Some results on strongly prime submodules
AR Naghipour - Journal of Algebraic Systems, 2014 - jas.shahroodut.ac.ir
Let $ R $ be a commutative ring with identity and let $ M $ be an $ R $-module. A proper
submodule $ P $ of $ M $ is called strongly prime submodule if $(P+ Rx: M) y P $ for $ x, y M …
submodule $ P $ of $ M $ is called strongly prime submodule if $(P+ Rx: M) y P $ for $ x, y M …
[PDF][PDF] SOME RESULTS ON STRONGLY PRIME SUBMODULES
AR NAGHIPOUR - Journal of Algebraic Systems, 2013 - scholar.archive.org
Let R be a commutative ring with identity and let M be an R-module. A proper submodule P
of M is called strongly prime submodule if (P+ Rx: M) y⊆ P for x, y∈ M, implies that x∈ P or …
of M is called strongly prime submodule if (P+ Rx: M) y⊆ P for x, y∈ M, implies that x∈ P or …
[PDF][PDF] SOME RESULTS ON STRONGLY PRIME SUBMODULES
AR NAGHIPOUR - Journal of Algebraic Systems, 2013 - jas.shahroodut.ac.ir
Let R be a commutative ring with identity and let M be an R-module. A proper submodule P
of M is called strongly prime submodule if (P+ Rx: M) y⊆ P for x, y∈ M, implies that x∈ P or …
of M is called strongly prime submodule if (P+ Rx: M) y⊆ P for x, y∈ M, implies that x∈ P or …