AbstractWe introduce interaction nets for a fragment of the differential lambda-calculus and exhibit in this framework a new symmetry between the of course and the why not modalities of linear logic, which is completely similar to the symmetry between the tensor and par connectives of linear logic. We use algebraic intuitions for introducing these nets and their reduction rules, and then we develop two correctness criteria (weak typability and acyclicity) and show that they guarantee strong normalization. Finally, we outline the correspondence between this interaction nets formalism and the resource lambda-calculus
Interaction nets are a graphical formalism inspired by Linear Logicproof-nets often used for studyin...
AbstractWe propose and study a translation of a pi-calculus without sums nor recursion into an untyp...
International audienceRecently Ehrhard and Regnier have introduced Differential Linear Logic, DILL f...
AbstractWe introduce interaction nets for the differential lambda-calculus and exhibit in this frame...
AbstractWe introduce interaction nets for a fragment of the differential lambda-calculus and exhibit...
20 pagee, to be published in the proceedings of LICS08International audienceThe Geometry of Interact...
We propose a translation of a finitary (that is, replication-free) version of the pi-calculus into p...
Interaction nets are a graphical paradigm of computation based on graph rewriting. They have proven ...
Interaction nets are a graphical paradigm of computation based on graph rewriting. They have proven ...
Abstract. We propose a translation of a finitary (that is, replicationfree) version of the monadic l...
Differential interaction nets (DIN) have been introduced by Thomas Ehrhard and Laurent Regnier as an...
AbstractInteraction nets are graph rewriting systems which are a generalisation of proof nets for cl...
AbstractThis paper presents a system of interaction nets, a graphical paradigm of computation based ...
AbstractWe define pure intuitionistic differential proof nets, extending Ehrhard and Regnier’s diffe...
International audienceWe define an extension of Herbelin's lambda-bar-mu-calculus, introducing a pro...
Interaction nets are a graphical formalism inspired by Linear Logicproof-nets often used for studyin...
AbstractWe propose and study a translation of a pi-calculus without sums nor recursion into an untyp...
International audienceRecently Ehrhard and Regnier have introduced Differential Linear Logic, DILL f...
AbstractWe introduce interaction nets for the differential lambda-calculus and exhibit in this frame...
AbstractWe introduce interaction nets for a fragment of the differential lambda-calculus and exhibit...
20 pagee, to be published in the proceedings of LICS08International audienceThe Geometry of Interact...
We propose a translation of a finitary (that is, replication-free) version of the pi-calculus into p...
Interaction nets are a graphical paradigm of computation based on graph rewriting. They have proven ...
Interaction nets are a graphical paradigm of computation based on graph rewriting. They have proven ...
Abstract. We propose a translation of a finitary (that is, replicationfree) version of the monadic l...
Differential interaction nets (DIN) have been introduced by Thomas Ehrhard and Laurent Regnier as an...
AbstractInteraction nets are graph rewriting systems which are a generalisation of proof nets for cl...
AbstractThis paper presents a system of interaction nets, a graphical paradigm of computation based ...
AbstractWe define pure intuitionistic differential proof nets, extending Ehrhard and Regnier’s diffe...
International audienceWe define an extension of Herbelin's lambda-bar-mu-calculus, introducing a pro...
Interaction nets are a graphical formalism inspired by Linear Logicproof-nets often used for studyin...
AbstractWe propose and study a translation of a pi-calculus without sums nor recursion into an untyp...
International audienceRecently Ehrhard and Regnier have introduced Differential Linear Logic, DILL f...