A neutrosophic hyperstructure is an algebraic structure generated by a given hyperstructure H and an indeterminacy factor I under the hyperoperation(s) of H. The objective of this paper is to study canonical hypergroups and hyperrings in which addition and multiplication are hyperoperations in a neutrosophic environment. Some basic properties of neutrosophic canonical hypergroups and neutrosophic hyperrings are presented. Quotient neutrosophic canonical hypergroups and neutrosophic hyperrings are presented
Neutrosophy as a generalization of classical logic introduced by Smarandache plays an important role...
NeutroSophication and AntiSophication are processes through which NeutroAlgebraic and AntiAlgebraic ...
Algebraic relations between rings are determined by homomorphisms and isomorphisms. This paper intro...
A neutrosophic hyperstructure is an algebraic structure generated by a given hyperstructure H and an...
International audienceRefinement of neutrosophic algebraic structure or hyperstructure allows for th...
The objective of this paper is to develop neutrosophic quadruple algebraic hyperstructures. Specical...
This paper is concerned with the introduction of neutrosophic hypernear-rings. The concept of neutro...
This paper presents the refinement of neutrosophic hypergroup and studies some of its properties. Se...
Given any algebraic hyperstructure (X,∗,◦), the objective of this paper is to generate a refined neu...
Hyperstructure theory, an 86 years old theory, has been of great interest for many algebraists where...
After introducing the notion of hyperstructures about 80 years ago by F. Marty, a number of research...
We introduced the theory of Single valued neutrosophic hypergroup as the initial theory of single va...
The objective of this paper is to study neutrosophic hypercompositional structures arising from the...
In this paper, we introduced the concepts of Single-valued neutrosophic hyperring and Single-valued ...
This paper presents the refinement of a type of neutrosophic hyperring in which +0 and · 0 are hyper...
Neutrosophy as a generalization of classical logic introduced by Smarandache plays an important role...
NeutroSophication and AntiSophication are processes through which NeutroAlgebraic and AntiAlgebraic ...
Algebraic relations between rings are determined by homomorphisms and isomorphisms. This paper intro...
A neutrosophic hyperstructure is an algebraic structure generated by a given hyperstructure H and an...
International audienceRefinement of neutrosophic algebraic structure or hyperstructure allows for th...
The objective of this paper is to develop neutrosophic quadruple algebraic hyperstructures. Specical...
This paper is concerned with the introduction of neutrosophic hypernear-rings. The concept of neutro...
This paper presents the refinement of neutrosophic hypergroup and studies some of its properties. Se...
Given any algebraic hyperstructure (X,∗,◦), the objective of this paper is to generate a refined neu...
Hyperstructure theory, an 86 years old theory, has been of great interest for many algebraists where...
After introducing the notion of hyperstructures about 80 years ago by F. Marty, a number of research...
We introduced the theory of Single valued neutrosophic hypergroup as the initial theory of single va...
The objective of this paper is to study neutrosophic hypercompositional structures arising from the...
In this paper, we introduced the concepts of Single-valued neutrosophic hyperring and Single-valued ...
This paper presents the refinement of a type of neutrosophic hyperring in which +0 and · 0 are hyper...
Neutrosophy as a generalization of classical logic introduced by Smarandache plays an important role...
NeutroSophication and AntiSophication are processes through which NeutroAlgebraic and AntiAlgebraic ...
Algebraic relations between rings are determined by homomorphisms and isomorphisms. This paper intro...