References
J. Myhill,Embedding classical type theory in ‘intuitionistic’ type theory, in:Axiomatic set theory, pp. 267–270, AMS, Providence, Rhode Island.
S. Bernini,Interpretazione intuizionista di teorie a logica classica, forthcoming.
S. C. Kleene andR. E. Vesley,The foundations of intuitionistic mathematics, North-Holland, Amsterdam, 1965.
G. Kreisel,Lawless sequences of natural numbers,Compositio Mathematicae, 20 (1968), pp. 222–248.
A. S. Troelstra,Informal theory of choice sequences,Studia Logica 25 (1970), 31–54.
L. E. J. Brouwer,Points and spaces,Canadian Journal of Mathematics 6 (1954), pp. 1–17.
G. Kreisel,Mathematical logic, T. L. Saaty (ed.),Lectures on Modern Mathematics III, New York-London-Sydney, 1965, pp. 95–195.
A. S. Troelstra,Principles of intuitionism,Lecture Notes in Mathematics 95, Springer, Berlin-Heidelberg-New York, 1969.
H. Luckhardt,Extensional Goedel functional interpretation. A consistency proof of classical analysis,Lecture Notes in Mathematics 306, Berlin-Heidelberg-New York, 1973.
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Allatum est die 6 Novembris 1975
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Bernini, S. A very strong intuitionistic theory. Stud Logica 35, 377–385 (1976). https://doi.org/10.1007/BF02123404
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DOI: https://doi.org/10.1007/BF02123404