David Hilbert's Foundations of Geometry (1899) contain nineteen statements, labelled axioms, from which every theorem in Euclid's Elements can be derived by deductive inference, according to the classical rules of logic
Mathematics is one of the most interesting and challeng-ing subjects known to mankind. This is due p...
In this paper we present three aspects of the autonomy of geometry. (1) An argument for the geometri...
2 Hilbert’s Grundlagen der Geometrie 4 2.1 Some axioms of Euclidean geometry..............
It is possible to de-formaze entirely Hilbert`s groups of axioms of the Euclidean Geometry, and to c...
This is an experimental geometry. All Hilbert's 20 axioms of the Euclidean GGeometry are denied in t...
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...
Pure geometry or Euclidean geometry is a body of theorems and corollaries logically derived from c...
The purpose of this note is to substantiate and explain the following quote from Hilbert
There has been considerable interest during the past 2300 years in comparing different models of geo...
In 1891, Hilbert came to the conclusion that geometry is not a science of the physical space but is ...
The article investigates one of the key contributions to modern structural math-ematics, namely Hilb...
The object in this article is to discuss the philosophical bearing of recent inquiries concerning ge...
This new geometry is important because it generalizes and unites in the same time all together: Eucl...
Sobre la base que aportan las notas manuscritas de David Hilbert para cursos sobre geometría, el art...
Mathematics is one of the most interesting and challeng-ing subjects known to mankind. This is due p...
In this paper we present three aspects of the autonomy of geometry. (1) An argument for the geometri...
2 Hilbert’s Grundlagen der Geometrie 4 2.1 Some axioms of Euclidean geometry..............
It is possible to de-formaze entirely Hilbert`s groups of axioms of the Euclidean Geometry, and to c...
This is an experimental geometry. All Hilbert's 20 axioms of the Euclidean GGeometry are denied in t...
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...
Pure geometry or Euclidean geometry is a body of theorems and corollaries logically derived from c...
The purpose of this note is to substantiate and explain the following quote from Hilbert
There has been considerable interest during the past 2300 years in comparing different models of geo...
In 1891, Hilbert came to the conclusion that geometry is not a science of the physical space but is ...
The article investigates one of the key contributions to modern structural math-ematics, namely Hilb...
The object in this article is to discuss the philosophical bearing of recent inquiries concerning ge...
This new geometry is important because it generalizes and unites in the same time all together: Eucl...
Sobre la base que aportan las notas manuscritas de David Hilbert para cursos sobre geometría, el art...
Mathematics is one of the most interesting and challeng-ing subjects known to mankind. This is due p...
In this paper we present three aspects of the autonomy of geometry. (1) An argument for the geometri...
2 Hilbert’s Grundlagen der Geometrie 4 2.1 Some axioms of Euclidean geometry..............