Finite Frames Fail: How Infinity Works its Way into the Semantics of Admissibility
Publication date
2016
Authors
Goudsmit, Jeroen
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Document Type
Article
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Abstract
Many intermediate logics, even extremely well-behaved ones such as IPC, lack the finite model property for admissible rules. We give conditions under which this failure holds. We show that frames which validate all admissible rules necessarily satisfy a certain closure condition, and we prove that this condition, in the finite case, ensures that the frame is of width 2. Finally, we indicate how this result is related to some classical results on finite, free Heyting algebras.
Keywords
intermediate logics, admissible rules, finite model property, projective Heyting algebras
Citation
Goudsmit, J 2016, 'Finite Frames Fail : How Infinity Works its Way into the Semantics of Admissibility', Studia Logica, vol. 104. https://doi.org/10.1007/s11225-016-9672-1