On the incomparability of systems of sets of lengths

Abstract

Let H be a Krull monoid with finite class group G such that every class contains a prime divisor. We consider the system L (H) of all sets of lengths of H and study when L (H) contains or is contained in a system L (H') of a Krull monoid H' with finite class group G', prime divisors in all classes and Davenport constant D (G')= D (G). Among others, we show that if G is either cyclic of order m 7 or an elementary 2-group of rank m-1 6, and G' is any group which is non-isomorphic to G but with Davenport constant D (G')= D (G), then the systems L (H) and L (H') are incomparable.