On generalization of $⊕$-cofinitely supplemented modules
Abstract
We study the properties of ⊕-cofinitely radical supplemented modules, or, briefly, $cgs^{⊕}$-modules. It is shown that a module with summand sum property (SSP) is $cgs^{⊕}$ if and only if $M/w \text{Loc}^{⊕} M$ ($w \text{Loc}^{⊕} M$ is the sum of all $w$-local direct summands of a module $M$) does not contain any maximal submodule, that every cofinite direct summand of a UC-extending $cgs^{⊕}$-module is $cgs^{⊕}$, and that, for any ring $R$, every free $R$-module is $cgs^{⊕}$ if and only if $R$ is semiperfect.
Published
25.02.2010
How to Cite
NisanciB., and PancarA. “On Generalization of $⊕$-Cofinitely Supplemented Modules”. Ukrains’kyi Matematychnyi Zhurnal, Vol. 62, no. 2, Feb. 2010, pp. 183–189, https://umj.imath.kiev.ua/index.php/umj/article/view/2854.
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Section
Research articles