Abstract EN:

This thesis deals with the existing links between two localized semantics of classical linear logic : indexed linear logic (LL(I)) of Bucciarelli and Ehrhard, and geometry of interaction (GoI) of Girard. First we introduce the localized relational semantics (RelLoc) in which exponentials are interpreted by nite families. We established a correspondance between families of elements of RelLoc and formulas of a variant of LL(I). The sequent calculus of this variant then represents the experiments for RelLoc. Next we dene the geometry of interaction for classical linear logic. Proofs are interpreted by sums of pairs made of a partial permutation interpreting an additive slice and a boolean identifying the slice. An operation of plunging enables to interpret the promotion. We detail the properties of this semantics, which is not an invariant of reduction. We can then establish a link between RelLoc and GoI, and make the partial permutations of GoI act on the elements of RelLoc. We proove that the ones invariant by the action of the GoI interpretation of a proof belongs to its interpretation in RelLoc