Abstract:
A ring on an abelian group $G$ is a ring, whose additive group is isomorphic to $G$.
A subgroup $A$ of an abelian group $G$ is called its absolute ideal,
if $A$ is an ideal in every ring on $G$.
In 1973. L.Fuchs formulated the problem of describing abelian groups,
on which there exists a ring structure,
whose every ideal is absolute.
Such abelian group is call a $RAI$-group.
A group $G$ is a group of class $K$,
if its $p$-component $T_p(G)$ is a separable and unbounded group for all prime $p$ such that
$T_p(G) \ne 0$
and every multiplication on the torsion subgroup $T(G)$ can be uniquely continued to a multiplication on $G$.
In this work, a description of countable $RAI$-groups of class $K$ is given.
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