在λΠ-Calculus Modulo中重写Modulo β

International Workshop on Logical Frameworks and Meta-Languages: Theory and Practice Pub Date : 2015-07-29 DOI:10.4204/EPTCS.185.6

Ronan Saillard

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引用次数: 4

摘要

λ Π-calculus模是λ-演算的一个变体，具有依赖类型，其中β-转换扩展为用户定义的重写规则。它是一个富有表现力的逻辑框架，并已被用于以一种浅显的方式对逻辑和类型系统进行编码。基本性质，如主题约简或类型的唯一性在λ Π-calculus模中一般不成立。然而，如果改写规则与β-约简生成的改写体系是合流的，则它们成立。但这限制太大了。为了处理由于β-约简和重写规则之间的干扰而导致不合流的情况，我们引入了λ Π-calculus模的重写模β的概念。证明了改写模β的合流足以保证主题约简和类型唯一性。我们通过将λ Π-calculus模编码到高阶重写系统(HRS)中来实现我们的目标。因此，对于λ Π-calculus模，我们也给出了hrs的合流结果。

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Rewriting Modulo βin the λΠ-Calculus Modulo

The λ Π-calculus Modulo is a variant of the λ-calculus with dependent types where β-conversion is extended with user-defined rewrite rules. It is an expressive logical framework and has been used to encode logics and type systems in a shallow way. Basic properties such as subject reduction or uniqueness of types do not hold in general in the λ Π-calculus Modulo. However, they hold if the rewrite system generated by the rewrite rules together with β-reduction is confluent. But this is too restrictive. To handle the case where non confluence comes from the interference between the β-reduction and rewrite rules with λ-abstraction on their left-hand side, we introduce a notion of rewriting modulo β for the λ Π-calculus Modulo. We prove that confluence of rewriting modulo β is enough to ensure subject reduction and uniqueness of types. We achieve our goal by encoding the λ Π-calculus Modulo into Higher-Order Rewrite System (HRS). As a consequence, we also make the confluence results for HRSs available for the λ Π-calculus Modulo.

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International Workshop on Logical Frameworks and Meta-Languages: Theory and Practice

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