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Eighth Annual IEEE Symposium on

Logic in Computer Science (LICS 1993)

Paper: Adequacy for untyped translations of typed λ-calculi (at LICS 1993)

Authors: Wesley Phoa


PCF is a simply typed λ-calculus with ground types ι (natural numbers) and ο (Booleans); there are no type variables and ⇒ is the only type constructor. There is a natural way to translate any PCF term t into an untyped λ-expression Λ(t), such that if t is a program, i.e. a closed term of ground type (say integer type) and t ⇒N n̅ then Λ(t) ⇒β cn, where ⇒N denotes call-by-name evaluation and cn denotes the nth Church numeral. This paper contains a proof of the converse: if Λ(t) ⇒β cn then t ⇒N n̅; this tells us that the translation is adequate. The proof is semantic, and uses synthetic domain theory to reduce the question to the original Plotkin/Sazonov adequacy theorem for standard domain models of call-by-name PCF. This argument generalises easily to extensions of PCF which can be translated into the untyped λ-calculus: we illustrate this by proving an analogous result for a `second-order' PCF with type quantification. We also discuss how to extend the result to versions of PCF with recursive types and subtyping


    author = 	 {Wesley Phoa},
    title = 	 {Adequacy for untyped translations of typed λ-calculi},
    booktitle =  {Proceedings of the Eighth Annual IEEE Symposium on Logic in Computer Science (LICS 1993)},
    year =	 {1993},
    month =	 {June}, 
    pages =      {287--295},
    location =   {Montreal, Canada}, 
    publisher =	 {IEEE Computer Society Press}

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Sam Staton