1996
DOI: 10.1007/3-540-61464-8_51
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Combinatory reduction systems with explicit substitution that preserve strong normalisation

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Cited by 20 publications
(13 citation statements)
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“…But it is confluent on closed terms (of explicit substitutions), which are sufficient to represent all λ-terms. Later several calculi were designed with full confluence [11], or with both properties by suppressing some of the operations of explicit substitutions such as the composition of substitutions [4,23,7]. Until very recently no fully expressive calculus existed with both properties of confluence and strong normalization.…”
Section: Introductionmentioning
confidence: 99%
“…But it is confluent on closed terms (of explicit substitutions), which are sufficient to represent all λ-terms. Later several calculi were designed with full confluence [11], or with both properties by suppressing some of the operations of explicit substitutions such as the composition of substitutions [4,23,7]. Until very recently no fully expressive calculus existed with both properties of confluence and strong normalization.…”
Section: Introductionmentioning
confidence: 99%
“…These two last approaches study the logical meaning of a given reduction system with explicit substitutions rather than the computational meaning of a given logical cut elimination process. Finally, it is worth noticing that the T P C ES -calculus is not a particular case of the higher order calculi with explicit substitutions proposed in [8], which do not allow to make abstractions on patterns, neither to have different forms of explicit substitutions.…”
Section: Resultsmentioning
confidence: 99%
“…Indeed, reduction rules for let terms will allow to express the pattern matching process inside the T P C ES calculus, while reduction rules for explicit substitutions terms will allow to express the behavior of explicit substitutions as is classically done in the literature [1,5,8,26]. Therefore, both pattern matching and explicit substitution computations can be modeled via the cut elimination process for sequent proofs.…”
Section: Typing Rulesmentioning
confidence: 99%
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