On Graded φ-Prime Submodules

Abstract

Let R be a graded commutative ring with non-zero unity 1 and M be a graded unitary R-module. Let GS(M) be the set of all graded R-submodules of M and φ: GS(M)→ GS(M)\\ be a function. A proper graded R-submodule K of M is said to be a graded φ-prime R-submodule of M if whenever r is a homogeneous element of R and m is a homogeneous element of M such that rm∈ K-φ(K), then either m∈ K or r∈ (K:RM). If φ(K)= for all K∈ GS(M), then a graded φ-prime submodule is exactly a graded prime submodule. If φ(K)=\0\ for all K∈ GS(M), then a graded φ-prime submodule is exactly a graded weakly prime submodule. Several properties of graded φ-prime submodules have been investigated.