Add to ORKGRecursive types are added to the first- and second-order lambda calculi and the resulting typed terms are shown to be strongly normalizable. A necessary and sufficient condition for strong normalizability is given for unrestricted definitions of recursive types
Colloque avec actes et comité de lecture. internationale.International audiencePure Pattern Type Sys...
This paper introduces "lambda-hat", a simply typed lambda calculus supporting inductive types an...
Abstract: "With the help of continuations, we first construct a transformation T which transforms ev...
International audienceWe give an arithmetical proof of the strong normalization of the $\lambda$-cal...
AbstractMendler, N.P., Inductive types and type constraints in the second-order lambda calculus, Ann...
International audienceThe lambda_ws-calculus is a lambda-calculus with explicit substitutions that s...
In this paper we describe a method to prove the normalization property for a large variety of typed ...
This is an informal explanation of the main concepts and results of [Sev96]. We consider typed and u...
We prove normalization for a dependently typed lambda-calculus extended with first-order data types ...
We give an analysis of classes of recursive types by presenting two extensions of the simply-typed l...
Abstract In the simply-typed lambda-calculus, a hereditary substitution replaces a free variablein a...
We give an analysis of classes of recursive types by presenting two extensions of the simply-typed l...
In the simply-typed lambda-calculus, a hereditary substitution replaces a free variable in a normal ...
Abstract. A typed lambda calculus with recursion in all finite types is defined such that the first ...
Recursive types extend the simply-typed lambda calculus (STLC) with the additional expressive power ...
Colloque avec actes et comité de lecture. internationale.International audiencePure Pattern Type Sys...
This paper introduces "lambda-hat", a simply typed lambda calculus supporting inductive types an...
Abstract: "With the help of continuations, we first construct a transformation T which transforms ev...
International audienceWe give an arithmetical proof of the strong normalization of the $\lambda$-cal...
AbstractMendler, N.P., Inductive types and type constraints in the second-order lambda calculus, Ann...
International audienceThe lambda_ws-calculus is a lambda-calculus with explicit substitutions that s...
In this paper we describe a method to prove the normalization property for a large variety of typed ...
This is an informal explanation of the main concepts and results of [Sev96]. We consider typed and u...
We prove normalization for a dependently typed lambda-calculus extended with first-order data types ...
We give an analysis of classes of recursive types by presenting two extensions of the simply-typed l...
Abstract In the simply-typed lambda-calculus, a hereditary substitution replaces a free variablein a...
We give an analysis of classes of recursive types by presenting two extensions of the simply-typed l...
In the simply-typed lambda-calculus, a hereditary substitution replaces a free variable in a normal ...
Abstract. A typed lambda calculus with recursion in all finite types is defined such that the first ...
Recursive types extend the simply-typed lambda calculus (STLC) with the additional expressive power ...
Colloque avec actes et comité de lecture. internationale.International audiencePure Pattern Type Sys...
This paper introduces "lambda-hat", a simply typed lambda calculus supporting inductive types an...
Abstract: "With the help of continuations, we first construct a transformation T which transforms ev...