This paper shows how a recently developed view of typing as small-step abstract reduction, due to Kuan, MacQueen, and Findler, can be used to recast the development of simple type theory from a rewriting perspective. We show how standard meta-theoretic results can be proved in a completely new way, using the rewriting view of simple typing. These meta-theoretic results include standard type preservation and progress properties for simply typed lambda calculus, as well as generalized versions where typing is taken to include both abstract and concrete reduction. We show how automated analysis tools developed in the term-rewriting community can be used to help automate the proofs for this meta-theory. Finally, we show how to adapt a standard ...
AbstractThe last few years have seen the development of a new calculus which can be considered as an...
International audienceDependently typed programming languages and proof assistants such as Agda and ...
Pure Type Systems (also called Generalized Type Systems) describe the functional structure of typed ...
This paper shows how a recently developed view of typing as small-step abstract reduction, due to Ku...
This paper shows how a recently developed view of typing as small-stepabstract reduction, due to Kua...
AbstractThe rewriting calculus is a rule construction and application framework. As such it embeds i...
Colloque avec actes et comité de lecture. internationale.International audiencePure Pattern Type Sys...
In the study of termination of reduction systems, the notion of types has played an important role. ...
In the area of foundations of mathematics and computer science, three related topics dominate. These...
This is an informal explanation of the main concepts and results of [Sev96]. We consider typed and u...
Tait's proof of strong normalization for the simply typed lambda-calculus is interpreted in a genera...
Texte intégral accessible uniquement aux membres de l'Université de LorraineThe rewriting calculus i...
Untyped reduction provides a natural operational semantics for type theory. Normalization results sa...
Abstract. We present a formal treatment of normalization by evalua-tion in type theory. The involved...
International audienceThe rewriting calculus (rho-calculus), is a minimal framework embedding lambda...
AbstractThe last few years have seen the development of a new calculus which can be considered as an...
International audienceDependently typed programming languages and proof assistants such as Agda and ...
Pure Type Systems (also called Generalized Type Systems) describe the functional structure of typed ...
This paper shows how a recently developed view of typing as small-step abstract reduction, due to Ku...
This paper shows how a recently developed view of typing as small-stepabstract reduction, due to Kua...
AbstractThe rewriting calculus is a rule construction and application framework. As such it embeds i...
Colloque avec actes et comité de lecture. internationale.International audiencePure Pattern Type Sys...
In the study of termination of reduction systems, the notion of types has played an important role. ...
In the area of foundations of mathematics and computer science, three related topics dominate. These...
This is an informal explanation of the main concepts and results of [Sev96]. We consider typed and u...
Tait's proof of strong normalization for the simply typed lambda-calculus is interpreted in a genera...
Texte intégral accessible uniquement aux membres de l'Université de LorraineThe rewriting calculus i...
Untyped reduction provides a natural operational semantics for type theory. Normalization results sa...
Abstract. We present a formal treatment of normalization by evalua-tion in type theory. The involved...
International audienceThe rewriting calculus (rho-calculus), is a minimal framework embedding lambda...
AbstractThe last few years have seen the development of a new calculus which can be considered as an...
International audienceDependently typed programming languages and proof assistants such as Agda and ...
Pure Type Systems (also called Generalized Type Systems) describe the functional structure of typed ...