On the quantifier complexity of Δ n+1 (T)– induction

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Archive for Mathematical Logic 43 (3):371-398 (2004)
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Abstract

In this paper we continue the study of the theories IΔ n+1 (T), initiated in [7]. We focus on the quantifier complexity of these fragments and theirs (non)finite axiomatization. A characterization is obtained for the class of theories such that IΔ n+1 (T) is Π n+2 –axiomatizable. In particular, IΔ n+1 (IΔ n+1 ) gives an axiomatization of Th Π n+2 (IΔ n+1 ) and is not finitely axiomatizable. This fact relates the fragment IΔ n+1 (IΔ n+1 ) to induction rule for Δ n+1 –formulas. Our arguments, involving a construction due to R. Kaye (see [9]), provide proofs of Parsons’ conservativeness theorem (see [16]) and (a weak version) of a result of L.D. Beklemishev on unnested applications of induction rules for Π n+2 and Δ n+1 formulas (see [2])

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10.1007/s00153-003-0198-7

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Author Profiles

Andrés Cordón
Felicity Martin
University of Sydney
Alexis Fernandez
Florida International University

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References found in this work

A proof-theoretic analysis of collection.Lev D. Beklemishev - 1998 - Archive for Mathematical Logic 37 (5-6):275-296.
On Σ1‐definable Functions Provably Total in I ∏ 1−.Teresa Bigorajska - 1995 - Mathematical Logic Quarterly 41 (1):135-137.

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