In this paper I offer an interpretation of the role of intuition in mathematical cognition in Kant’s philosophy of mathematics based on two novel and very recent interpretations of Kant’s epistemology. I argue, with Lucy Allais, that the primary role of intuition in cognition is in presenting objects and I argue, with Karl Schafer, that the contribution of these intuitions is in providing the concepts involved in the cognition with real possibility and determinate content. I argue that the primary role of intuition in mathematical cognition is in defining mathematical concepts. The essential contribution of intuition here is in establishing the real possibility of these concepts – that is, that there are objects that fall under thes...
According to Kant, the axioms of intuition, i.e. space and time, must provide an organization of the...
Many recent attempts to analyze Kant\u27s philosophy of mathematics have proceeded from within the c...
The crucial role played by intuition in Kant's theory of geometry has been widely discussed. Largely...
Recent debates in the interpretation of Kant’s theoretical philosophy have focused on the nature of ...
The aim of this paper is to shed light on the distinction between pure and empirical intuition, a...
Proposition 6.233 from Wittgenstein’s Tractatus has been read as a rejection of the Kantian claim th...
The crucial role played by intuition in Kant’s theory of geometry has been widely discussed. Largely...
When dealing with the relationship between mathematics and cognition, we face two main intellectual ...
The mathematical developments of the 19th century seemed to undermine Kant’s philosophy. Non-Euclide...
Chapter 3 further investigates the role of intuition in the application of concepts to intuitions. K...
In the recent debate between conceptualists and nonconceptualists about perceptual content, Kant’s n...
Intuitionism derives philosophically from Kant\u27s Conceptualism -- the object of the mathematical ...
The philosophy of Immanuel Kant contains an important rationalistic element, and the study and inter...
Kant’s transcendental philosophy (transcendentalism) focuses on both the human method of cognition i...
Gödel argued that intuition has an important role to play in mathematical epistemology, and despite ...
According to Kant, the axioms of intuition, i.e. space and time, must provide an organization of the...
Many recent attempts to analyze Kant\u27s philosophy of mathematics have proceeded from within the c...
The crucial role played by intuition in Kant's theory of geometry has been widely discussed. Largely...
Recent debates in the interpretation of Kant’s theoretical philosophy have focused on the nature of ...
The aim of this paper is to shed light on the distinction between pure and empirical intuition, a...
Proposition 6.233 from Wittgenstein’s Tractatus has been read as a rejection of the Kantian claim th...
The crucial role played by intuition in Kant’s theory of geometry has been widely discussed. Largely...
When dealing with the relationship between mathematics and cognition, we face two main intellectual ...
The mathematical developments of the 19th century seemed to undermine Kant’s philosophy. Non-Euclide...
Chapter 3 further investigates the role of intuition in the application of concepts to intuitions. K...
In the recent debate between conceptualists and nonconceptualists about perceptual content, Kant’s n...
Intuitionism derives philosophically from Kant\u27s Conceptualism -- the object of the mathematical ...
The philosophy of Immanuel Kant contains an important rationalistic element, and the study and inter...
Kant’s transcendental philosophy (transcendentalism) focuses on both the human method of cognition i...
Gödel argued that intuition has an important role to play in mathematical epistemology, and despite ...
According to Kant, the axioms of intuition, i.e. space and time, must provide an organization of the...
Many recent attempts to analyze Kant\u27s philosophy of mathematics have proceeded from within the c...
The crucial role played by intuition in Kant's theory of geometry has been widely discussed. Largely...