On ϕ-2-Absorbing Primary Submodules
R Moradi, M Ebrahimpour - Acta Mathematica Vietnamica, 2017 - Springer
Let R be a commutative ring with identity and M be a unitary R-module. Let ϕ: S (M)→ S
(M)∪∅ ϕ:S(M)→S(M)∪{∅\} be a function, where S (M) is the set of submodules of M. We …
(M)∪∅ ϕ:S(M)→S(M)∪{∅\} be a function, where S (M) is the set of submodules of M. We …
On ϕ-2-Absorbing Primary Submodules
R Moradi, M Ebrahimpour - Acta Mathematica Vietnamica, 2016 - infona.pl
Let R be a commutative ring with identity and M be a unitary R-module. Let ϕ: S (M)→ S
(M)∪{∅} $\phi: S (M)\rightarrow S (M)\cup\{\emptyset\} $ be a function, where S (M) is the set …
(M)∪{∅} $\phi: S (M)\rightarrow S (M)\cup\{\emptyset\} $ be a function, where S (M) is the set …
On ϕ-2-Absorbing Primary Submodules
R Moradi, M Ebrahimpour - Acta Mathematica Vietnamica, 2016 - infona.pl
Let R be a commutative ring with identity and M be a unitary R-module. Let ϕ: S (M)→ S
(M)∪{∅} $\phi: S (M)\rightarrow S (M)\cup\{\emptyset\} $ be a function, where S (M) is the set …
(M)∪{∅} $\phi: S (M)\rightarrow S (M)\cup\{\emptyset\} $ be a function, where S (M) is the set …