In this article the initial discussion of the untenability of the distinction between “pure” and “applied" mathematics is followed by looking at alternative approaches regarding the relationship between mathematics and the “real world” - with intuitionism and Platonism representing the two opposite positions. The notions of infinity as well as the totality character of spatial continuity (and its implied infinite divisibility) turned out to occupy a central position in this context. In the final section brief attention is given - against the background of some perspectives on the history of mathematics - to an alternative approach in which both the uniqueness and the mutual irreducibility of number and space are conjectured
This thesis studies the position of mathematical realism (the position that mathematical objects hav...
Explaining his love of philosophy, Slavoj Žižek notes that he ‘secretly thinks reality ...
AbstractThis article compares treatments of the infinite, of continuity and definitions of real numb...
Mathematics is an integral cornerstone of science and society at large, and its implications and der...
The popular view that mathematics is “objective” and “neutral” in the sense that it does not know di...
There is a wide range of realist but non-Platonist philosophies of mathematics—naturalist or Aristot...
This article proposes a brief argument for why mathematics is transcendental in so far as ...
In 1908, Henri Poincaré claimed that: ...the mathematical facts worthy of being studied are those wh...
In the Reality we know, we cannot say if something is infinite whether we are doing Physics, Biology...
The essence of number was regarded by the ancient Greeks as the root cause of the existence of the ...
This article draws on several crucial and unpublished manuscripts from the Scholem Archive in explor...
This paper revisits philosophical questions regarding the relationship between mathematics and matte...
This article draws on several crucial and unpublished manuscripts from the Scholem Archive in explor...
In the article, an argument is given that Euclidean geometry is a priori in the same way that number...
Infinity is not an easy concept. A number of difficulties that people cope with when dealing with pr...
This thesis studies the position of mathematical realism (the position that mathematical objects hav...
Explaining his love of philosophy, Slavoj Žižek notes that he ‘secretly thinks reality ...
AbstractThis article compares treatments of the infinite, of continuity and definitions of real numb...
Mathematics is an integral cornerstone of science and society at large, and its implications and der...
The popular view that mathematics is “objective” and “neutral” in the sense that it does not know di...
There is a wide range of realist but non-Platonist philosophies of mathematics—naturalist or Aristot...
This article proposes a brief argument for why mathematics is transcendental in so far as ...
In 1908, Henri Poincaré claimed that: ...the mathematical facts worthy of being studied are those wh...
In the Reality we know, we cannot say if something is infinite whether we are doing Physics, Biology...
The essence of number was regarded by the ancient Greeks as the root cause of the existence of the ...
This article draws on several crucial and unpublished manuscripts from the Scholem Archive in explor...
This paper revisits philosophical questions regarding the relationship between mathematics and matte...
This article draws on several crucial and unpublished manuscripts from the Scholem Archive in explor...
In the article, an argument is given that Euclidean geometry is a priori in the same way that number...
Infinity is not an easy concept. A number of difficulties that people cope with when dealing with pr...
This thesis studies the position of mathematical realism (the position that mathematical objects hav...
Explaining his love of philosophy, Slavoj Žižek notes that he ‘secretly thinks reality ...
AbstractThis article compares treatments of the infinite, of continuity and definitions of real numb...