This study is an attempt to highlight the impact that pumping vocabulary in the
composition of poetry, and is no doubt that the semiotic this vocabulary effectively
contribute in giving a recipe poetic text, because they represent the signs of sema
ntics as
diverse contexts in which they are contained, and the dynamism achieved from a damaged
vocabulary within the same topic opens up new horizons, and pave the way for a variety of
readings, according to the ability of the recipient language, cognitive and proceeds, hence
the emphasis on the singular in construction as a key text for reproduction
again.
In this work , The fifth order non-polynomial spline functions is
used to solve linear volterra integral equations with weakly
singular kernel .
Numerical examples are presented to illustrate the applications
of this method and to compare the computed results with
other numerical methods.
We study in this paper one of functional analysis problems, involved with
construction a new class of functions, denoted by . The definition of the new
class depends on definition of Lebesgueclass of functions and on the Holder clas .
We study the
relation between the new class and approximation of the new class
to rational functions.
This paper concerns the mathematical, linear model of micropolar
elastic, homogeneous and isotropic body, of axisymetric state of
small deformations, in the frame of the linear theory of micropolar
elasticity with six material constants . In the p
aper, first
we introduce the dynamic displacements-rotation-temperature
equations for the considerable body in the axisymetric state of
small deformation , subjected to temperature field.
الجسم المرن البلوري ذو انفعالات صغيرة متناظرة محوريا و خاضع لحرارة
تركيب معادلات الإزاحات و الدورانات و الحرارة
الحلول الشاذة
Micropolar elastic body of axisymetric state of small deformations and subjected to temperature field
decomposing the dynamical displacements-rotationstemperature equations
singular solutions
The object of this paper is to study the total as substructure of hom (M,N) R
for any two modules R M and R N , one of interesting question, is when the total
of a module N equals the hom (N, J (N)) R .
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.
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.
Let M and N be two modules over a ring R. The object of this paper is the study
of substructures of hom (M, N) R such as, radical, the singular, and co-singular
ideal and the total. The new obtained results include necessary and sufficient
conditi
ons the total of a ring R to equal some ideal of R.