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Content available remote Reducibility Proofs in the λ-Calculus
EN
Reducibility, despite being quite mysterious and inflexible, has been used to prove a number of properties of the λ-calculus and is well known to offer general proofs which can be applied to a number of instantiations. In this paper, we look at two related but different results in λ-calculi with intersection types. 1. We show that one such result (which aims at giving reducibility proofs of Church-Rosser, standardisation and weak normalisation for the untyped λ-calculus) faces serious problems which break the reducibility method. We provide a proposal to partially repair the method. 2. We consider a second result whose purpose is to use reducibility for typed terms in order to show the Church-Rosser of &lbeta;-developments for the untyped terms (and hence the Church- Rosser of β-reduction). In this second result, strong normalisation is not needed. We extend the second result to encompass both βI- and βη-reduction rather than simply β-reduction.
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Content available remote On Realisability Semantics for Intersection Types with Expansion Variables
EN
Expansion is a crucial operation for calculating principal typings in intersection type systems. Because the early definitions of expansion were complicated, E-variables were introduced in order to make the calculations easier to mechanise and reason about. Recently, E-variables have been further simplified and generalised to also allow calculating other type operators than just intersection. There has been much work on semantics for type systems with intersection types, but none whatsoever before our work, on type systems with E-variables. In this paper we expose the challenges of building a semantics for E-variables and we provide a novel solution. Because it is unclear how to devise a space of meanings for E-variables, we develop instead a space of meanings for types that is hierarchical. First, we index each type with a natural number and show that although this intuitively captures the use of E-variables, it is difficult to index the universal type ωwith this hierarchy and it is not possible to obtain completeness of the semantics if more than one E-variable is used. We then move to a more complex semantics where each type is associated with a list of natural numbers and establish that both ů and an arbitrary number of E-variables can be represented without losing any of the desirable properties of a realisability semantics.
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