AbstractWe present an introduction to infinitary lambda calculus, highlighting its main properties. Subsequently we give three applications of infinitary lambda calculus. The first addresses the non-definability of Surjective Pairing, which was shown by the first author not to be definable in lambda calculus. We show how this result follows easily as an application of Berry’s Sequentiality Theorem, which itself can be proved in the setting of infinitary lambda calculus. The second pertains to the notion of relative recursiveness of number-theoretic functions. The third application concerns an explanation of counterexamples to confluence of lambda calculus extended with non-left-linear reduction rules: Adding non-left-linear reduction rules ...
International audienceIn our paper "Uniformity and the Taylor expansion of ordinary lambda-terms" (w...
AbstractThe use of λ-calculus in richer settings, possibly involving parallelism, is examined in ter...
International audienceThe lambda mu-calculus is an extension of the lambda-calculus that has been in...
We present an introduction to infinitary lambda calculus, highlighting its main properties. Subseque...
AbstractWe present an introduction to infinitary lambda calculus, highlighting its main properties. ...
Originating in Girard's Linear logic, Ehrhard and Regnier's Taylor expansion of $\lambda$-terms has ...
In this paper we present a set of necessary and sufficient conditions on a set of lambda terms to s...
We provide a coinductive definition of strongly convergent reductions between infinite lambda terms....
International audienceWe introduce a linear infinitary λ-calculus, called Λ∞, in which two exponenti...
International audienceIn this paper, we present the lambda-mu-and-or-calculus which at the typed lev...
In a previous paper we have established the theory of transfinite reduction for orthogonal term rewr...
AbstractIn a previous paper we have established the theory of transfinite reduction for orthogonal t...
AbstractWe consider the equational theory λπ of λ-calculus extended with constants π, π0, π1 and axi...
We answer Klop and de Vrijer's question whether adding surjective-pairing axioms to the extensional ...
37 pagesInternational audienceWe show that lambda calculus is a computation model which can step by ...
International audienceIn our paper "Uniformity and the Taylor expansion of ordinary lambda-terms" (w...
AbstractThe use of λ-calculus in richer settings, possibly involving parallelism, is examined in ter...
International audienceThe lambda mu-calculus is an extension of the lambda-calculus that has been in...
We present an introduction to infinitary lambda calculus, highlighting its main properties. Subseque...
AbstractWe present an introduction to infinitary lambda calculus, highlighting its main properties. ...
Originating in Girard's Linear logic, Ehrhard and Regnier's Taylor expansion of $\lambda$-terms has ...
In this paper we present a set of necessary and sufficient conditions on a set of lambda terms to s...
We provide a coinductive definition of strongly convergent reductions between infinite lambda terms....
International audienceWe introduce a linear infinitary λ-calculus, called Λ∞, in which two exponenti...
International audienceIn this paper, we present the lambda-mu-and-or-calculus which at the typed lev...
In a previous paper we have established the theory of transfinite reduction for orthogonal term rewr...
AbstractIn a previous paper we have established the theory of transfinite reduction for orthogonal t...
AbstractWe consider the equational theory λπ of λ-calculus extended with constants π, π0, π1 and axi...
We answer Klop and de Vrijer's question whether adding surjective-pairing axioms to the extensional ...
37 pagesInternational audienceWe show that lambda calculus is a computation model which can step by ...
International audienceIn our paper "Uniformity and the Taylor expansion of ordinary lambda-terms" (w...
AbstractThe use of λ-calculus in richer settings, possibly involving parallelism, is examined in ter...
International audienceThe lambda mu-calculus is an extension of the lambda-calculus that has been in...