On Delta Sets and their Realizable Subsets in Krull Monoids with Cyclic Class Groups

Abstract

Let M be a commutative cancellative monoid. The set (M), which consists of all positive integers which are distances between consecutive factorization lengths of elements in M, is a widely studied object in the theory of nonunique factorizations. If M is a Krull monoid with cyclic class group of order n 3, then it is well-known that (M) ⊂eq \1, …, n-2\. Moreover, equality holds for this containment when each class contains a prime divisor from M. In this note, we consider the question of determining which subsets of \1, …, n-2\ occur as the delta set of an individual element from M. We first prove for x ∈ M that if n - 2 ∈ (x), then (x) = \n-2\ (i.e., not all subsets of \1,…, n-2\ can be realized as delta sets of individual elements). We close by proving an Archimedean-type property for delta sets from Krull monoids with finite cyclic class group: for every natural number m, there exist a Krull monoid M with finite cyclic class group such that M has an element x with |(x)| m.