模块、抽象和参数多态性

Karl Crary
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引用次数: 19

摘要

雷诺兹抽象定理构成了数据抽象的数学基础。他的背景是多态λ演算。今天,许多现代语言,如ML家族,采用丰富的模块系统,旨在为数据抽象提供比多态lambda演算更有表现力的支持,但是类似于抽象定理的模块系统远远落后。我们给出了一个支持生成和应用函子、高阶函子、密封和半透明签名的现代模块演算的抽象定理。需要克服的主要问题是:(1)模块结合了类型和术语的事实,因此它们必须同时被视为两者,(2)为透明和不透明模块之间的区别建模的效果原则,以及(3)支持单例类型的非常丰富的类型构造函数语言。我们定义了模块的逻辑等价,并证明它与上下文等价是一致的。这证实了模块有利于数据抽象的民间定理。我们所有的证明都是用Coq形式化的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Modules, abstraction, and parametric polymorphism
Reynolds's Abstraction theorem forms the mathematical foundation for data abstraction. His setting was the polymorphic lambda calculus. Today, many modern languages, such as the ML family, employ rich module systems designed to give more expressive support for data abstraction than the polymorphic lambda calculus, but analogues of the Abstraction theorem for such module systems have lagged far behind. We give an account of the Abstraction theorem for a modern module calculus supporting generative and applicative functors, higher-order functors, sealing, and translucent signatures. The main issues to be overcome are: (1) the fact that modules combine both types and terms, so they must be treated as both simultaneously, (2) the effect discipline that models the distinction between transparent and opaque modules, and (3) a very rich language of type constructors supporting singleton kinds. We define logical equivalence for modules and show that it coincides with contextual equivalence. This substantiates the folk theorem that modules are good for data abstraction. All our proofs are formalized in Coq.
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