On phase semantics and denotational semantics in multiplicative–additive linear logic

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Annals of Pure and Applied Logic 102 (3):247-282 (2000)
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Abstract

We study the notion of logical relation in the coherence space semantics of multiplicative-additive linear logic . We show that, when the ground-type logical relation is “closed under restrictions”, the logical relation associated to any type can be seen as a map associating facts of a phase space to families of points of the web of the corresponding coherence space. We introduce a sequent calculus extension of whose formulae denote these families of points. This logic admits a truth-value semantics in the previously mentioned phase space, and this truth-value semantics faithfully describes the logical relation model we started from. Then we generalize this notion of phase space, we prove a truth-value completeness result for and we derive from any phase model of a denotational model for . Using the truth-value completeness result, we obtain a weak denotational completeness result based on this new denotational semantics

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10.1016/s0168-0072(99)00040-8

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Citations of this work

A Completeness Theorem For Symmetric Product Phase Spaces.Thomas Ehrhard - 2004 - Journal of Symbolic Logic 69 (2):340-370.

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Domain theory in logical form.Samson Abramsky - 1991 - Annals of Pure and Applied Logic 51 (1-2):1-77.

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