Gabbay Separation for the Duration Calculus

Time Pub Date : 2022-01-01 DOI:10.4230/LIPIcs.TIME.2022.10
Dimitar P. Guelev
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Abstract

Gabbay’s separation theorem about linear temporal logic with past has proved to be one of the most useful theoretical results in temporal logic. In particular it enables a concise proof of Kamp’s seminal expressive completeness theorem for LTL. In 2000, Alexander Rabinovich established an expressive completeness result for a subset of the Duration Calculus (DC), a real-time interval temporal logic. DC is based on the chop binary modality, which restricts access to subintervals of the reference time interval, and is therefore regarded as introspective . The considered subset of DC is known as the ⌈ P ⌉ -subset in the literature. Neighbourhood Logic (NL), a system closely related to DC, is based on the neighbourhood modalities, also written ⟨ A ⟩ and ⟨ ¯ A ⟩ in the notation stemming from Allen’s system of interval relations. These modalities are expanding as they allow writing future and past formulas to impose conditions outside the reference interval. This setting makes temporal separation relevant: is expressive power ultimately affected, if past constructs are not allowed in the scope of future ones, or vice versa? In this paper we establish an analogue of Gabbay’s separation theorem for the ⌈ P ⌉ -subset of the extension of DC by the neighbourhood modalities, and the ⌈ P ⌉ -subset of the extension of DC by the neighbourhood modalities and chop -based analogue of Kleene star . We show that the result applies if the weak chop inverses , a pair binary expanding modalities, are given the role of the neighbourhood modalities, by virtue of the inter-expressibility between them and the neighbourhood modalities in the presence of chop .
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加贝分离的持续时间演算
Gabbay关于线性时间逻辑与过去的分离定理是时间逻辑中最有用的理论结果之一。特别是,它能够简洁地证明Kamp对LTL的开创性表达完备性定理。Alexander Rabinovich在2000年建立了持续时间演算(Duration Calculus, DC)子集的表达完备性结果。DC基于截波二值模态,限制了对参考时间区间子区间的访问,因此被认为是内省的。在文献中,所考虑的DC子集被称为“≤P≤”子集。邻域逻辑(NL),一个与DC密切相关的系统,基于邻域模态,也写成⟨a⟩和⟨¯a⟩源自Allen的区间关系系统的符号。这些模式正在扩展,因为它们允许编写未来和过去的公式来施加参考区间之外的条件。这种设置使得时间分离相关:如果过去的构念在未来的构念范围内不被允许,表达能力最终会受到影响吗,反之亦然?本文建立了DC被邻模扩展的≤P²子集的Gabbay分离定理的一个类似,以及DC被邻模扩展的≤P²子集和基于chop的Kleene星的类似。我们证明了如果弱斩逆(一对二进制展开模)在斩存在的情况下与邻模之间具有互表达性而被赋予邻模的作用,则该结果是适用的。
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