AbstractTermination for classical natural deduction is difficult in the presence of commuting/permutative conversions for disjunction. An approach based on reducibility candidates is presented that uses non-strictly positive inductive definitions.It covers second-order universal quantification and also the extension of the logic with fixed points of non-strictly positive operators, which appears to be a new result.Finally, the relation to Parigot’s strictly positive inductive definition of his set of reducibility candidates and to his notion of generalized reducibility candidates is explained
Abstract—Inductive and coinductive specifications are widely used in formalizing computational syste...
The goal of this paper is to extend classical logic with a generalized notion of inductive definitio...
Natural deduction with alternatives extends Gentzen–Prawitz-style natural deduction with a single st...
AbstractTermination for classical natural deduction is difficult in the presence of commuting/permut...
A new proof of strong normalization of Parigot’s second-order λµ-calculus is given by a reduction-pr...
International audienceWe give in this paper a short semantical proof of the strong normalization for...
International audienceIn this paper, we introduce a semantics of realisability for the classical pro...
In the current paper we present a powerful technique of obtaining natural deduction (or, in other wo...
AbstractThis paper is a comparative study of a number of (intensional-semantically distinct) least a...
In earlier articles we have introduced truth table natural deduction which allows one to extract nat...
We present a proof of strong normalization of proof-reduction in a general system of natural deducti...
International audienceWe give a direct, purely arithmetical and elementary proof of the strong norma...
Submitted to APALWe prove the strong normalization of full classical natural deduction (i.e. with co...
\u3cp\u3eWe develop a general method for deriving natural deduction rules from the truth table for a...
We present a new Curry-Howard correspondence for classical first-order natural deduction. We add to ...
Abstract—Inductive and coinductive specifications are widely used in formalizing computational syste...
The goal of this paper is to extend classical logic with a generalized notion of inductive definitio...
Natural deduction with alternatives extends Gentzen–Prawitz-style natural deduction with a single st...
AbstractTermination for classical natural deduction is difficult in the presence of commuting/permut...
A new proof of strong normalization of Parigot’s second-order λµ-calculus is given by a reduction-pr...
International audienceWe give in this paper a short semantical proof of the strong normalization for...
International audienceIn this paper, we introduce a semantics of realisability for the classical pro...
In the current paper we present a powerful technique of obtaining natural deduction (or, in other wo...
AbstractThis paper is a comparative study of a number of (intensional-semantically distinct) least a...
In earlier articles we have introduced truth table natural deduction which allows one to extract nat...
We present a proof of strong normalization of proof-reduction in a general system of natural deducti...
International audienceWe give a direct, purely arithmetical and elementary proof of the strong norma...
Submitted to APALWe prove the strong normalization of full classical natural deduction (i.e. with co...
\u3cp\u3eWe develop a general method for deriving natural deduction rules from the truth table for a...
We present a new Curry-Howard correspondence for classical first-order natural deduction. We add to ...
Abstract—Inductive and coinductive specifications are widely used in formalizing computational syste...
The goal of this paper is to extend classical logic with a generalized notion of inductive definitio...
Natural deduction with alternatives extends Gentzen–Prawitz-style natural deduction with a single st...