In this dissertation, we extend the methods of non-idempotent intersection type theory, pioneered by Gardner and de Carvalho, to some calculi beyond the lambda-calculus.- We first present a characterization of head and strong normalization in the lambda-mu calculus (classical natural deduction) by introducing non-idempotent union types. As in the intuitionistic case, non-idempotency allows us to extract quantitative information from the typing derivations and we obtain proofs of termination that are far more elementary than those in the idempotent case. These results leads us to define a small-step variant of the lambda-mu calculus, in which strong normalization is also characterized by means of quantitative methods.- In the second part of ...
International audienceWe present an explicitly typed lambda calculus "à la Church" based on the uni...
In this thesis, we present a quantitative study of the call-by-need lambda-calculus, both from type-...
We provide a new and elementary proof of strong normalization for the lambda calculus of intersectio...
In this dissertation, we extend the methods of non-idempotent intersection type theory, pioneered by...
L'objet de cette thèse est l'extension des méthodes de la théorie des types intersections non-idempo...
We study systems of non-idempotent intersection types for different variants of the lambda-calculus ...
We define two resource aware typing systems for the lambda-mu-calculus based on non-idempotent inter...
Intersection types are an essential tool in the analysis of operational and denotational properties ...
We present a typing system with non-idempotent intersection types, typing aterm syntax covering thre...
AbstractRecent work on infinitary versions of the lambda calculus has shown that the infinite lambda...
Recent work on infinitary versions of the lambda calculus has shown that the infinite lambda calculu...
International audienceThis paper revisits models of typed lambda calculus based on filters of inters...
This thesis presents the meta-theory of the Calculus of Inductive Constructions, that is the Calculu...
This paper revisits models of typed lambda-calculus based on filters of intersection types: By using...
Cette thèse étudie la notion d'approximation dans le lambda-calcul selon différentes perspectives. D...
International audienceWe present an explicitly typed lambda calculus "à la Church" based on the uni...
In this thesis, we present a quantitative study of the call-by-need lambda-calculus, both from type-...
We provide a new and elementary proof of strong normalization for the lambda calculus of intersectio...
In this dissertation, we extend the methods of non-idempotent intersection type theory, pioneered by...
L'objet de cette thèse est l'extension des méthodes de la théorie des types intersections non-idempo...
We study systems of non-idempotent intersection types for different variants of the lambda-calculus ...
We define two resource aware typing systems for the lambda-mu-calculus based on non-idempotent inter...
Intersection types are an essential tool in the analysis of operational and denotational properties ...
We present a typing system with non-idempotent intersection types, typing aterm syntax covering thre...
AbstractRecent work on infinitary versions of the lambda calculus has shown that the infinite lambda...
Recent work on infinitary versions of the lambda calculus has shown that the infinite lambda calculu...
International audienceThis paper revisits models of typed lambda calculus based on filters of inters...
This thesis presents the meta-theory of the Calculus of Inductive Constructions, that is the Calculu...
This paper revisits models of typed lambda-calculus based on filters of intersection types: By using...
Cette thèse étudie la notion d'approximation dans le lambda-calcul selon différentes perspectives. D...
International audienceWe present an explicitly typed lambda calculus "à la Church" based on the uni...
In this thesis, we present a quantitative study of the call-by-need lambda-calculus, both from type-...
We provide a new and elementary proof of strong normalization for the lambda calculus of intersectio...