On the Algebraic and Arithmetic structure of the monoid of Product-one sequences II

Abstract

Let G be a finite group and G' its commutator subgroup. By a sequence over G, we mean a finite unordered sequence of terms from G, where repetition is allowed, and we say that it is a product-one sequence if its terms can be ordered such that their product equals the identity element of G. The monoid B (G) of all product-one sequences over G is a finitely generated C-monoid whence it has a finite commutative class semigroup. It is well-known that the class semigroup is a group if and only if G is abelian (equivalently, B (G) is Krull). In the present paper we show that the class semigroup is Clifford (i.e., a union of groups) if and only if |G'| 2 if and only if B (G) is seminormal, and we study sets of lengths in B (G).