International audienceIn a recent paper, Herbelin developed a calculus dPA$^\omega$ in which constructive proofs for the axioms of countable and dependent choices could be derived via the encoding of a proof of countable universal quantification as a stream of it components. However, the property of normalization (and therefore the one of soundness) was only conjectured. The difficulty for the proof of normalization is due to the simultaneous presence of dependent dependent types (for the constructive part of the choice), of control operators (for classical logic), of coinductive objects (to encode functions of type $\mathbb{N} \to A$ into streams $(a_0,a_1,\ldots)$) and of lazy evaluation with sharing (for these coinductive objects).Buildi...
International audienceWe present the first typeful implementation of Normalization by Evaluation for...
We present a calculus providing a Curry-Howard correspondence to classical logic represented in the ...
This thesis offers a study of the Curry-Howard correspondence for a certain fragment (the canonical ...
International audienceIn a recent paper, Herbelin developed a calculus dPA$^\omega$ in which constru...
Dependent types are a key feature of the proof assistants based on the Curry-Howard isomorphism. It ...
International audienceThe dependent sum type of Martin-Löf's type theory provides a strong existenti...
International audienceWe define a variant of realizability where realizers are pairs of a term and a...
This thesis focused on the computational content of classical proofs, and specifically on proofs wit...
AbstractWe present a typed calculus λξ isomorphic to the implicational fragment of the classical seq...
Ariola et al defined a call-by-need λ-calculus with control, together with a sequent calculus presen...
Real world programming languages crucially depend on the availability of computational effects to ac...
1ère version rédigée en janvier 2011. Nombreuses corrections, et raffinements, appliqués après coup....
At the heart of the connections between Proof Theory and Type Theory, the Curry-Howard correspondenc...
We present a typed calculus LambdaXi isomorphic to the implicational fragment of the classical seque...
Commencée en Septembre 2003.At the heart of the connections between Proof Theory and Type Theory, th...
International audienceWe present the first typeful implementation of Normalization by Evaluation for...
We present a calculus providing a Curry-Howard correspondence to classical logic represented in the ...
This thesis offers a study of the Curry-Howard correspondence for a certain fragment (the canonical ...
International audienceIn a recent paper, Herbelin developed a calculus dPA$^\omega$ in which constru...
Dependent types are a key feature of the proof assistants based on the Curry-Howard isomorphism. It ...
International audienceThe dependent sum type of Martin-Löf's type theory provides a strong existenti...
International audienceWe define a variant of realizability where realizers are pairs of a term and a...
This thesis focused on the computational content of classical proofs, and specifically on proofs wit...
AbstractWe present a typed calculus λξ isomorphic to the implicational fragment of the classical seq...
Ariola et al defined a call-by-need λ-calculus with control, together with a sequent calculus presen...
Real world programming languages crucially depend on the availability of computational effects to ac...
1ère version rédigée en janvier 2011. Nombreuses corrections, et raffinements, appliqués après coup....
At the heart of the connections between Proof Theory and Type Theory, the Curry-Howard correspondenc...
We present a typed calculus LambdaXi isomorphic to the implicational fragment of the classical seque...
Commencée en Septembre 2003.At the heart of the connections between Proof Theory and Type Theory, th...
International audienceWe present the first typeful implementation of Normalization by Evaluation for...
We present a calculus providing a Curry-Howard correspondence to classical logic represented in the ...
This thesis offers a study of the Curry-Howard correspondence for a certain fragment (the canonical ...