量词深度的近最优下界和Weisfeiler-Leman细化步骤

IF 2.3 2区 计算机科学 Q2 COMPUTER SCIENCE, HARDWARE & ARCHITECTURE
Christoph Berkholz, Jakob Nordström
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引用次数: 0

摘要

我们证明了量词深度(也称为量词秩)与一阶逻辑中变量数量的近乎最优权衡,通过展示n元素结构对,这些结构可以由k变量一阶句子区分,但每个这样的句子都需要量词深度至少nΩ(k/log k)。我们的权衡也适用于一阶计数逻辑,并且通过与k维Weisfeiler-Leman算法的已知联系,意味着细化迭代次数的接近最优下界。在我们的证明中,一个关键的组成部分是由[Razborov ' 16]在证明复杂性的背景下引入的硬度凝结技术。我们应用这种方法来减少关系结构的域大小,同时保持在有限变量逻辑中区分它们所需的最小量词深度。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Near-Optimal Lower Bounds on Quantifier Depth and Weisfeiler–Leman Refinement Steps

We prove near-optimal trade-offs for quantifier depth (also called quantifier rank) versus number of variables in first-order logic by exhibiting pairs of n-element structures that can be distinguished by a k-variable first-order sentence but where every such sentence requires quantifier depth at least nΩ(k/log k). Our trade-offs also apply to first-order counting logic, and by the known connection to the k-dimensional Weisfeiler–Leman algorithm imply near-optimal lower bounds on the number of refinement iterations.

A key component in our proof is the hardness condensation technique introduced by [Razborov ’16] in the context of proof complexity. We apply this method to reduce the domain size of relational structures while maintaining the minimal quantifier depth needed to distinguish them in finite variable logics.

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来源期刊
Journal of the ACM
Journal of the ACM 工程技术-计算机:理论方法
CiteScore
7.50
自引率
0.00%
发文量
51
审稿时长
3 months
期刊介绍: The best indicator of the scope of the journal is provided by the areas covered by its Editorial Board. These areas change from time to time, as the field evolves. The following areas are currently covered by a member of the Editorial Board: Algorithms and Combinatorial Optimization; Algorithms and Data Structures; Algorithms, Combinatorial Optimization, and Games; Artificial Intelligence; Complexity Theory; Computational Biology; Computational Geometry; Computer Graphics and Computer Vision; Computer-Aided Verification; Cryptography and Security; Cyber-Physical, Embedded, and Real-Time Systems; Database Systems and Theory; Distributed Computing; Economics and Computation; Information Theory; Logic and Computation; Logic, Algorithms, and Complexity; Machine Learning and Computational Learning Theory; Networking; Parallel Computing and Architecture; Programming Languages; Quantum Computing; Randomized Algorithms and Probabilistic Analysis of Algorithms; Scientific Computing and High Performance Computing; Software Engineering; Web Algorithms and Data Mining
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