论非交换环上的自变不变乘法模块

IF 0.5 Q3 MATHEMATICS

International Electronic Journal of Algebra Pub Date : 2023-10-05 DOI:10.24330/ieja.1411145

L. Thuyet, T. C. Quynh

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引用次数: 0

摘要

模块的重要类别之一是交换环上的乘法模块类。许多学者都研究过这一课题，并在这一领域取得了许多成果。之后，图甘巴耶夫也考虑了非交换环上的乘法模块。在本文中，我们继续考虑非交换环上乘法模块的自变不变性。我们证明，如果 $R$ 是一个右杜环，并且 $M$ 是一个乘法、有限生成的右 $R$ 模块，它有一个生成集 $\{m_1, \dots , m_n\}$ ，使得 $r(m_i) = 0$ 并且 $[m_iR: M] \subseteq C(R)$ 是 $R$ 的中心，那么 $M$ 是投影的。此外，如果 $R$ 是一个右二元、左准二元、CMI 环，并且 $M$ 是一个乘法、非奇异、自变量不变、有限生成的右 $R$ 模块，它有一个生成集 $\{m_1, \dots , m_n\}$，使得 $r(m_i) = 0$ 并且 $[m_iR: M] \subseteq C(R)$ 是 $R$ 的中心，那么 $M_R \cong R$ 是注入的。

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On Automorphism-invariant multiplication modules over a noncommutative ring

One of the important classes of modules is the class of multiplication modules over a commutative ring. This topic has been considered by many authors and numerous results have been obtained in this area. After that, Tuganbaev also considered the multiplication module over a noncommutative ring. In this paper, we continue to consider the automorphism-invariance of multiplication modules over a noncommutative ring. We prove that if $R$ is a right duo ring and $M$ is a multiplication, finitely generated right $R$-module with a generating set $\{m_1, \dots , m_n\}$ such that $r(m_i) = 0$ and $[m_iR: M] \subseteq C(R)$ the center of $R$, then $M$ is projective. Moreover, if $R$ is a right duo, left quasi-duo, CMI ring and $M$ is a multiplication, non-singular, automorphism-invariant, finitely generated right $R$-module with a generating set $\{m_1, \dots , m_n\}$ such that $r(m_i) = 0$ and $[m_iR: M] \subseteq C(R)$ the center of $R$, then $M_R \cong R$ is injective.

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来源期刊

International Electronic Journal of Algebra MATHEMATICS-

CiteScore

0.90

自引率

16.70%

发文量

审稿时长

36 weeks

期刊介绍： The International Electronic Journal of Algebra is published twice a year. IEJA is reviewed by Mathematical Reviews, MathSciNet, Zentralblatt MATH, Current Mathematical Publications. IEJA seeks previously unpublished papers that contain: Module theory Ring theory Group theory Algebras Comodules Corings Coalgebras Representation theory Number theory.