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Prolog detects pathological self reference in the Gödel sentence
Abstract
This sentence G ↔ ¬(F ⊢ G) and its negation G ↔ ~(F ⊢ ¬G) are shown to meet the conventional definition of incompleteness: Incomplete(T) ↔ ∃φ ((T ⊬ φ) ∧ (T ⊬ ¬φ)). They meet conventional definition of incompleteness because neither the sentence nor its negation is provable in F (or any other formal system). --Author's Profile
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Added to PP
2021-04-10
Downloads
282 (#54,947)
6 months
88 (#45,218)
2021-04-10
Downloads
282 (#54,947)
6 months
88 (#45,218)
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