Undecidability of the Problem of Recognizing Axiomatizations of Superintuitionistic Propositional Calculi

Studia Logica 102 (5):1021-1039 (2014)
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Abstract

We give a new proof of the following result : it is undecidable whether a given calculus, that is a finite set of propositional formulas together with the rules of modus ponens and substitution, axiomatizes the classical logic. Moreover, we prove the same for every superintuitionistic calculus. As a corollary, it is undecidable whether a given calculus is consistent, whether it is superintuitionistic, whether two given calculi have the same theorems, whether a given formula is derivable in a given calculus. The proof is by reduction from the undecidable halting problem for the so-called tag systems introduced by Post. We also give a historical survey of related results

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10.1007/s11225-013-9520-5

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Computability & unsolvability.Martin Davis - 1958 - New York: Dover Publications.
Computability & Unsolvability.Clifford Spector - 1958 - Journal of Symbolic Logic 23 (4):432-433.
An undecidable problem in correspondence theory.L. A. Chagrova - 1991 - Journal of Symbolic Logic 56 (4):1261-1272.
A detailed argument for the Post-Linial theorems.Mary Katherine Yntema - 1964 - Notre Dame Journal of Formal Logic 5 (1):37-50.

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