Add to ORKGThis article draws on several crucial and unpublished manuscripts from the Scholem Archive in exploration of Gershom Scholem's youthful statements on mathematics and its relation to extra-mathematical facts and, more broadly, to a concept of history that would prove to be consequential for Walter Benjamin's own thinking on "messianism" and a "futuristic politics." In context of critiquing the German Youth Movement's subsumption of active life to the nationalistic conditions of the "earth" during the First World War, Scholem turns to mathematics for a genuine and self-consistent theory of action. In the concept of actual infinity (in Cantor and Bolzano) he finds an explanation of how mathematics relates to "the physical" without reducing the...
Den Mittelpunkt des folgenden Diskurses bildet ein Projekt des Neukantianers Hermann Cohen (1842-191...
In order to explain Wittgenstein’s account of the reality of completed infinity in mathematics, a br...
The mathematician Georg Cantor strongly believed in the existence of actually infinite numbers and s...
This article draws on several crucial and unpublished manuscripts from the Scholem Archive in explor...
This article draws on several crucial and unpublished manuscripts from the Scholem Archive in explor...
In this article the initial discussion of the untenability of the distinction between “pure” and “ap...
"The definitive clarification of the nature of the infinite has become necessary, not merely for the...
The seventeenth century was an important period in the conceptual development of the notion of the i...
This paper explores the concept of infinity in mathematics and its relation to theological considera...
Infinity is not an easy concept. A number of difficulties that people cope with when dealing with pr...
This paper argues that the principle of continuity that underlies Benjamin’s understanding of what m...
The notion of indivisibles and atoms arose in ancient Greece. The continuum—that is, the collection ...
Thesis advisor: Patrick ByrneIn the late 19th century, Georg Cantor opened up the mathematical field...
I address the historical emergence of the mathematical infinite, and how we are to take the infinite...
Language is at the basis of Benjamin’s critique of knowledge in On Language as Such and on the Lang...
Den Mittelpunkt des folgenden Diskurses bildet ein Projekt des Neukantianers Hermann Cohen (1842-191...
In order to explain Wittgenstein’s account of the reality of completed infinity in mathematics, a br...
The mathematician Georg Cantor strongly believed in the existence of actually infinite numbers and s...
This article draws on several crucial and unpublished manuscripts from the Scholem Archive in explor...
This article draws on several crucial and unpublished manuscripts from the Scholem Archive in explor...
In this article the initial discussion of the untenability of the distinction between “pure” and “ap...
"The definitive clarification of the nature of the infinite has become necessary, not merely for the...
The seventeenth century was an important period in the conceptual development of the notion of the i...
This paper explores the concept of infinity in mathematics and its relation to theological considera...
Infinity is not an easy concept. A number of difficulties that people cope with when dealing with pr...
This paper argues that the principle of continuity that underlies Benjamin’s understanding of what m...
The notion of indivisibles and atoms arose in ancient Greece. The continuum—that is, the collection ...
Thesis advisor: Patrick ByrneIn the late 19th century, Georg Cantor opened up the mathematical field...
I address the historical emergence of the mathematical infinite, and how we are to take the infinite...
Language is at the basis of Benjamin’s critique of knowledge in On Language as Such and on the Lang...
Den Mittelpunkt des folgenden Diskurses bildet ein Projekt des Neukantianers Hermann Cohen (1842-191...
In order to explain Wittgenstein’s account of the reality of completed infinity in mathematics, a br...
The mathematician Georg Cantor strongly believed in the existence of actually infinite numbers and s...