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|Title||On Weakly Almost Generalized 2-Absorbing Sub-modules of Modules|
Let M be a module over a commutative ring R with non-zero identity. A proper sub-module N of M is called weakly almost generalized 2-absorbing (denoted by WAG2 -absorbing) sub-module, if for and with either or or for some positive integers and . We study the relation between WAG2 -absorbing sub-modules and primary, weak primary and weakly primary sub-modules. Also, we study the behavior of , when N is WAG2 -absorbing sub-module. Moreover, the WAG2 -absorbing sub-modules when are characterized.
|Published in||IUG Journal of Natural Studies: (Special Issue) The Sixth International Conference on Science & Development � 14-15 march 2017|
|Series||Volume: 25, Number: 2|
|Publisher||الجامعة الإسلامية - غزة|
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Naji, Osama Abd El Karim (الجامعة الإسلامية - غزة, 2016)Let R be a commutative ring with a nonzero identity and M be a unitary R-module. Chin Pi. Lu studied prime submodules. Many authors have investigated some generalizations of prime ideals and submodules to 2-absorbing ...
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