代数索引类型的抽象和不变性

R. Atkey, Patricia Johann, A. Kennedy
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引用次数: 8

摘要

雷诺兹的关系参数提供了一种强大的方法来解释程序在数据表示变化时的不变性。雷诺兹理论有一系列令人眼花缭乱的应用,利用不变性来产生“自由定理”、非居住结果和代数数据类型的编码。在计算机科学之外,不变性是贯穿数学和物理许多领域的一个共同主题。例如,一个三角形的面积不会因旋转或翻转而改变。如果我们缩放一个三角形,那么我们缩放它的面积,保持两者之间不变的关系。性质不变的变换通常被组织成群,其代数结构反映了变换的可组合性和可逆性。在本文中,我们研究了用几何变换群等代数结构来索引类型的编程语言。其他示例包括按主体索引的类型(用于信息流安全性)和按距离索引的类型(用于分析一致连续性属性)。在Reynolds之后,我们证明了一个涵盖所有这些实例的一般抽象定理。抽象定理的结果包括表达程序不变性的自由定理,基于不变性的类型同构,以及指示某些代数索引类型何时不存在或仅由平凡程序存在的非可定义性结果。我们已经在Coq中完全形式化了我们的框架和大多数示例。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Abstraction and invariance for algebraically indexed types
Reynolds' relational parametricity provides a powerful way to reason about programs in terms of invariance under changes of data representation. A dazzling array of applications of Reynolds' theory exists, exploiting invariance to yield "free theorems", non-inhabitation results, and encodings of algebraic datatypes. Outside computer science, invariance is a common theme running through many areas of mathematics and physics. For example, the area of a triangle is unaltered by rotation or flipping. If we scale a triangle, then we scale its area, maintaining an invariant relationship between the two. The transformations under which properties are invariant are often organised into groups, with the algebraic structure reflecting the composability and invertibility of transformations. In this paper, we investigate programming languages whose types are indexed by algebraic structures such as groups of geometric transformations. Other examples include types indexed by principals--for information flow security--and types indexed by distances--for analysis of analytic uniform continuity properties. Following Reynolds, we prove a general Abstraction Theorem that covers all these instances. Consequences of our Abstraction Theorem include free theorems expressing invariance properties of programs, type isomorphisms based on invariance properties, and non-definability results indicating when certain algebraically indexed types are uninhabited or only inhabited by trivial programs. We have fully formalised our framework and most examples in Coq.
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