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Parametric Church's Thesis: Synthetic Computability without Choice - MaRDI portal

Parametric Church's Thesis: Synthetic Computability without Choice

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Publication:6386412

DOI10.1007/978-3-030-93100-1_6arXiv2112.11781MaRDI QIDQ6386412

Yannick Forster

Publication date: 22 December 2021

Abstract: In synthetic computability, pioneered by Richman, Bridges, and Bauer, one develops computability theory without an explicit model of computation. This is enabled by assuming an axiom equivalent to postulating a function phi to be universal for the space mathbbNomathbbN (mathsfCTphi, a consequence of the constructivist axiom mathsfCT), Markov's principle, and at least the axiom of countable choice. Assuming mathsfCT and countable choice invalidates the law of excluded middle, thereby also invalidating classical intuitions prevalent in textbooks on computability. On the other hand, results like Rice's theorem are not provable without a form of choice. In contrast to existing work, we base our investigations in constructive type theory with a separate, impredicative universe of propositions where countable choice does not hold and thus a priori mathsfCTphi and the law of excluded middle seem to be consistent. We introduce various parametric strengthenings of mathsfCTphi, which are equivalent to assuming mathsfCTphi and an Snm operator for phi like in the Snm theorem. The strengthened axioms allow developing synthetic computability theory without choice, as demonstrated by elegant synthetic proofs of Rice's theorem. Moreover, they seem to be not in conflict with classical intuitions since they are consequences of the traditional analytic form of mathsfCT. Besides explaining the novel axioms and proofs of Rice's theorem we contribute machine-checked proofs of all results in the Coq proof assistant.












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