Polynomial Dedekind domains with finite residue fields of prime characteristic

Abstract

We show that every Dedekind domain R lying between the polynomial rings Z[X] and Q[X] with the property that its residue fields of prime characteristic are finite fields is equal to a generalized ring of integer-valued polynomials, that is, for each prime p∈ Z there exists a finite subset Ep of transcendental elements over Q in the absolute integral closure Zp of the ring of p-adic integers such that R=\f∈ Q[X] f(Ep)⊂eq Zp, ∀ prime p∈ Z\. Moreover, we prove that the class group of R is isomorphic to a direct sum of a countable family of finitely generated abelian groups. Conversely, any group of this kind is the class group of a Dedekind domain R between Z[X] and Q[X].

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