Skip to main content
SpringerLink
Log in

Decidability of Quantified Propositional Intuitionistic Logic and S4 on Trees of Height and Arity ≤ω

  • Published:
Journal of Philosophical Logic Aims and scope Submit manuscript

Abstract

Quantified propositional intuitionistic logic is obtained from propositional intuitionistic logic by adding quantifiers ∀p, ∃p, where the propositional variables range over upward-closed subsets of the set of worlds in a Kripke structure. If the permitted accessibility relations are arbitrary partial orders, the resulting logic is known to be recursively isomorphic to full second-order logic (Kremer, 1997). It is shown that if the Kripke structures are restricted to trees of at height and width at most ω, the resulting logics are decidable. This provides a partial answer to a question by Kremer. The result also transfers to modal S4 and some Gödel–Dummett logics with quantifiers over propositions.

This is a preview of subscription content, log in via an institution to check access.

Access this article

Log in via an institution

Price excludes VAT (USA)
Tax calculation will be finalised during checkout.

Instant access to the full article PDF.

Institutional subscriptions

Similar content being viewed by others

References

  • Baaz, M., Ciabattoni, A. and Zach, R.: 2000, Quantified propositional Gödel logic, in A. Voronkov and M. Parigot (eds.), Logic for Programming and Automated Reasoning, LPAR 2000. Proceedings, LNAI 1955, Springer, Berlin, pp. 240-256.

    Google Scholar 

  • Baaz, M. and Zach, R.: 1998, Compact propositional Gödel logics, in 28th International Symposium on Multiple-valued Logic. May 1998, Fukuoka, Japan. Proceedings, IEEE Press, Los Alamitos, pp. 108-113.

    Google Scholar 

  • Fine, K.: 1970, Propositional quantifiers in modal logic, Theoria 36, 336-346.

    Google Scholar 

  • Gabbay, D.: 1981, Semantical Investigations in Heyting's Intuitionistic Logic, Reidel, Dordrecht.

    Google Scholar 

  • Kremer, P.: 1993, Quantifying over propositions in relevance logic, J. Symbolic Logic 58, 334-349.

    Google Scholar 

  • Kremer, P.: 1997, On the complexity of propositional quantification in intuitionistic logic, J. Symbolic Logic 62, 529-544.

    Google Scholar 

  • Kripke, S. A.: 1965, Semantical analysis of intuitionistic logic I, in J. N. Crossley and M. A. E. Dummett (eds.), Formal Systems and Recursive Functions, North-Holland, Amsterdam, pp. 92-130.

    Google Scholar 

  • McKinsey, J. J. and Tarski, A.: 1948, Some theorems about the sentential calculi of Lewis and Heyting, J. Symbolic Logic 13, 1-15.

    Google Scholar 

  • Rabin, M. O.: 1969, Decidability of second-order theories and automata on infinite trees, Trans. Amer. Math. Soc. 141, 1-35.

    Google Scholar 

Download references

Author information

Authors and Affiliations

  1. Department of Philosophy, University of Calgary, 2500 University Drive NW Calgary, Alberta, T2N 1N4, Canada

    Richard Zach

Authors
  1. Richard Zach
    View author publications

    You can also search for this author in PubMed Google Scholar

Rights and permissions

Reprints and permissions

About this article

Cite this article

Zach, R. Decidability of Quantified Propositional Intuitionistic Logic and S4 on Trees of Height and Arity ≤ω. Journal of Philosophical Logic 33, 155–164 (2004). https://doi.org/10.1023/B:LOGI.0000021744.10237.d0

Download citation

  • Issue Date:

  • DOI: https://doi.org/10.1023/B:LOGI.0000021744.10237.d0

Search

Navigation