On Rad-⊕-Supplemented Modules
Yahya Talebi, Azadeh Mahmoudi
Abstract
Let R be a ring and M a right R-module. M is called Rad-⊕-s-module if every submodule of M has a Rad-supplement that is a direct summand of M, and M is called completely Rad-⊕-s-module if every direct summand of M is Rad-⊕-s-module. In this paper various properties of such modules are developed. It is shown that any finite direct sum of Rad-⊕-s-modules is Rad-⊕-s-module. We also show that if M is Rad-⊕-s-module with (D3), then M is completely Rad-⊕-s-module.
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Published
2011-08-01
How to Cite
Team, S. (2011). On Rad-⊕-Supplemented Modules: Yahya Talebi, Azadeh Mahmoudi. Thai Journal of Mathematics, 9(2), 373–381. Retrieved from https://thaijmath2.in.cmu.ac.th/index.php/thaijmath/article/view/270
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