Rings on quotient divisible abelian groups

Abstract

The paper is devoted to the study of absolute ideals of groups in the class QD1, which consists of all quotient divisible abelian groups of torsion-free rank 1. A ring is called an AI-ring (respectively, an RF-ring) if it has no ideals except absolute ideals (respectively, fully invariant subgroups) of its additive group. An abelian group is called an RAI-group (respectively, an RFI-group) if there exists at least one AI-ring (respectively, FI-ring) on it. If every absolute ideal of an abelian group is a fully invariant subgroup, then this group is called an afi-group. It is shown that every group in QD1 is an RAI-group, an RFI-group, and an afi-group. Thus, Problem 93 of L. Fuchs' monograph ``Infinite Abelian Groups, Vol. II, New York-London: Academic Press, 1973'' is resolved within the class QD1. For any group in QD1, all rings on it that are AI-rings are described. Furthermore, the set of all AI-rings on G ∈ QD1 coincides with the set of all FI-rings on G. In addition, the principal absolute ideals of groups in QD1 are described.