International audienceWe give an analysis of various classical axioms and characterize a notion of minimal classical logic that enforces Peirce's law without enforcing Ex Falso Quodlibet. We show that a "natural" implementation of this logic is Parigot's classical natural deduction. We then move on to the computational side and emphasize that Parigot's lambda-mu corresponds to minimal classical logic. A continuation constant must be added to lambda-mu to get full classical logic. The extended calculus is isomorphic to a syntactical restriction of Felleisen's theory of control that offers a more expressive reduction semantics. This isomorphic calculus is in correspondence with a refined version of Prawitz's natural deduction
In earlier articles we have introduced truth table natural deduction which allows one to extract nat...
International audienceCombinatory logic shows that bound variables can be eliminated without loss of...
In this thesis we use the syntactic-semantic method of constructive type theory to give meaning to c...
International audienceWe give an analysis of various classical axioms and characterize a notion of m...
Abstract. We give an analysis of various classical axioms and characterize a notion of minimal class...
AbstractThis paper proposes and studies a particular typed λ-calculus for classical linear logic. I ...
This paper studies a new classical natural deduction system, presented as a typed calculus named $\l...
International audienceWe present a new Curry-Howard correspondence for classical first-order natural...
AbstractThis paper considers a typed λ-calculus for classical linear logic. I shall give an explanat...
AbstractIn stark contrast to Natural Deduction for Intuitionistic Logic, Natural Deduction for Class...
In this paper we give a strong normalization proof for a set of reduction rules for classical logic....
We present a calculus providing a Curry-Howard correspondence to classical logic represented in the ...
International audienceIn this paper, we present the lambda-mu-and-or-calculus which at the typed lev...
The Curry-Howard isomorphism is the idea that proofs in natural deduction can be put in corresponden...
We present a new Curry-Howard correspondence for classical first-order natural deduction. We add to ...
In earlier articles we have introduced truth table natural deduction which allows one to extract nat...
International audienceCombinatory logic shows that bound variables can be eliminated without loss of...
In this thesis we use the syntactic-semantic method of constructive type theory to give meaning to c...
International audienceWe give an analysis of various classical axioms and characterize a notion of m...
Abstract. We give an analysis of various classical axioms and characterize a notion of minimal class...
AbstractThis paper proposes and studies a particular typed λ-calculus for classical linear logic. I ...
This paper studies a new classical natural deduction system, presented as a typed calculus named $\l...
International audienceWe present a new Curry-Howard correspondence for classical first-order natural...
AbstractThis paper considers a typed λ-calculus for classical linear logic. I shall give an explanat...
AbstractIn stark contrast to Natural Deduction for Intuitionistic Logic, Natural Deduction for Class...
In this paper we give a strong normalization proof for a set of reduction rules for classical logic....
We present a calculus providing a Curry-Howard correspondence to classical logic represented in the ...
International audienceIn this paper, we present the lambda-mu-and-or-calculus which at the typed lev...
The Curry-Howard isomorphism is the idea that proofs in natural deduction can be put in corresponden...
We present a new Curry-Howard correspondence for classical first-order natural deduction. We add to ...
In earlier articles we have introduced truth table natural deduction which allows one to extract nat...
International audienceCombinatory logic shows that bound variables can be eliminated without loss of...
In this thesis we use the syntactic-semantic method of constructive type theory to give meaning to c...