With the discovery of consistent non-Euclidean geometries, the a priori status of Euclidean proof was radically undermined. In response, philosophers proposed two revisionary interpretations of the practice: some argued that Euclidean proof is a purely formal system of deductive logic; others suggested that Euclidean reasoning is empirical, employing concepts derived from experience. I argue that both interpretations fail to capture the true nature of our geometrical thought. Euclidean proof is not a system of pure logic, but one in which our grasp of the content of geometrical concepts plays a central role; moreover, our grasp of this content is a priori
With the development of non-Euclidean geometries in the nineteenth century, the concern arose as to ...
The Lorentz transformations in the theory of special relativity~(SR) lead to a little-investigated p...
. In 1931, the young Austrian mathematician that a formal mathematical system is either incomplete o...
In the article, an argument is given that Euclidean geometry is a priori in the same way that number...
Kant's arguments for the synthetic a priori status of geometry are generally taken to have...
John Corcoran and George Boger. Aristotelian logic and Euclidean geometry. Bulletin of Symbolic Logi...
The paper argues that a fundamental experience necessary to prove theorems in Euclidean geometry is ...
In this dissertation, I develop a novel account of spatial experience that—unlike most contemporary ...
International audienceDuring a long-term teaching experiment aimed at developing 10th grade students...
We report on our efforts to explore geometry using constructive mathematics and intuitionistic logic...
We advance a theory of the representational role of Euclidean diagrams according to which they are s...
This document is the Accepted Manuscript of an article accepted for publication in Synthese. Under e...
Doctor of PhilosophyDepartment of MathematicsAndrew G. BennettThis dissertation investigates and com...
We argue against the claim that the employment of diagrams in Euclidean geometry gives rise to gaps ...
With the development of non-Euclidean geometries in the nineteenth century, the concern arose as to ...
The Lorentz transformations in the theory of special relativity~(SR) lead to a little-investigated p...
. In 1931, the young Austrian mathematician that a formal mathematical system is either incomplete o...
In the article, an argument is given that Euclidean geometry is a priori in the same way that number...
Kant's arguments for the synthetic a priori status of geometry are generally taken to have...
John Corcoran and George Boger. Aristotelian logic and Euclidean geometry. Bulletin of Symbolic Logi...
The paper argues that a fundamental experience necessary to prove theorems in Euclidean geometry is ...
In this dissertation, I develop a novel account of spatial experience that—unlike most contemporary ...
International audienceDuring a long-term teaching experiment aimed at developing 10th grade students...
We report on our efforts to explore geometry using constructive mathematics and intuitionistic logic...
We advance a theory of the representational role of Euclidean diagrams according to which they are s...
This document is the Accepted Manuscript of an article accepted for publication in Synthese. Under e...
Doctor of PhilosophyDepartment of MathematicsAndrew G. BennettThis dissertation investigates and com...
We argue against the claim that the employment of diagrams in Euclidean geometry gives rise to gaps ...
With the development of non-Euclidean geometries in the nineteenth century, the concern arose as to ...
The Lorentz transformations in the theory of special relativity~(SR) lead to a little-investigated p...
. In 1931, the young Austrian mathematician that a formal mathematical system is either incomplete o...