Three different styles of foundations of mathematics are now commonplace: set theory, type theory, and category theory. How do they relate, and how do they differ? What advantages and disadvantages does each one have over the others? We pursue these questions by considering interpretations of each system into the others and examining the preservation and loss of mathematical content thereby. In order to stay focused on the “big picture”, we merely sketch the overall form of each construction, referring to the literature for details. Each of the three steps considered below is based on more recent logical research than the preceding one. The first step from sets to types is essentially the familiar idea of set theoretic semantics for a synta...
This paper is a literature survey on homotopy type theory, analyzing the formalization of sets withi...
Category theory is discussed as an appropriate mathematical basis for the formalization and study of...
This is the first of two articles dedicated to the notion of con-structive set. In them we attempt a...
Set-theoretic and category-theoretic foundations represent different perspectives on mathematical su...
First we introduce some basic theoretical issues that set the stage for subsequent accounts. Secondl...
Contemporary mathematics consists of many different branches and is intimately related to various ot...
Recent years have seen a wealth of discussion on the topic of the foundations of mathematics, and th...
Category theory helps unify the algebraic and topological aspects of mathematics. For example, start...
Category Theory (CT) is a branch of mathematics regarded by its proponents either as an alternative ...
Category theory has been advocated as a replacement for set theory as the foundation for mathematics...
Formal Axiomatic method as exemplified in Hilbert’s Grundlagen der Geometrie is based on a structura...
Critique of set-theory as a founding theory of category-theory. Proposal of a theory of sets and cla...
We can learn from questions as well as from their answers. This paper urges some things to learn fro...
This paper considers the nature and role of axioms from the point of view of the current debates abo...
This paper examines the connections between intuitionistic type theory and category theory. A versi...
This paper is a literature survey on homotopy type theory, analyzing the formalization of sets withi...
Category theory is discussed as an appropriate mathematical basis for the formalization and study of...
This is the first of two articles dedicated to the notion of con-structive set. In them we attempt a...
Set-theoretic and category-theoretic foundations represent different perspectives on mathematical su...
First we introduce some basic theoretical issues that set the stage for subsequent accounts. Secondl...
Contemporary mathematics consists of many different branches and is intimately related to various ot...
Recent years have seen a wealth of discussion on the topic of the foundations of mathematics, and th...
Category theory helps unify the algebraic and topological aspects of mathematics. For example, start...
Category Theory (CT) is a branch of mathematics regarded by its proponents either as an alternative ...
Category theory has been advocated as a replacement for set theory as the foundation for mathematics...
Formal Axiomatic method as exemplified in Hilbert’s Grundlagen der Geometrie is based on a structura...
Critique of set-theory as a founding theory of category-theory. Proposal of a theory of sets and cla...
We can learn from questions as well as from their answers. This paper urges some things to learn fro...
This paper considers the nature and role of axioms from the point of view of the current debates abo...
This paper examines the connections between intuitionistic type theory and category theory. A versi...
This paper is a literature survey on homotopy type theory, analyzing the formalization of sets withi...
Category theory is discussed as an appropriate mathematical basis for the formalization and study of...
This is the first of two articles dedicated to the notion of con-structive set. In them we attempt a...