Additive unit structure of endomorphism rings and invariance of modules

Asensio, Pedro A. Guil; Quynh, Truong Cong; Srivastava, Ashish K.

doi:10.1007/s13373-016-0096-z

Cited by 22 publications

(7 citation statements)

References 34 publications

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“…We begin by noting an important structural result from [11] which will be of crucial importance throughout.…”

Section: Resultsmentioning

confidence: 99%

“…Theorem 2.1. [11] Let X be an enveloping (resp., covering) class of modules. If u : M → X is a monomorphic X -envelope (resp., p : X → M is an epimorphic cover) of a module M such that M is X -automorphism invariant (resp., X -automorphism coinvariant) and End (X)/J(End (X)) is a von Neumann regular right self-injective ring and idempotents lift modulo J(End (X)), then End (M )/J(End (M )) is also a von Neumann regular ring and idempotents in End(M )/J(End (M )) lift to idempotents in End (M ).…”

Section: Resultsmentioning

confidence: 99%

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Modules which are coinvariant under automorphisms of their projective covers

et al. 2016

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In this paper we study modules coinvariant under automorphisms of their projective covers. We first provide an alternative, and in fact, a more succinct and conceptual proof for the result that a module M is invariant under automorphisms of its injective envelope if and only if given any submodule N of M , any monomorphism f : N → M can be extended to an endomorphism of M and then, as a dual of it, we show that over a right perfect ring, a module M is coinvariant under automorphisms of its projective cover if and only if for every submodule N of M , any epimorphism ϕ : M → M/N can be lifted to an endomorphism of M .2010 Mathematics Subject Classification. 16D40, 16D80.

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“…We begin by noting an important structural result from [11] which will be of crucial importance throughout.…”

Section: Resultsmentioning

confidence: 99%

Section: Resultsmentioning

confidence: 99%

Modules which are coinvariant under automorphisms of their projective covers

et al. 2016

Self Cite

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“…Общая теория модулей, инвариантных и коинвариантных относительно автоморфизмов соответственно своей оболочки и своего накрытия, была в последнее время развита в [20][21][22]. Теория модулей, инвариантных относительно идемпотентных эндморфизмов своей оболочки, изучена в [23].…”

Section: Introductionunclassified

Модули, Коинвариантные Относительно Идемпотентных Эндоморфизмов Своих Накрытий

Abyzov¹,

Le²,

Truong³

et al. 2019

Sib. Mat. Zh.

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Аннотация. Изучаются модули, коинвариантные относительно идемпотентных эндоморфизмов своих накрытий. Вводятся и изучаются обобщения дискретных и непрерывных модулей с помощью теории накрытий и оболочек модулей. В качестве приложения рассмотрены случаи плоских накрытий, инъективных оболочек и чисто инъективных оболочек.

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“…[13] (respectively [12]). We refer to [19] for some general statements about modules which are invariant with respect to classes of endomorphisms of injective hulls.…”

Section: Introductionmentioning

confidence: 99%