公平响应式规划

Andrew Cave, Francisco Ferreira, P. Panangaden, B. Pientka
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引用次数: 38

摘要

功能反应性规划(FRP)对具有事件和信号的反应性系统进行建模,这些事件和信号先前已被观察到对应于线性时间逻辑(LTL)的“最终”和“始终”模式。本文根据模态模微积分的精神,定义了具有最小不动点算子和最大不动点算子的LTL的构造变分,并给出了作为反应性规划基础演算的证明-程序解释。先前的研究强调了LTL和FRP之间对应的命题类型部分;在这里,我们通过使用结构证明理论来强调证明即程序部分。我们展示了类型系统具有足够的表现力,可以强制执行动态属性,例如调度器的公平性和最终的结果交付。我们用(co)迭代运算符来说明微积分中的编程。我们证明了操作语义的类型保存,这保证了程序是因果关系的。我们也给出了一个强规格化的证明,证明我们的程序是可生产的,并且它们满足由它们的类型派生的活动性质。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Fair reactive programming
Functional Reactive Programming (FRP) models reactive systems with events and signals, which have previously been observed to correspond to the "eventually" and "always" modalities of linear temporal logic (LTL). In this paper, we define a constructive variant of LTL with least fixed point and greatest fixed point operators in the spirit of the modal mu-calculus, and give it a proofs-as-programs interpretation as a foundational calculus for reactive programs. Previous work emphasized the propositions-as-types part of the correspondence between LTL and FRP; here we emphasize the proofs-as-programs part by employing structural proof theory. We show that the type system is expressive enough to enforce liveness properties such as the fairness of schedulers and the eventual delivery of results. We illustrate programming in this calculus using (co)iteration operators. We prove type preservation of our operational semantics, which guarantees that our programs are causal. We give also a proof of strong normalization which provides justification that our programs are productive and that they satisfy liveness properties derived from their types.
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