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A proof-theoretic study of the correspondence of classical logic and modal logic

Published online by Cambridge University Press:  12 March 2014

H. Kushida
Affiliation:
Department of Philosophy, Keio University, 2-15-45 Mita, Minato-Ku, Tokyo 108-8345, Japan, E-mail: [email protected]
M. Okada
Affiliation:
Department of Philosophy, Keio University, 2-15-45 Mita, Minato-Ku, Tokyo 108-8345, Japan, E-mail: [email protected]

Abstract

It is well known that the modal logic S5 can be embedded in the classical predicate logic by interpreting the modal operator in terms of a quantifier. Wajsberg [10] proved this fact in a syntactic way. Mints [7] extended this result to the quantified version of S5; using a purely proof-theoretic method he showed that the quantified S5 corresponds to the classical predicate logic with one-sorted variable. In this paper we extend Mints' result to the basic modal logic S4; we investigate the correspondence between the quantified versions of S4 (with and without the Barcan formula) and the classical predicate logic (with one-sorted variable). We present a purely proof-theoretic proof-transformation method, reducing an LK-proof of an interpreted formula to a modal proof.

Type
Research Article
Copyright
Copyright © Association for Symbolic Logic 2003

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References

REFERENCES

[1] Buss, S., Introduction to proof theory, Handbook of proof theory (Buss, S., editor), 1998, pp. 178.Google Scholar
[2] Dyckhoff, R. and Pinto, L., Permutability of proofs in intuitionistic sequent calculi, Theoretical Computer Science, vol. 212 (1999), pp. 141155.CrossRefGoogle Scholar
[3] Feys, R., Modèles à variables de différentes sortes pour les logiques modales M” ou S5, Synthése, vol. 12 (1960), pp. 182196.Google Scholar
[4] Gentzen, G., Untersuchungen über das logische Schließen, Mathematische Zeitschrift, vol. 39 (1935), pp. 176–210, 405431.CrossRefGoogle Scholar
[5] Hughes, G. and Cresswell, M., A new introduction to modal logic, Routledge, London and New York, 1996.CrossRefGoogle Scholar
[6] Kleene, S. C., Permutability of inferences in Gentzen's calculi LK and LJ, Memoirs of the American Mathematical Society, vol. 10 (1952), pp. 126.Google Scholar
[7] Mints, G. E., On some calculi of modal logic, Proceedings of the Steklov Institute of Mathematics, 1968, pp. 97124.Google Scholar
[8] Takeuti, G., Proof theory, second ed., North-Holland, Amsterdam, 1987.Google Scholar
[9] van Benthem, J., Modal logic and classical logic, Bibliopolis, Naples, 1985.Google Scholar
[10] Wajsberg, M., Ein erweiterter Klassenkalkül, Monatshefte für mathematische Physik, vol. 40 (1933), pp. 113126.CrossRefGoogle Scholar