AbstractWe introduce aλ-calculus with symmetric reduction rules and “classical” types, i.e., types corresponding to formulas of classical propositional logic. The strong normalization property is proved to hold for such a calculus, as well as for its extension to a system equivalent to Peano arithmetic. A theorem on the shape of terms in normal form is also proved, making it possible to get recursive functions out of proofs ofΠ02formulas, i.e., those corresponding to program specifications
AbstractThis paper proposes and studies a particular typed λ-calculus for classical linear logic. I ...
AbstractParigot [Computational Logic and Proof Theory, vol. 713, 1993, p. 263] suggested symmetric s...
International audienceIn this paper, we present the lambda-mu-and-or-calculus which at the typed lev...
International audienceWe give arithmetical proofs of the strong normalization of two symmetric $\lam...
In any model of typed λ-calculus conianing some basic arithmetic, a functional p - * (procedure—* e...
AbstractIn this paper we give a strong normalization proof for a set of reduction rules for classica...
International audienceWe prove the strong normalization of full classical natural deduction (i.e. wi...
Accepté pour publication dans le journal APAL ; 25 pagesWe present a version of system F_omega in wh...
This thesis examines, from proof theoretical point of view, some of the calculi which can be related...
We introduce Pure Type Systems with Pairs generalising earlier work on program extraction in Typed L...
International audienceThe symmetric $\lambda \mu$-calculus is the $\lambda \mu$-calculus introduced ...
AbstractLambda-SF-calculus can represent programs as closed normal forms. In turn, all closed normal...
Accepté à CSL'07We show how to extract classical programs expressed in Krivine lambda-c-calculus fro...
© 2016 The Author(s) Lambda-SF-calculus can represent programs as closed normal forms. In turn, all ...
AbstractThis paper presents a step in the development of an operational approach to program extracti...
AbstractThis paper proposes and studies a particular typed λ-calculus for classical linear logic. I ...
AbstractParigot [Computational Logic and Proof Theory, vol. 713, 1993, p. 263] suggested symmetric s...
International audienceIn this paper, we present the lambda-mu-and-or-calculus which at the typed lev...
International audienceWe give arithmetical proofs of the strong normalization of two symmetric $\lam...
In any model of typed λ-calculus conianing some basic arithmetic, a functional p - * (procedure—* e...
AbstractIn this paper we give a strong normalization proof for a set of reduction rules for classica...
International audienceWe prove the strong normalization of full classical natural deduction (i.e. wi...
Accepté pour publication dans le journal APAL ; 25 pagesWe present a version of system F_omega in wh...
This thesis examines, from proof theoretical point of view, some of the calculi which can be related...
We introduce Pure Type Systems with Pairs generalising earlier work on program extraction in Typed L...
International audienceThe symmetric $\lambda \mu$-calculus is the $\lambda \mu$-calculus introduced ...
AbstractLambda-SF-calculus can represent programs as closed normal forms. In turn, all closed normal...
Accepté à CSL'07We show how to extract classical programs expressed in Krivine lambda-c-calculus fro...
© 2016 The Author(s) Lambda-SF-calculus can represent programs as closed normal forms. In turn, all ...
AbstractThis paper presents a step in the development of an operational approach to program extracti...
AbstractThis paper proposes and studies a particular typed λ-calculus for classical linear logic. I ...
AbstractParigot [Computational Logic and Proof Theory, vol. 713, 1993, p. 263] suggested symmetric s...
International audienceIn this paper, we present the lambda-mu-and-or-calculus which at the typed lev...