Differential Linear Logic enriches Linear Logic with additional logical rules for the exponential connectives, dual to the usual rules of dereliction, weakening and contraction. We present a proof-net syntax for Differential Linear Logic and a categorical axiomatization of its denotational models. We also introduce a simple categorical condition on these models under which a general antiderivative operation becomes available. Last we briefly describe the model of sets and relations and give a more detailed account of the model of finiteness spaces and linear and continuous functions
Differential linear logic was introduced as a syntactic proof-theoretic approach to the analysis of ...
International audienceWe extend Ehrhard-Regnier's differential linear logic along the lines of Laure...
In Linear Logic ($\mathsf{LL}$), the exponential modality $!$ brings forth adistinction between non-...
This special issue is devoted to some aspects of the new ideas that recently arose from the work of ...
Linear Logic refines Classical Logic by taking into account the resources used during the proof and ...
With finiteness spaces, Ehrhard has shown a semantics of linear logic with a differentiation operati...
There are two types of duality in Linear Logic. The first one is negation, balancing positive and ne...
AbstractThe proof-theoretic origins and specialized models of linear logic make it primarily operati...
Linear Logic was introduced as the computational counterpart of the algebraic notion of linearity. D...
We present differential linear logic and its models, the associated resource and differential lambda...
Proof Theory is the result of a tumultuous history, developed on the periphery of mainstream mathema...
Differential categories have a rich relation with proof theory and linear logic. In this talk, we wi...
AbstractWe introduce interaction nets for a fragment of the differential lambda-calculus and exhibit...
International audienceWe give a geometric condition that characterizes the differential nets having ...
International audienceThis two-parts paper offers a survey of linear logic and ludics, which were in...
Differential linear logic was introduced as a syntactic proof-theoretic approach to the analysis of ...
International audienceWe extend Ehrhard-Regnier's differential linear logic along the lines of Laure...
In Linear Logic ($\mathsf{LL}$), the exponential modality $!$ brings forth adistinction between non-...
This special issue is devoted to some aspects of the new ideas that recently arose from the work of ...
Linear Logic refines Classical Logic by taking into account the resources used during the proof and ...
With finiteness spaces, Ehrhard has shown a semantics of linear logic with a differentiation operati...
There are two types of duality in Linear Logic. The first one is negation, balancing positive and ne...
AbstractThe proof-theoretic origins and specialized models of linear logic make it primarily operati...
Linear Logic was introduced as the computational counterpart of the algebraic notion of linearity. D...
We present differential linear logic and its models, the associated resource and differential lambda...
Proof Theory is the result of a tumultuous history, developed on the periphery of mainstream mathema...
Differential categories have a rich relation with proof theory and linear logic. In this talk, we wi...
AbstractWe introduce interaction nets for a fragment of the differential lambda-calculus and exhibit...
International audienceWe give a geometric condition that characterizes the differential nets having ...
International audienceThis two-parts paper offers a survey of linear logic and ludics, which were in...
Differential linear logic was introduced as a syntactic proof-theoretic approach to the analysis of ...
International audienceWe extend Ehrhard-Regnier's differential linear logic along the lines of Laure...
In Linear Logic ($\mathsf{LL}$), the exponential modality $!$ brings forth adistinction between non-...