BL (logic)


Basic fuzzy Logic, the logic of continuous t-norms, is one of t-norm fuzzy logics. It belongs to the broader class of substructural logics, or logics of residuated lattices; it extends the logic of all left-continuous t-norms MTL.

Syntax

Language

The language of the propositional logic BL consists of countably many propositional variables and the following primitive logical connectives:
The following are the most common defined logical connectives:
Well-formed formulae of BL are defined as usual in propositional logics. In order to save parentheses, it is common to use the following order of precedence:
A Hilbert-style deduction system for BL has been introduced by Petr Hájek. Its single derivation rule is modus ponens:
The following are its axiom schemata:
The axioms and of the original axiomatic system were shown to be redundant and. All the other axioms were shown to be independent.

Semantics

Like in other propositional t-norm fuzzy logics, algebraic semantics is predominantly used for BL, with three main classes of algebras with respect to which the logic is complete: