Hájek basic fuzzy logic and Łukasiewicz infinite-valued logic
Using the theory of BL-algebras, it is shown that a prepositional formula φ is derivable in Łukasiewicz infinite valued Logic if and only if its double negation ∼∼ φ is derivable in Hájek Basic Fuzzy logic. If SBL is the extension of Basic Logic by the axiom (φ & (φ ⇒ ∼ φ)) ⇒ ψ, then φ is deriva...
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| Autores principales: | , |
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| Formato: | JOUR |
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| Acceso en línea: | http://hdl.handle.net/20.500.12110/paper_09335846_v42_n4_p361_Cignoli |
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| Sumario: | Using the theory of BL-algebras, it is shown that a prepositional formula φ is derivable in Łukasiewicz infinite valued Logic if and only if its double negation ∼∼ φ is derivable in Hájek Basic Fuzzy logic. If SBL is the extension of Basic Logic by the axiom (φ & (φ ⇒ ∼ φ)) ⇒ ψ, then φ is derivable in in classical logic if and only if ∼∼ φ is derivable in SBL. Axiomatic extensions of Basic Logic are in correspondence with subvarieties of the variety of BL-algebras. It is shown that the MV-algebra of regular elements of a free algebra in a subvariety of BL-algebras is free in the corresponding subvariety of MV-algebras, with the same number of free generators. Similar results are obtained for the generalized BL-algebras of dense elements of free BL-algebras. |
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