Degree of variance parabolically- Kahlerian spaces Relative Holomorphically projective Mappings

In this paper defined important expressions, a remembered important theorem which we need , approved essential theorem to be exist non trivial Holomorphically projective mapping between Kahlerian spaces. Finally we specified Kahlerian spaces which have maximum degree of variance parabolically – Kahlerian spaces.

Quasi–Hereditary Rings and Modules

The concept of hereditary and semi-hereditary rings and modules has grate effect in Theory of rings and modules, because the relation between this concepts with Baer and Rickart rings and modules. For this reason, we generalize this concept by quasihereditary rings.

Isometric and projective transformations of Parabolically- Kahlerian flat Spaces

In this paper remembered important expressions and theorems related of paper, After word try to find conditions to be exist Isometric transformation and projective Transformation in in Parabolically- Kahlerian flat Spaces, and try to limiting the number of motion parameter in this transformations .

القراءات الإسقاطية النفسية لمشهد الأنثى في نصوص جاهلية

Cash visions variation around the female and a clear indicator of a scene reflects the importance of the female element in the pre-Islamic life despite the harsh environment and the patriarchal society, and the result of this disparity Reading richer cash psychological readings party by Arab literature.

The semi-potent endomorphism ring of a module

In this paper, we studied the concept of semi-potency of endomorphism ring of modules. In addition to that, it has been studied the endomorphism ring of semi injective ( projective) modules and direct injective ( projective) modules.

S.N Algorithm To Find Cycle Intersection Of Tow Projective Curves

It may be difficult, often, finding the cycle intersection of two curves in the projective plane. Therefore, in our paper, we have mentioned a new mechanism to find it which was represented by S.N algorithm that works on writing this intersection as sum of simple cycle intersections which is easy to find. On the other hand, by this algorithm we mentioned a new and simplified proof of the known Bezout’s theorem.

Locally Projective and Locally Injective Modules II

The object of this paper is to study the locally projective and locally injective modules. Specifically, this paper is a continuation of study of locally projective and locally injective modules, where a new description of locally projective and locally injective modules is obtained.

Locally Projective and Locally Injective Modules

The object of this paper is to study the endomorphism rings of locally projective and locally injective modules. Specifically, this paper is a continuation of study of endomorphism rings of locally projective and locally injective modules to be semipotent rings.

Endomorphism Rings Of Modules

The objective of this paper is to continue our study for a right 1 I - rings and to generalize the concept of 1 I - rings to modules. We call a ring R a right 1 I - ring if every right annihilator for any element of R contains a nonzero idempotent.

I1 -RINGS

The objectiv of this paper is to study the relationship between certain ring R and endomorphism rings of free modules over R. Specifically, the basic problem is to describe ring R, which for it endomorphism ring of all free R-module, is a generalized right Baer ring, right I1-ring. Call a ring R is a generalized right Baer ring if any right annihilator contains a non-zero idempotent. We call a ring R is right I1-ring if the right annihilator of any element of R contains a non-zero idempotent. This text is showing that each right ideal of a ring R contains a projective right ideal if the endomorphism ring of any free R-module is a right I1-ring. And shown over a ring R, the endomorphism ring of any free R-module is a generalized right Baer ring if and only if endomorphism ring of any free R-module is an I1-ring.