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FSS
2006
2006
The logic of tied implications, part 2: Syntax
An implication operator A is said to be tied if there is a binary operation T that ties A; that is, the identity A(a, A(b, z)) = A(T (a, b), z) holds for all a, b, z. We aim at the construction of a complete predicate logic for prelinear tied adjointness algebras. We realize this in three steps. In the first step, we establish a propositional calculus AdjTPC, complete for the class of all tied adjointness algebras on partially ordered sets; without prelinearity and ignoring the lattice operations. For that we supply a Hilbert system based on seven axioms and one deduction rule (modus ponens). In the second and third steps, we extend AdjTPC to propositional and predicate calculi; complete for prelinear tied adjointness algebras. We apply a duality principle, due to Morsi, in all three calculi; through which we manage to cut down the number of proofs.
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| Added | 12 Dec 2010 |
| Updated | 12 Dec 2010 |
| Type | Journal |
| Year | 2006 |
| Where | FSS |
| Authors | Nehad N. Morsi, Wafik Boulos Lotfallah, Moataz Saleh El-Zekey |
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