Algebraic varieties in "mixed" affine spaces

Question

Let $K\subset L$ be a field extension and let $K\subset F_1,F_2,...,F_n\subset L$ be proper intermediate fields. Consider the "mixed" affine space $\mathbb{A}_{(F_i)}:=\prod_{i=1}^n F_i$ instead of $\mathbb{A}_K^n$ (or $\mathbb{A}_L^n$ for that matter) and consider zero sets of polynomials $f\in K[X_1,X_2,...,X_n]$ in $\mathbb{A}_{(F_i)}$. From the perspective of classic algebraic geometry, it only seems natural to look for such a generalization.

Has this specific type of problems been studied/discussed in more detail anywhere and, if yes, under what wording? A reference will be most appreciated. I am mostly interested in the case of algebraic number fields, but other examples are most welcome as well.

Answer 1

The product of Weil restrictions $P = \prod_{i=1}^n {\rm{R}}_{F_i/K}(\mathbf{A}^1_{F_i})$ is naturally a closed subscheme of the direct product $\prod_{i=1}^n {\rm{R}}_{L/K}(\mathbf{A}^1_L) = {\rm{R}}_{L/K}(\mathbf{A}^n_L)$. For any closed subscheme $Z \subset \mathbf{A}^n_K$, we also get a closed subscheme ${\rm{R}}_{L/K}(Z_L) \subset {\rm{R}}_{L/K}(\mathbf{A}^n_L)$ and can see where it meets $P$. Those intersections are the $K$-schemes you're wondering about (e.g., the $K$-points are precisely the loci inside $\prod F_i$ defined by the vanishing of several polynomials in $n$ variables over $K$).

From the viewpoint of Weil restriction of affine schemes of finite type, this looks like a rather special kind of construction. It isn't clear why it should be useful or a natural thing to consider from the viewpoint of classical algebraic geometry (though Weil restriction is very useful). Is there a situation you have in mind for which this is interesting to consider?