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Abelianized fundamental group of the affine space over a finite field and big Witt vectors in several variables

Let $X$ be a normal proper variety over a perfect field $k$. We describe abelian coverings of X in terms of the functor $\underline{\rm HDiv}_X$ of principal relative Cartier divisors on $X$. If the base field $k$ is finite, the geometric Galois group of the maximal abelian extension of the function field of $X$ is given by the $k$-valued points of the Cartier dual of the completion of $\underline{\rm HDiv}_X$. As another application, we present the geometric abelianized fundamental group of the affine $n$-space over a finite field by the group of big Witt vectors in $n$ variables, a generalization of the (usual) big Witt vectors.