AbstractWe give an illustration of a construction useful in producing and describing models of Girard and Reynolds' polymorphic λ-calculus. The key unifying ideas are that of a Grothendieck fibration and the category of continuous sections associated with it, constructions used in indexed category theory; the universal types of the calculus are interpreted as the category of continuous sections of the fibration. As a major example a new model for the polymorphic λ-calculus is presented. In it a type is interpreted as a Scott domain. In fact, understanding universal types of the polymorphic λ-calculus as categories of continuous sections appears to be useful generally. For example, the technique also applies to the finitary projection model ...
AbstractWe present and discuss the relations between two classes of categorical models of the second...
Reynolds’ theory of parametric polymorphism captures the invariance of polymorphically typed program...
The Girard-Reynolds polymorphic-calculus is generally regarded as a calculus of parametric polymorph...
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 give an illustration of a construction useful in producing and describing models of Girar...
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...
In this work we describe a category of domains, whose objects are in general categories instead of p...
AbstractWe present a general method for constructing extensional models for the Girard-Reynolds poly...
AbstractWe present a categorical generalisation of the notion of domains, which is closed under (sui...
AbstractWe introduce a model of the second-order lambda calculus. Such a model is a Scott domain who...
We present a general method for constructing extensional models for the Girard-Reynolds polymorphic ...
Various models for the Girard-Reynolds second-order lambda calculus have been presented in the liter...
AbstractThe technical contribution of this paper is threefold.First we show how to encode functional...
AbstractWe present and discuss the relations between two classes of categorical models of the second...
Reynolds’ theory of parametric polymorphism captures the invariance of polymorphically typed program...
The Girard-Reynolds polymorphic-calculus is generally regarded as a calculus of parametric polymorph...
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 give an illustration of a construction useful in producing and describing models of Girar...
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...
In this work we describe a category of domains, whose objects are in general categories instead of p...
AbstractWe present a general method for constructing extensional models for the Girard-Reynolds poly...
AbstractWe present a categorical generalisation of the notion of domains, which is closed under (sui...
AbstractWe introduce a model of the second-order lambda calculus. Such a model is a Scott domain who...
We present a general method for constructing extensional models for the Girard-Reynolds polymorphic ...
Various models for the Girard-Reynolds second-order lambda calculus have been presented in the liter...
AbstractThe technical contribution of this paper is threefold.First we show how to encode functional...
AbstractWe present and discuss the relations between two classes of categorical models of the second...
Reynolds’ theory of parametric polymorphism captures the invariance of polymorphically typed program...
The Girard-Reynolds polymorphic-calculus is generally regarded as a calculus of parametric polymorph...