Abstract
Girard's recent system of linear logic is presented in a way that avoids the two-level structure of formulae and sequents, and that minimises the number of primitive function symbols. A deduction theorem is proved concerning the classical implication as embedded in linear logic. The Hilbert-style axiomatisation is proved to be equivalent to the sequent formalism. The axiomatisation leads to a complete class of algebraic models. Various models are exhibited. On the meta-level we use Dijkstra's method of explicit equational proofs. © 1990 BCS.
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CITATION STYLE
Hesselink, W. H. (1990). Axioms and models of linear logic. Formal Aspects of Computing, 2(1), 139–166. https://doi.org/10.1007/BF01888221
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