By Apichart Sa-nguannam

Year 2012

ABSTRACT

The purposes of this thesis are to (1) study properties and characterizations of small simple quasi-injective modules, (2) study properties and characterizations of endomorphism rings of small simple quasi-injective modules, (3) extend the concept of small principally quasi-injective modules, and (4) find some relations between small simple quasi-injective modules, small principally quasi-injective modules and projective modules. Let R be a ring. A right R-module M is called mininjective if, for each simple right ideal K of R, every R-homomorphism γ : K M extends to an R-homomorphism from R to M.

A right R-module N is called small principally Minjective if every R-homomorphism from a small and principal submodule of M to N can be extended to an R-homomorphism from M to N. A right R-module M is called small principally quasiinjective if it is small principally M-injective. The notion of small principally quasi-injective modules is extended to be small simple quasi-injective modules. A right R-module N is called small simple Minjective if every R-homomorphism from a small and simple submodule of M to N can be extended to an R-homomorphism from M to N. A right R-module M is called small simple quasiinjective if it is small simple M-injective.

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