On half-factoriality of transfer Krull monoids

Abstract

Let H be a transfer Krull monoid over a subset G0 of an abelian group G with finite exponent. Then every non-unit a∈ H can be written as a finite product of atoms, say a=u1 · … · uk. The set L(a) of all possible factorization lengths k is called the set of lengths of a, and H is said to be half-factorial if | L(a)|=1 for all a∈ H. We show that, if a ∈ H and | L(a (3(G) - 3)/2 )| = 1, then the smallest divisor-closed submonoid of H containing a is half-factorial. In addition, we prove that, if G0 is finite and | L(Πg∈ G0g2ord(g))|=1, then H is half-factorial.