International audienceWe present a typing system for the λ-calculus, with non-idempotent intersection types. As it is the case in (some) systems with idempotent intersections, a λ-term is typable if and only if it is strongly normalising. Non-idempotency brings some further information into typing trees, such as a bound on the longest β-reduction sequence reducing a term to its normal form.We actually present these results in Klop’s extension of λ-calculus, where the bound that is read in the typing tree of a term is refined into an exact measure of the longest reduction sequence.This complexity result is, for longest reduction sequences, the counterpart of de Carvalho’s result for linear head-reduction sequence
AbstractA general reducibility method is developed for proving reduction properties of lambda terms ...
L'objet de cette thèse est l'extension des méthodes de la théorie des types intersections non-idempo...
We provide a new and elementary proof of strong normalization for the lambda calculus of intersectio...
International audienceWe present a typing system for the λ-calculus, with non-idempotent intersectio...
We present a typing system with non-idempotent intersection types, typing a term syntax covering thr...
We study systems of non-idempotent intersection types for different variants of the lambda-calculus ...
AbstractWe characterize β-strongly normalizing λ-terms by means of a non-idempotent intersection typ...
We define two resource aware typing systems for the lambda-mu-calculus based on non-idempotent inter...
Two new notions of reduction for terms of the λ-calculus are introduced and the question of whether ...
AbstractAmong all the reduction strategies for the untyped λ-calculus, the so called lazy β-evaluati...
AbstractWe introduce a new unification procedure for the type inference problem in the intersection ...
Abstract. This paper gives a characterisation, via intersection types, of the strongly normalising p...
Intersection types were originally introduced as idempotent, i.e., modulo the equivalence σ ∧σ = σ. ...
International audienceThis paper revisits models of typed lambda calculus based on filters of inters...
AbstractWe introduce a typed π-calculus where strong normalisation is ensured by typability. Strong ...
AbstractA general reducibility method is developed for proving reduction properties of lambda terms ...
L'objet de cette thèse est l'extension des méthodes de la théorie des types intersections non-idempo...
We provide a new and elementary proof of strong normalization for the lambda calculus of intersectio...
International audienceWe present a typing system for the λ-calculus, with non-idempotent intersectio...
We present a typing system with non-idempotent intersection types, typing a term syntax covering thr...
We study systems of non-idempotent intersection types for different variants of the lambda-calculus ...
AbstractWe characterize β-strongly normalizing λ-terms by means of a non-idempotent intersection typ...
We define two resource aware typing systems for the lambda-mu-calculus based on non-idempotent inter...
Two new notions of reduction for terms of the λ-calculus are introduced and the question of whether ...
AbstractAmong all the reduction strategies for the untyped λ-calculus, the so called lazy β-evaluati...
AbstractWe introduce a new unification procedure for the type inference problem in the intersection ...
Abstract. This paper gives a characterisation, via intersection types, of the strongly normalising p...
Intersection types were originally introduced as idempotent, i.e., modulo the equivalence σ ∧σ = σ. ...
International audienceThis paper revisits models of typed lambda calculus based on filters of inters...
AbstractWe introduce a typed π-calculus where strong normalisation is ensured by typability. Strong ...
AbstractA general reducibility method is developed for proving reduction properties of lambda terms ...
L'objet de cette thèse est l'extension des méthodes de la théorie des types intersections non-idempo...
We provide a new and elementary proof of strong normalization for the lambda calculus of intersectio...