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The complexity of plane hyperbolic incidence geometry is∀∃∀∃
Mathematical Logic Quarterly 51 (3):277-281 (2005)
Abstract
We show that plane hyperbolic geometry, expressed in terms of points and the ternary relation of collinearity alone, cannot be expressed by means of axioms of complexity at most ∀∃∀, but that there is an axiom system, all of whose axioms are ∀∃∀∃ sentences. This remains true for Klingenberg's generalized hyperbolic planes, with arbitrary ordered fields as coordinate fieldsMy notes
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Citations of this work
Mario Pieri’s View of the Symbiotic Relationship between the Foundations and the Teaching of Elementary Geometry in the Context of the Early Twentieth Century Proposals for Pedagogical Reform.Elena Anne Corie Marchisotto & Ana Millán Gasca - 2021 - Philosophia Scientiae 25:157-183.
Case for the Irreducibility of Geometry to Algebra†.Victor Pambuccian & Celia Schacht - 2022 - Philosophia Mathematica 30 (1):1-31.
Corrigendum to “The complexity of plane hyperbolic incidence geometry is ∀∃∀∃”.Victor Pambuccian - 2008 - Mathematical Logic Quarterly 54 (6):668-668.
2005 annual meeting of the association for symbolic logic.Ilijas Farah, Deirdre Haskell, Andrey Morozov, Vladimir Pestov & Jindrich Zapletal - 2006 - Bulletin of Symbolic Logic 12 (1):143.
Correction to “Axiomatizations of Hyperbolic Geometry”.Victor Pambuccian - 2005 - Synthese 145 (3):497-497.
References found in this work
Axiomatizations of hyperbolic geometry: A comparison based on language and quantifier type complexity.Victor Pambuccian - 2002 - Synthese 133 (3):331 - 341.
Axiomatizations of Hyperbolic Geometry: A Comparison Based on Language and Quantifier Type Complexity.Victor Pambuccian - 2002 - Synthese 133 (3):331-341.
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