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Generic generalized Rosser fixed points
Studia Logica 46 (2):193 - 203 (1987)
Abstract
To the standard propositional modal system of provability logic constants are added to account for the arithmetical fixed points introduced by Bernardi-Montagna in [5]. With that interpretation in mind, a system LR of modal propositional logic is axiomatized, a modal completeness theorem is established for LR and, after that, a uniform arithmetical (Solovay-type) completeness theorem with respect to PA is obtained for LR.My notes
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Citations of this work
A small reflection principle for bounded arithmetic.Rineke Verbrugge & Albert Visser - 1994 - Journal of Symbolic Logic 59 (3):785-812.
A Simplification of a Completeness Proof of Guaspari and Solovay.Dick H. J. de Jongh - 1987 - Studia Logica 46 (2):187-192.
References found in this work
The unprovability of consistency: an essay in modal logic.George Boolos - 1979 - New York: Cambridge University Press.
Self-Reference and Modal Logic.George Boolos & C. Smorynski - 1988 - Journal of Symbolic Logic 53 (1):306.
An effective fixed-point theorem in intuitionistic diagonalizable algebras.Giovanni Sambin - 1976 - Studia Logica 35 (4):345 - 361.
The fixed-point theorem for diagonalizable algebras.Claudio Bernardi - 1975 - Studia Logica 34 (3):239 - 251.
Relatively precomplete numerations and arithmetic.Franco Montagna - 1982 - Journal of Philosophical Logic 11 (4):419 - 430.
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