We establish the Robinson joint consistency theorem for the infinite-valued propositional logic of Łukasiewicz. As a corollary we easily obtain the amalgamation property for MV-algebras—the algebras of Łukasiewicz logic: all pre-existing proofs of this latter result make essential use of the Pierce amalgamation theorem for abelian lattice-ordered groups (with strong unit) together with the categorical equivalence between these groups and MV-algebras. Our main tools are elementary and geometric.
Geometry of Robinson consistency in Łukasiewicz logic / D. MUNDICI; BUSANICHE M. - In: ANNALS OF PURE AND APPLIED LOGIC. - ISSN 0168-0072. - STAMPA. - 147:(2007), pp. 1-22. [10.1016/j.apal.2006.11.003]
Geometry of Robinson consistency in Łukasiewicz logic
MUNDICI, DANIELE;
2007
Abstract
We establish the Robinson joint consistency theorem for the infinite-valued propositional logic of Łukasiewicz. As a corollary we easily obtain the amalgamation property for MV-algebras—the algebras of Łukasiewicz logic: all pre-existing proofs of this latter result make essential use of the Pierce amalgamation theorem for abelian lattice-ordered groups (with strong unit) together with the categorical equivalence between these groups and MV-algebras. Our main tools are elementary and geometric.
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