Add to ORKGCategory theory (CT) is important in virtue of its mathematical applications and its power to generate philosophical debate. It is a language for algebraic topology, a deductive system in homological algebra, and, as an alternative to set theory, a means of object construction (in Grothendieck's conception of algebraic geometry). Unpublished sources show that Grothendieck quit the Bourbaki group because of a debate on CT, which was partly epistemological in nature, especially as far as set-theoretical realisation of categorical constructions was concerned. We claim that CT is fundamental because it is a theory of some typical operations of structural mathematics: in our pragmatic perspective, justification of mathematical knowledge is not p...
Set-theoretic and category-theoretic foundations represent different perspectives on mathematical su...
In the paper we discuss the problem of limitations of freedom in mathematics and search for criteria...
Set-theoretic and category-theoretic foundations represent different perspectives on mathematical su...
Category theory (CT) is important in virtue of its mathematical applications and its power to genera...
Category theory (CT) is important in virtue of its mathematical applications and its power to genera...
Category theory (CT) is important in virtue of its mathematical applications and its power to genera...
La théorie des catégories (TC) vaut tant par ses applications mathématiques que par les débats philo...
Category Theory (CT) is a branch of mathematics regarded by its proponents either as an alternative ...
We can learn from questions as well as from their answers. This paper urges some things to learn fro...
Formal Axiomatic method as exemplified in Hilbert’s Grundlagen der Geometrie is based on a structura...
SCOPE AND CONI'ENTS: This THESIS comprises the core of Chapter I and a self-contained excerpt f...
Category theory helps unify the algebraic and topological aspects of mathematics. For example, start...
In this paper I argue that Category theory provides an alternative to Hilbert’s Formal Axiomatic met...
Formal Axiomatic method as exemplified in Hilbert’s Grundlagen der Geometrie is based on a structura...
Category theory has been advocated as a replacement for set theory as the foundation for mathematics...
Set-theoretic and category-theoretic foundations represent different perspectives on mathematical su...
In the paper we discuss the problem of limitations of freedom in mathematics and search for criteria...
Set-theoretic and category-theoretic foundations represent different perspectives on mathematical su...
Category theory (CT) is important in virtue of its mathematical applications and its power to genera...
Category theory (CT) is important in virtue of its mathematical applications and its power to genera...
Category theory (CT) is important in virtue of its mathematical applications and its power to genera...
La théorie des catégories (TC) vaut tant par ses applications mathématiques que par les débats philo...
Category Theory (CT) is a branch of mathematics regarded by its proponents either as an alternative ...
We can learn from questions as well as from their answers. This paper urges some things to learn fro...
Formal Axiomatic method as exemplified in Hilbert’s Grundlagen der Geometrie is based on a structura...
SCOPE AND CONI'ENTS: This THESIS comprises the core of Chapter I and a self-contained excerpt f...
Category theory helps unify the algebraic and topological aspects of mathematics. For example, start...
In this paper I argue that Category theory provides an alternative to Hilbert’s Formal Axiomatic met...
Formal Axiomatic method as exemplified in Hilbert’s Grundlagen der Geometrie is based on a structura...
Category theory has been advocated as a replacement for set theory as the foundation for mathematics...
Set-theoretic and category-theoretic foundations represent different perspectives on mathematical su...
In the paper we discuss the problem of limitations of freedom in mathematics and search for criteria...
Set-theoretic and category-theoretic foundations represent different perspectives on mathematical su...