Constructive proofs of the range property in lambda calculus (Q1314345)
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scientific article; zbMATH DE number 501163
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Constructive proofs of the range property in lambda calculus |
scientific article; zbMATH DE number 501163 |
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Constructive proofs of the range property in lambda calculus (English)
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26 September 1994
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The range property, conjectured in 1968 by Böhm, says that the range of a combinator \(F\), that is the set of all terms \(F A\) modulo \(\beta\)- convertibility, is either a singleton or an infinite set. This paper recalls first the classical (nonconstructive) proofs and then gives two constructive proofs. The first one adds to Böhm's idea of using a fixed point the coding of lambda-terms by natural numbers. The second is based on Ershov numerations. This leads to a generalization of the range theorem due to Statman.
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range property
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range of a combinator
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constructive proofs
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coding of lambda-terms by natural numbers
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Ershov numerations
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0.89249086
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0.88565385
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0.8818989
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0.8741605
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0.87071323
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