A realization result for systems of sets of lengths

Abstract

Let L* be a family of finite subsets of N0 having the following properties. (a). \0\, \1\ ∈ L* and all other sets of L* lie in N 2. (b). If L1, L2 ∈ L*, then the sumset L1 + L2 ∈ L*. We show that there is a Dedekind domain D whose system of sets of lengths equals L*.