2018-02-20T05:12:38Z
http://jas.shahroodut.ac.ir/?_action=export&rf=summon&issue=57
Journal of Algebraic Systems
JAS
2345-5128
2345-5128
2014
2
1
ON COMULTIPLICATION AND R-MULTIPLICATION MODULES
Ashkan
Nikseresht
Habib
Sharif
We state several conditions under which comultiplication and weak comultiplication modulesare cyclic and study strong comultiplication modules and comultiplication rings. In particular,we will show that every faithful weak comultiplication module having a maximal submoduleover a reduced ring with a finite indecomposable decomposition is cyclic. Also we show that if M is an strong comultiplication R-module, then R is semilocal and M is finitely cogenerated.Furthermore, we define an R-module M to be p-comultiplication, if every nontrivial submodule of M is the annihilator of some prime ideal of R containing the annihilator of M and give a characterization of all cyclic p-comultiplication modules. Moreover, we prove that every pcomultiplication module which is not cyclic, has no maximal submodule and its annihilator is not prime. Also we give an example of a module over a Dedekind domain which is not weak comultiplication, but all of whose localizations at prime ideals are comultiplication and hence serves as a counterexample to [10, Proposition 2.3] and [11, Proposition 2.4].
Comultiplication Module
r-Multiplication Module
p-Comultiplication Module
2014
09
01
1
19
http://jas.shahroodut.ac.ir/article_298_f888f28d2d7511ee49e8903f7599a544.pdf
Journal of Algebraic Systems
JAS
2345-5128
2345-5128
2014
2
1
DIFFERENTIAL MULTIPLICATIVE HYPERRINGS
L.
Kamali Ardekani
Bijan
Davvaz
There are several kinds of hyperrings, for example, Krasnerhyperrings, multiplicative hyperring, general hyperrings and$H_v$-rings. In a multiplicative hyperring, the multiplication isa hyperoperation, while the addition is a binary operation. In this paper, the notion of derivation on multiplicative hyperrings is introduced and some related properties are investigated. {bf Keywords:} multiplicative hyperring, derivation, differential hyperring.
multiplicative hyperring
derivation
differential hyperring
2014
09
01
21
35
http://jas.shahroodut.ac.ir/article_299_420674ca212578f4903402930ff38459.pdf
Journal of Algebraic Systems
JAS
2345-5128
2345-5128
2014
2
1
A CHARACTERIZATION OF BAER-IDEALS
Ali
Taherifar
An ideal I of a ring R is called right Baer-ideal if there exists an idempotent e 2 R such that r(I) = eR. We know that R is quasi-Baer if every ideal of R is a right Baer-ideal, R is n-generalized right quasi-Baer if for each I E R the ideal In is right Baer-ideal, and R is right principaly quasi-Baer if every principal right ideal of R is a right Baer-ideal. Therefore the concept of Baer ideal is important. In this paper we investigate some properties of Baer-ideals and give a characterization of Baer-ideals in 2-by-2 generalized triangular matrix rings, full and upper triangular matrix rings, semiprime ring and ring of continuous functions. Finally, we find equivalent conditions for which the 2-by-2 generalized triangular matrix ring is right SA.
Quasi-Baer ring
Generalized right quasi-Baer
Semicentral idempotent
Spec(R)
Extremally disconnected space
2014
09
01
37
51
http://jas.shahroodut.ac.ir/article_300_2e4cb45d9d8d73d64020a61a5b0b5a76.pdf
Journal of Algebraic Systems
JAS
2345-5128
2345-5128
2014
2
1
APPROXIMATE IDENTITY IN CLOSED CODIMENSION ONE IDEALS OF SEMIGROUP ALGEBRAS
bharam
Mohammadzadeh
Let S be a locally compact topological foundation semigroup with identity and Ma(S) be its semigroup algebra. In this paper, we give necessary and sufficient conditions to have abounded approximate identity in closed codimension one ideals of the semigroup algebra $M_a(S)$ of a locally compact topological foundationsemigroup with identity.
Approximate identity
codimension one ideal
foundation semigroup
semigroup algebras
2014
09
01
53
59
http://jas.shahroodut.ac.ir/article_301_7ee4ea8311e307d1890f997207da12dd.pdf
Journal of Algebraic Systems
JAS
2345-5128
2345-5128
2014
2
1
LIFTING MODULES WITH RESPECT TO A PRERADICAL
Tayyebeh
Amouzegar
Let $M$ be a right module over a ring $R$, $tau_M$ a preradical on $sigma[M]$, and$Ninsigma[M]$. In this note we show that if $N_1, N_2in sigma[M]$ are two$tau_M$-lifting modules such that $N_i$ is $N_j$-projective ($i,j=1,2$), then $N=N_1oplusN_2$ is $tau_M$-lifting. We investigate when homomorphic image of a $tau_M$-lifting moduleis $tau_M$-lifting.
preradical
hereditary
$tau_M$-lifting module
2014
09
01
61
65
http://jas.shahroodut.ac.ir/article_302_b20995498df3389eed9b24a2342bd647.pdf
Journal of Algebraic Systems
JAS
2345-5128
2345-5128
2014
2
1
BEST APPROXIMATION IN QUASI TENSOR PRODUCT SPACE AND DIRECT SUM OF LATTICE NORMED SPACES
Mahdi
Iranmanesh
Fateme
Solimani
We study the theory of best approximation in tensor product and the direct sum of some lattice normed spacesX_{i}. We introduce quasi tensor product space anddiscuss about the relation between tensor product space and thisnew space which we denote it by X boxtimesY. We investigate best approximation in direct sum of lattice normed spaces by elements which are not necessarily downwardor upward and we call them I_{m}-quasi downward or I_{m}-quasi upward.We show that these sets can be interpreted as downward or upward sets. The relation of these sets withdownward and upward subsets of the direct sum of lattice normedspaces X_{i} is discussed. This will be done by homomorphismfunctions. Finally, we introduce the best approximation of thesesets.
Best approximation
proximinal set
downward set
tensor
product
quasi tensor product
2014
09
01
67
81
http://jas.shahroodut.ac.ir/article_303_47a2d4b1a718f29bd44bf701d6db4309.pdf