Schönfinkel-type operators for classical logic (Q993497)
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scientific article; zbMATH DE number 5788054
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Schönfinkel-type operators for classical logic |
scientific article; zbMATH DE number 5788054 |
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Schönfinkel-type operators for classical logic (English)
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20 September 2010
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The author defines a new operator, dual to Schönfinkel's one, and proves that this operator by itself is sufficient to define all the connectives and operators of classical first-order logic. It is shown that there are four binary operators such that each can serve as the only undefined logical constant for classical first-order logic and that, for every \(n\)-ary connective that yields a functionally complete singleton set of connectives, two Schönfinkel-type operators are definable, and all the latter ones are definable in this way.
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functional completeness
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sufficient sets of operators
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quantifiers
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Peirce
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Sheffer
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Post
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Schönfinkel.
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0.88392603
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0.87190735
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0.8699486
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0.8685879
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0.86813235
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