A proof system for separation logic with magic wand

Wonyeol Lee, Sungwoo Park
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引用次数: 29

Abstract

Separation logic is an extension of Hoare logic which is acknowledged as an enabling technology for large-scale program verification. It features two new logical connectives, separating conjunction and separating implication, but most of the applications of separation logic have exploited only separating conjunction without considering separating implication. Nevertheless the power of separating implication has been well recognized and there is a growing interest in its use for program verification. This paper develops a proof system for full separation logic which supports not only separating conjunction but also separating implication. The proof system is developed in the style of sequent calculus and satisfies the admissibility of cut. The key challenge in the development is to devise a set of inference rules for manipulating heap structures that ensure the completeness of the proof system with respect to separation logic. We show that our proof of completeness directly translates to a proof search strategy.
用魔棒证明分离逻辑的系统
分离逻辑是霍尔逻辑的扩展,被认为是大规模程序验证的使能技术。它有两个新的逻辑连接词:分离连接和分离隐含,但是大多数分离逻辑的应用只利用了分离连接而没有考虑分离隐含。尽管如此,分离隐含的力量已经得到了很好的认识,并且对将其用于程序验证的兴趣越来越大。本文开发了一个既支持分离合又支持分离蕴涵的完全分离逻辑证明系统。该证明系统采用序列演算的形式,满足切的可容许性。开发中的关键挑战是设计一组用于操作堆结构的推理规则,以确保证明系统在分离逻辑方面的完整性。我们证明了我们的完备性证明直接转化为证明搜索策略。
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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