Weak implicational logics related to the Lambek calculus

Zielonka Wojciech

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(2009) Towards mathematical philosophy, Dordrecht, Springer.

Weak implicational logics related to the Lambek calculus

Gentzen versus Hilbert formalisms

Wojciech Zielonka

pp. 201-212

It has been proved by the author that the product-free Lambek calculus with the empty string in its associative (L ₀) and non-associative (NL ₀) variant is not finitely Gentzen-style axiomatizable if the only rule of inference is the cut rule. We give here rather detailed outlines of the proofs for both L ₀ and NL ₀. In the last section, Hilbert-style axiomatics for the corresponding weak implicational calculi are given.

Publication details

DOI: 10.1007/978-1-4020-9084-4_10

Full citation:

Zielonka, W. (2009)., Weak implicational logics related to the Lambek calculus: Gentzen versus Hilbert formalisms, in D. Makinson, J. Malinowski & H. Wansing (eds.), Towards mathematical philosophy, Dordrecht, Springer, pp. 201-212.

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