The Finite Model Property for Logics with the Tangle Modality

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Studia Logica 106 (1):131-166 (2018)
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Abstract

The tangle modality is a propositional connective that extends basic modal logic to a language that is expressively equivalent over certain classes of finite frames to the bisimulation-invariant fragments of both first-order and monadic second-order logic. This paper axiomatises several logics with tangle, including some that have the universal modality, and shows that they have the finite model property for Kripke frame semantics. The logics are specified by a variety of conditions on their validating frames, including local and global connectedness properties. Some of the results have been used to obtain completeness theorems for interpretations of tangled modal logics in topological spaces.

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10.1007/s11225-017-9732-1

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Citations of this work

Logic and time.John P. Burgess - 1979 - Journal of Symbolic Logic 44 (4):566-582.
Spatial logic of tangled closure operators and modal mu-calculus.Robert Goldblatt & Ian Hodkinson - 2017 - Annals of Pure and Applied Logic 168 (5):1032-1090.

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References found in this work

[Omnibus Review].Robert Goldblatt - 1986 - Journal of Symbolic Logic 51 (1):225-227.
Decidability of S4.1.Krister Segerberg - 1968 - Theoria 34 (1):7-20.
Decidability of S4.1.Krister Segerberg - 1968 - Theoria 34 (1):7-20.
« Everywhere » and « here ».Valentin Shehtman - 1999 - Journal of Applied Non-Classical Logics 9 (2-3):369-379.
Modal characterisation theorems over special classes of frames.Anuj Dawar & Martin Otto - 2010 - Annals of Pure and Applied Logic 161 (1):1-42.

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