Add to ORKGWe present $\cal L$, an extension of Parigot's $\lambda\mu$-calculus by adding negation as a type constructor, together with syntactic constructs that represent negation introduction and elimination. We will define a notion of reduction that extends $\lambda\mu$'s reduction system with two new reduction rules, and show that the system satisfies subject reduction. Using Aczel's generalisation of Tait and Martin-L\"of's notion of parallel reduction, we show that this extended reduction is confluent. Although the notion of type assignment has its limitations with respect to representation of proofs in natural deduction with implication and negation, we will show that all propositions that can be shown in there have a witness in $\cal L$. Using...
"This paper is about our hobby." That is the first sentence of [MP93], the first report on our forma...
International audienceIn this paper, we present the lambda-mu-and-or-calculus which at the typed lev...
This paper addresses the problem of extending the formulae-as-types principle to classical logic. Mo...
We present $\cal L$, an extension of Parigot's $\lambda\mu$-calculus byadding negation as a type con...
In this paper we investigate the Curry-Howard correspondence for constructive modal logic in light o...
In this paper we investigate the Curry-Howard correspondence for constructive modal logic in light o...
The correspondence between natural deduction proofs and λ-terms is presented and discussed. A varian...
In this thesis I introduce a new approach to the automated analysis of the reduction behaviour of A...
The role of Classical Logic in computer science is changing drastically over the last few years. Giv...
The lambda-Pi-calculus allows to express proofs of minimal predicate logic. It can be extended, in a...
14 pagesWe study a lambda-calculus with references and a types and effects system. In the first part...
International audienceIn this paper, we present the lambda-mu-and-or-calculus which at the typed lev...
The formal system \lambda\delta is a typed lambda calculus derived from \Lambda\infinity, aiming to...
This paper addresses the problem of extending the formulae-as-types principle to classical logic. Mo...
At the heart of the connections between Proof Theory and Type Theory, the Curry-Howard correspondenc...
"This paper is about our hobby." That is the first sentence of [MP93], the first report on our forma...
International audienceIn this paper, we present the lambda-mu-and-or-calculus which at the typed lev...
This paper addresses the problem of extending the formulae-as-types principle to classical logic. Mo...
We present $\cal L$, an extension of Parigot's $\lambda\mu$-calculus byadding negation as a type con...
In this paper we investigate the Curry-Howard correspondence for constructive modal logic in light o...
In this paper we investigate the Curry-Howard correspondence for constructive modal logic in light o...
The correspondence between natural deduction proofs and λ-terms is presented and discussed. A varian...
In this thesis I introduce a new approach to the automated analysis of the reduction behaviour of A...
The role of Classical Logic in computer science is changing drastically over the last few years. Giv...
The lambda-Pi-calculus allows to express proofs of minimal predicate logic. It can be extended, in a...
14 pagesWe study a lambda-calculus with references and a types and effects system. In the first part...
International audienceIn this paper, we present the lambda-mu-and-or-calculus which at the typed lev...
The formal system \lambda\delta is a typed lambda calculus derived from \Lambda\infinity, aiming to...
This paper addresses the problem of extending the formulae-as-types principle to classical logic. Mo...
At the heart of the connections between Proof Theory and Type Theory, the Curry-Howard correspondenc...
"This paper is about our hobby." That is the first sentence of [MP93], the first report on our forma...
International audienceIn this paper, we present the lambda-mu-and-or-calculus which at the typed lev...
This paper addresses the problem of extending the formulae-as-types principle to classical logic. Mo...