On modal logics between {$\roman K\times\roman K\times \roman K$} and {${\rm S}5\times{\rm S}5\times{\rm S}5$}

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Journal of Symbolic Logic 67 (1):221-234 (2002)
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Abstract

We prove that everyn-modal logic betweenKnandS5nis undecidable, whenever n ≥ 3. We also show that each of these logics is non-finitely axiomatizable, lacks the product finite model property, and there is no algorithm deciding whether a finite frame validates the logic. These results answer several questions of Gabbay and Shehtman. The proofs combine the modal logic technique of Yankov–Fine frame formulas with algebraic logic results of Halmos, Johnson and Monk, and give a reduction of the representation problem of finite relation algebras.

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10.2178/jsl/1190150040

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Citations of this work

Algebraic Logic, Where Does It Stand Today?Tarek Sayed Ahmed - 2005 - Bulletin of Symbolic Logic 11 (3):465-516.
Hybrid Formulas and Elementarily Generated Modal Logics.Ian Hodkinson - 2006 - Notre Dame Journal of Formal Logic 47 (4):443-478.

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References found in this work

Modal logic.Yde Venema - 2000 - Philosophical Review 109 (2):286-289.
Two-dimensional modal logic.Krister Segerberg - 1973 - Journal of Philosophical Logic 2 (1):77 - 96.
Cylindric Algebras. Part II.Leon Henkin, J. Donald Monk & Alfred Tarski - 1988 - Journal of Symbolic Logic 53 (2):651-653.
Fibring Logics.Dov M. Gabbay - 2000 - Studia Logica 66 (3):440-443.

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