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A continuity principle equivalent to the monotone $$Pi ^{0}_{1}$$ fan theorem
Archive for Mathematical Logic 58 (3-4):443-456 (2019)
Abstract
The strong continuity principle reads “every pointwise continuous function from a complete separable metric space to a metric space is uniformly continuous near each compact image.” We show that this principle is equivalent to the fan theorem for monotone \ bars. We work in the context of constructive reverse mathematics.Other Versions
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References found in this work
Constructive Functional Analysis.D. S. Bridges & Peter Zahn - 1982 - Journal of Symbolic Logic 47 (3):703-705.
Reverse Mathematics in Bishop’s Constructive Mathematics.Hajime Ishihara - 2006 - Philosophia Scientiae:43-59.
Sequences of real functions on [0, 1] in constructive reverse mathematics.Hannes Diener & Iris Loeb - 2009 - Annals of Pure and Applied Logic 157 (1):50-61.
A Bizarre Property Equivalent To The -fan Theorem.Josef Berger & Douglas Bridges - 2006 - Logic Journal of the IGPL 14 (6):867-871.
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