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An Upper Bound for the Proof-Theoretic Strength of Martin-Löf Type Theory with W-type and One Universe

In: The Legacy of Kurt Schütte

Author

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  • A. Setzer

    (Swansea University Bay Campus, Department of Computer Science)

Abstract

We present an upper bound for the proof theoretic strength of Martin-Lof’s type theory with W-type and one universe. This proof, together with the well ordering proof carried out in [12] shows that the proof theoretic strength of this theory is precisely ψΩ1ΩI+ω, which is slightly more than the strength of Feferman’s theory T0, the classical set theory KPI, and the subsystem of analysis (Δ12−CA)+(BI). The strength of the intensional and extensional version, and of the version a la Tarski and a la Russell are shown to be the same. The proof is carried out by interpreting the type theories in question in an extension of Kripke-Platek set theory KPI+. We show that validity of Π11-sentences is preserved in this interpretation.

Suggested Citation

  • A. Setzer, 2020. "An Upper Bound for the Proof-Theoretic Strength of Martin-Löf Type Theory with W-type and One Universe," Springer Books, in: Reinhard Kahle & Michael Rathjen (ed.), The Legacy of Kurt Schütte, chapter 0, pages 299-343, Springer.
    • Handle: RePEc:spr:sprchp:978-3-030-49424-7_16
    DOI: 10.1007/978-3-030-49424-7_16
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