In fact, the real numbers do not have the structure of a field. Rather, they are the limit of a projective system. Thus, the real numbers are more accurately viewed as a completion of the rational numbers. This means that any real number can be expressed as a limit of rational numbers, and the operations of addition, subtraction, multiplication, and division on real numbers can all be approximated and performed through these rational numbers
The purpose of Dedekind cuts is to provide a sound logical foundation for the real number system. De...
A new method for representing positive integers and real numbers in a rational base is considered. I...
AbstractThis paper addresses the topic of the refinement of exact real numbers. It presents a three-...
The aim of this article is to provide a logical building of the real number system starting from the...
It is well-known that the real number system can be characterised as a topological space [1], [3], a...
Real numbers are divided into rational and irrational numbers. Students learn about this division al...
The purpose of this paper is to present a logical development of the real number system from a few b...
AbstractA new technique for the geometry of numbers is exhibited. This technique provides sharp esti...
A field extension R of the real numbers is presented. It has similar algebraic properties as ; for e...
AbstractBlum et al. (1989) showed the existence of a NP-complete problem over the real closed fields...
We give an equational specification of the field operations on the rational numbers under initial al...
AbstractThe only well-defined mathematical model of the real number system based on the field axioms...
While the rational numbers Q are dense in the real numbers R, it seems like there are many, many mor...
AbstractSome subfields of the field of real numbers which consist exclusively of rational numbers an...
In mathematics, the system of hyperreal numbers is a way of treating infinite and infinitesimal quan...
The purpose of Dedekind cuts is to provide a sound logical foundation for the real number system. De...
A new method for representing positive integers and real numbers in a rational base is considered. I...
AbstractThis paper addresses the topic of the refinement of exact real numbers. It presents a three-...
The aim of this article is to provide a logical building of the real number system starting from the...
It is well-known that the real number system can be characterised as a topological space [1], [3], a...
Real numbers are divided into rational and irrational numbers. Students learn about this division al...
The purpose of this paper is to present a logical development of the real number system from a few b...
AbstractA new technique for the geometry of numbers is exhibited. This technique provides sharp esti...
A field extension R of the real numbers is presented. It has similar algebraic properties as ; for e...
AbstractBlum et al. (1989) showed the existence of a NP-complete problem over the real closed fields...
We give an equational specification of the field operations on the rational numbers under initial al...
AbstractThe only well-defined mathematical model of the real number system based on the field axioms...
While the rational numbers Q are dense in the real numbers R, it seems like there are many, many mor...
AbstractSome subfields of the field of real numbers which consist exclusively of rational numbers an...
In mathematics, the system of hyperreal numbers is a way of treating infinite and infinitesimal quan...
The purpose of Dedekind cuts is to provide a sound logical foundation for the real number system. De...
A new method for representing positive integers and real numbers in a rational base is considered. I...
AbstractThis paper addresses the topic of the refinement of exact real numbers. It presents a three-...
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