Generalizations of prime submodules over non-commutative rings

Abstract

Throughout this paper, R is an associative ring (not necessarily commutative) with identity and M is a right R-module with unitary. In this paper, we introduce a new concept of φ-prime submodule over an associative ring with identity. Thus we define the concept as following: Assume that S(M) is the set of all submodules of M and φ:S(M)→ S(M)\\ is a function. For every Y∈ S(M) and ideal I of R, a proper submodule X of M is called φ-prime, if YI⊂eq X and YIφ(X), then Y⊂eq X or I⊂eq(X:RM). Then we examine the properties of φ-prime submodules and characterize it when M is a multiplication module.