بعض اعمامات المقاسات المتميزة == Some Generalizations of Distinguished Modules
Author name:
شيماء حبيب حسن
Supervisor name:
ليلى سلمان محمود
General topic:
Mathematics
Specific topic:
Mathematics
Degree:
Master
University:
University of Baghdad
Language:
English
University location:
Baghdad
First pages:
27T1019 - p.pdf
Abstract:
In this work, R is a commutative ring with identity and M be an (left) Rmodule.M is said to be a distinguished R - module provided that for each maximal ideal I of R. Our main concern in this work is to give and study some generalizations of distinguished modules by using some restrictions on the submodule of M. In this process we present two types of generalizations of distinguished modules, namely essentially distinguished modules and purely distinguished modules where we call M essentially distinguished when is an essential submodule of M for each maximal ideal I of R. And we call M purely distinguished when is a nonzero pure submodule of M for each maximal ideal I of R. We study these two types of modules in this thesis. The following are samples of some results that are proved in this work : 1. Let M be a principally quasi - injective R - module such that .Then M is essentially distinguished if and only if for each maximal ideal I of R, there exist such that and .2. Let M be a scalar (cyclic) principally quasi - injective R - module and let I be a maximal ideal of R. Then the following statements are equivalent : i. M is essentially distinguished.ii. contains a copy of every simple R - module.iii. is a cogenerator for Mod - R, provided that is compressible.iv. Every f. g. (or projective or multiplication) R - module is dualizable with respect to M.3. We assume M is faithful f. g. multiplication R - module. Then M is essentially distinguished if and only if R is essentially distinguished ring.4. Let M be an R - module which satisfies d. a. c. Then M is purely distinguished if and only if for each maximal ideal I of R, there exists such that (m) is pure in M and . 5. Let M be an R - module which satisfies d. a. c. If has (PSP) then M is purely distinguished.6. We take M is f. g. multiplication R - module. Then M is purely distinguished if and only if R is a purely distinguished ring.7. Let M be a distinguished faithful multiplication R - module. Then M is purely distinguished if and only if is a multiplication and an idempotent submodule of M for each maximal ideal I of R
