Abelian groups with normal endomorphism rings

被引：0

作者：

A. R. Chekhlov

机构：

来源：

Algebra and Logic | 2009年 / 48卷

关键词：

fully invariant subgroup; central invariant subgroup; normal endomorphism ring; invariant endomorphism ring; Lie bracket of endomorphisms.;

D O I：

暂无

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学科分类号：

摘要：

A ring is said to be normal if all of its idempotents are central. It is proved that a mixed group A with a normal endomorphism ring contains a pure fully invariant subgroup G ⊕ B, the endomorphism ring of a group G is commutative, and a subgroup B is not always distinguished by a direct summand in A. We describe separable, coperiodic, and other groups with normal endomorphism rings. Also we consider Abelian groups in which the square of the Lie bracket of any two endomorphisms is the zero endomorphism. It is proved that every central invariant subgroup of a group is fully invariant iff the endomorphism ring of the group is commutative.

引用

页码：298 / 308

页数：10

共 7 条

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[2] Szendrei J(1974)Abelian groups in which endomorphic images are fully invariant J. Alg. 29 232-245
[3] Lawver DA(1973)On the commutativity and generalized regularity of ε( Acta Math. Acad. Sci. Hung. 24 107-112
[4] Lawver DA(1965)) Acta Math. Acad. Sci. Hung. 16 23-26
[5] Reid JD(1965)On subcommutative rings Rend. Sem. Mat. Univ. Padova 35 171-175
[6] Orsatti A(1973)Su di un problema di T. Szele, e J Szendrei Acta Math. Acad. Sci. Hung. 24 59-63
[7] Schultz P(undefined)On a paper of Szele and Szendrei on groups with commutative endomorphism rings undefined undefined undefined-undefined

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