International audienceAbstract In each variant of the $$\lambda $$ λ -calculus, factorization and normalization are two key properties that show how results are computed. Instead of proving factorization/normalization for the call-by-name (CbN) and call-by-value (CbV) variants separately, we prove them only once, for the bang calculus (an extension of the $$\lambda $$ λ -calculus inspired by linear logic and subsuming CbN and CbV), and then we transfer the result via translations, obtaining factorization/normalization for CbN and CbV. The approach is robust: it still holds when extending the calculi with operators and extra rules to model some additional computational features
The Dual Calculus, proposed recently by Wadler, is the outcome of two distinct lines of research in ...
We show that the standard normalization-by-evaluation construction for the simply-typed λβη-calculu...
AbstractWe develop the type theory of the Normalisation by Evaluation (NbE) algorithm for the λ-calc...
In each variant of the λ-calculus, factorization and normalization are two key properties that show ...
AbstractThis paper proves the confluency and the strong normalizability of the call-by-value λμ-calc...
The lambda-calculus with generalized applications is the Curry-Howard counterpart to the system of n...
International audienceWe consider the non-deterministic extension of the call-by-value lambda calcul...
The lambda-calculus with generalized applications is the Curry-Howard counterpart to the system of n...
We study the reduction in a lambda-calculus derived from Moggi's computational one, that we call the...
International audienceWe present a call-by-need λ-calculus that enables strong reduction (that is, r...
AbstractThe Dual Calculus, proposed recently by Wadler, is the outcome of two distinct lines of rese...
We investigate normalization in call-by-name formulation of λC-cal-culus, a constructive analogue of...
LJQ is it focused sequent calculus for intuitionistic logic, with a simple restriction on the first ...
Recently, a standardization theorem has been proven for a variant of Plotkin\u27s call-by-value lamb...
We show that the standard normalization-by-evaluation construction for the simply-typed λβη-calculus...
The Dual Calculus, proposed recently by Wadler, is the outcome of two distinct lines of research in ...
We show that the standard normalization-by-evaluation construction for the simply-typed λβη-calculu...
AbstractWe develop the type theory of the Normalisation by Evaluation (NbE) algorithm for the λ-calc...
In each variant of the λ-calculus, factorization and normalization are two key properties that show ...
AbstractThis paper proves the confluency and the strong normalizability of the call-by-value λμ-calc...
The lambda-calculus with generalized applications is the Curry-Howard counterpart to the system of n...
International audienceWe consider the non-deterministic extension of the call-by-value lambda calcul...
The lambda-calculus with generalized applications is the Curry-Howard counterpart to the system of n...
We study the reduction in a lambda-calculus derived from Moggi's computational one, that we call the...
International audienceWe present a call-by-need λ-calculus that enables strong reduction (that is, r...
AbstractThe Dual Calculus, proposed recently by Wadler, is the outcome of two distinct lines of rese...
We investigate normalization in call-by-name formulation of λC-cal-culus, a constructive analogue of...
LJQ is it focused sequent calculus for intuitionistic logic, with a simple restriction on the first ...
Recently, a standardization theorem has been proven for a variant of Plotkin\u27s call-by-value lamb...
We show that the standard normalization-by-evaluation construction for the simply-typed λβη-calculus...
The Dual Calculus, proposed recently by Wadler, is the outcome of two distinct lines of research in ...
We show that the standard normalization-by-evaluation construction for the simply-typed λβη-calculu...
AbstractWe develop the type theory of the Normalisation by Evaluation (NbE) algorithm for the λ-calc...