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Dialectica interpretation of well-founded induction
Mathematical Logic Quarterly 54 (3):229-239 (2008)
Abstract
From a classical proof that the gcd of natural numbers a1 and a2 is a linear combination of the two, we extract by Gödel's Dialectica interpretation an algorithm computing the coefficients. The proof uses the minimum principle. We show generally how well-founded recursion can be used to Dialectica interpret well-founded induction, which is needed in the proof of the minimum principle. In the special case of the example above it turns out that we obtain a reasonable extracted term, representing an algorithm close to Euclid'sLinks
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Citations of this work
An analysis of gödel's dialectica interpretation via linear logic.Paulo Oliva - 2008 - Dialectica 62 (2):269–290.
Light dialectica revisited.Mircea-Dan Hernest & Trifon Trifonov - 2010 - Annals of Pure and Applied Logic 161 (11):1379-1389.
References found in this work
Über eine bisher noch nicht benützte erweiterung Des finiten standpunktes.Von Kurt Gödel - 1958 - Dialectica 12 (3‐4):280-287.
Über eine bisher noch nicht benützte Erweiterung des finiten Standpunktes.Kurt Gödel - 1958 - Dialectica 12 (3):280.
Refined program extraction from classical proofs.Ulrich Berger, Wilfried Buchholz & Helmut Schwichtenberg - 2002 - Annals of Pure and Applied Logic 114 (1-3):3-25.
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