分离理论的参数完备性

J. Brotherston, Jules Villard
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引用次数: 40

摘要

在本文中,我们缩小了逻辑BBI(分离逻辑的命题基础)中的可证明性与分离模型的预期类别中的有效性之间的逻辑差距,这些模型用于分离逻辑的应用,如程序验证。预期的分离模型类别通常由一组公理指定,这些公理描述了期望保持的特定模型属性,我们称之为分离理论。我们的主要贡献如下。首先,我们证明了分离理论的几个典型性质在BBI中是不可定义的。其次,我们证明了这些属性在BBI的一个合适的混合扩展中是可定义的,通过向BBI添加命名理论,以与混合逻辑扩展正常模态逻辑相同的方式获得。无绑定扩展捕获了我们考虑的大多数属性,而具有混合逻辑通常绑定的完整扩展HyBBI(↓)涵盖了所有这些属性。第三,对于我们的混合逻辑,我们给出了一个公理证明系统,它与任何一组“纯”公理的扩展对于满足这些公理的模型是健全完备的。作为这个一般结果的一个推论,我们以参数化的方式,得到了任何与我们所考虑的类分离的理论的一个健全的、完备的公理证明系统。据我们所知,这门课包括了所有出版文献中出现的分离理论。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Parametric completeness for separation theories
In this paper, we close the logical gap between provability in the logic BBI, which is the propositional basis for separation logic, and validity in an intended class of separation models, as employed in applications of separation logic such as program verification. An intended class of separation models is usually specified by a collection of axioms describing the specific model properties that are expected to hold, which we call a separation theory. Our main contributions are as follows. First, we show that several typical properties of separation theories are not definable in BBI. Second, we show that these properties become definable in a suitable hybrid extension of BBI, obtained by adding a theory of naming to BBI in the same way that hybrid logic extends normal modal logic. The binder-free extension captures most of the properties we consider, and the full extension HyBBI(↓) with the usual ↓ binder of hybrid logic covers all these properties. Third, we present an axiomatic proof system for our hybrid logic whose extension with any set of "pure" axioms is sound and complete with respect to the models satisfying those axioms. As a corollary of this general result, we obtain, in a parametric manner, a sound and complete axiomatic proof system for any separation theory from our considered class. To the best of our knowledge, this class includes all separation theories appearing in the published literature.
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