International audienceWe consider the non-deterministic extension of the call-by-value lambda calculus, which corresponds to the additive fragment of the linear-algebraic lambda-calculus. We define a fine-grained type system, capturing the right linearity present in such formalisms. After proving the subject reduction and the strong normalisation properties, we propose a translation of this calculus into the System F with pairs, which corresponds to a non linear fragment of linear logic. The translation provides a deeper understanding of the linearity in our setting
In Proceedings DCM 2011, arXiv:1207.6821International audienceWe describe a type system for the line...
In this paper we present a non-deterministic call-by-need (untyped) lambda calculus X,d with a const...
We consider a de’Liguoro-Piperno-style extension of the pure lambda calculus with a non-deterministi...
AbstractGirard described two translations of intuitionistic logic into linear logic, one where A→B m...
this paper is a minor refinement of one previously presented by Wadler [41,42], which is based on Gi...
If every lambda-abstraction in a lambda-term M binds at most one variable occurrence, then M is said...
International audienceWe consider the call-by-value lambda-calculus extended with a may-convergent n...
AbstractGirard described two translations of intuitionistic logic into linear logic, one where A → B...
Since it is unsound to reason about call-by-value languages using call-by name equational theories, ...
We prove a linearity theorem for an extension of linear logic with addition and multiplication by a ...
International audienceWe examine the relationship between the algebraic lambda-calculus, a fragment ...
We present an extension of the lambda-calculus with dierential constructions motivated by a model of...
We show that the full PCF language can be encoded in L_rec, a syntactically linear λ-calculus extend...
We examine the relationship between the algebraic lambda-calculus, a fragmentof the differential lam...
In this paper we present a non-deterministic call-by-need (untyped) lambda calculus lambda nd with a...
In Proceedings DCM 2011, arXiv:1207.6821International audienceWe describe a type system for the line...
In this paper we present a non-deterministic call-by-need (untyped) lambda calculus X,d with a const...
We consider a de’Liguoro-Piperno-style extension of the pure lambda calculus with a non-deterministi...
AbstractGirard described two translations of intuitionistic logic into linear logic, one where A→B m...
this paper is a minor refinement of one previously presented by Wadler [41,42], which is based on Gi...
If every lambda-abstraction in a lambda-term M binds at most one variable occurrence, then M is said...
International audienceWe consider the call-by-value lambda-calculus extended with a may-convergent n...
AbstractGirard described two translations of intuitionistic logic into linear logic, one where A → B...
Since it is unsound to reason about call-by-value languages using call-by name equational theories, ...
We prove a linearity theorem for an extension of linear logic with addition and multiplication by a ...
International audienceWe examine the relationship between the algebraic lambda-calculus, a fragment ...
We present an extension of the lambda-calculus with dierential constructions motivated by a model of...
We show that the full PCF language can be encoded in L_rec, a syntactically linear λ-calculus extend...
We examine the relationship between the algebraic lambda-calculus, a fragmentof the differential lam...
In this paper we present a non-deterministic call-by-need (untyped) lambda calculus lambda nd with a...
In Proceedings DCM 2011, arXiv:1207.6821International audienceWe describe a type system for the line...
In this paper we present a non-deterministic call-by-need (untyped) lambda calculus X,d with a const...
We consider a de’Liguoro-Piperno-style extension of the pure lambda calculus with a non-deterministi...