Artículo
On Product Logic with Truth-constants
Fecha de publicación:
12/2006
Editorial:
Oxford University Press
Revista:
Journal Of Logic And Computation
ISSN:
0955-792X
Idioma:
Inglés
Tipo de recurso:
Artículo publicado
Clasificación temática:
Resumen
Product Logic Π is an axiomatic extension of Hájek's Basic Fuzzy Logic BL coping with the 1-tautologies when the strong conjunction & and implication → are interpreted by the product of reals in [0, 1] and its residuum respectively. In this paper we investigate expansions of Product Logic by adding into the language a countable set of truth-constants (one truth-constant r\#304; for each r in a countable Π-subalgebra of [0, 1]) and by adding the corresponding book-keeping axioms for the truthconstants. We first show that the corresponding logics Π() are algebraizable, and hence complete with respect to the variety of Π()-algebras. The main result of the paper is the canonical standard completeness of these logics, that is, theorems of Π() are exactly the 1-tautologies of the algebra defined over the real unit interval where the truth-constants are interpreted as their own values. It is also shown that they do not enjoy the canonical strong standard completeness, but they enjoy it for finite theories when restricted to evaluated Π-formulas of the kind r\#304; → φ, where r\#304; is a truth-constant and φ a formula not containing truth-constants. Finally we consider the logics ΠΔ(), the expansion of Π() with the well-known Baaz's projection connective Δ, and we show canonical finite strong standard completeness for them.
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Articulos(IAM)
Articulos de INST.ARG.DE MATEMATICAS "ALBERTO CALDERON"
Articulos de INST.ARG.DE MATEMATICAS "ALBERTO CALDERON"
Citación
Savický, Petr; Cignoli, Roberto Leonardo Oscar; Esteva, Francesc; Godo, Lluis; Nogura, Carles; On Product Logic with Truth-constants; Oxford University Press; Journal Of Logic And Computation; 16; 2; 12-2006; 205-225
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