In this paper we present three aspects of the autonomy of geometry. (1) An argument for the geometric as opposed to the ‘geometric algebraic’ interpretation of Euclid’s Books I and II; (2) Hilbert’s successful project to axiomatize Euclid’s geometry in a first order geometric language, notably eliminating the dependence on the Archimedean axiom; (3) the independent conception of multiplication from a geometric as opposed to an arithmetic viewpoint
The objective of this research is to analyze the historical development of the classical work of geo...
International audienceThe main aim of this paper is to present Proclus ’ philosophy of geometric ext...
There has been considerable interest during the past 2300 years in comparing different models of geo...
In this paper we present three aspects of the autonomy of geometry. (1) An argument for the geometri...
The object in this article is to discuss the philosophical bearing of recent inquiries concerning ge...
Title: Comparison of Euclid's and Hilbert's Axiomatic Systems of Geometry from the Didactic Viewpoin...
In this article, we describe how David Hilbert (1862–1943) understood the arithmetisation of geometr...
In 1891, Hilbert came to the conclusion that geometry is not a science of the physical space but is ...
The ancient Greeks were the first to explore ruler and compass constructions, and Euclid was the fir...
In this thesis, we investigate how a proof assistant can be used to study the foundations of geometr...
In this thesis, I investigate the nature of geometric knowledge and its relationship to spatial int...
The present article explores the relationships between the geometric and algebraic ideas presented i...
Working paper par Angela Axworthy, Max-Planck-Institut für Wissenschaftsgeschichte de Berlin, The on...
There are two ways to study projective geometry: 1) an extension fo the Eucildean geometry taught in...
Though the modernization of the school mathematics has been promoted in the area of algebra, probabi...
The objective of this research is to analyze the historical development of the classical work of geo...
International audienceThe main aim of this paper is to present Proclus ’ philosophy of geometric ext...
There has been considerable interest during the past 2300 years in comparing different models of geo...
In this paper we present three aspects of the autonomy of geometry. (1) An argument for the geometri...
The object in this article is to discuss the philosophical bearing of recent inquiries concerning ge...
Title: Comparison of Euclid's and Hilbert's Axiomatic Systems of Geometry from the Didactic Viewpoin...
In this article, we describe how David Hilbert (1862–1943) understood the arithmetisation of geometr...
In 1891, Hilbert came to the conclusion that geometry is not a science of the physical space but is ...
The ancient Greeks were the first to explore ruler and compass constructions, and Euclid was the fir...
In this thesis, we investigate how a proof assistant can be used to study the foundations of geometr...
In this thesis, I investigate the nature of geometric knowledge and its relationship to spatial int...
The present article explores the relationships between the geometric and algebraic ideas presented i...
Working paper par Angela Axworthy, Max-Planck-Institut für Wissenschaftsgeschichte de Berlin, The on...
There are two ways to study projective geometry: 1) an extension fo the Eucildean geometry taught in...
Though the modernization of the school mathematics has been promoted in the area of algebra, probabi...
The objective of this research is to analyze the historical development of the classical work of geo...
International audienceThe main aim of this paper is to present Proclus ’ philosophy of geometric ext...
There has been considerable interest during the past 2300 years in comparing different models of geo...