Friedberg Numbering in Fragments of Peano Arithmetic and α-Recursion Theory-Reference-Cited by-同舟云学术

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Friedberg Numbering in Fragments of Peano Arithmetic and α-Recursion Theory

Published:2013-12 Issue:4 Volume:78 Page:1135-1163
ISSN:0022-4812
Container-title:The Journal of Symbolic Logic
language:en
Short-container-title:J. symb. log.

Author:

Li Wei

Abstract

AbstractIn this paper, we investigate the existence of a Friedberg numbering in fragments of Peano Arithmetic and initial segments of Gödel's constructible hierarchy Lα, where α is Σ1 admissible. We prove that(1) Over P− + BΣ2, the existence of a Friedberg numbering is equivalent to IΣ2, and(2) For Lα, there is a Friedberg numbering if and only if the tame Σ2 projectum of α equals the Σ2 cofinality of α.

Publisher

Cambridge University Press (CUP)

Subject

Logic,Philosophy

Reference24 articles.

1. Techniques of Admissible Recursion Theory

2. ∑2 Induction and infinite injury priority arguments, part III: Prompt sets, minimal pairs and Shoenfield’s Conjecture

3. ∑n-Collection Schemas in Arithmetic

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1. On Arithmetical Numberings in Reverse Mathematics;Lecture Notes in Computer Science;2024

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