Admissibility of Cut in LC with Fixed Point Combinator

Studia Logica 81 (3):399-423 (2005)
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Abstract

The fixed point combinator (Y) is an important non-proper combinator, which is defhable from a combinatorially complete base. This combinator guarantees that recursive equations have a solution. Structurally free logics (LC) turn combinators into formulas and replace structural rules by combinatory ones. This paper introduces the fixed point and the dual fixed point combinator into structurally free logics. The admissibility of (multiple) cut in the resulting calculus is not provable by a simple adaptation of the similar proof for LC with proper combinators. The novelty of our proof—beyond proving the cut for a newly extended calculus–is that we add a fourth induction to the by-and-large Gentzen-style proof.

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10.1007/s11225-005-4651-y

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Katalin Bimbo
University of Alberta

Citations of this work

New Consecution Calculi for R→t.Katalin Bimbó & J. Michael Dunn - 2012 - Notre Dame Journal of Formal Logic 53 (4):491-509.
LEt ® , LR °[^( ~ )], LK and cutfree proofs.Katalin Bimbó - 2007 - Journal of Philosophical Logic 36 (5):557-570.
Dual Gaggle Semantics for Entailment.Katalin Bimbó - 2009 - Notre Dame Journal of Formal Logic 50 (1):23-41.

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References found in this work

Investigations into Logical Deduction.Gerhard Gentzen - 1964 - American Philosophical Quarterly 1 (4):288 - 306.
Combinators and structurally free logic.J. Dunn & R. Meyer - 1997 - Logic Journal of the IGPL 5 (4):505-537.
A truth value semantics for modal logic.J. Michael Dunn - 1973 - Journal of Symbolic Logic 42 (2):87--100.
Two extensions of the structurally free logic LC.K. Bimbó & J. Dunn - 1998 - Logic Journal of the IGPL 6 (3):403-424.
Semantics for structurally free logics LC+.K. Bimbó - 2001 - Logic Journal of the IGPL 9 (4):525-539.

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