The speculative ambition of replacing the old theory of program approximation based on syntactic continuity with the theory of resource consumption based on Taylor expansion and originating from the differential γ-calculus is nowadays at hand. Using this resource sensitive theory, we provide simple proofs of important results in γ-calculus that are usually demonstrated by exploiting Scott's continuity, Berry's stability or Kahn and Plotkin's sequentiality theory. A paradigmatic example is given by the Perpendicular Lines Lemma for the Böhm tree semantics, which is proved here simply by induction, but relying on the main properties of resource approximants: strong normalization, confluence and linearity
International audienceThe Resource λ-calculus is a variation of the λ-calculus where arguments can b...
We investigate program equivalence for linear higher-order (sequential) languages endowed with primi...
International audienceIn the folklore of linear logic, a common intuition is that the structure of f...
The speculative ambition of replacing the old theory of program approximation based on syntactic con...
Almost 20 years ago Ehrhard and Regnier, inspired by the semantics of linear logic, discoveredthe po...
AbstractWe define the complete Taylor expansion of an ordinary lambda-term as an infinite linear com...
International audienceThe resource λ-calculus is a variation of the λ-calculus where arguments are s...
A Multiplicative-Exponential Linear Logic (MELL) proof-structure can be expanded into a set of resou...
We study the semantics of a resource sensitive extension of the lambda-calculus in a canonical refle...
Il y a un peu moins de 20 ans, Ehrhard et Regnier, inspirés par la sémantique de la logique linéaire...
International audienceWe introduce a notion of reduction on resource vectors, i.e. infinite linear c...
Originating in Girard's Linear logic, Ehrhard and Regnier's Taylor expansion of $\lambda$-terms has ...
International audienceIn our paper "Uniformity and the Taylor expansion of ordinary lambda-terms" (w...
International audienceLinear Logic is based on the analogy between algebraic linearity (i.e. commuta...
International audienceIt has been known since Ehrhard and Regnier's seminal work on the Taylor expan...
International audienceThe Resource λ-calculus is a variation of the λ-calculus where arguments can b...
We investigate program equivalence for linear higher-order (sequential) languages endowed with primi...
International audienceIn the folklore of linear logic, a common intuition is that the structure of f...
The speculative ambition of replacing the old theory of program approximation based on syntactic con...
Almost 20 years ago Ehrhard and Regnier, inspired by the semantics of linear logic, discoveredthe po...
AbstractWe define the complete Taylor expansion of an ordinary lambda-term as an infinite linear com...
International audienceThe resource λ-calculus is a variation of the λ-calculus where arguments are s...
A Multiplicative-Exponential Linear Logic (MELL) proof-structure can be expanded into a set of resou...
We study the semantics of a resource sensitive extension of the lambda-calculus in a canonical refle...
Il y a un peu moins de 20 ans, Ehrhard et Regnier, inspirés par la sémantique de la logique linéaire...
International audienceWe introduce a notion of reduction on resource vectors, i.e. infinite linear c...
Originating in Girard's Linear logic, Ehrhard and Regnier's Taylor expansion of $\lambda$-terms has ...
International audienceIn our paper "Uniformity and the Taylor expansion of ordinary lambda-terms" (w...
International audienceLinear Logic is based on the analogy between algebraic linearity (i.e. commuta...
International audienceIt has been known since Ehrhard and Regnier's seminal work on the Taylor expan...
International audienceThe Resource λ-calculus is a variation of the λ-calculus where arguments can b...
We investigate program equivalence for linear higher-order (sequential) languages endowed with primi...
International audienceIn the folklore of linear logic, a common intuition is that the structure of f...