System F with coercion constraints

Julien Cretin, Didier Rémy
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引用次数: 10

Abstract

We present a second-order λ-calculus with coercion constraints that generalizes a previous extension of System F with parametric coercion abstractions by allowing multiple but simultaneous type and coercion abstractions, as well as recursive coercions and equi-recursive types. This enables a uniform presentation of several type system features that had previously been studied separately: type containment, bounded and instance-bounded polymorphism, which are already encodable with parametric coercion abstraction, and ML-style subtyping constraints. Our framework allows for a clear separation of language constructs with and without computational content. We also distinguish coherent coercions that are fully erasable from potentially incoherent coercions that suspend the evaluation---and enable the encoding of GADTs. Technically, type coercions that witness subtyping relations between types are replaced by a more expressive notion of typing coercions that witness subsumption relations between typings, e.g. pairs composed of a typing environment and a type. Our calculus is equipped with full reduction that allows reduction under abstractions---but we also introduce a form of weak reduction as reduction cannot proceed under incoherent type abstractions. Type soundness is proved by adapting the step-indexed semantics technique to full reduction, moving indices inside terms so as to control the reduction steps internally---but this is only detailed in the extended version.
具有强制约束的系统F
我们提出了一个二阶λ-微积分,通过允许多个同时类型和强制抽象,以及递归强制和等递归类型,推广了具有参数强制抽象的系统F的先前扩展。这使得以前单独研究的几个类型系统特性能够统一表示:类型包含、有界和实例有界多态性(已经可以用参数强制抽象进行编码)和ml风格的子类型约束。我们的框架允许清晰地分离有和没有计算内容的语言结构。我们还区分了完全可擦除的相干强制和暂停评估的潜在不相干强制,并使gadt的编码成为可能。从技术上讲,见证类型之间的子类型关系的类型强制被更具表达性的见证类型之间的包容关系的类型强制概念所取代,例如,由类型环境和类型组成的对。我们的演算配备了完全还原,允许在抽象下进行还原——但我们也引入了一种弱还原形式,因为还原不能在非连贯类型抽象下进行。通过将步索引语义技术应用于完全约简,在项内移动索引从而在内部控制约简步骤来证明类型稳健性,但这只在扩展版本中详细介绍。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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