网络的语义基础

Carolyn Jane Anderson, Nate Foster, Arjun Guha, Jean-Baptiste Jeannin, D. Kozen, Cole Schlesinger, D. Walker
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引用次数: 433

摘要

近年来,人们对用于编程网络的高级语言越来越感兴趣。但是这些语言的设计在很大程度上是临时的,更多的是由应用程序的需求和网络硬件的能力驱动,而不是由基本原则驱动。由于缺乏语义基础,语言设计者在决定如何合并新特性方面几乎没有指导,而程序员也没有办法对他们的代码进行精确推理。NetKAT是一种新的网络程序设计语言,它建立在坚实的数学基础之上,具有完善的方程理论。我们描述了NetKAT的设计,包括过滤、修改和传输数据包的原语;联合和顺序组合操作符;以及迭代程序的Kleene星型运算符。我们证明了NetKAT是一个被称为Kleene代数与测试(KAT)的规范和被充分研究的数学结构的实例,并证明了它的方程理论在其指称语义方面是健全和完整的。最后,我们介绍了等式理论的实际应用,包括检查可达性的语法技术,证明确保程序之间隔离的非干扰特性,以及建立编译算法的正确性。
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NetKAT: semantic foundations for networks
Recent years have seen growing interest in high-level languages for programming networks. But the design of these languages has been largely ad hoc, driven more by the needs of applications and the capabilities of network hardware than by foundational principles. The lack of a semantic foundation has left language designers with little guidance in determining how to incorporate new features, and programmers without a means to reason precisely about their code. This paper presents NetKAT, a new network programming language that is based on a solid mathematical foundation and comes equipped with a sound and complete equational theory. We describe the design of NetKAT, including primitives for filtering, modifying, and transmitting packets; union and sequential composition operators; and a Kleene star operator that iterates programs. We show that NetKAT is an instance of a canonical and well-studied mathematical structure called a Kleene algebra with tests (KAT) and prove that its equational theory is sound and complete with respect to its denotational semantics. Finally, we present practical applications of the equational theory including syntactic techniques for checking reachability, proving non-interference properties that ensure isolation between programs, and establishing the correctness of compilation algorithms.
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Session details: Verified systems Session details: Semantic models 2 Session details: Program analysis 3 Session details: Program analysis 1 Session details: Type system design
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