In classical propositional logic, a theory T is prime (i.e., for every pair of formulas F,G, either T⊢F→G or T⊢G→F) iff it is complete. In Lukasiewicz infinite-valued logic the two notions split, completeness being stronger than primeness. Using toric desingularization algorithms and the fine structure of prime ideal spaces of free ℓ-groups, in this paper we shall characterize prime theories in infinite-valued logic. We will show that recursively enumerable (r.e.) prime theories over a finite number of variables are decidable, and we will exhibit an example of an undecidable r.e. prime theory over countably many variables.
Decidable and undecidable prime theories in infinite-valued logic / D. MUNDICI; G. PANTI. - In: ANNALS OF PURE AND APPLIED LOGIC. - ISSN 0168-0072. - STAMPA. - 108:(2001), pp. 269-278. [10.1016/S0168-0072(00)00051-8]
Decidable and undecidable prime theories in infinite-valued logic
MUNDICI, DANIELE;
2001
Abstract
In classical propositional logic, a theory T is prime (i.e., for every pair of formulas F,G, either T⊢F→G or T⊢G→F) iff it is complete. In Lukasiewicz infinite-valued logic the two notions split, completeness being stronger than primeness. Using toric desingularization algorithms and the fine structure of prime ideal spaces of free ℓ-groups, in this paper we shall characterize prime theories in infinite-valued logic. We will show that recursively enumerable (r.e.) prime theories over a finite number of variables are decidable, and we will exhibit an example of an undecidable r.e. prime theory over countably many variables.
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