伪半投影模与自同态环

N. Ha
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引用次数: 0

摘要

一个模块$M$被称为伪半射影,如果对于所有的$\alpha,\beta\in \mathrm{End}_R(M)$和$\mathrm{Im}(\alpha)=\mathrm{Im}(\beta)$,都包含$\alpha\, \mathrm{End}_R(M)=\beta\, \mathrm{End}_R(M)$。本文研究了伪半射影模及其自同态环的一些性质。证明了一个环$ R$是一个半局部环当且仅当每个半原始有限生成的右$R$ -模都是伪半投影。此外,我们证明了如果$M$是一个具有有限空维的可伸缩伪半投影模,那么$\mathrm{End}_R(M)$是一个半局部环,并且对于$M$具有$h(M)$空维的某些自同态$h$, $\mathrm{End}_R(M)$的每一个极大右理想都具有$\{s \in \mathrm{End}_R(M) | \mathrm{Im}(s) + \mathrm{Ker}(h)\ne M\}$的形式。
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Pseudo semi-projective modules and endomorphism rings
A module $M$ is called pseudo semi-projective if, for all $\alpha,\beta\in \mathrm{End}_R(M)$ with $\mathrm{Im}(\alpha)=\mathrm{Im}(\beta)$, there holds $\alpha\, \mathrm{End}_R(M)=\beta\, \mathrm{End}_R(M)$. In this paper, we study some properties of pseudo semi-projective modules and their endomorphism rings. It is shown that a ring $ R$ is a semilocal ring if and only if each semiprimitive finitely generated right $R$-module is pseudo semi-projective. Moreover, we show that if $M$ is a coretractable pseudo semi-projective module with finite hollow dimension, then $\mathrm{End}_R(M)$ is a semilocal ring and every maximal right ideal of $\mathrm{End}_R(M)$ has the form $\{s \in \mathrm{End}_R(M) | \mathrm{Im}(s) + \mathrm{Ker}(h)\ne M\}$ for some endomorphism $h$ of $M$ with $h(M)$ hollow.
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来源期刊
CiteScore
1.20
自引率
40.00%
发文量
27
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