A characterization of finite abelian groups via sets of lengths in transfer Krull monoids

Abstract

Let H be a transfer Krull monoid over a finite ablian group G (for example, rings of integers, holomorphy rings in algebraic function fields, and regular congruence monoids in these domains). Then each nonunit a ∈ H can be written as a product of irreducible elements, say a = u1 … uk, and the number of factors k is called the length of the factorization. The set L (a) of all possible factorization lengths is the set of lengths of a. It is classical that the system L (H) = \ L (a) a ∈ H \ of all sets of lengths depends only on the group G, and a standing conjecture states that conversely the system L (H) is characteristic for the group G. Let H' be a further transfer Krull monoid over a finite ablian group G' and suppose that L (H)= L (H'). We prove that, if G Cnr with r n-3 or (r n-1 2 and n is a prime power), then G and G' are isomorphic.