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PROOF-THEORETIC STRENGTHS OF WEAK THEORIES FOR POSITIVE INDUCTIVE DEFINITIONS

Published online by Cambridge University Press:  23 October 2018

TOSHIYASU ARAI*
Affiliation:
GRADUATE SCHOOL OF SCIENCE, CHIBA UNIVERSITY 1-33, YAYOI-CHO, INAGE-KU CHIBA, 263-8522, JAPANE-mail: [email protected]

Abstract

In this article the lightface ${\rm{\Pi }}_1^1$-Comprehension axiom is shown to be proof-theoretically strong even over ${\rm{RCA}}_0^{\rm{*}}$, and we calibrate the proof-theoretic ordinals of weak fragments of the theory ${\rm{I}}{{\rm{D}}_1}$ of positive inductive definitions over natural numbers. Conjunctions of negative and positive formulas in the transfinite induction axiom of ${\rm{I}}{{\rm{D}}_1}$ are shown to be weak, and disjunctions are strong. Thus we draw a boundary line between predicatively reducible and impredicative fragments of ${\rm{I}}{{\rm{D}}_1}$.

Type
Articles
Copyright
Copyright © The Association for Symbolic Logic 2018 

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References

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