In this paper we propose a reflection on the use of axiomatic set theory as a fundamental tool to address the foundational issues of mathematics. In particular, we focus on the key concept of infinty, indeed the strong"the Absolute" by Cantor), as we aim to show how the point of view offered by a specific set-theoretical framework allows us to deal with such a paradoxical notion in a completely safe manner. For this purpose, we shall introduce NBG set theory and discuss its consistency. We assume the reader is familiar with ZFC set theory (see for example [2] or [3])
When children play Superheroes and constantly try to one-up each other’s powers, it’s not unusual fo...
Set theory deals with the most fundamental existence questions in mathematics– questions which affect...
Considering the set of natural numbers N, then in the context of Peano axioms, we find a fundamental...
In this paper we propose a reflection on the use of axiomatic set theory as a fundamental tool to ad...
It is known that the Infinity Axiom can be expressed, even if the Axiom of Foundation is not assumed...
This paper expands upon a way in which we might rationally doubt that there are multiple sizes of in...
The infinite in mathematics has two manifestations. Its occurrence in analysis has been satisfactori...
AbstractWe develop an axiomatic set theory — the Theory of Hyperfinite Sets THS— which is based on t...
The concept of infinity refers to either an unending process or a limitless quantity. Aristotle intr...
An analysis of the well known paradoxes found in intuitive set theory has led to the reconstruction ...
Wilhelm Ackermann has proved that Zermelo-Fraenkel set theory in which the axiom of infinity is repl...
Often, people who study mathematics learn theorems to prove results in and about the vast array of b...
The aim of the present note is to show that it is possible, in the construction of numbers sets, to ...
Cantor thought of the principles of set theory or intuitive principles as universal forms that can a...
Those incompleteness theorems mean the relation of (Peano) arithmetic and (ZFC) set theory, or philo...
When children play Superheroes and constantly try to one-up each other’s powers, it’s not unusual fo...
Set theory deals with the most fundamental existence questions in mathematics– questions which affect...
Considering the set of natural numbers N, then in the context of Peano axioms, we find a fundamental...
In this paper we propose a reflection on the use of axiomatic set theory as a fundamental tool to ad...
It is known that the Infinity Axiom can be expressed, even if the Axiom of Foundation is not assumed...
This paper expands upon a way in which we might rationally doubt that there are multiple sizes of in...
The infinite in mathematics has two manifestations. Its occurrence in analysis has been satisfactori...
AbstractWe develop an axiomatic set theory — the Theory of Hyperfinite Sets THS— which is based on t...
The concept of infinity refers to either an unending process or a limitless quantity. Aristotle intr...
An analysis of the well known paradoxes found in intuitive set theory has led to the reconstruction ...
Wilhelm Ackermann has proved that Zermelo-Fraenkel set theory in which the axiom of infinity is repl...
Often, people who study mathematics learn theorems to prove results in and about the vast array of b...
The aim of the present note is to show that it is possible, in the construction of numbers sets, to ...
Cantor thought of the principles of set theory or intuitive principles as universal forms that can a...
Those incompleteness theorems mean the relation of (Peano) arithmetic and (ZFC) set theory, or philo...
When children play Superheroes and constantly try to one-up each other’s powers, it’s not unusual fo...
Set theory deals with the most fundamental existence questions in mathematics– questions which affect...
Considering the set of natural numbers N, then in the context of Peano axioms, we find a fundamental...