Semisimple Modules Relative to A Semiradical Property
DOI:
https://doi.org/10.24996/ijs.2022.63.11.26Keywords:
Semiradical (radical) property, Semisimple modules, t- semisimple modulesAbstract
In this paper, we introduce the concept of s.p-semisimple module. Let S be a semiradical property, we say that a module M is s.p - semisimple if for every submodule N of M, there exists a direct summand K of M such that K ≤ N and N / K has S. we prove that a module M is s.p - semisimple module if and only if for every submodule A of M, there exists a direct summand B of M such that A = B + C and C has S. Also, we prove that for a module M is s.p - semisimple if and only if for every submodule A of M, there exists an idempotent e ∊ End(M) such that e(M) ≤ A and (1- e)(A) has S.
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Published
2022-11-30
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Section
Mathematics
How to Cite
Semisimple Modules Relative to A Semiradical Property. (2022). Iraqi Journal of Science, 63(11), 4901-4910. https://doi.org/10.24996/ijs.2022.63.11.26
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