Proofs that count

Azadeh Farzan, Zachary Kincaid, A. Podelski
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引用次数: 34

Abstract

Counting arguments are among the most basic proof methods in mathematics. Within the field of formal verification, they are useful for reasoning about programs with infinite control, such as programs with an unbounded number of threads, or (concurrent) programs with recursive procedures. While counting arguments are common in informal, hand-written proofs of such programs, there are no fully automated techniques to construct counting arguments. The key questions involved in automating counting arguments are: how to decide what should be counted?, and how to decide when a counting argument is valid? In this paper, we present a technique for automatically constructing and checking counting arguments, which includes novel solutions to these questions.
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重要的证明
计数论证是数学中最基本的证明方法之一。在形式验证领域中,它们用于推理具有无限控制的程序,例如具有无限线程数的程序或具有递归过程的(并发)程序。虽然计数参数在此类程序的非正式手写证明中很常见,但没有完全自动化的技术来构造计数参数。自动计数参数涉及的关键问题是:如何决定应该计数什么?,以及如何确定计数参数何时有效?在本文中,我们提出了一种自动构造和检查计数参数的技术,其中包括对这些问题的新颖解决方案。
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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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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