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Paper detail

How Much Propositional Logic Suffices for Rosser's Essential Undecidability Theorem?

In this paper we explore the following question: how weak can a logic be for Rosser's essential undecidability result to be provable for a weak arithmetical theory? It is well known that Robinson's Q is essentially undecidable in intuitionistic logic, and P. Hajek proved it in the fuzzy logic BL for Grzegorczyk's variant of Q which interprets the arithmetic operations as non-total non-functional relations. We present a proof of essential undecidability in a much weaker substructural logic and for a much weaker arithmetic theory, a version of Robinson's R (with arithmetic operations also interpreted as mere relations). Our result is based on a structural version of the undecidability argument introduced by Kleene and we show that it goes well beyond the scope of the Boolean, intuitionistic, or fuzzy logic.

preprint2020arXivOpen access
Guillermo BadiaPetr CintulaPetr HajekAndrew Tedder
math.LO
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Guillermo BadiaPetr CintulaPetr HajekAndrew Tedder

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