Products of k atoms in Krull monoids

Abstract

Let H be a Krull monoid with finite class group G such that every class contains a prime divisor. For k∈ N, let Uk(H) denote the set of all m∈ N with the following property: There exist atoms u1, …, uk, v1, … , vm∈ H such that u1·…· uk=v1·…· vm. It is well-known that the sets Uk (H) are finite intervals whose maxima k(H)= Uk(H) depend only on G. If |G| 2, then k (H) = k for every k ∈ N. Suppose that |G| 3. An elementary counting argument shows that 2k(H)=k D(G) and k D(G)+1 2k+1(H) k D(G)+ D(G)2 where D(G) is the Davenport constant. In Ga-Ge09b it was proved that for cyclic groups we have k D(G)+1 = 2k+1(H) for every k ∈ N. In the present paper we show that (under a mild condition on the Davenport constant) for every noncyclic group there exists a k*∈ N such that 2k+1(H)= k D(G)+ D(G)2 for every k k*. This confirms a conjecture of A. Geroldinger, D. Grynkiewicz, and P. Yuan in Ge-Gr-Yu15.