Some Results on Simple-Direct-Injective Modules

Derya Keskin Tütüncü; Rachid Tribak

doi:10.5666/KMJ.2023.63.4.521

Some Results on Simple-Direct-Injective Modules

Derya Keskin Tütüncü
, Rachid Tribak

Division of Algebra and Number Theory

Centre Régional des Métiers de l’Education et de la Formation (CRMEF-TTH)Tanger

Research output: Contribution to journal › Article › peer-review

1 Citation (Scopus)

Abstract

A module M is called a simple-direct-injective module if, whenever A and B are simple submodules of M with A ^∼= B and B is a direct summand of M, then A is a direct summand of M. Some new characterizations of these modules are proved. The structure of simple-direct-injective modules over a commutative Dedekind domain is fully determined. Also, some relevant counterexamples are indicated to show that a left simple-direct-injective ring need not be right simple-direct-injective.

Original language	English
Pages (from-to)	521-537
Number of pages	17
Journal	Kyungpook Mathematical Journal
Volume	63
Issue number	4
DOIs	https://doi.org/10.5666/KMJ.2023.63.4.521
Publication status	Published - 2023

Keywords

Dedekind domain
Left (Right) simple-direct-injective ring
Simple-Direct-Injective module

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10.5666/KMJ.2023.63.4.521

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abstract = "A module M is called a simple-direct-injective module if, whenever A and B are simple submodules of M with A ∼= B and B is a direct summand of M, then A is a direct summand of M. Some new characterizations of these modules are proved. The structure of simple-direct-injective modules over a commutative Dedekind domain is fully determined. Also, some relevant counterexamples are indicated to show that a left simple-direct-injective ring need not be right simple-direct-injective.",

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AU - Tribak, Rachid

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PY - 2023

Y1 - 2023

N2 - A module M is called a simple-direct-injective module if, whenever A and B are simple submodules of M with A ∼= B and B is a direct summand of M, then A is a direct summand of M. Some new characterizations of these modules are proved. The structure of simple-direct-injective modules over a commutative Dedekind domain is fully determined. Also, some relevant counterexamples are indicated to show that a left simple-direct-injective ring need not be right simple-direct-injective.

AB - A module M is called a simple-direct-injective module if, whenever A and B are simple submodules of M with A ∼= B and B is a direct summand of M, then A is a direct summand of M. Some new characterizations of these modules are proved. The structure of simple-direct-injective modules over a commutative Dedekind domain is fully determined. Also, some relevant counterexamples are indicated to show that a left simple-direct-injective ring need not be right simple-direct-injective.

KW - Dedekind domain

KW - Left (Right) simple-direct-injective ring

KW - Simple-Direct-Injective module

UR - https://www.scopus.com/pages/publications/85189441031

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SP - 521

EP - 537

JO - Kyungpook Mathematical Journal

JF - Kyungpook Mathematical Journal

IS - 4

ER -

Some Results on Simple-Direct-Injective Modules

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Keywords

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