In the present study , every module M is unitary and every ring F is commutative with identity. We gave a definition of a new class F − module which is namely S-pseudo bounded module symbolically (S-PS.B. F − module) and introduced some different approaches to attach this class with other types of well-known modules such that monoform module, quasi-Dedekind module, compressible module and retractable module. The main purpose of this article is to present a few new conditions for some corollaries and properties. The F − homomorphism of monoform and compressible modules connect in a useful way with an endomorphism of a F − module M that we relied on it in the definition of S-pseudo bounded module. We used the symbol End ( M ) which means the set of all endomorphism maps of F − module M . Also S-pseudo bounded module gave us directly or with some conditions different modules such as retractable module, an injective module and others.
Rashid et al. (Fri,) studied this question.