Abstract
In mathematical proofs axioms and intermediary results are often represented by their names. It is however undecidable whether such a description corresponds to an underlying proof. This implies that there is sometimes no recursive bound of the complexity of the simplest underlying proof in the complexity of the abstract proof description, i.e. the abstract proof description might be non-recursively simpler.
Necessity by §8, no 1, Proposition 1; sufficiency by Theorem 1. (Proof of Corollary page 85 Bourbaki, General Topology 1).
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Notes
- 1.
The author is grateful to the anonymous referee for the hint to MacLane’s thesis which contains one of the few explicit discussions of proof macros with the corresponding rules in logic.
References
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Baaz, M. (2019). Note on the Benefit of Proof Representations by Name. In: Centrone, S., Negri, S., Sarikaya, D., Schuster, P.M. (eds) Mathesis Universalis, Computability and Proof. Synthese Library, vol 412. Springer, Cham. https://doi.org/10.1007/978-3-030-20447-1_4
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