Title of article
A common axiom set for classical and intuitionistic plane geometry Original Research Article
Author/Authors
Melinda Lombard، نويسنده , , Richard Vesley، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1998
Pages
27
From page
229
To page
255
Abstract
We describe a first order axiom set which yields the classical first order Euclidean geometry of Tarski when used with classical logic, and yields an intuitionistic (or constructive) Euclidean geometry when used with intuitionistic logic. The first order language has a single six place atomic predicate and no function symbols. The intuitionistic system has a computational interpretation in recursive function theory, that is, a realizability interpretation analogous to those given by Kleene for intuitionistic arithmetic and analysis. This interpretation shows the unprovability in the intuitionistic theory of certain “nonconstructive” theorems of the classical geometry.
Keywords
Tarski geometry , Constructive analysis , Intuitionistic geometry
Journal title
Annals of Pure and Applied Logic
Serial Year
1998
Journal title
Annals of Pure and Applied Logic
Record number
896162
Link To Document