Reynolds\u27 notion of relational parametricity has been extremely influential and well studied for polymorphic programming languages and type theories based on System F. The extension of relational parametricity to higher kinded polymorphism, which allows quantification over type operators as well as types, has not received as much attention. We present a model of relational parametricity for System Fomega, within the impredicative Calculus of Inductive Constructions, and show how it forms an instance of a general class of models defined by Hasegawa. We investigate some of the consequences of our model and show that it supports the definition of inductive types, indexed by an arbitrary kind, and with reasoning principles provided by initia...
AbstractIn his seminal paper on “Types, Abstraction and Parametric Polymorphism,” John Reynolds call...
We present a possible world semantics for a call-by-value higher-order programming language with imp...
We give the first relationally parametric model of the extensional calculus of constructions. Our mo...
Reynolds’ notion of relational parametricity has been extremely influential and well studied for pol...
Reynolds’ theory of relational parametricity captures the invariance of polymorphically typed progra...
Reynolds’ original theory of relational parametricity was intended to capture the idea that polymorp...
This paper combines reflexive-graph-category structure for relational parametricity with fibrational...
Reynolds' theory of relational parametricity captures the invariance of polymorphically typed progra...
In this paper we introduce a logic for parametric polymorphism. Just as LCF is a logic for the simp...
In this paper we study the interaction of subtyping and parametricity. We describe a logic for a pr...
Data Types, though, as Reynolds stresses, is not perfectly suited for higher type or higher order sy...
Reynolds’ theory of parametric polymorphism captures the invariance of polymorphically typed program...
Reynolds' abstraction theorem shows how a typing judgement in System F can be translated into a rela...
Reynolds' abstraction theorem shows how a typing judgement in System F can be translated into a rela...
Reynolds' theory of parametric polymorphism captures the invariance of polymorphically typed program...
AbstractIn his seminal paper on “Types, Abstraction and Parametric Polymorphism,” John Reynolds call...
We present a possible world semantics for a call-by-value higher-order programming language with imp...
We give the first relationally parametric model of the extensional calculus of constructions. Our mo...
Reynolds’ notion of relational parametricity has been extremely influential and well studied for pol...
Reynolds’ theory of relational parametricity captures the invariance of polymorphically typed progra...
Reynolds’ original theory of relational parametricity was intended to capture the idea that polymorp...
This paper combines reflexive-graph-category structure for relational parametricity with fibrational...
Reynolds' theory of relational parametricity captures the invariance of polymorphically typed progra...
In this paper we introduce a logic for parametric polymorphism. Just as LCF is a logic for the simp...
In this paper we study the interaction of subtyping and parametricity. We describe a logic for a pr...
Data Types, though, as Reynolds stresses, is not perfectly suited for higher type or higher order sy...
Reynolds’ theory of parametric polymorphism captures the invariance of polymorphically typed program...
Reynolds' abstraction theorem shows how a typing judgement in System F can be translated into a rela...
Reynolds' abstraction theorem shows how a typing judgement in System F can be translated into a rela...
Reynolds' theory of parametric polymorphism captures the invariance of polymorphically typed program...
AbstractIn his seminal paper on “Types, Abstraction and Parametric Polymorphism,” John Reynolds call...
We present a possible world semantics for a call-by-value higher-order programming language with imp...
We give the first relationally parametric model of the extensional calculus of constructions. Our mo...