Add to ORKGIn this paper I argue that Category theory provides an alternative to Hilbert’s Formal Axiomatic method and doesn't support Mathematical Structuralism
In this paper, I explore Bunge’s fictionism in philosophy of mathematics. After an overview of Bunge...
Hermeneutic fictionalism about mathematics maintains that mathematics is not committed to the existe...
We discuss ways in which category theory might be useful in philosophy of science, in particular for...
why Category theory does not support mathematical structuralism 1. Mathematical Interpretation a) He...
Formal Axiomatic method as exemplified in Hilbert’s Grundlagen der Geometrie is based on a structura...
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...
Category theory (CT) is important in virtue of its mathematical applications and its power to genera...
This article surveys recent literature by Parsons, McGee, Shapiro and others on the significance of ...
This paper sets out to explore how hermeneutics might offer an approach to describing the nature of ...
Category theory (CT) is important in virtue of its mathematical applications and its power to genera...
Higher-dimensional algebra, also known as higher-dimensional category theory, is a large-scale conte...
We explore an alternative interpretation to the abstract mathematical subject of category theory, by...
The debate on structuralism in the philosophy of mathematics has brought into focus a question about...
In this paper, I explore Bunge’s fictionism in philosophy of mathematics. After an overview of Bunge...
Hermeneutic fictionalism about mathematics maintains that mathematics is not committed to the existe...
We discuss ways in which category theory might be useful in philosophy of science, in particular for...
why Category theory does not support mathematical structuralism 1. Mathematical Interpretation a) He...
Formal Axiomatic method as exemplified in Hilbert’s Grundlagen der Geometrie is based on a structura...
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...
Category theory (CT) is important in virtue of its mathematical applications and its power to genera...
This article surveys recent literature by Parsons, McGee, Shapiro and others on the significance of ...
This paper sets out to explore how hermeneutics might offer an approach to describing the nature of ...
Category theory (CT) is important in virtue of its mathematical applications and its power to genera...
Higher-dimensional algebra, also known as higher-dimensional category theory, is a large-scale conte...
We explore an alternative interpretation to the abstract mathematical subject of category theory, by...
The debate on structuralism in the philosophy of mathematics has brought into focus a question about...
In this paper, I explore Bunge’s fictionism in philosophy of mathematics. After an overview of Bunge...
Hermeneutic fictionalism about mathematics maintains that mathematics is not committed to the existe...
We discuss ways in which category theory might be useful in philosophy of science, in particular for...