We study the strong normalization of a new Curry-Howard correspondence for HA + EM1, constructive Heyting Arithmetic with the excluded middle on Sigma01-formulas. The proof-term language of HA + EM1 consists in the lambda calculus plus an operator ||_a which represents, from the viewpoint of programming, an exception operator with a delimited scope, and from the viewpoint of logic, a restricted version of the excluded middle. We give a strong normalization proof for the system based on a technique of "non-deterministic immersion"
This thesis examines, from proof theoretical point of view, some of the calculi which can be related...
We introduce a typed Tc-calculus where strong normali-sation is ensured by typability. Strong normal...
AbstractWe introduce a typed π-calculus where strong normalisation is ensured by typability. Strong ...
We study the strong normalization of a new Curry-Howard correspondence for HA+EM1, constructive Heyt...
We present a new Curry-Howard correspondence for HA + EM_1, constructive Heyting Arithmetic with the...
We present a new Curry-Howard correspondence for classical first-order natural deduction. We add to ...
We consider a de’Liguoro-Piperno-style extension of the pure lambda calculus with a non-deterministi...
International audienceWe present a new Curry-Howard correspondence for classical first-order natural...
In this paper we give an arithmetical proof of the strong normalization of λ Sym Prop of Berardi and...
This paper defines a sound and complete semantic criterion, based onreducibility candidates, for str...
In this paper we give an arithmetical proof of the strong normalization oflambda-Sym-Prop of Berardi...
International audienceUsual normalization by evaluation techniques have a strong relationship with c...
Abstract. In a previous paper [4], we introduced a non-deterministic λ-calculus (λ-LK) whose type sy...
Abstract. Usual normalization by evaluation techniques have a strong relationship with completeness ...
International audienceWe give arithmetical proofs of the strong normalization of two symmetric $\lam...
This thesis examines, from proof theoretical point of view, some of the calculi which can be related...
We introduce a typed Tc-calculus where strong normali-sation is ensured by typability. Strong normal...
AbstractWe introduce a typed π-calculus where strong normalisation is ensured by typability. Strong ...
We study the strong normalization of a new Curry-Howard correspondence for HA+EM1, constructive Heyt...
We present a new Curry-Howard correspondence for HA + EM_1, constructive Heyting Arithmetic with the...
We present a new Curry-Howard correspondence for classical first-order natural deduction. We add to ...
We consider a de’Liguoro-Piperno-style extension of the pure lambda calculus with a non-deterministi...
International audienceWe present a new Curry-Howard correspondence for classical first-order natural...
In this paper we give an arithmetical proof of the strong normalization of λ Sym Prop of Berardi and...
This paper defines a sound and complete semantic criterion, based onreducibility candidates, for str...
In this paper we give an arithmetical proof of the strong normalization oflambda-Sym-Prop of Berardi...
International audienceUsual normalization by evaluation techniques have a strong relationship with c...
Abstract. In a previous paper [4], we introduced a non-deterministic λ-calculus (λ-LK) whose type sy...
Abstract. Usual normalization by evaluation techniques have a strong relationship with completeness ...
International audienceWe give arithmetical proofs of the strong normalization of two symmetric $\lam...
This thesis examines, from proof theoretical point of view, some of the calculi which can be related...
We introduce a typed Tc-calculus where strong normali-sation is ensured by typability. Strong normal...
AbstractWe introduce a typed π-calculus where strong normalisation is ensured by typability. Strong ...