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The simplest axiom system for plane hyperbolic geometry
Studia Logica 77 (3):385 - 411 (2004)
Abstract
We provide a quantifier-free axiom system for plane hyperbolic geometry in a language containing only absolute geometrically meaningful ternary operations (in the sense that they have the same interpretation in Euclidean geometry as well). Each axiom contains at most 4 variables. It is known that there is no axiom system for plane hyperbolic consisting of only prenex 3-variable axioms. Changing one of the axioms, one obtains an axiom system for plane Euclidean geometry, expressed in the same language, all of whose axioms are also at most 4-variable universal sentences. We also provide an axiom system for plane hyperbolic geometry in Tarski's language L B which might be the simplest possible one in that language.My notes
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Citations of this work
Axiomatizing geometric constructions.Victor Pambuccian - 2008 - Journal of Applied Logic 6 (1):24-46.
The Simplest Axiom System for Hyperbolic Geometry Revisited, Again.Jesse Alama - 2014 - Studia Logica 102 (3):609-615.
The Simplest Axiom System for Plane Hyperbolic Geometry Revisited.Victor Pambuccian - 2011 - Studia Logica 97 (3):347 - 349.
Logic for physical space: From antiquity to present days.Marco Aiello, Guram Bezhanishvili, Isabelle Bloch & Valentin Goranko - 2012 - Synthese 186 (3):619-632.
Case for the Irreducibility of Geometry to Algebra†.Victor Pambuccian & Celia Schacht - 2022 - Philosophia Mathematica 30 (1):1-31.
References found in this work
Dimension in Elementary Euclidean Geometry.Dana Scott - 1969 - Journal of Symbolic Logic 34 (3):514-514.
Ternary Operations as Primitive Notions for Constructive Plane Geometry V.Victor Pambuccian - 1994 - Mathematical Logic Quarterly 40 (4):455-477.
Constructive Axiomatizations of Plane Absolute, Euclidean and Hyperbolic Geometry.Victor Pambuccian - 2001 - Mathematical Logic Quarterly 47 (1):129-136.
Ternary Operations as Primitive Notions for Constructive Plane Geometry VI.Victor Pambuccian - 1995 - Mathematical Logic Quarterly 41 (3):384-394.
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