Abstract
We investigate natural deduction proofs of the Lambek calculus from the point of view of tree automata. The main result is that the set of proofs of the Lambek calculus cannot be accepted by a finite tree automaton. The proof is extended to cover the proofs used by grammars based on the Lambek calculus, which typically use only a subset of the set of all proofs. While Lambek grammars can assign regular tree languages as structural descriptions, there exist Lambek grammars that assign non-regular structural descriptions, both when considering normal and non-normal proof trees. Combining the results of Pentus (1993) and Thatcher (1967), we can conclude that Lambek grammars, although generating only context-free languages, can extend the strong generative capacity of context-free grammars. Furthermore, we show that structural descriptions that disregard the use of introduction rules cannot be used for a compositional semantics following the Curry-Howard isomorphism.
The results of this paper are contained in my dissertation (Tiede, 1999). I would like to thank my thesis advisor Larry Moss, Johan van Benthem, Christian Retoré, and two anonymous referees for comments on this paper. All remaining errors are the author’s.
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References
Ajdukiewicz, K. Die syntaktische Konnexität. In Studia Philosophica 1:1–27, 1935.
Bar-Hillel, Y. Language and Information. Addison-Wesley, Reading, 1964
Benthem, J. van. Logical Syntax. In Theoretical Linguistics 14(2/3): 119–142, 1987.
Benthem, J. van Language in Action. MIT Press, Cambridge, MA, 1995.
Buszkowski, W. Proof Theory and Mathematical Linguistics. In Benthem, J. and A. ter Meulen (eds.) Handbook of Logic & Language. MIT Press: 683–736, Cambridge, 1997.
Carpenter, R. The Turing-completeness of multimodal categorial grammars. In JFAK. Essays Dedicated to Johan van Benthem on the Occasion of his 50th Birth-day. Gerbrandy, J., M. Marx, M. de Rijke, and Y. Venema (eds.), Vossiuspers, Amsterdam University Press, 1999.
Finkel, A. and I. Tellier. A polynomial algorithm for the membership problem with categorial grammars. In Theoretical Computer Science 164: 207–221, 1996.
Gécseg, F. and M. Steinby. Tree Automata, Akadémiai Kiadó, Budapest, 1984.
Hindley, J. R. Basic Simple Type Theory. Cambridge University Press, Cambridge, 1997.
Jaeger, G. On the generative capacity of multi-modal Categorial Grammars. IRCS Report 98-25, Institute for Research in Cognitive Science, University of Pennsylvania, Philadelphia, 1998.
Janssen, T. Compositionality. In Benthem, J. van, and A. ter Meulen (eds.) Handbook of Logic & Language. MIT Press, Cambridge, 1997.
Kozen, D., Automata and Computability. Springer, Berlin, 1997.
Lambek, J. The Mathematics of Sentence Structure. In American Mathematical Monthly 65: 154–169, 1958.
Moerbeek, O. Algorithmic and Formal Language Theoretic Aspects of Lambek Calculus. Unpublished Master’s Thesis, Dept. of Logic and Theoretical Computer Science, University of Amsterdam, 1991.
Moortgat, M. Categorial Type Logics. In Benthem, J. van, and A ter Meulen (eds.) Handbook of Logic & Language. Cambridge: MIT Press: 93–178, 1997.
Pentus, M. Lambek grammars are context-free. In Proc. 8th Annual IEEE Symposium on Logic in Computer Science., 1993.
Rogers, J. A Descriptive Approach to Language Theoretic Complexity. CSLI Publications, 1998.
Steedman, M. Categorial Grammar. In Lingua 90: 221–258, 1993.
Tiede, H.-J. Deductive Systems and Grammars. PhD Dissertation, Indiana University, 1999.
Thatcher, J. W. Characterizing Derivation Trees of Context-Free Grammars through a Generalization of Finite Automata Theory. In J.Comput. System Sci. 1, 317–322, 1967.
Wansing, H. The Logic of Information Structures. Springer Verlag, Berlin, 1993.
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Tiede, HJ. (2001). Lambek Calculus Proofs and Tree Automata. In: Moortgat, M. (eds) Logical Aspects of Computational Linguistics. LACL 1998. Lecture Notes in Computer Science(), vol 2014. Springer, Berlin, Heidelberg. https://doi.org/10.1007/3-540-45738-0_15
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DOI: https://doi.org/10.1007/3-540-45738-0_15
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