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A new proof of Ajtai’s completeness theorem for nonstandard finite structures
Archive for Mathematical Logic 54 (3-4):413-424 (2015)
Abstract
Ajtai’s completeness theorem roughly states that a countable structure A coded in a model of arithmetic can be end-extended and expanded to a model of a given theory G if and only if a contradiction cannot be derived by a proof from G plus the diagram of A, provided that the proof is definable in A and contains only formulas of a standard length. The existence of such model extensions is closely related to questions in complexity theory. In this paper we give a new proof of Ajtai’s theorem using basic techniques of model theory.Other Versions
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Citations of this work
Construction of models of bounded arithmetic by restricted reduced powers.Michal Garlík - 2016 - Archive for Mathematical Logic 55 (5-6):625-648.
References found in this work
Bounded arithmetic, propositional logic, and complexity theory.Jan Krajíček - 1995 - New York, NY, USA: Cambridge University Press.
An introduction to recursively saturated and resplendent models.Jon Barwise & John Schlipf - 1976 - Journal of Symbolic Logic 41 (2):531-536.
Metamathematics of First-Order Arithmetic.Petr Hajék & Pavel Pudlák - 1994 - Studia Logica 53 (3):465-466.
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