论文信息 - The bounded functional interpretation of the double negation shift

The bounded functional interpretation of the double negation shift

We prove that the (non-intuitionistic) law of the double negation shift has a bounded functional interpretation with bar recursive functional of finite type. As an application, we show that full numerical comprehension is compatible with the uniformities introduced by the characteristic principles of the bounded functional interpretation for the classical case.

Fernando Ferreira | Patrícia Engrácia

[1] Jaime Gaspar. Factorization of the Shoenfield-like Bounded Functional Interpretation , 2009, Notre Dame J. Formal Log..

[2] Paulo Oliva,et al. Bounded functional interpretation , 2005, Ann. Pure Appl. Log..

[3] Jeremy Avigad,et al. Chapter V – Gödel’s Functional (“Dialectica”) Interpretation , 1998 .

[4] Von Kurt Gödel,et al. ÜBER EINE BISHER NOCH NICHT BENÜTZTE ERWEITERUNG DES FINITEN STANDPUNKTES , 1958 .

[5] S. Shelah,et al. Annals of Pure and Applied Logic , 1991 .

[6] Paulo Oliva. Understanding and Using Spector's Bar Recursive Interpretation of Classical Analysis , 2006, CiE.

[7] U. Kohlenbach. Analysing proofs in analysis , 1996 .

[8] Marc Bezem,et al. Strongly majorizable functionals of finite type: A model for barrecursion containing discontinuous functionals , 1985, Journal of Symbolic Logic.

[9] A Most Artistic Package of a Jumble of Ideas , 2008 .

[10] A. Troelstra. Metamathematical investigation of intuitionistic arithmetic and analysis , 1973 .

[11] Ulrich Kohlenbach,et al. Applied Proof Theory - Proof Interpretations and their Use in Mathematics , 2008, Springer Monographs in Mathematics.

[12] W. A. Howard,et al. Functional interpretation of bar induction by bar recursion , 1968 .

[13] C. Spector. Provably recursive functionals of analysis: a consistency proof of analysis by an extension of princ , 1962 .