Add to ORKGWe define the simplest log-euclidean geometry. This geometry exposes a difficulty hidden in Hilbert's list of axioms presented in his "Grundlagen der Geometrie". The list of axioms appears to be incomplete if the foundations of geometry are to be independent of set theory, as Hilbert intended. In that case we need to add a missing axiom. Log-euclidean geometry satisfies all axioms but the missing one, the fifth axiom of congruence and Euclid's axiom of parallels. This gives an elementary proof (with no need of Riemannian geometry) of the independence of these axioms from the others
The present first part about the eventual completeness of mathematics (called “Hilbert mathematics”)...
Focusing methodologically on those historical aspects that are relevant to supporting intuition in a...
The relationships between intuition, axiomatic method and formalism in Hilbert's foundational studie...
We define the simplest log-euclidean geometry. This geometry exposes a difficulty hidden in Hilbert'...
Abstract. We use Herbrand’s theorem to give a new proof that Euclid’s parallel ax-iom is not derivab...
In this monograph, the authors present a modern development of Euclidean geometry from independent a...
In this monograph, the authors present a modern development of Euclidean geometry from independent a...
In this article, we describe how David Hilbert (1862–1943) understood the arithmetisation of geometr...
In this article, we describe how David Hilbert (1862–1943) understood the arithmetisation of geometr...
2 Hilbert’s Grundlagen der Geometrie 4 2.1 Some axioms of Euclidean geometry..............
This paper aims to show how the mathematical content of Hilbert’s Axiom of Completeness consists in ...
This paper aims to show how the mathematical content of Hilbert's Axiom of Completeness consists in ...
We use Herbrand’s theorem to give a new proof that Euclid’s parallel axiom is not derivable from the...
Graduation date: 1968This paper is a continuation of William Zell's thesis, A Model of Non-Euclidean...
The Grundlagen der Geometrie brought Euclid’s ancient axioms up to the standards of modern logic, a...
The present first part about the eventual completeness of mathematics (called “Hilbert mathematics”)...
Focusing methodologically on those historical aspects that are relevant to supporting intuition in a...
The relationships between intuition, axiomatic method and formalism in Hilbert's foundational studie...
We define the simplest log-euclidean geometry. This geometry exposes a difficulty hidden in Hilbert'...
Abstract. We use Herbrand’s theorem to give a new proof that Euclid’s parallel ax-iom is not derivab...
In this monograph, the authors present a modern development of Euclidean geometry from independent a...
In this monograph, the authors present a modern development of Euclidean geometry from independent a...
In this article, we describe how David Hilbert (1862–1943) understood the arithmetisation of geometr...
In this article, we describe how David Hilbert (1862–1943) understood the arithmetisation of geometr...
2 Hilbert’s Grundlagen der Geometrie 4 2.1 Some axioms of Euclidean geometry..............
This paper aims to show how the mathematical content of Hilbert’s Axiom of Completeness consists in ...
This paper aims to show how the mathematical content of Hilbert's Axiom of Completeness consists in ...
We use Herbrand’s theorem to give a new proof that Euclid’s parallel axiom is not derivable from the...
Graduation date: 1968This paper is a continuation of William Zell's thesis, A Model of Non-Euclidean...
The Grundlagen der Geometrie brought Euclid’s ancient axioms up to the standards of modern logic, a...
The present first part about the eventual completeness of mathematics (called “Hilbert mathematics”)...
Focusing methodologically on those historical aspects that are relevant to supporting intuition in a...
The relationships between intuition, axiomatic method and formalism in Hilbert's foundational studie...