Relative and modified relative realizability

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Annals of Pure and Applied Logic 118 (1-2):115-132 (2002)
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Abstract

The classical forms of both modified realizability and relative realizability are naturally described in terms of the Sierpinski topos. The paper puts these two observations together and explains abstractly the existence of the geometric morphisms and logical functors connecting the various toposes at issue. This is done by advancing the theory of triposes over internal partial combinatory algebras and by employing a novel notion of elementary map

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10.1016/s0168-0072(01)00122-1

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Jaap Van Oosten
Leiden University

Citations of this work

Intuitionistic analysis at the end of time.Joan Rand Moschovakis - 2017 - Bulletin of Symbolic Logic 23 (3):279-295.
Introduction to Turing categories.J. Robin B. Cockett & Pieter Jw Hofstra - 2008 - Annals of Pure and Applied Logic 156 (2):183-209.

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References found in this work

The foundations of intuitionistic mathematics.Stephen Cole Kleene - 1965 - Amsterdam,: North-Holland Pub. Co.. Edited by Richard Eugene Vesley.
A semantical proof of De Jongh's theorem.Jaap van Oosten - 1991 - Archive for Mathematical Logic 31 (2):105-114.
Can there be no nonrecursive functions?Joan Rand Moschovakis - 1971 - Journal of Symbolic Logic 36 (2):309-315.

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