Add to ORKGExplicit substitution calculi are extensions of the lambda-calculus where the substitution mechanism is internalized into the theory. This feature makes them suitable for implementation and theoretical study of logic-based tools such as strongly typed programming languages and proof assistant systems. In this paper we explore new developments on two of the most successful styles of explicit substitution calculi: the lambda sigma- and lambda S(e)-calculi
Pure type systems are a generic formalism for usual lambda-calculus, which combine great simplicity ...
This report contains the proceedings of the fourth Workshop on Explicit Substitutions Theory and Ap...
We present a confluent rewriting system wich extends a previous calculus for the Lambda-Calculus (Le...
Explicit substitution calculi are extensions of the Lambda-calculus where the substitution mechanism...
Calculi with explicit substitutions are widely used in different areas of com-puter science such as ...
Explicit substitution calculi are extensions of the λ-calculus where the substitution mechanism is i...
Explicit substitution calculi are extensions of the λ-calculus where the substitution mechanism is i...
Many different systems with explicit substitutions have been proposed toimplement a large class of h...
International audienceCalculi with explicit substitutions are widely used in different areas of comp...
International audienceSince Melliès has shown that $\lambda\sigma$ (a calculus of explicit substitut...
Pure type systems are a generic formalism for usual lambda-calculus, which combine great simplicity ...
Pure type systems are a generic formalism for usual lambda-calculus, which combine great simplicity ...
Pure type systems are a generic formalism for usual lambda-calculus, which combine great simplicity ...
Pure type systems are a generic formalism for usual lambda-calculus, which combine great simplicity ...
Pure type systems are a generic formalism for usual lambda-calculus, which combine great simplicity ...
Pure type systems are a generic formalism for usual lambda-calculus, which combine great simplicity ...
This report contains the proceedings of the fourth Workshop on Explicit Substitutions Theory and Ap...
We present a confluent rewriting system wich extends a previous calculus for the Lambda-Calculus (Le...
Explicit substitution calculi are extensions of the Lambda-calculus where the substitution mechanism...
Calculi with explicit substitutions are widely used in different areas of com-puter science such as ...
Explicit substitution calculi are extensions of the λ-calculus where the substitution mechanism is i...
Explicit substitution calculi are extensions of the λ-calculus where the substitution mechanism is i...
Many different systems with explicit substitutions have been proposed toimplement a large class of h...
International audienceCalculi with explicit substitutions are widely used in different areas of comp...
International audienceSince Melliès has shown that $\lambda\sigma$ (a calculus of explicit substitut...
Pure type systems are a generic formalism for usual lambda-calculus, which combine great simplicity ...
Pure type systems are a generic formalism for usual lambda-calculus, which combine great simplicity ...
Pure type systems are a generic formalism for usual lambda-calculus, which combine great simplicity ...
Pure type systems are a generic formalism for usual lambda-calculus, which combine great simplicity ...
Pure type systems are a generic formalism for usual lambda-calculus, which combine great simplicity ...
Pure type systems are a generic formalism for usual lambda-calculus, which combine great simplicity ...
This report contains the proceedings of the fourth Workshop on Explicit Substitutions Theory and Ap...
We present a confluent rewriting system wich extends a previous calculus for the Lambda-Calculus (Le...