How to be R eally Contraction-Free

Studia Logica 52 (3):381 - 391 (1993)
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Abstract

A logic is said to be contraction free if the rule from A→(A→B) to A→B is not truth preserving. It is well known that a logic has to be contraction free for it to support a non-trivial naïve theory of sets or of truth. What is not so well known is that if there is another contracting implication expressible in the language, the logic still cannot support such a naïve theory. A logic is said to be robustly contraction free if there is no such operator expressible in its language. We show that a large class of finitely valued logics are each not robustly contraction free, and demonstrate that some other contraction free logics fail to be robustly contraction free. Finally, the sublogics of Łω (with the standard connectives) are shown to be robustly contraction free.

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10.1007/bf01057653

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Greg Restall
University of Melbourne

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References found in this work

Logical paradoxes for many-valued systems.Moh Shaw-Kwei - 1954 - Journal of Symbolic Logic 19 (1):37-40.
Where gamma fails.Robert K. Meyer, Steve Giambrone & Ross T. Brady - 1984 - Studia Logica 43 (3):247 - 256.

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