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Intuitionistic notions of boundedness in ℕ
Mathematical Logic Quarterly 55 (1):31-36 (2009)
Abstract
We consider notions of boundedness of subsets of the natural numbers ℕ that occur when doing mathematics in the context of intuitionistic logic. We obtain a new characterization of the notion of a pseudobounded subset and we formulate the closely related notion of a detachably finite subset. We establish metric equivalents for a subset of ℕ to be detachably finite and to satisfy the ascending chain condition. Following Ishihara, we spell out the relationship between detachable finiteness and sequential continuity. Most of the results do not require countable choiceMy notes
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Citations of this work
Constructive aspects of Riemann’s permutation theorem for series.J. Berger, Douglas Bridges, Hannes Diener & Helmet Schwichtenberg - forthcoming - Logic Journal of the IGPL.
The anti-Specker property, positivity, and total boundedness.Douglas Bridges & Hannes Diener - 2010 - Mathematical Logic Quarterly 56 (4):434-441.
The uniform boundedness theorem and a boundedness principle.Hajime Ishihara - 2012 - Annals of Pure and Applied Logic 163 (8):1057-1061.
References found in this work
Continuity properties in constructive mathematics.Hajime Ishihara - 1992 - Journal of Symbolic Logic 57 (2):557-565.
A constructive look at the completeness of the space $\mathcal{d} (\mathbb{r})$.Hajime Ishihara & Satoru Yoshida - 2002 - Journal of Symbolic Logic 67 (4):1511-1519.
A constructive look at the completeness of the space (ℝ).Hajime Ishihara & Satoru Yoshida - 2002 - Journal of Symbolic Logic 67 (4):1511-1519.
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