LJQ is a focused sequent calculus for intuitionistic logic, with a simple restriction on the first premisss of the usual left introduction rule for implication. We discuss its history (going back to about 1950, or beyond), present the underlying theory and its applications both to terminating proof-search calculi and to call-by-value reduction in lambda calculus
. We exploit a system of realizers for classical logic, and a translation from resolution into the s...
. We describe a sequent calculus MJ, based on work of Herbelin, of which the cutfree derivations are...
We extend Parigot's -calculus to form a system of realizers for classical logic which reflects ...
LJQ is a focused sequent calculus for intuitionistic logic, with a simple restriction on the first p...
LJQ is a focused sequent calculus for intuitionistic logic, with a simple restriction on the first p...
LJQ is it focused sequent calculus for intuitionistic logic, with a simple restriction on the first ...
LJQ is it focused sequent calculus for intuitionistic logic, with a simple restriction on the first ...
Accepté pour publication dans J. Logic Comput. ; 24 pagesLJQ is a focused sequent calculus for intui...
International audienceWe investigate the control of evaluation strategies in a variant of the λ-calc...
International audienceWe investigate the control of evaluation strategies in a variant of the λ-calc...
International audienceWe present a compact sequent calculus LKU for classical logic organized around...
Gentzen's sequent calculi LK and LJ are landmark proof systems. They identify the structural rules o...
International audienceWe present a compact sequent calculus LKU for classical logic organized around...
Gentzen's sequent calculi LK and LJ are landmark proof systems. They identify the structural rules o...
Gentzen's sequent calculi LK and LJ are landmark proof systems. They identify the structural rules o...
. We exploit a system of realizers for classical logic, and a translation from resolution into the s...
. We describe a sequent calculus MJ, based on work of Herbelin, of which the cutfree derivations are...
We extend Parigot's -calculus to form a system of realizers for classical logic which reflects ...
LJQ is a focused sequent calculus for intuitionistic logic, with a simple restriction on the first p...
LJQ is a focused sequent calculus for intuitionistic logic, with a simple restriction on the first p...
LJQ is it focused sequent calculus for intuitionistic logic, with a simple restriction on the first ...
LJQ is it focused sequent calculus for intuitionistic logic, with a simple restriction on the first ...
Accepté pour publication dans J. Logic Comput. ; 24 pagesLJQ is a focused sequent calculus for intui...
International audienceWe investigate the control of evaluation strategies in a variant of the λ-calc...
International audienceWe investigate the control of evaluation strategies in a variant of the λ-calc...
International audienceWe present a compact sequent calculus LKU for classical logic organized around...
Gentzen's sequent calculi LK and LJ are landmark proof systems. They identify the structural rules o...
International audienceWe present a compact sequent calculus LKU for classical logic organized around...
Gentzen's sequent calculi LK and LJ are landmark proof systems. They identify the structural rules o...
Gentzen's sequent calculi LK and LJ are landmark proof systems. They identify the structural rules o...
. We exploit a system of realizers for classical logic, and a translation from resolution into the s...
. We describe a sequent calculus MJ, based on work of Herbelin, of which the cutfree derivations are...
We extend Parigot's -calculus to form a system of realizers for classical logic which reflects ...
Add to ORKG