_1, \cdots, x_m]$ for some $z \in \Omega $, then $p (f_1,\cdots,f_m)=0$.

Constant functions satisfy this property obviously, so I wonder the existence of non-cobstant maps of certain property.

And what about 'continuous functions', not 'holomorphic'?

I asked the same one at MSE but I didn't get an answer.

Answer 1

EDITED:

No, it is not possible if $f_1, \ldots, f_m$ are not all constant.

Suppose wlog $f_1$ is not constant. I'll ignore $f_2, \ldots, f_m$ and consider polynomials $p(f_1(z))$. For convenience I'll omit the subscript and call this $p(f(z))$. $f(\Omega)$ is an open subset of $\mathbb C$, so it contains $\alpha + \beta i$ for some $\alpha, \beta \in \mathbb Q$, i.e. there is some $z_0$ such that $f(z_0) = \alpha + \beta i$, and so $p(f(z_0)) = 0$ where $p(w) = (w-\alpha)^2 + \beta^2$.