Intensional models for the theory of types
Reinhard Muskens
Source: J. Symbolic Logic Volume 72, Issue 1
(2007), 98-118.
Abstract
In this paper we define intensional models for the classical theory of types, thus arriving at an intensional type logic ITL. Intensional models generalize Henkin's general models and have a natural definition. As a class they do not validate the axiom of Extensionality. We give a cut-free sequent calculus for type theory and show completeness of this calculus with respect to the class of intensional models via a model existence theorem. After this we turn our attention to applications. Firstly, it is argued that, since ITL is truly intensional, it can be used to model ascriptions of propositional attitude without predicting logical omniscience. In order to illustrate this a small fragment of English is defined and provided with an ITL semantics. Secondly, it is shown that ITL models contain certain objects that can be identified with possible worlds. Essential elements of modal logic become available within classical type theory once the axiom of Extensionality is given up.
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Permanent link to this document: http://projecteuclid.org/euclid.jsl/1174668386
Digital Object Identifier: doi:10.2178/jsl/1174668386
Mathematical Reviews number (MathSciNet): MR2298473
Zentralblatt MATH identifier: 1116.03008
References
P. B. Andrews, Resolution in type theory, Journal of Symbolic Logic, vol. 36 (1971), no. 3, pp. 414--432.
Mathematical Reviews (MathSciNet): MR302401
Digital Object Identifier: doi:10.2307/2269949
Project Euclid: euclid.jsl/1183737751
Zentralblatt MATH: 0231.02038
J. Barwise, Information and impossibilities, Notre Dame Journal of Formal Logic, vol. 38 (1997), no. 4, pp. 488--515.
Mathematical Reviews (MathSciNet): MR1648849
Digital Object Identifier: doi:10.1305/ndjfl/1039540766
Project Euclid: euclid.ndjfl/1039540766
Zentralblatt MATH: 0920.03002
C. Benzmüller, C. E. Brown, and M. Kohlhase, Higher order semantics and extensionality, Journal of Symbolic Logic, vol. 69 (2004).
Mathematical Reviews (MathSciNet): MR2135655
Digital Object Identifier: doi:10.2178/jsl/1102022211
Project Euclid: euclid.jsl/1102022211
Zentralblatt MATH: 1071.03024
R. Carnap, Meaning and Necessity, Chicago University Press, Chicago, 1947.
Mathematical Reviews (MathSciNet): MR19563
Zentralblatt MATH: 0034.00106
G. Chierchia and R. Turner, Semantics and property theory, Linguistics and Philosophy, vol. 11 (1988), pp. 261--302.
A. Church, A formulation of the simple theory of types, Journal of Symbolic Logic, vol. 5 (1940), pp. 56--68.
Mathematical Reviews (MathSciNet): MR1931
Digital Object Identifier: doi:10.2307/2266170
Project Euclid: euclid.jsl/1183387805
Zentralblatt MATH: 0023.28901
M. J. Cresswell, Intensional logics and logical truth, Journal of Philosophical Logic, vol. 1 (1972), pp. 2--15.
Mathematical Reviews (MathSciNet): MR317904
Digital Object Identifier: doi:10.1007/BF00649986
Zentralblatt MATH: 0239.02012
--------, Structured Meanings, MIT Press, Cambridge, MA, 1985.
M. Fitting, First-Order Logic and Automated Theorem Proving, Springer, New York, 1996.
Mathematical Reviews (MathSciNet): MR1383320
Zentralblatt MATH: 0848.68101
--------, Types, Tableaus, and Gödels God, Kluwer Academic Publishers, Dordrecht, 2002.
G. Frege, Über Sinn und Bedeutung, 1892, reprinted in Funktion, Begriff, Bedeutung. Fünf Logische Studien, (G. Patzig, editor), Vandenhoeck & Ruprecht, Göttingen.
Mathematical Reviews (MathSciNet): MR967322
Zentralblatt MATH: 0649.03003
L. Henkin, Completeness in the theory of types, Journal of Symbolic Logic, vol. 15 (1950), pp. 81--91.
Mathematical Reviews (MathSciNet): MR36188
Digital Object Identifier: doi:10.2307/2266967
Project Euclid: euclid.jsl/1183730860
Zentralblatt MATH: 0039.00801
J. Hintikka, Impossible possible worlds vindicated, Journal of Philosophical Logic, vol. 4 (1975), pp. 475--484.
Mathematical Reviews (MathSciNet): MR472476
Digital Object Identifier: doi:10.1007/BF00558761
Zentralblatt MATH: 0334.02003
D. Lewis, General semantics, Semantics of Natural Language (D. Davidson and G. Harman, editors), Reidel, Dordrecht, 1972, pp. 169--218.
