Add to ORKGInternational audienceIn this paper, we define a realizability semantics for the simply typed $\lambda\mu$-calculus. We show that if a term is typable, then it inhabits the interpretation of its type. This result serves to give characterizations of the computational behavior of some closed typed terms. We also prove a completeness result of our realizability semantics using a particular term model
We present a general method for proving properties of typed λ-terms. This method is obtained by intr...
A closed λ-term M is easy if, for any other closed term N, the lambda theory generated by ...
A closed λ-term M is easy if, for any other closed term N, the lambda theory generated by ...
In this paper, we define a new realizability semantics for the simply typedlambda-mu-calculus. We sh...
In this paper, we correct some errors in [21]. We define a new realizability semantics for the simpl...
In this paper, we correct some errors in [21]. We define a new realizability semantics for the simpl...
We present a general method for proving properties of typed λ-terms. This method is obtained by intr...
The main purpose of this paper is to take apart the reducibility method in order to understand how i...
The main purpose of this paper is to take apart the reducibility method in order to understand how i...
We present a realizability interpretation of an intuitionistic version of Church's Simple Theory of ...
We present the model construction technique called Linear Realizability. It consists in building a c...
We present a variation of Hindley\u27s completeness theorem for simply typed lambda-calculus. It is ...
We present a simply-typed λ-calculus with explicit substitutions and we give a fully formalised proo...
We present a simply-typed λ-calculus with explicit substitutions and we give a fully formalised proo...
We present a simply-typed λ-calculus with explicit substitutions and we give a fully formalised proo...
We present a general method for proving properties of typed λ-terms. This method is obtained by intr...
A closed λ-term M is easy if, for any other closed term N, the lambda theory generated by ...
A closed λ-term M is easy if, for any other closed term N, the lambda theory generated by ...
In this paper, we define a new realizability semantics for the simply typedlambda-mu-calculus. We sh...
In this paper, we correct some errors in [21]. We define a new realizability semantics for the simpl...
In this paper, we correct some errors in [21]. We define a new realizability semantics for the simpl...
We present a general method for proving properties of typed λ-terms. This method is obtained by intr...
The main purpose of this paper is to take apart the reducibility method in order to understand how i...
The main purpose of this paper is to take apart the reducibility method in order to understand how i...
We present a realizability interpretation of an intuitionistic version of Church's Simple Theory of ...
We present the model construction technique called Linear Realizability. It consists in building a c...
We present a variation of Hindley\u27s completeness theorem for simply typed lambda-calculus. It is ...
We present a simply-typed λ-calculus with explicit substitutions and we give a fully formalised proo...
We present a simply-typed λ-calculus with explicit substitutions and we give a fully formalised proo...
We present a simply-typed λ-calculus with explicit substitutions and we give a fully formalised proo...
We present a general method for proving properties of typed λ-terms. This method is obtained by intr...
A closed λ-term M is easy if, for any other closed term N, the lambda theory generated by ...
A closed λ-term M is easy if, for any other closed term N, the lambda theory generated by ...