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Undecidability in diagonalizable algebras
Journal of Symbolic Logic 62 (1):79-116 (1997)
Abstract
If a formal theory T is able to reason about its own syntax, then the diagonalizable algebra of T is defined as its Lindenbaum sentence algebra endowed with a unary operator □ which sends a sentence φ to the sentence □φ asserting the provability of φ in T. We prove that the first order theories of diagonalizable algebras of a wide class of theories are undecidable and establish some related resultsLinks
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Citations of this work
Effectively inseparable Boolean algebras in lattices of sentences.V. Yu Shavrukov - 2010 - Archive for Mathematical Logic 49 (1):69-89.
On Shavrukov’s Non-Isomorphism Theorem for Diagonalizable Algebras.Evgeny A. Kolmakov - 2024 - Review of Symbolic Logic 17 (1):206-243.
Franco Montagna’s Work on Provability Logic and Many-valued Logic.Lev Beklemishev & Tommaso Flaminio - 2016 - Studia Logica 104 (1):1-46.
References found in this work
Representation and duality theory for diagonalizable algebras.Roberto Magari - 1975 - Studia Logica 34 (4):305 - 313.
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.
Shavrukov's Theorem on the Subalgebras of Diagonalizable Algebras for Theories Containing IΔ0+exp.Domenico Zambella - 1994 - Notre Dame Journal of Formal Logic 35 (1):147-157.
A note on the diagonalizable algebras of PA and ZF.V. Yu Shavrukov - 1993 - Annals of Pure and Applied Logic 61 (1-2):161-173.
On bimodal logics of provability.Lev D. Beklemishev - 1994 - Annals of Pure and Applied Logic 68 (2):115-159.
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