On Dedekind domains whose class groups are direct sums of cyclic groups
Abstract
For a given family (Gi)i ∈ of finitely generated abelian groups, we construct a Dedekind domain D having the following properties. enumerate (D) i ∈ Gi. For each i ∈ , there exists a submonoid Si ⊂eq D with (DSi) Gi. Each class of (D) and of all (DSi) contains infinitely many prime ideals. enumerate Furthermore, we study orders as well as sets of lengths in the Dedekind domain D and in all its localizations DSi.
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