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MARKOV’S PRINCIPLE AND SUBSYSTEMS OF INTUITIONISTIC ANALYSIS

Published online by Cambridge University Press:  26 February 2019

JOAN RAND MOSCHOVAKIS*
Affiliation:
PROF. EMERITA OF MATHEMATICS, OCCIDENTAL COLLEGE 721 24TH STREET SANTA MONICA, CA90402, USA E-mail: [email protected]: https://www.math.ucla.edu/∼joan/

Abstract

Using a technique developed by Coquand and Hofmann [3] we verify that adding the analytical form MP1: $\forall \alpha (\neg \neg \exists {\rm{x}}\alpha ({\rm{x}}) = 0 \to \exists {\rm{x}}\alpha ({\rm{x}}) = 0)$ of Markov’s Principle does not increase the class of ${\rm{\Pi }}_2^0$ formulas provable in Kleene and Vesley’s formal system for intuitionistic analysis, or in subsystems obtained by omitting or restricting various axiom schemas in specified ways.

Type
Articles
Copyright
Copyright © The Association for Symbolic Logic 2019 

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References

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