On $\tau_M$-Semilocal Modules and Rings
DOI:
https://doi.org/10.26713/cma.v1i3.122Keywords:
$\tau_M$-Supplement submodules, Weakly $\tau_M$-supplemented modules, $\tau_M$-Semilocal ringsAbstract
Let $\tau_M$ be any preradical for $\sigma[M]$ and $N$ any module in $\sigma[M]$. In [2], Al-Takhman, Lomp and Wisbauer defined and studied the concept of $\tau_M$-supplemented module. In this paper we define the concept of weakly $\tau_M$-supplemented module and investigate some properties of such modules. We show that weakly $\tau_M$-supplemented module $N$ is $\tau_M$-semilocal (i.e., $N/\tau_M(N)$ is semisimple) and that $R$ is a $\tau$-semilocal ring if and only if $_{R}R$ (or $R_R$) is weakly $\tau_M$-supplemented.Downloads
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How to Cite
Talebi, Y., Amoozegar, T., & Mansoury, Z. (2010). On $\tau_M$-Semilocal Modules and Rings. Communications in Mathematics and Applications, 1(3), 145–151. https://doi.org/10.26713/cma.v1i3.122
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