Algebraic characterizations and block product decompositions for first order logic and its infinitary quantifier extensions over countable words

IF 1.1 3区计算机科学 Q1 BUSINESS, FINANCE

Journal of Computer and System Sciences Pub Date : 2023-09-01 DOI:10.1016/j.jcss.2023.04.002

Bharat Adsul , Saptarshi Sarkar , A.V. Sreejith

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引用次数: 0

Abstract

We contribute to the refined understanding of language-logic-algebra interplay in a recent algebraic framework over countable words. Algebraic characterizations of the one variable fragment of FO as well as the boolean closure of the existential fragment of FO are established. We develop a seamless integration of the block product operation in the countable setting, and generalize well-known decompositional characterizations of FO and its two variable fragment. We propose an extension of FO admitting infinitary quantifiers to reason about inherent infinitary properties of countable words, and obtain a natural hierarchical block-product based characterization of this extension. Properties expressible in this extension can be simultaneously expressed in the classical logical systems such as WMSO and FO[cut]. We also rule out the possibility of a finite-basis for a block-product based characterization of these logical systems. Finally, we report algebraic characterizations of one variable fragments of the hierarchies of the new extension.

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一阶逻辑的代数表征和块积分解及其可数词上的无限量词扩展

在最近关于可数词的代数框架中，我们有助于对语言逻辑代数相互作用的精细理解。建立了FO的单变量片段的代数刻画以及FO存在片段的布尔闭包。我们在可数设置下开发了块积运算的无缝集成，并推广了FO及其双变量片段的众所周知的分解特征。我们提出了FO允许不定式量词的扩展，以推理可数词的固有不定式性质，并获得了该扩展的基于自然层次块积的特征。在这个扩展中可表达的属性可以同时在经典逻辑系统中表达，如WMSO和FO[cut]。我们还排除了这些逻辑系统的基于块积的特征化的有限基的可能性。最后，我们报告了新扩展的层次结构的一个变量片段的代数特征。

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来源期刊

Journal of Computer and System Sciences 工程技术-计算机：理论方法

CiteScore

3.70

自引率

0.00%

发文量

审稿时长

68 days

期刊介绍： The Journal of Computer and System Sciences publishes original research papers in computer science and related subjects in system science, with attention to the relevant mathematical theory. Applications-oriented papers may also be accepted and they are expected to contain deep analytic evaluation of the proposed solutions. Research areas include traditional subjects such as: • Theory of algorithms and computability • Formal languages • Automata theory Contemporary subjects such as: • Complexity theory • Algorithmic Complexity • Parallel & distributed computing • Computer networks • Neural networks • Computational learning theory • Database theory & practice • Computer modeling of complex systems • Security and Privacy.