Book contents
- Kant’s Philosophy of Mathematics
- Kant’s Philosophy of Mathematics
- Copyright page
- Dedication
- Contents
- Contributors
- Acknowledgements
- Introduction
- Part I Roots
- Part II Method and Logic
- 4 Kant’s Theory of Mathematics
- 5 Singular Terms and Intuitions in Kant
- 6 Kant and the Character of Mathematical Inference
- Part III Space and Geometry
- Part IV Arithmetic and Number
- References to Works by Kant
- Bibliography
- Index
4 - Kant’s Theory of Mathematics
What Theory of What Mathematics?
from Part II - Method and Logic
Published online by Cambridge University Press: 24 April 2020
- Kant’s Philosophy of Mathematics
- Kant’s Philosophy of Mathematics
- Copyright page
- Dedication
- Contents
- Contributors
- Acknowledgements
- Introduction
- Part I Roots
- Part II Method and Logic
- 4 Kant’s Theory of Mathematics
- 5 Singular Terms and Intuitions in Kant
- 6 Kant and the Character of Mathematical Inference
- Part III Space and Geometry
- Part IV Arithmetic and Number
- References to Works by Kant
- Bibliography
- Index
Summary
Hintikka reprises and enhances some of his original themes, and argues that Kant’s notion of construction in intuition is codified in the modern predicate logic inference patterns of universal and existential instantiation. Hintikka traces back the device of construction to the Euclidean ekthesis, drawing a figure according to a definition. He shows that a geometrical construction allows one to deduce more about the definition than is made possible by the concept of deduction prevalent in Kant’s time. Hintikka couches this analysis in the context of his discussion of the logic of the mathematical method as an epistemic logic of seeking and finding, and thus displays a comprehensive picture of his own mature view.
Keywords
- Type
- Chapter
- Information
- Kant's Philosophy of Mathematics , pp. 85 - 102Publisher: Cambridge University PressPrint publication year: 2020
- 4
- Cited by