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TLCA
2007
Springer
2007
Springer
Continuation-Passing Style and Strong Normalisation for Intuitionistic Sequent Calculi
Abstract. The intuitionistic fragment of the call-by-name version of Curien and Herbelin’s λµ˜µ-calculus is isolated and proved strongly normalising by means of an embedding into the simply-typed λ-calculus. Our embedding is a continuation-and-garbagepassing style translation, the inspiring idea coming from Ikeda and Nakazawa’s translation of Parigot’s λµ-calculus. The embedding strictly simulates reductions while usual continuation-passing-style transformations erase permutative reduction steps. For our intuitionistic sequent calculus, we even only need “units of garbage” to be passed. We apply the same method to other calculi, namely successive extensions of the simply-typed λcalculus leading to our intuitionistic system, and already for the simplest extension we consider (λ-calculus with generalised application), this yields the first proof of strong normalisation through a reduction-preserving embedding. The results obtained extend to second and higher-order cal...
Real-time TrafficEmbedding | Intuitionistic | Intuitionistic Sequent Calculus | Theoretical Computer Science | TLCA 2007 |
| Added | 09 Jun 2010 |
| Updated | 09 Jun 2010 |
| Type | Conference |
| Year | 2007 |
| Where | TLCA |
| Authors | José Espírito Santo, Ralph Matthes, Luis Pinto |
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