We present two proof systems for implication-only intuitionistic logic in the calculus of structures. The first is a direct adaptation of the standard sequent calculus to the deep inference setting, and we describe a procedure for cut elimination, similar to the one from the sequent calculus, but using a non-local rewriting. The second system is the symmetric completion of the first, as normally given in deep inference for logics with a DeMorgan duality: all inference rules have duals, as cut is dual to the identity axiom. We prove a generalisation of cut elimination, that we call symmetric normalisation, where all rules dual to standard ones are permuted up in the derivation. The result is a decomposition theorem having cut elimination and...
Bi-intuitionistic logic is the extension of intuitionistic logic with exclusion, a connective dual t...
AbstractWe prove a folklore theorem, that two derivations in a cut-free sequent calculus for intuiti...
. We describe a sequent calculus MJ, based on work of Herbelin, of which the cutfree derivations are...
International audienceWe present two proof systems for implication-only intuitionistic logic in the ...
Abstract. In this paper we investigate, for intuitionistic implicational logic, the relationship bet...
. We describe a sequent calculus, based on work of Herbelin, of which the cut-free derivations are i...
In this thesis we see deductive systems for classical propositional and predicate logic which use de...
AbstractWe present new variants of known proofs of cut elimination for intuitionistic and classical ...
Abstract. In this paper we introduce a cut-elimination procedure for classical logic, which is both ...
Abstract. In this paper we present a strongly normalising cut-elimination procedure for classical lo...
Abstract. In this paper a strongly normalising cut-elimination procedure is presented for classical ...
Abstract. Inspired by the Curry-Howard correspondence, we study normalisation procedures in the dept...
This paper presents systems for first-order intuitionistic logic and several of its extensions in wh...
AbstractAlgebraic proofs of the cut-elimination theorems for classical and intuitionistic logic are ...
Algebraic proofs of the cut-elimination theorems for classical and intuitionistic logic are presente...
Bi-intuitionistic logic is the extension of intuitionistic logic with exclusion, a connective dual t...
AbstractWe prove a folklore theorem, that two derivations in a cut-free sequent calculus for intuiti...
. We describe a sequent calculus MJ, based on work of Herbelin, of which the cutfree derivations are...
International audienceWe present two proof systems for implication-only intuitionistic logic in the ...
Abstract. In this paper we investigate, for intuitionistic implicational logic, the relationship bet...
. We describe a sequent calculus, based on work of Herbelin, of which the cut-free derivations are i...
In this thesis we see deductive systems for classical propositional and predicate logic which use de...
AbstractWe present new variants of known proofs of cut elimination for intuitionistic and classical ...
Abstract. In this paper we introduce a cut-elimination procedure for classical logic, which is both ...
Abstract. In this paper we present a strongly normalising cut-elimination procedure for classical lo...
Abstract. In this paper a strongly normalising cut-elimination procedure is presented for classical ...
Abstract. Inspired by the Curry-Howard correspondence, we study normalisation procedures in the dept...
This paper presents systems for first-order intuitionistic logic and several of its extensions in wh...
AbstractAlgebraic proofs of the cut-elimination theorems for classical and intuitionistic logic are ...
Algebraic proofs of the cut-elimination theorems for classical and intuitionistic logic are presente...
Bi-intuitionistic logic is the extension of intuitionistic logic with exclusion, a connective dual t...
AbstractWe prove a folklore theorem, that two derivations in a cut-free sequent calculus for intuiti...
. We describe a sequent calculus MJ, based on work of Herbelin, of which the cutfree derivations are...