In this paper we propose a new concept of primeness in quantales. It is proved that this concept coincide with classical definition in commutative quantales, but no longer valid in the noncommutative setting. Also, the notions of strong and uniform strong primeness are investigated
summary:\font\jeden=rsfs7 \font\dva=rsfs10 We study several choice principles for systems of finite ...
AbstractAn ideal I of a commutative ring R with identity is said to be coprimely packed by prime ide...
AbstractRegular projective quantales are characterized as the weakly ∗-stable completely distributiv...
In this paper, given two quantales non necessary with identity. We investigate the ideals, prime ide...
The Prime Ideal Theorem is shown to be equivalent with the following two statements (1) Any compact ...
AbstractIn this paper, we offer a general Prime Ideal Principle for proving that certain ideals in a...
A prime ideal p is said to be strongly prime if whenever p contains an intersection of ideals, p con...
The concept of prime ideal, which arises in the theory of rings as a generalization of the concept o...
The main aim of this project is to learn a branch of Mathematics that studies commutative rings with...
In this paper, the definition of a Q-P quantale module and some relative concepts were introduced. ...
Spectrum constructions appear throughout mathematics as a way of constructing topological spaces fro...
While the study of quantale-like structures goes back up to the 1930’s (notwithstanding that the ter...
The main aim of this investigation is to propose the notion of uniform and strong primeness in fuzz...
summary:The concept of a semiprime ideal in a poset is introduced. Characterizations of semiprime id...
The concern of this paper is to investigate the structure of skew polynomial rings (Ore extensions) ...
summary:\font\jeden=rsfs7 \font\dva=rsfs10 We study several choice principles for systems of finite ...
AbstractAn ideal I of a commutative ring R with identity is said to be coprimely packed by prime ide...
AbstractRegular projective quantales are characterized as the weakly ∗-stable completely distributiv...
In this paper, given two quantales non necessary with identity. We investigate the ideals, prime ide...
The Prime Ideal Theorem is shown to be equivalent with the following two statements (1) Any compact ...
AbstractIn this paper, we offer a general Prime Ideal Principle for proving that certain ideals in a...
A prime ideal p is said to be strongly prime if whenever p contains an intersection of ideals, p con...
The concept of prime ideal, which arises in the theory of rings as a generalization of the concept o...
The main aim of this project is to learn a branch of Mathematics that studies commutative rings with...
In this paper, the definition of a Q-P quantale module and some relative concepts were introduced. ...
Spectrum constructions appear throughout mathematics as a way of constructing topological spaces fro...
While the study of quantale-like structures goes back up to the 1930’s (notwithstanding that the ter...
The main aim of this investigation is to propose the notion of uniform and strong primeness in fuzz...
summary:The concept of a semiprime ideal in a poset is introduced. Characterizations of semiprime id...
The concern of this paper is to investigate the structure of skew polynomial rings (Ore extensions) ...
summary:\font\jeden=rsfs7 \font\dva=rsfs10 We study several choice principles for systems of finite ...
AbstractAn ideal I of a commutative ring R with identity is said to be coprimely packed by prime ide...
AbstractRegular projective quantales are characterized as the weakly ∗-stable completely distributiv...