MLF is a type system extending ML with first-class polymorphism as in system F. The main goal of the present paper is to show that MLF enjoys strong normalization, i.e. it has no infinite reduction paths. The proof of this result is achieved in several steps. We first focus on xMLF, the Church-style version of MLF, and show that it can be translated into a calculus of coercions: terms are mapped into terms and instantiations into coercions. This coercion calculus can be seen as a decorated version of system F, so that the simulation results entails strong normalization of xMLF through the same property of system F. We then transfer the result to all other versions of MLF using the fact that they can be compiled into xMLF and showing there i...
Tait's proof of strong normalization for the simply typed lambda-calculus is interpreted in a genera...
The language MLF is an extension of System-F that permits robust first-order partial type inference ...
We give a framework for denotational semantics for the polymorphic core of the programming languag...
MLF is a type system extending ML with first-class polymorphism as in system F. The main goal of the...
AbstractMLF is a type system extending ML with first-class polymorphism as in system F. The main goa...
International audienceMLF is a type system that seamlessly merges ML-style implicit butsecond-class ...
AbstractThe language MLF is a proposal for a new type system that supersedes both ML and System F, a...
International audienceIn [gallier], general results (due to Coppo, Dezani and Veneri) relating prope...
Functional programming languages, like OCaml or Haskell, rely on the lambda calculus for their core ...
MLF is a type system that seamlessly merges ML-style implicit but second-class polymorphism with Sys...
Directeur de thèse : Didier Rémy (INRIA Rocquencourt) Rapporteur : Benjamin Pierce (Université de Pe...
AbstractMLF is a type system that seamlessly merges ML-style implicit but second-class polymorphism ...
In this paper, we prove the strong normalisation for Martin- Lof's Logical Framework, and suggest th...
Contains fulltext : 91466.pdf (preprint version ) (Open Access
Les langages de programmation fonctionnels, comme OCaml ou Haskell, reposent sur le lambda calcul en...
Tait's proof of strong normalization for the simply typed lambda-calculus is interpreted in a genera...
The language MLF is an extension of System-F that permits robust first-order partial type inference ...
We give a framework for denotational semantics for the polymorphic core of the programming languag...
MLF is a type system extending ML with first-class polymorphism as in system F. The main goal of the...
AbstractMLF is a type system extending ML with first-class polymorphism as in system F. The main goa...
International audienceMLF is a type system that seamlessly merges ML-style implicit butsecond-class ...
AbstractThe language MLF is a proposal for a new type system that supersedes both ML and System F, a...
International audienceIn [gallier], general results (due to Coppo, Dezani and Veneri) relating prope...
Functional programming languages, like OCaml or Haskell, rely on the lambda calculus for their core ...
MLF is a type system that seamlessly merges ML-style implicit but second-class polymorphism with Sys...
Directeur de thèse : Didier Rémy (INRIA Rocquencourt) Rapporteur : Benjamin Pierce (Université de Pe...
AbstractMLF is a type system that seamlessly merges ML-style implicit but second-class polymorphism ...
In this paper, we prove the strong normalisation for Martin- Lof's Logical Framework, and suggest th...
Contains fulltext : 91466.pdf (preprint version ) (Open Access
Les langages de programmation fonctionnels, comme OCaml ou Haskell, reposent sur le lambda calcul en...
Tait's proof of strong normalization for the simply typed lambda-calculus is interpreted in a genera...
The language MLF is an extension of System-F that permits robust first-order partial type inference ...
We give a framework for denotational semantics for the polymorphic core of the programming languag...