We present here a large family of concrete models for Girard and Reynolds polymorphism (System F), in a noncategorical setting. The family generalizes the construction of the model of Barbanera and Berardi, hence it contains models which are complete for F. It also contains simpler models, the simplest of them, E², being a second-order variant of the Engeler-Plotkin model E. All the models here belong to the continuous semantics, all have the maximum number of polymorphic maps. The class contains models which can be viewed as two intertwined compatible webbed models of untyped lambda-calculus, but is much larger than this. Finally many of its models might be read as two intertwined strict intersection type systems
Various models for the Girard-Reynolds second-order lambda calculus have been presented in the liter...
AbstractJean-Yves Girard and John Reynolds independently discovered the second-order polymorphic lam...
AbstractWe present a categorical generalisation of the notion of domains, which is closed under (sui...
AbstractWe present here a large family of concrete models for Girard and Reynolds polymorphism (syst...
We present here a large family of concrete models for Girard and Reynolds polymorphism (System F), i...
AbstractWe give an illustration of a construction useful in producing and describing models of Girar...
We show that Friedman's proof of the existence of non-trivial beta-eta-complete models of the simply...
We give an illustration of a construction useful in producing and describing models of Girard and Re...
We give an illustration of a construction useful in producing and describing models of Girard and Re...
AbstractWe introduce a model of the second-order lambda calculus. Such a model is a Scott domain who...
AbstractWe generalize Baeten and Boerboom's method of forcing to show that there is a fixed sequence...
AbstractWe present a general method for constructing extensional models for the Girard-Reynolds poly...
We present a general method for constructing extensional models for the Girard-Reynolds polymorphic ...
We generalize Baeten and Boerbom's method of forcing, and apply it to show that there is a fixed seq...
Reynolds’ theory of parametric polymorphism captures the invariance of polymorphically typed program...
Various models for the Girard-Reynolds second-order lambda calculus have been presented in the liter...
AbstractJean-Yves Girard and John Reynolds independently discovered the second-order polymorphic lam...
AbstractWe present a categorical generalisation of the notion of domains, which is closed under (sui...
AbstractWe present here a large family of concrete models for Girard and Reynolds polymorphism (syst...
We present here a large family of concrete models for Girard and Reynolds polymorphism (System F), i...
AbstractWe give an illustration of a construction useful in producing and describing models of Girar...
We show that Friedman's proof of the existence of non-trivial beta-eta-complete models of the simply...
We give an illustration of a construction useful in producing and describing models of Girard and Re...
We give an illustration of a construction useful in producing and describing models of Girard and Re...
AbstractWe introduce a model of the second-order lambda calculus. Such a model is a Scott domain who...
AbstractWe generalize Baeten and Boerboom's method of forcing to show that there is a fixed sequence...
AbstractWe present a general method for constructing extensional models for the Girard-Reynolds poly...
We present a general method for constructing extensional models for the Girard-Reynolds polymorphic ...
We generalize Baeten and Boerbom's method of forcing, and apply it to show that there is a fixed seq...
Reynolds’ theory of parametric polymorphism captures the invariance of polymorphically typed program...
Various models for the Girard-Reynolds second-order lambda calculus have been presented in the liter...
AbstractJean-Yves Girard and John Reynolds independently discovered the second-order polymorphic lam...
AbstractWe present a categorical generalisation of the notion of domains, which is closed under (sui...