International audienceIt has been known since Ehrhard and Regnier's seminal work on the Taylor expansion of $\lambda$-terms that this operation commutes with normalization: the expansion of a $\lambda$-term is always normalizable and its normal form is the expansion of the B\"ohm tree of the term. We generalize this result to the non-uniform setting of the algebraic $\lambda$-calculus, i.e. $\lambda$-calculus extended with linear combinations of terms. This requires us to tackle two difficulties: foremost is the fact that Ehrhard and Regnier's techniques rely heavily on the uniform, deterministic nature of the ordinary $\lambda$-calculus, and thus cannot be adapted; second is the absence of any satisfactory generic extension of the notion o...
The resource calculus is an extension of the λ-calculus allowing to model resource consumption. It i...
The resource calculus is an extension of the lambda-calculus allowing to model resource consumption....
International audienceWe study the problem of defining normal forms of terms for the algebraic -calc...
International audienceWe introduce a notion of reduction on resource vectors, i.e. infinite linear c...
International audienceWe show that the normal form of the Taylor expansion of a $\lambda$-term is is...
AbstractWe define the complete Taylor expansion of an ordinary lambda-term as an infinite linear com...
Originating in Girard's Linear logic, Ehrhard and Regnier's Taylor expansion of $\lambda$-terms has ...
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...
12 pagesInternational audienceWe introduce and study a version of Krivine's machine which provides a...
International audienceIn our paper "Uniformity and the Taylor expansion of ordinary lambda-terms" (w...
AbstractBuilding on previous work by Mints, Buchholz and Schwichtenberg, a simplified version of con...
International audienceThe resource λ-calculus is a variation of the λ-calculus where arguments are s...
If every lambda-abstraction in a lambda-term M binds at most one variable occurrence, then M is said...
International audienceLinear Logic is based on the analogy between algebraic linearity (i.e. commuta...
The resource calculus is an extension of the λ-calculus allowing to model resource consumption. It i...
The resource calculus is an extension of the lambda-calculus allowing to model resource consumption....
International audienceWe study the problem of defining normal forms of terms for the algebraic -calc...
International audienceWe introduce a notion of reduction on resource vectors, i.e. infinite linear c...
International audienceWe show that the normal form of the Taylor expansion of a $\lambda$-term is is...
AbstractWe define the complete Taylor expansion of an ordinary lambda-term as an infinite linear com...
Originating in Girard's Linear logic, Ehrhard and Regnier's Taylor expansion of $\lambda$-terms has ...
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...
12 pagesInternational audienceWe introduce and study a version of Krivine's machine which provides a...
International audienceIn our paper "Uniformity and the Taylor expansion of ordinary lambda-terms" (w...
AbstractBuilding on previous work by Mints, Buchholz and Schwichtenberg, a simplified version of con...
International audienceThe resource λ-calculus is a variation of the λ-calculus where arguments are s...
If every lambda-abstraction in a lambda-term M binds at most one variable occurrence, then M is said...
International audienceLinear Logic is based on the analogy between algebraic linearity (i.e. commuta...
The resource calculus is an extension of the λ-calculus allowing to model resource consumption. It i...
The resource calculus is an extension of the lambda-calculus allowing to model resource consumption....
International audienceWe study the problem of defining normal forms of terms for the algebraic -calc...