Add to ORKGWe will discuss the 9th axiom of Zermelo-Fraenkel set theory with choice, which is often abbreviated ZFC, since it includes the axiom of choice (AC). AC is a controversial axiom that is mathematically equivalent to many well known theorems and has an interesting history in set theory. This thesis is a combination of discussion of the history of the axiom and the reasoning behind why the axiom is controversial. This entails several proofs of theorems that establish the fact that AC is equivalent to such theorems and notions as Tychonoff\u27s Theorem, Zorn\u27s Lemma, the Well-Ordering Theorem, and many more
In 1963, the first author introduced a course in set theory at the Uni versity of Illinois whose ma...
RESUMEN: El axioma de Elección fue enunciado por primera vez por Zermelo en 1904 y desde entonces ha...
This paper presents Wacław Sierpiński – the first advocate of the axiom of choice. We focus on the p...
In this paper I will be discussing the Axiom of Choice and its equivalent statements. The Axiom of C...
In set theory, the Axiom of Choice (AC) was formulated in 1904 by Ernst Zermelo. It is an addition ...
Treballs Finals de Grau de Matemàtiques, Facultat de Matemàtiques, Universitat de Barcelona, Any: 20...
When people think of mathematics they think right or wrong, empirically correct or empirically ...
In 1883, Georg Cantor proposed that it was a valid law of thought that every set can be well ordered...
summary:Many fundamental mathematical results fail in {\bf{ZF}}, i.e., in Zermelo-Fraenkel set theor...
The theory of choice sequences is usually considered to be far from the mainstream of mathematics. I...
We show that the Peano axioms do not meet ZFC axioms. We discuss that a set of natural numbers, i.e....
For mathematicians interested in problems of foundations, logical-mathematicians and philosophers of...
My research concerns the search for and justification of new axioms in math-ematics. The need for ne...
Abstract. We show that it is not possible to construct a Fraenkel-Mostowski model in which the axiom...
Working within the Zermelo-Frankel Axioms of set theory, we will introduce two important contradicto...
In 1963, the first author introduced a course in set theory at the Uni versity of Illinois whose ma...
RESUMEN: El axioma de Elección fue enunciado por primera vez por Zermelo en 1904 y desde entonces ha...
This paper presents Wacław Sierpiński – the first advocate of the axiom of choice. We focus on the p...
In this paper I will be discussing the Axiom of Choice and its equivalent statements. The Axiom of C...
In set theory, the Axiom of Choice (AC) was formulated in 1904 by Ernst Zermelo. It is an addition ...
Treballs Finals de Grau de Matemàtiques, Facultat de Matemàtiques, Universitat de Barcelona, Any: 20...
When people think of mathematics they think right or wrong, empirically correct or empirically ...
In 1883, Georg Cantor proposed that it was a valid law of thought that every set can be well ordered...
summary:Many fundamental mathematical results fail in {\bf{ZF}}, i.e., in Zermelo-Fraenkel set theor...
The theory of choice sequences is usually considered to be far from the mainstream of mathematics. I...
We show that the Peano axioms do not meet ZFC axioms. We discuss that a set of natural numbers, i.e....
For mathematicians interested in problems of foundations, logical-mathematicians and philosophers of...
My research concerns the search for and justification of new axioms in math-ematics. The need for ne...
Abstract. We show that it is not possible to construct a Fraenkel-Mostowski model in which the axiom...
Working within the Zermelo-Frankel Axioms of set theory, we will introduce two important contradicto...
In 1963, the first author introduced a course in set theory at the Uni versity of Illinois whose ma...
RESUMEN: El axioma de Elección fue enunciado por primera vez por Zermelo en 1904 y desde entonces ha...
This paper presents Wacław Sierpiński – the first advocate of the axiom of choice. We focus on the p...