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A note on the interpretability logic of finitely axiomatized theories
Studia Logica 50 (2):241 - 250 (1991)
Abstract
In [6] Albert Visser shows that ILP completely axiomatizes all schemata about provability and relative interpretability that are provable in finitely axiomatized theories. In this paper we introduce a system called ILP that completely axiomatizes the arithmetically valid principles of provability in and interpretability over such theories. To prove the arithmetical completeness of ILP we use a suitable kind of tail models; as a byproduct we obtain a somewhat modified proof of Visser's completeness result.Links
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References found in this work
On the scheme of induction for bounded arithmetic formulas.A. J. Wilkie & J. B. Paris - 1987 - Annals of Pure and Applied Logic 35 (C):261-302.
Self-Reference and Modal Logic.George Boolos & C. Smorynski - 1988 - Journal of Symbolic Logic 53 (1):306.
The provability logics of recursively enumerable theories extending peano arithmetic at arbitrary theories extending peano arithmetic.Albert Visser - 1984 - Journal of Philosophical Logic 13 (1):97 - 113.
A note on the interpretability logic of finitely axiomatized theories.Maarten de Rijke - 1991 - Studia Logica 50 (2):241-250.
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