Multiplications on mixed abelian groups

A multiplication on an abelian group G is a homomorphism $$\mu: G\otimes G\rightarrow G$$. An mixed abelian group G is called an MT-group if every multiplication on the torsion part of the group G can be extended  uniquely to a multiplication on G. MT-groups have been studied in many articles on the theory of additive groups of rings, but their complete description has not yet been obtained. In this paper, a pure fully invariant subgroup $$G^*_\Lambda$$ is considered for an abelian MT-group G. One of the main properties of this subgroup is that $$\bigcap\limits_{p \in \Lambda (G)}pG^*_\Lambda$$ is a nil-ideal in every ring with the additive group G (here $$\Lambda (G)$$ is the set of all primes p, for which the p-primary component of G is non-zero). It is shown that for every MT-group G either $$G=G^*_\Lambda$$ or the quotient group $$G/G^*_\Lambda$$ is uncountable.

Abelian group, multiplication on a group, ring on an abelian group

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