A negationless interpretation of intuitionistic theories

Erkenntnis 53 (1-2):155-179 (2000)
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Abstract

In a seriesof papers beginning in 1944, the Dutch mathematician and philosopherGeorge Francois Cornelis Griss proposed that constructivemathematics should be developedwithout the use of the intuitionistic negation1 and,moreover, without any use of a nullpredicate.In the present work, we give formalized versions of intuitionisticarithmetic, analysis,and higher-order arithmetic in the spirit ofGriss' ``negationless intuitionistic mathematics''and then consider their relation to thecurrent formalizations of thesetheories.

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10.1023/a:1005207512630

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Citations of this work

Notes on Constructive Negation.Grigori Mints - 2006 - Synthese 148 (3):701-717.

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References found in this work

Introduction to metamathematics.Stephen Cole Kleene - 1952 - Groningen: P. Noordhoff N.V..
Natural deduction: a proof-theoretical study.Dag Prawitz - 1965 - Mineola, N.Y.: Dover Publications.
Negationless Intuitionistic Mathematics.G. F. C. Griss - 1947 - Journal of Symbolic Logic 12 (2):62-62.
An extension of negationless logic.J. Kent Minichiello - 1969 - Notre Dame Journal of Formal Logic 10 (3):298-302.

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