Almost 20 years ago Ehrhard and Regnier, inspired by the semantics of linear logic, discoveredthe possibility of performing the Taylor expansion of a program in the realm of lambda-calculus. Evenforgetting the rational coefficients, the terms populating the Taylor expansion of a programcontain quantitative information about the program itself. Simply collecting such resourcesensitive approximants allows to define an approximation theory simpler than the original one,but still meaningful. Now, in mathematics, a notion of approximation is usually conceived as atool for inferring properties of the approximated objects: it is precisely the approach we adoptin this manuscript.In the first part of the thesis, we define this resource approximation...
We study the semantics of a resource sensitive extension of the lambda-calculus in a canonical refle...
AbstractWe present an extension of the lambda-calculus with differential constructions. We state and...
A Multiplicative-Exponential Linear Logic (MELL) proof-structure can be expanded into a set of resou...
Il y a un peu moins de 20 ans, Ehrhard et Regnier, inspirés par la sémantique de la logique linéaire...
The speculative ambition of replacing the old theory of program approximation based on syntactic con...
AbstractWe define the complete Taylor expansion of an ordinary lambda-term as an infinite linear com...
Le lambda-calcul avec ressources est une variante du lambda-calcul fondée sur la linéarité : les lam...
Elegant semantics and efficient implementations of functional programming languages can both be desc...
International audienceIn our paper "Uniformity and the Taylor expansion of ordinary lambda-terms" (w...
Elegant semantics and efficient implementations of functional programming languages can both be descri...
This thesis deals with the management of explicit resources in functional languages, stressing on pr...
International audienceThe connection between the Call-By-Push-Value lambda-calculus introduced by Le...
Originating in Girard's Linear logic, Ehrhard and Regnier's Taylor expansion of $\lambda$-terms has ...
The Curry-Howard isomorphism is the idea that proofs in natural deduction can be put in corresponden...
Cette thèse étudie la notion d'approximation dans le lambda-calcul selon différentes perspectives. D...
We study the semantics of a resource sensitive extension of the lambda-calculus in a canonical refle...
AbstractWe present an extension of the lambda-calculus with differential constructions. We state and...
A Multiplicative-Exponential Linear Logic (MELL) proof-structure can be expanded into a set of resou...
Il y a un peu moins de 20 ans, Ehrhard et Regnier, inspirés par la sémantique de la logique linéaire...
The speculative ambition of replacing the old theory of program approximation based on syntactic con...
AbstractWe define the complete Taylor expansion of an ordinary lambda-term as an infinite linear com...
Le lambda-calcul avec ressources est une variante du lambda-calcul fondée sur la linéarité : les lam...
Elegant semantics and efficient implementations of functional programming languages can both be desc...
International audienceIn our paper "Uniformity and the Taylor expansion of ordinary lambda-terms" (w...
Elegant semantics and efficient implementations of functional programming languages can both be descri...
This thesis deals with the management of explicit resources in functional languages, stressing on pr...
International audienceThe connection between the Call-By-Push-Value lambda-calculus introduced by Le...
Originating in Girard's Linear logic, Ehrhard and Regnier's Taylor expansion of $\lambda$-terms has ...
The Curry-Howard isomorphism is the idea that proofs in natural deduction can be put in corresponden...
Cette thèse étudie la notion d'approximation dans le lambda-calcul selon différentes perspectives. D...
We study the semantics of a resource sensitive extension of the lambda-calculus in a canonical refle...
AbstractWe present an extension of the lambda-calculus with differential constructions. We state and...
A Multiplicative-Exponential Linear Logic (MELL) proof-structure can be expanded into a set of resou...