R. Montague, Universal grammar, Theoria, vol. 36 (1970), pp. 373--398, reprinted in [thom:form74?].
Mathematical Reviews (MathSciNet): MR307873
--------, The proper treatment of quantification in ordinary english, Approaches to Natural Language (J. Hintikka, J. Moravcsik, and P. Supper, editors), Reidel, Dordrecht, 1973, reprinted in [thom:form74?], pp. 221--242.
Y. Moschovakis, Sense and denotation as algorithm and value, Logic Colloquium '90 (Helsinki 1990), Lecture Notes in Logic, vol. 2, Springer, Berlin, 1994, pp. 210--249.
Mathematical Reviews (MathSciNet): MR1279843
Zentralblatt MATH: 0823.03022
R. A. Muskens, A relational formulation of the theory of types, Linguistics and Philosophy, vol. 12 (1989), pp. 325--346.
--------, Meaning and partiality, CSLI, Stanford, 1995.
--------, Sense and the computation of reference, Linguistics and Philosophy, vol. 28 (2005), no. 4, pp. 473--504.
--------, Higher order modal logic, Handbook of Modal Logic (P. Blackburn, J. F. A. K. van Benthem, and F. Wolter, editors), Studies in Logic and Practical Reasoning, vol. 3, Elsevier, Dordrecht, 2006, pp. 621--653.
S. Orey, Model theory for the higher order predicate calculus, Transactions of the American Mathematical Society, vol. 92 (1959), pp. 72--84.
Mathematical Reviews (MathSciNet): MR107600
Digital Object Identifier: doi:10.2307/1993168
JSTOR: links.jstor.org
Zentralblatt MATH: 0088.01004
C. Pollard, Hyperintensional semantics in a higher-order logic with definable subtypes, Lambda Calculus, Type Theory, and Natural Language (M. Fernández, C. Fox, and S. Lappin, editors), King's College, London, 2005, pp. 32--46.
D. Prawitz, Hauptsatz for higher order logic, Journal of Symbolic Logic, vol. 33 (1968), no. 3, pp. 452--457.
Mathematical Reviews (MathSciNet): MR238680
Digital Object Identifier: doi:10.2307/2270331
Project Euclid: euclid.jsl/1183736433
Zentralblatt MATH: 0164.31002
V. Rantala, Quantified modal logic: Non-normal worlds and propositional attitudes, Studia Logica, vol. 41 (1982), pp. 41--65.
Mathematical Reviews (MathSciNet): MR706735
Digital Object Identifier: doi:10.1007/BF00373492
K. Schütte, Syntactical and semantical properties of simple type theory, Journal of Symbolic Logic, vol. 25 (1960), no. 4, pp. 305--326.
Mathematical Reviews (MathSciNet): MR144813
Digital Object Identifier: doi:10.2307/2963525
Project Euclid: euclid.jsl/1183734126
Zentralblatt MATH: 0109.00511
R. M. Smullyan, First-Order Logic, Springer-Verlag, Berlin, 1968.
Mathematical Reviews (MathSciNet): MR243994
Zentralblatt MATH: 0172.28901
M. Takahashi, A proof of cut-elimination theorem in simple type Theory, Journal of the Mathematical Society of Japan, vol. 19 (1967), no. 4, pp. 399--410.
Mathematical Reviews (MathSciNet): MR219409
Zentralblatt MATH: 0206.27503
Digital Object Identifier: doi:10.2969/jmsj/01940399
R. Thomason (editor), Formal Philosophy, Selected papers of Richard Montague, Yale University Press, 1974.
--------, A model theory for propositional attitudes, Linguistics and Philosophy, vol. 4 (1980), pp. 47--70.
R. Turner, A theory of properties, Journal of Symbolic Logic, vol. 52 (1987), no. 2, pp. 455--472.
Mathematical Reviews (MathSciNet): MR890452
Digital Object Identifier: doi:10.2307/2274394
Project Euclid: euclid.jsl/1183742374
Zentralblatt MATH: 0629.03007
A. N. Whitehead and B. Russell, Principia Mathematica, Cambridge University Press, 1910-13.
L. Wittgenstein, Tractatus Logico-Philosophicus, Routledge, 1922.
E. Zalta, A classically-based theory of impossible worlds, Notre Dame Journal of Formal Logic, vol. 38 (1997), no. 4, pp. 640--660.
Mathematical Reviews (MathSciNet): MR1648857
Digital Object Identifier: doi:10.1305/ndjfl/1039540774
Project Euclid: euclid.ndjfl/1039540774
Zentralblatt MATH: 0914.03001
