S-prime and S-weakly prime submodules

Abstract

In this study, all rings are commutative with non-zero identity and all modules are considered to be unital. Let M be a left R-module. A proper submodule N of M is called an S-weakly prime submodule if 0M≠ f(m)∈ N implies that either m∈ N or f(M)⊂eq N, where f∈ S=End(M) and m∈ M. Some results concerning S-prime and S-weakly prime submodules are obtained. Then we study S-prime and S-weakly prime submodules of multiplication modules. Also for R-modules M1 and M2, we examine S-prime and S-weakly prime submodules of M=M1× M2, where S=S1× S2, S1=End(M1) and S2=End(M2).