Add to ORKGNeutrices are convex subgroups of the nonstandard real number system, most of them are external sets. Because of the convexity and the invariance under some translations and multiplications, the external neutrices are models of orders of magnitude. A calculus of external numbers has been developped, which includes solving of equations, and even an analysis, for the structure of external numbers has a property of completeness. This paper contains a further step, towards linear algebra. We show that in R^{k}, with standard k, every neutrix is the direct sum of k neutrices of R. The components may be chosen orthogonal
The aim of this paper is to establish a strong foundation of number theoretical concepts in the neut...
The notion of neutrosophic ideal in subtraction algebras is introduced, and several properties are i...
AbstractWe introduce a new class of binary matroids called almost regular. Any such matroid is not r...
AbstractNeutrices are convex additive subgroups of the nonstandard space Rk, most of them are extern...
Neutrices and External Numbers: A Flexible Number System introduces a new model of orders of magnitu...
Neutrices are additive subgroups of a nonstandard model of the real numbers. An external number is t...
AbstractTheodore Motzkin proved, in 1936, that any polyhedral convex set can be expressed as the (Mi...
The objective of this paper is to introduce the concept of NeutroRings by considering three NeutroAx...
The objective of this paper is to introduce the concept of refined neutrosophic matrices as matrices...
The aim of this paper is to extend the concept of cubic sets to the neutrosophic sets. The notions o...
International audienceIn an attempt to generalize and create alternatives for classical algebraic st...
International audienceThe focus of this chapter is on the study of NeutroSemigroups. NeutroSemigroup...
The main goal of this paper is to study several structures generated by using 3-refined neutrosophic...
This paper studies the problem of determining invertible elements (units) in any n-refined neutrosop...
The objective of this paper is to study algebraic properties of neutrosophic matrices, where a neces...
The aim of this paper is to establish a strong foundation of number theoretical concepts in the neut...
The notion of neutrosophic ideal in subtraction algebras is introduced, and several properties are i...
AbstractWe introduce a new class of binary matroids called almost regular. Any such matroid is not r...
AbstractNeutrices are convex additive subgroups of the nonstandard space Rk, most of them are extern...
Neutrices and External Numbers: A Flexible Number System introduces a new model of orders of magnitu...
Neutrices are additive subgroups of a nonstandard model of the real numbers. An external number is t...
AbstractTheodore Motzkin proved, in 1936, that any polyhedral convex set can be expressed as the (Mi...
The objective of this paper is to introduce the concept of NeutroRings by considering three NeutroAx...
The objective of this paper is to introduce the concept of refined neutrosophic matrices as matrices...
The aim of this paper is to extend the concept of cubic sets to the neutrosophic sets. The notions o...
International audienceIn an attempt to generalize and create alternatives for classical algebraic st...
International audienceThe focus of this chapter is on the study of NeutroSemigroups. NeutroSemigroup...
The main goal of this paper is to study several structures generated by using 3-refined neutrosophic...
This paper studies the problem of determining invertible elements (units) in any n-refined neutrosop...
The objective of this paper is to study algebraic properties of neutrosophic matrices, where a neces...
The aim of this paper is to establish a strong foundation of number theoretical concepts in the neut...
The notion of neutrosophic ideal in subtraction algebras is introduced, and several properties are i...
AbstractWe introduce a new class of binary matroids called almost regular. Any such matroid is not r...